tag:blogger.com,1999:blog-89213189264893774282024-03-14T07:53:41.505+02:00Ο άγνωστος χΜια περιήγηση στον κόσμο των μαθηματικώνThanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comBlogger321125tag:blogger.com,1999:blog-8921318926489377428.post-6848127660587760442024-02-24T18:48:00.001+02:002024-02-24T18:48:17.346+02:00Επαναληπτικό Διαγώνισμα Γ Λυκείου (2ο Κεφάλαιο / 2024)<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiH-TBiihQoWbouZ1-2m58LlmwxQNbKu00Fn70OwIio4QMrBXkwQMcuZAeL5WhbjFTT8PCGkYtITg8gphp-UP01ju6z8InB_y4HcnUgD4nUHMdk3QbVRaRd4xb-v8OMVkGESXld9ifKuQerPvATVxJLD0l7D32HXOdj1wtl9ClRu5TqxiBAFLpOvzb8IYKB/s800/c0304476-800px-wm.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="800" data-original-width="658" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiH-TBiihQoWbouZ1-2m58LlmwxQNbKu00Fn70OwIio4QMrBXkwQMcuZAeL5WhbjFTT8PCGkYtITg8gphp-UP01ju6z8InB_y4HcnUgD4nUHMdk3QbVRaRd4xb-v8OMVkGESXld9ifKuQerPvATVxJLD0l7D32HXOdj1wtl9ClRu5TqxiBAFLpOvzb8IYKB/s320/c0304476-800px-wm.jpg" width="263" /></a></div><p><br /></p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/135kE-irGdTrgKlMV3zlgkrwJJrpfqar7/preview" width="640"></iframe>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-65960071142324695922024-02-07T20:43:00.009+02:002024-02-07T20:59:46.650+02:00Εγκαινιάζεται το αστρονομικό ρολόι πλανητάριο βασισμένο στο Μηχανισμό των Αντικυθήρων<p> </p> <p></p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjOi7_7R9WbyQvp661f-sBnp4CRCM4YNPfWsVGctHAynUEQa-K9riZEA2iUdJ6moq9cd1ENFJ3XlnIo8BggqgPnatWfsKOMAzwQ1GAI2ctUXeWPtuBscKPCKXObzi5b222BMCnnVmkUbXDB8pGsr9b2Mj-QV560JJxwJgaf10h1BCzgE6ch3cR6_LYVTIeQ/s300/%CE%A7%CF%89%CF%81%CE%AF%CF%82%20%CF%84%CE%AF%CF%84%CE%BB%CE%BF.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="168" data-original-width="300" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjOi7_7R9WbyQvp661f-sBnp4CRCM4YNPfWsVGctHAynUEQa-K9riZEA2iUdJ6moq9cd1ENFJ3XlnIo8BggqgPnatWfsKOMAzwQ1GAI2ctUXeWPtuBscKPCKXObzi5b222BMCnnVmkUbXDB8pGsr9b2Mj-QV560JJxwJgaf10h1BCzgE6ch3cR6_LYVTIeQ/s16000/%CE%A7%CF%89%CF%81%CE%AF%CF%82%20%CF%84%CE%AF%CF%84%CE%BB%CE%BF.jpg" /></a></div>Εγκαίνια για το αστρονομικό ρολόι πλανητάριο, το οποίο βασίζεται στο Μηχανισμό των Αντικυθήρων στο Πανεπιστήμιο της πολιτείας Σονόρα στο Μεξικό. Η αυριανή ημερομηνία επιλέχθηκε, ώστε να συμπίπτει με την "Παγκόσμια Ημέρα Ελληνικής Γλώσσας" (09 Φεβρουαρίου, ημέρα μνήμης του Διονύσιου Σολωμού).<p></p><p>Το αστρονομικό ρολόι πλανητάριο με ύψος 3,20 μέτρα (δέκα φορές μεγαλύτερο από το πρωτότυπο έργο ύψους 32 εκατοστών) έχει τοποθετηθεί σε μια μικρή πλατεία, η οποία ονομάστηκε "Πλατεία Αντικυθήρων" μέσα στην Πανεπιστημιούπολη και κατασκευάστηκε σε συνεργασία ερευνητικής ομάδας του Πανεπιστημίου με γνωστή εταιρεία μεγάλων ρολογιών. </p><p></p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhfDA3Oop6t6J6iqFpHoy4Cztzd01U9683Uj9hbd94-O5k8v5HR68iYq7KRh6eESL3YOt9xitiFFB7IAZeehcnnXW_sY6x4cijXv2D8qg2UB_wciyCRCZU5l1amMkvWQRhEC8OK1_FCqpPGFXBjsx-Wx9e03eDs4fTo31Vhv_jkbnvyMyq6j1KHcTpekOI-/s960/2-3-960x720.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="720" data-original-width="960" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhfDA3Oop6t6J6iqFpHoy4Cztzd01U9683Uj9hbd94-O5k8v5HR68iYq7KRh6eESL3YOt9xitiFFB7IAZeehcnnXW_sY6x4cijXv2D8qg2UB_wciyCRCZU5l1amMkvWQRhEC8OK1_FCqpPGFXBjsx-Wx9e03eDs4fTo31Vhv_jkbnvyMyq6j1KHcTpekOI-/w320-h240/2-3-960x720.jpg" width="320" /></a></div><p></p><p>Στη συγκεκριμένη εκδήλωση θα ενεργοποιηθεί το μνημιακό ρολόι, το οποίο από εκείνη τη στιγμή και μετά θα παρέχει κίνηση στο αντίγραφο του Μηχανισμού των Αντικυθήρων.</p><p>Η μνημειώδης αυτή έκδοση περιλαμβάνει την πρόβλεψη των θέσεων των ουράνιων σωμάτων, δηλαδή του Ήλιου, της Σελήνης και των πέντε ορατών πλανητών, την πρόβλεψη του καιρού με βάση ακριβή ημερολόγια και κλιματολογικά δεδομένα (π.χ. Οκτώβρη και Νοέμβρη βρέχει στην Ελλάδα, άρα πρέπει να γίνει σπορά των σιτηρών), προβλέπει επίσης τις εκλείψεις και προσδιορίζει πότε γίνονται οι Ολυμπιακοί Αγώνες.</p><p>Το αστρονομικό ρολόι πλανητάριο παρουσιάστηκε για πρώτη φορά σε παγκόσμιο επίπεδο στις 02 Ιουνίου 2022, στο Ίδρυμα Αικατερίνης Λασκαρίδη.</p><p>Η τελετή εγκαινίων είναι στις 08 Φεβρουαρίου 2023, 08:30 μ.μ. ώρα Ελλάδας και υπάρχει η δυνατότητα παρακολούθησης στο παρακάτω κανάλι:</p>
<iframe allow="accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture; web-share" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/twGxgZdyhf4?si=9S9UAAg6RfPpDlPD" title="YouTube video player" width="560"></iframe>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-21235921587299603662023-11-04T15:15:00.004+02:002023-11-09T19:04:30.649+02:00Επαναληπτικό Διαγώνισμα Γ΄ Λυκείου (1ο Κεφάλαιο / 2023 - 2024)<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj2Widf5FVSRlj0kpBT-Rl9rD3dSBs2byXtjKXeDnT0sGnLSpgTRjo8XJQBZ2KTi8iIa7zMqVJyfHxty5f0mC7BQhKHIFWWJ2F05QdwvNNzlMUSfOPo1hVecoVaxwhSvXPCTWG_6EPVT_ZS5eCNCylSIOMg1vWODCKJT9qELqR_OqOiHddPgPNXlbK3ZEfH/s329/250px-BBolzano.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="329" data-original-width="250" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj2Widf5FVSRlj0kpBT-Rl9rD3dSBs2byXtjKXeDnT0sGnLSpgTRjo8XJQBZ2KTi8iIa7zMqVJyfHxty5f0mC7BQhKHIFWWJ2F05QdwvNNzlMUSfOPo1hVecoVaxwhSvXPCTWG_6EPVT_ZS5eCNCylSIOMg1vWODCKJT9qELqR_OqOiHddPgPNXlbK3ZEfH/s320/250px-BBolzano.jpg" width="243" /></a></div><p></p><p>Τις απαντήσεις επιμελήθηκε ο συνάδελφος και φίλος Γιάννης Κάκανος.<br /></p><p></p><p></p><p></p><p></p><p><iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/12L9eHUlfNdITL3KXtuB6X4-qYGig6kgQ/preview" width="640"></iframe></p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1GPyKWo8119c0rEMLa4cicT3rVKYwchnw/preview" width="640"></iframe>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-4665660041691330772023-09-03T20:05:00.002+03:002023-09-03T20:05:33.295+03:00Σχολεία σε όλο τον κόσμο!<p style="text-align: center;"></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhMx9gs2OtDB-sNMDu41Oehu75s5FGW2wwXwzRxm1qfiyKCtOxuWjM0Gl2DstYchGBqEGXai868iXelX-TGR_1re9bbu86aO9_ApvQzvfWEU4u9hqwvzV6Yz8Qc3AzZLjB_6dwMQyrz_pOUMiDovclbMr9dL0WtfI37rjYUC0i-U_6i2XQwxQDnC4YCWC4q/s670/1.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="670" data-original-width="562" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhMx9gs2OtDB-sNMDu41Oehu75s5FGW2wwXwzRxm1qfiyKCtOxuWjM0Gl2DstYchGBqEGXai868iXelX-TGR_1re9bbu86aO9_ApvQzvfWEU4u9hqwvzV6Yz8Qc3AzZLjB_6dwMQyrz_pOUMiDovclbMr9dL0WtfI37rjYUC0i-U_6i2XQwxQDnC4YCWC4q/s320/1.jpg" width="268" /></a></div><br /><p></p><p style="text-align: left;">Το <b>σχολείο</b> είναι ένας εκπαιδευτικός χώρος, ο οποίος έχει σχεδιαστεί για να ενθαρρύνει τους μαθητές να μαθαίνουν υπό την καθοδήγηση των δασκάλων τους. Η λέξη προέρχεται από το ελληνικό "σχόλη" που είχε την έννοια της απραξίας, του ελεύθερου χρόνου και της αργίας. </p><p style="text-align: left;">Η λέξη πήρε τη δευτερεύουσα σημασία της "συζήτησης" με την οποία πέρασε και στα λατινικά ως "schola", καθώς Έλληνες και Ρωμαίοι θεωρούσαν τη συζήτηση ως τον καλύτερο τρόπο για να περνούν τον ελεύθερο χρόνο τους, ενώ αργότερα πήρε την έννοια του μέρους στο οποίο γίνονταν αυτές οι συζητήσεις. Από το λατινικό schola η λέξη πέρασε και στις υπόλοιπες ευρωπαϊκές γλώσσες, ως school, ecole, schule κ.α.</p><p style="text-align: left;"> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgigek8IrO71DaTLgRXtQUddSmurNGgjCFXinTgSL57gntwv4OixpyMElxd7FhSk8eHu6_JQOrL_UU09zgXM50TYbylxjm76SPUaH5r0tOcBC2c57Cw6gxvitO961wOg7GN0x5RlFKSbu1mvEMP5_vK6mq6039a7HsWin0atRWXctrc2VWUbrUMJelkxYvr/s291/2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="173" data-original-width="291" height="173" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgigek8IrO71DaTLgRXtQUddSmurNGgjCFXinTgSL57gntwv4OixpyMElxd7FhSk8eHu6_JQOrL_UU09zgXM50TYbylxjm76SPUaH5r0tOcBC2c57Cw6gxvitO961wOg7GN0x5RlFKSbu1mvEMP5_vK6mq6039a7HsWin0atRWXctrc2VWUbrUMJelkxYvr/s1600/2.jpg" width="291" /></a> </div><div class="separator" style="clear: both; text-align: left;">Ο τρόπος της ομαδοποίησης των μαθητών σε συγκεκριμένες τοποθεσίες για να μάθουν, υφίσταται από την αρχαιότητα με την "Ακαδημία του Πλάτωνα" και την "Περιπατητική Σχολή" του Αριστοτέλη που αποτελούσαν και τα πρώτα οργανωμένα δημόσια εκπαιδευτικά ιδρύματα. Οργανωμένα σχολεία συναντάμε επίσης στην αρχαία Ινδία, στην αρχαία Κίνα, στη Βυζαντινή Αυτοκρατορία και στον Ισλαμικό πολιτισμό.</div><div class="separator" style="clear: both; text-align: left;"> </div><div class="separator" style="clear: both; text-align: left;">Γενικότερα υπάρχει διαφορετική νομοθεσία, αλλά και αντίληψη σχετικά με την εκπαίδευση και τα σχολεία στον κόσμο, η οποία εξελίσσεται με την πάροδο του χρόνου, αλλά και σε σχέση με την κουλτούρα κάθε χώρας. Για παράδειγμα υπάρχουν χώρες στις οποίες οι δραστηριότητες των μαθητών με τα χέρια δεν εντάσσονται στα εκπαιδευτικά τους προγράμματα, καθώς θεωρούνται χειρωνακτική εργασία και όχι εκπαιδευτικές δράσεις. Κάτι αντίστοιχο ισχύει και με τις καλλιτεχνικές εκπαιδευτικές δραστηριότητες, όπως η μουσική, η οποία στο Ιράν για παράδειγμα παραλείπεται από το εθνικό πρόγραμμα σπουδών.</div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: left;">Ας δούμε στη συνέχεια μερικά ιδιαίτερα σχολεία και τα προγράμματά τους.</div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: left;"><b>Παπούα Νέα Γουινέα, Σκωτία</b></div><div class="separator" style="clear: both; text-align: left;"><b><br /></b></div><div class="separator" style="clear: both; text-align: center;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiQ9GrVk_aq9eAIZQK6OrCHsn4mk4ts1r-2P0LdkHgWKGXT7ACGf_ufdr6I8O1lZoG54GyDgp0Io4EgkWhuR3zxhaw3hmIgCI6yayMTzGmCJm2CKtDVQ1kfnMxYWSiF_q1z1PJTB45nk3aJEavICNVuc4_2oeVqnivhhbrkNCcdEmE1ZHjC-_ulKyTTmJF3/s636/3.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="480" data-original-width="636" height="242" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiQ9GrVk_aq9eAIZQK6OrCHsn4mk4ts1r-2P0LdkHgWKGXT7ACGf_ufdr6I8O1lZoG54GyDgp0Io4EgkWhuR3zxhaw3hmIgCI6yayMTzGmCJm2CKtDVQ1kfnMxYWSiF_q1z1PJTB45nk3aJEavICNVuc4_2oeVqnivhhbrkNCcdEmE1ZHjC-_ulKyTTmJF3/s320/3.png" width="320" /></a></div><div style="text-align: left;">Στην Παπούα Νέα Γουινέα λειτουργεί σχολείο στο οποίο οι μαθητές προσέρχονται όπως ακριβώς ζουν, δηλαδή γυμνοί, καθώς προέρχονται από οικογένειες που ασχολούνται αποκλειστικά με τη γεωργία χρησιμοποιώντας πρωτόγονα μέσα. Στόχος της κυβέρνησης είναι να τους βοηθήσει σε διάφορους τομείς, αλλά και στο να αποβάλλουν τυχόν κανιβαλικά ένστικτα!</div><div style="text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjJDWb3st7q-T2I9rJ9tYjt1QedYMrJIWMBvXctgmJdOCW64PzIQhW5asHdhakYeChIN5S3Jq_9gSXk-iLRXFOwFzU5rAKJGVyWKE9dG2xq1OhFoV5smCyw0HWe5dB0s_AOi_g9XSImRkOQ08E6p7Q4AQorEcAOoUtK6TOzaxF_nwTB9vubSfMQULBgxFoe/s620/4.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="410" data-original-width="620" height="212" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjJDWb3st7q-T2I9rJ9tYjt1QedYMrJIWMBvXctgmJdOCW64PzIQhW5asHdhakYeChIN5S3Jq_9gSXk-iLRXFOwFzU5rAKJGVyWKE9dG2xq1OhFoV5smCyw0HWe5dB0s_AOi_g9XSImRkOQ08E6p7Q4AQorEcAOoUtK6TOzaxF_nwTB9vubSfMQULBgxFoe/s320/4.png" width="320" /></a></div></div><div class="separator" style="clear: both; text-align: left;">Σε αρκετά σχολεία στον κόσμο οι μαθητές προσέρχονται με τοπικές παραδοσιακές ενδυμασίες, όπως στη Σκωτία για παράδειγμα, όπου υπάρχουν εκπαιδευτικά ιδρύματα στα οποία οι μαθητές παρακολουθούν τα μαθήματά τους φορώντας kilts, ή στη Νέα Ζηλανδία όπου προσέρχονται για μάθημα ξυπόλυτοι και φορώντας μαγιό. </div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: left;"><b>Μπαγκλαντές, Μαρόκο</b></div><div class="separator" style="clear: both; text-align: left;"><b> </b></div><div class="separator" style="clear: both; text-align: center;"><b><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEieRCOcemSUrUi2S5dBWsBubfqe4LfMwv9U7E55FW6-0Ul-HggdIUEGgaNS1EtC9N7Q0cq5LvPQGnfmDaMeMG_g2C3AskjXo6KPC_TW4EzdKUUWNa6LBbsiiJqNSO2bZeTP05Oy-OX5EcH8YZqinc3Oeho9ujyMst_ucrzJyK1sVXVoPk29FOmBQA190uYv/s637/5.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="365" data-original-width="637" height="183" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEieRCOcemSUrUi2S5dBWsBubfqe4LfMwv9U7E55FW6-0Ul-HggdIUEGgaNS1EtC9N7Q0cq5LvPQGnfmDaMeMG_g2C3AskjXo6KPC_TW4EzdKUUWNa6LBbsiiJqNSO2bZeTP05Oy-OX5EcH8YZqinc3Oeho9ujyMst_ucrzJyK1sVXVoPk29FOmBQA190uYv/s320/5.png" width="320" /></a></div></b></div><div class="separator" style="clear: both; text-align: left;">Στο Μπαγκλαντές ένα πλωτό σχολείο παίρνει τους μαθητές από την αποβάθρα το πρωί για να ξεκινήσουν το μάθημα, ενώ το μεσημέρι επιστρέφει και παίρνει καινούργιους. Εξαιτίας των μουσώνων το Μπαγκλαντές πλήττεται πολύ συχνά από καταστροφικές πλημμύρες, οι οποίες αφήνουν χωρίς στέγη εκατομμύρια ανθρώπους.</div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhe_mw-mFJqTIEOxUMoNw8gTwCnmZBvywhz7QqYVR9mbX-tMzofGDULNPKv-Gp0yGPqiMg983Af_Lb1TP65qiCjIC7EK5PTIAQT147V_PegaSr395k9pbyLqVATpNGWX04StaxV_I6L_y0hKDOghdPLQnm4h9q1Fa1uasEhrdMj_21t578sRShw2XcH3saS/s708/6.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="528" data-original-width="708" height="239" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhe_mw-mFJqTIEOxUMoNw8gTwCnmZBvywhz7QqYVR9mbX-tMzofGDULNPKv-Gp0yGPqiMg983Af_Lb1TP65qiCjIC7EK5PTIAQT147V_PegaSr395k9pbyLqVATpNGWX04StaxV_I6L_y0hKDOghdPLQnm4h9q1Fa1uasEhrdMj_21t578sRShw2XcH3saS/s320/6.png" width="320" /></a></div><p>Πλωτό σχολείο υπάρχει και στο Μαρόκο, το οποίο στηρίζει πάνω από 100 παιδιά καθημερινά, ακόμη και σε ακραίες καιρικές συνθήκες.</p><p> </p><p><b>Κίνα, Ινδία</b></p><p style="text-align: center;"><b></b></p><div class="separator" style="clear: both; text-align: center;"><b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhjhdDHEerXdAy4cWSlFwRoWLv5jjgx_fRlCN0LNZaoqpMdUORbWdQbldVRf-uFP7xIHf8lVp-AAzRi12eQa4QeLGowrKwqvDMqANDmobEf2r3DkQG_MeCe5l-19cRTNkJFk1RSVdNDWV-gWOBG4bpGE70HsWoAwFGrXm7e-A21HjZrEJArfkJ6KJtAzpF1/s637/7.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="423" data-original-width="637" height="212" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhjhdDHEerXdAy4cWSlFwRoWLv5jjgx_fRlCN0LNZaoqpMdUORbWdQbldVRf-uFP7xIHf8lVp-AAzRi12eQa4QeLGowrKwqvDMqANDmobEf2r3DkQG_MeCe5l-19cRTNkJFk1RSVdNDWV-gWOBG4bpGE70HsWoAwFGrXm7e-A21HjZrEJArfkJ6KJtAzpF1/s320/7.png" width="320" /></a></b></div><p></p><p style="text-align: left;">Σχολείο στη Νότια Κίνα σε μια από τις φτωχότερες επαρχίες της χώρας. Το 1984 αποφασίστηκε από τις τοπικές αρχές, λόγω έλλειψης πόρων, να στεγαστεί το Δημοτικό Σχολείο της περιοχής σε ένα σπήλαιο. Από τότε το σχολείο λειτουργεί κανονικά.</p><p style="text-align: left;"> </p><p style="text-align: left;"></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh4NBB0XsuvsGAgV4jEAeuWvNw4kMxGNJCU_DR27BH5GFygIwcQTY-Nkc6G77wcH63569f0NY0u0ptpkLLT9fVa8bBC5XPHrjVUxx50VXJuvBrRqyYih_vW8BOI7D5FxCJNbeG7Y0jhCBrlZmRjsDvxxef5oTYmGYt7fm7ucv8AHrcQmWYzb822d1YZ3RoX/s634/8.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="420" data-original-width="634" height="212" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh4NBB0XsuvsGAgV4jEAeuWvNw4kMxGNJCU_DR27BH5GFygIwcQTY-Nkc6G77wcH63569f0NY0u0ptpkLLT9fVa8bBC5XPHrjVUxx50VXJuvBrRqyYih_vW8BOI7D5FxCJNbeG7Y0jhCBrlZmRjsDvxxef5oTYmGYt7fm7ucv8AHrcQmWYzb822d1YZ3RoX/s320/8.png" width="320" /></a></div>Στην Ινδία πάνω από 4.000 μαθητές εκπαιδεύονται στους σταθμούς των τρένων. Ο λόγος για το ιδιότυπο αυτό εκπαιδευτικό πρόγραμμα είναι πως πάρα πολλά παιδιά πηγαίνουν από το πρωί στις αποβάθρες για να ζητιανέψουν, αντί να βρίσκονται στα σχολεία τους.<p></p><p style="text-align: left;"> </p><p style="text-align: left;"><b>ΗΠΑ, Σουηδία <br /></b></p><p style="text-align: center;"><b></b></p><div class="separator" style="clear: both; text-align: center;"><b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjC45ioGEbpniQeVwP96fJ-ai8UxlvGdPVfOKggxj2TDiTNXFWFIJWoMUKMg0x_6eJENen1gFTpPzML2tC6IyZ4WlZ1sKchWccOdyqRgtl676BaRLK2OqELE3KRiqXOkpOCJqhjOpb_cUIoamMBSz9OQ8G06lD7Zrm4P47EeCYex5ZEx9l3OelJRkKZ7Kxj/s635/9.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="424" data-original-width="635" height="214" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjC45ioGEbpniQeVwP96fJ-ai8UxlvGdPVfOKggxj2TDiTNXFWFIJWoMUKMg0x_6eJENen1gFTpPzML2tC6IyZ4WlZ1sKchWccOdyqRgtl676BaRLK2OqELE3KRiqXOkpOCJqhjOpb_cUIoamMBSz9OQ8G06lD7Zrm4P47EeCYex5ZEx9l3OelJRkKZ7Kxj/s320/9.png" width="320" /></a></b></div><p></p><p style="text-align: left;">Το <b>Γυμνάσιο Harvey Milk</b> στη Νέα Υόρκη ιδρύθηκε για να παρέχει εκπαίδευση σε όσους μαθητές φοβούνται ότι θα μπορούσαν να πέσουν θύματα σχολικού εκφοβισμού και κακοποίησης στα παραδοσιακά σχολεία. Φέρει το όνομα του διάσημου υπερασπιστή των δικαιωμάτων των ομοφυλόφιλων και πολιτικό Harvey Milk και κατά καιρούς έχει δεχτεί αγωγές από ομοφοβικές οργανώσεις.</p><p style="text-align: left;"><br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi15_4Sl25ha2epXgkCwRB_YLRte2ei3qnRETx3tuVP_k3nzIPV34XuKs_Pg4I-Z53r7X3fMyUx1wA8sOFdO-dbcMlg6ST22h1DwX7hBUb9UXQCQhwKkQGI5aq-yBICsBvucIQvxGtCH2UpQ3-vL857pqZFaAwyZWCdJ_A26N74R3xIju5pe5upMLT_JlFd/s707/10.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="461" data-original-width="707" height="209" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi15_4Sl25ha2epXgkCwRB_YLRte2ei3qnRETx3tuVP_k3nzIPV34XuKs_Pg4I-Z53r7X3fMyUx1wA8sOFdO-dbcMlg6ST22h1DwX7hBUb9UXQCQhwKkQGI5aq-yBICsBvucIQvxGtCH2UpQ3-vL857pqZFaAwyZWCdJ_A26N74R3xIju5pe5upMLT_JlFd/s320/10.png" width="320" /></a></div><p>Σχολείο ουδέτερου φύλου υπάρχει και στη Σουηδία με τους καθηγητές να αποφεύγουν τη χρήση αντωνυμιών, όπως "αυτός" και "αυτή" και στόχο να καταπολεμηθούν έμφυλα στερεότυπα.</p><p><br /></p><p><b>ΗΠΑ</b></p><div class="separator" style="clear: both; text-align: center;"><b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKuLIa1jCgUoVomHt7phMX3Bt95PuZdvYLUhBZPFEUQ85utEeXpmHU92J3cMBPgwUGZ1lnRjAigGUdSyXwRDU4XVYyMBMxMmXwprhC8c3FWDcpz1Wy1GgpwNcVOxEvgRFJNdbXgkeF36kiU70EHTNDzON0gBSB6yyhNPfcVjknK9rhE7_HLsCC1gDgMMNN/s634/11.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="423" data-original-width="634" height="214" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKuLIa1jCgUoVomHt7phMX3Bt95PuZdvYLUhBZPFEUQ85utEeXpmHU92J3cMBPgwUGZ1lnRjAigGUdSyXwRDU4XVYyMBMxMmXwprhC8c3FWDcpz1Wy1GgpwNcVOxEvgRFJNdbXgkeF36kiU70EHTNDzON0gBSB6yyhNPfcVjknK9rhE7_HLsCC1gDgMMNN/s320/11.png" width="320" /></a></b></div>Ένα από τα μοναδικά στο είδους τους σχολεία, στο οποίο χρησιμοποιούν αποκλειστικά υπολογιστές. Είναι το <b>"Σχολείο του μέλλοντος" </b>στη Φιλαδέλφεια, όπου μαθητές και εκπαιδευτικοί δεν χρησιμοποιούν καθόλου βιβλία, τετράδια και στυλό.<p></p><p> </p><p style="text-align: center;"></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhbnDEzcO7h6zTh5yUTAs2mm2tqlA-58iaTZW4832IEFJ0bcLKc8CfNhaJbCDhtoAIe5v2YMW-OZnwhPY8v99tc1hi21dQIqzI9I-6MM_wc7fMa7NJ74K88z_eOHWMb-eTJXTMzCJtvwjxFGkbp8Y1Dfbk47hu0GyrAXbZChpDAP8NZKbprdNkrtDbDLwnd/s706/12.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="469" data-original-width="706" height="213" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhbnDEzcO7h6zTh5yUTAs2mm2tqlA-58iaTZW4832IEFJ0bcLKc8CfNhaJbCDhtoAIe5v2YMW-OZnwhPY8v99tc1hi21dQIqzI9I-6MM_wc7fMa7NJ74K88z_eOHWMb-eTJXTMzCJtvwjxFGkbp8Y1Dfbk47hu0GyrAXbZChpDAP8NZKbprdNkrtDbDLwnd/s320/12.png" width="320" /></a></div><p></p><p style="text-align: left;">Κάτι παρόμοιο συμβαίνει και στα <b>σχολεία καριέρας, </b>στα οποία η διδασκαλία δεν γίνεται με τον παραδοσιακό τρόπο, δεν υπάρχουν καθηγητές, αλλά σύμβουλοι - επαγγελματίες που δραστηριοποιούνται στο πεδίο ενδιαφέροντος των μαθητών. Οι έφηβοι μαθαίνουν αποκλειστικά και μόνο αυτά που χρειάζονται για τς μελλοντικές καριέρες, τις οποίες έχουν επιλέξει.</p><p style="text-align: left;"><br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg6R_s3cMtZeCIl6tUJINfDDV0XjRa-rB7zn8YEwFVZ6AaANsAYcuS0Miqlzehp6iX_Wbz8Pe-3v7c8VexNfjIAnd0O9G0NKYruaWSI_nzSAJ8x75i-DCiSRQHw-blNLiZrGSlgkMOtXdTRUSFC67bZE2_RmJipM3WisqQDydrBwyNKQ8L04doqL34Uj65k/s710/13.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="412" data-original-width="710" height="186" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg6R_s3cMtZeCIl6tUJINfDDV0XjRa-rB7zn8YEwFVZ6AaANsAYcuS0Miqlzehp6iX_Wbz8Pe-3v7c8VexNfjIAnd0O9G0NKYruaWSI_nzSAJ8x75i-DCiSRQHw-blNLiZrGSlgkMOtXdTRUSFC67bZE2_RmJipM3WisqQDydrBwyNKQ8L04doqL34Uj65k/s320/13.png" width="320" /></a></div><p>Χωρίς αίθουσες διδασκαλίας είναι και το <b>σχολείο - γραφείο</b>, στο οποίο ο κάθε μαθητής αντί για θρανίο έχει το δικό του γραφείο, τον δικό του υπολογιστή και το δικό του πλάνο εργασίας.</p><p><b> </b><br /></p><p><b>Ολλανδία</b></p><p style="text-align: center;"><b></b></p><div class="separator" style="clear: both; text-align: center;"><b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEglA3pxd9CRQKZilM0EN2PMeR-t52sY36IW7umUbM1AUC3UZkPUDzScO3roBEJnRP5UdAroLnhuIx2bDUBmwjeKHIoWoHUQS9w_uEJyM2N369CQVQK_FmGz6sASr7JavjWRPwdZZidaEepU_tZDR_sUEbHdNefkxAAYUJmRJEKL6sH9mB8f3jxFZB3Vo6_H/s705/14.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="460" data-original-width="705" height="209" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEglA3pxd9CRQKZilM0EN2PMeR-t52sY36IW7umUbM1AUC3UZkPUDzScO3roBEJnRP5UdAroLnhuIx2bDUBmwjeKHIoWoHUQS9w_uEJyM2N369CQVQK_FmGz6sASr7JavjWRPwdZZidaEepU_tZDR_sUEbHdNefkxAAYUJmRJEKL6sH9mB8f3jxFZB3Vo6_H/s320/14.png" width="320" /></a></b></div><p></p><p style="text-align: left;">Ένα σχολείο κατά της απρόσωπης προσέγγισης, το <b>σχολείο Steve Jobs</b> στο Άμστερνταμ, όπου κάθε μαθητής παρακολουθεί ένα αποκλειστικά ατομικό πρόγραμμα εκμάθησης με βάση τα ταλέντα του, τις δεξιότητες και τα ενδιαφέροντά του, το οποίο αναπροσαρμόζεται κάθε έξι εβδομάδες.</p><p style="text-align: left;"><br /></p><p style="text-align: left;"><b>Δανία</b></p><p style="text-align: center;"><b></b></p><div class="separator" style="clear: both; text-align: center;"><b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgzHntN_0-zBwV8dfhr4KXz4KHJVEF87bU9PJ3E1fri0meeaQmG5iPNTTeE4wfn9jG1F86sbrzwzRIzqGpuTM9Ki0UatG8wsH4H1K1CUXF7bNDBv_NCsS_8ftuHxdfVeWcDeQNHt8JsAc3Fo4F9baBALIkhFvGeGmBfPtJShVWFn6Rkkug-MnY8-B1N_0ES/s707/15.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="475" data-original-width="707" height="215" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgzHntN_0-zBwV8dfhr4KXz4KHJVEF87bU9PJ3E1fri0meeaQmG5iPNTTeE4wfn9jG1F86sbrzwzRIzqGpuTM9Ki0UatG8wsH4H1K1CUXF7bNDBv_NCsS_8ftuHxdfVeWcDeQNHt8JsAc3Fo4F9baBALIkhFvGeGmBfPtJShVWFn6Rkkug-MnY8-B1N_0ES/s320/15.png" width="320" /></a></b></div><p></p><p style="text-align: left;">Πάνω από 1000 μαθητές Λυκείου παρακολουθούν μαθήματα σε έναν τεράστιο γυάλινο κύβο στην Κοπεγχάγη, όχι σε αίθουσες, αλλά σε άνετους καθιστικούς χώρους με σκοπό να ενισχυθεί η δημιουργική σκέψη τους και να ενθαρρυνθεί η ευελιξία.</p><p style="text-align: left;"><br /></p><p style="text-align: left;"><b>ΗΠΑ, Καναδάς, Φιλανδία</b></p><p style="text-align: center;"><b></b></p><div class="separator" style="clear: both; text-align: center;"><b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjlrna5jGNCa-_43QEi-b6XG7WAFEGm78fGBH0Jws1gb8r54r3BSaO0UJiWs54Ul8mzQyEwAwWCRDPgpNVjAIJ9p8hLCg-Enx-D8qjp_xos2P3JNg63B3wbR3NFoQghjCs2AzIUHyaBHxnEny86FU1yLQwRbWhCq8VEZk39Jt1ZCzC1AupF4SZYGq_diavq/s632/16.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="422" data-original-width="632" height="214" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjlrna5jGNCa-_43QEi-b6XG7WAFEGm78fGBH0Jws1gb8r54r3BSaO0UJiWs54Ul8mzQyEwAwWCRDPgpNVjAIJ9p8hLCg-Enx-D8qjp_xos2P3JNg63B3wbR3NFoQghjCs2AzIUHyaBHxnEny86FU1yLQwRbWhCq8VEZk39Jt1ZCzC1AupF4SZYGq_diavq/s320/16.png" width="320" /></a></b></div><p></p><p style="text-align: left;">Στο <b>ελεύθερο σχολείο </b>του Μπρούκλιν δεν υπάρχουν προγράμματα σπουδών, ούτε σχολικοί κανονισμοί. Οι κανόνες μπαίνουν από τους μαθητές, οι οποίοι αποφασίζουν τι μάθημα θα παρακολουθήσουν, τι ώρα θα βγουν διάλειμμα, πότε θα παίξουν και πότε θα κοιμηθούν. Για εργασίες, βαθμούς και εξετάσεις ούτε λόγος.</p><p style="text-align: left;"><br /></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhbYS8ZrIA86ODLEoO9IWbaHHvMrtEqe-SEEsGxk2-EcKpeT5ZkkZgqVapZsfo_58UfRJ2uh9jfKGRbes4ooPgBjvoeTJFCIgqttE14ZSD8eA2a4WE4wxkYFdhXP2-WKbYQARM9O5bvLdHSOZJckyq_NjNw8SW3Gj8IRnZz1zr79MBzj2_s5Pz4NynerBH9/s707/17.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="477" data-original-width="707" height="216" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhbYS8ZrIA86ODLEoO9IWbaHHvMrtEqe-SEEsGxk2-EcKpeT5ZkkZgqVapZsfo_58UfRJ2uh9jfKGRbes4ooPgBjvoeTJFCIgqttE14ZSD8eA2a4WE4wxkYFdhXP2-WKbYQARM9O5bvLdHSOZJckyq_NjNw8SW3Gj8IRnZz1zr79MBzj2_s5Pz4NynerBH9/s320/17.png" width="320" /></a></div><p>Κάτι αντίστοιχο συμβαίνει και στο <b>σχολείο χωρίς μαθήματα </b>στο Τορόντο του Καναδά με τους εκπαιδευτικούς να βρίσκονται περισσότερο σε θέση παρατηρητή που απλά συμβουλεύουν τους μαθητές.</p><p> </p><p style="text-align: center;"></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi-b21WqKNd1yJqrfxk0PoNYUr5f5WosuT39ZgN4AzYCSWhO_Ka6DbyFBU39QM331rGCiXjb-E0Y-wnr9VPrp0HvvYnVWY6sE5S93oJjSfSFSN16L0_FLKahxGe5bFiHvQeEbMBoYmEoZ0D1-C9CKi-6DkyElarMbBv9PJB4r1-iX4GZph4fT2bnAvVnBEG/s705/18.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="369" data-original-width="705" height="167" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi-b21WqKNd1yJqrfxk0PoNYUr5f5WosuT39ZgN4AzYCSWhO_Ka6DbyFBU39QM331rGCiXjb-E0Y-wnr9VPrp0HvvYnVWY6sE5S93oJjSfSFSN16L0_FLKahxGe5bFiHvQeEbMBoYmEoZ0D1-C9CKi-6DkyElarMbBv9PJB4r1-iX4GZph4fT2bnAvVnBEG/s320/18.png" width="320" /></a></div><p></p><p style="text-align: left;">Και στη Φιλανδία όμως υπάρχει τέτοιο σχολείο, στο οποίο κατά τη διάρκεια των μαθημάτων οι μαθητές είναι ελεύθεροι να καθίσουν σε όποιο σημείο θέλουν και να συνομιλήσουν με τους φίλους τους. Μπορούν ακόμη να ξαπλώσουν στους καναπέδες και να κοιμηθούν αν αισθάνονται κουρασμένοι.</p><p style="text-align: left;"><br /></p><p style="text-align: left;"><b>Ιαπωνία, Ασιατικές χώρες</b></p><p style="text-align: left;"><b></b></p><div class="separator" style="clear: both; text-align: center;"><b><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgALGg9NjZfuX8lKCJRfN1chq6ADrra3hDi8cExsqo6HuMxxG70jB6AZU8TvsVwGyHBWhTvlpDay6IBdnedMv8Cy73h2zMubj-cZ7mikOrdpaNjoUpv8fh8haI-m6bgCg4AG7r7GDubOA8FQtKW0JNAbxnhKBNPnjqJOuUNrARXB-us91XbndU6Nl91B3S0/s675/19.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="492" data-original-width="675" height="233" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgALGg9NjZfuX8lKCJRfN1chq6ADrra3hDi8cExsqo6HuMxxG70jB6AZU8TvsVwGyHBWhTvlpDay6IBdnedMv8Cy73h2zMubj-cZ7mikOrdpaNjoUpv8fh8haI-m6bgCg4AG7r7GDubOA8FQtKW0JNAbxnhKBNPnjqJOuUNrARXB-us91XbndU6Nl91B3S0/s320/19.png" width="320" /></a></b></div>Στον αντίποδα του ελεύθερου σχολείου, στο Τόκιο πάνω από τα μισά δημόσια σχολεία απαγορεύουν σε μαθητές και μαθήτριες να βάφουν τα μαλλιά τους, λόγω της προσήλωσης τους στην κουλτούρα της ομοιογένειας.<p></p><p style="text-align: left;"> </p><p style="text-align: left;"></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF8FL6fWXUAJHp61zyDKHaybDxAKVobgTaDZv14pfIb-vlYF0FUE_Kdl0tDCaOxMPuUHlzkxLPtd-wBsXitaiOQ9ugha3IueYIRH7P0gU4ykE5uh4BTgiwyD4v51ZZKf3cBXqYxisJmaGEjzD7Xx3u3iCotFr9LcaY9UeaFZFXI9520nBxoUsYRLH1d_8k/s684/20.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="478" data-original-width="684" height="224" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhF8FL6fWXUAJHp61zyDKHaybDxAKVobgTaDZv14pfIb-vlYF0FUE_Kdl0tDCaOxMPuUHlzkxLPtd-wBsXitaiOQ9ugha3IueYIRH7P0gU4ykE5uh4BTgiwyD4v51ZZKf3cBXqYxisJmaGEjzD7Xx3u3iCotFr9LcaY9UeaFZFXI9520nBxoUsYRLH1d_8k/s320/20.png" width="320" /></a></div><p>Η Ασία φημίζεται όμως και για τις πολύ αυστηρές τιμωρίες που επιβάλλονται στους μαθητές όταν αργούν ή μιλούν κατά τη διάρκεια του μαθήματος, όπως το να σταθούν ανάποδα για αρκετή ώρα.</p><p> </p><p>Στην Ελλάδα δεν πρέπει να ξεχνάμε ότι η πρώτη ιδεολογική οριοθέτηση των Πειραματικών Σχολείων, πριν από περίπου έναν αιώνα, δεν ήταν άλλη από το να αποκτήσει ο μαθητής, ως εσωτερική ανάγκη, την αίσθηση του καθήκοντος, αλλά και να καταπολεμηθούν εθνικά ελαττώματα, όπως η ανοργανωσιά. <br /></p><p>Είναι σαφές πως ο καθρέφτης κάθε κοινωνίας περνάει από την εκπαίδευση την οποία παρέχει. <br /></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-50228832579935729122023-08-08T11:52:00.002+03:002023-08-08T11:52:44.413+03:002ο Διεθνές Συνέδριο της Διεθνούς Ακαδημίας της Ιστορίας των Επιστημών <p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi8kGJAPbnUzCmRo0Z91S5gXYn-hddeRxUpUMY0AoaSl_0Pfv-vnCdncr44yF_w0kLjEOySQwBddbNxoflvkNOzj869OZkgmBsN5k3aD6LTXo1zvqTj7Kz1oysOlIpNoU0LFuqoYYnXNg8xOuNdgiz8My9g90MeT-aKhOJqE9pF4zsW09q3UOGXgXivXAxY/s240/364996694_262682323198756_9176085636772078632_n.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="240" data-original-width="158" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi8kGJAPbnUzCmRo0Z91S5gXYn-hddeRxUpUMY0AoaSl_0Pfv-vnCdncr44yF_w0kLjEOySQwBddbNxoflvkNOzj869OZkgmBsN5k3aD6LTXo1zvqTj7Kz1oysOlIpNoU0LFuqoYYnXNg8xOuNdgiz8My9g90MeT-aKhOJqE9pF4zsW09q3UOGXgXivXAxY/s1600/364996694_262682323198756_9176085636772078632_n.jpg" width="158" /></a></div> <p></p><p>Η Διεθνής Ακαδημία της Ιστορίας των Επιστημών ιδρύθηκε το 1928 και συγκεντρώνει τους πιο διακεκριμένους ειδικούς στην ιστορία της επιστήμης και της τεχνολογίας από όλες τις χώρες του κόσμου, οι οποίοι επιλέγονται αποκλειστικά με βάση το επιστημονικό τους έργο. Έχει την έδρα της στο Παρίσι και αποτελείται από 200 τακτικά και 300 αντεπιστέλλοντα μέλη.</p><p>Το 2ο Διεθνές Συνέδριο που οργανώνει θα διεξαχθεί στην Αθήνα, στις αίθουσες του Εθνικού Ιδρύματος Ερευνών (<a href="http://www.eie.gr/" target="_blank">http://www.eie.gr/</a>) τη χρονική περίοδο 12 - 15 Σεπτεμβρίου 2023.</p><p>Έχει τίτλο <i>"Επιστημονικές πρακτικές και ανθρώπινες αξίες - Μια ιστορική προσέγγιση."</i></p><p>Στην πρώτη ανακοίνωση για τη διεξαγωγή του 2oυ CIAHS, η Διεθνής Ακαδημία ξεκινάει με τα λόγια ενός εκ των ιδρυτών της, του βελγικής καταγωγής συγγραφέα και λόγιου, με σπουδές στη Χημεία, στην Ουράνια Μηχανική και στα Μαθηματικά, George Alfred Leon Sarton (1884 - 1956), ότι<b> η ιστορία της επιστήμης είναι η βάση ενός "νέου ανθρωπισμού", επειδή η επιστήμη δημιουργεί τις δικές της αξίες.</b></p><p>Συνεχίζοντας όμως επισημαίνει πως υπάρχουν περιπτώσεις στην ιστορία που η παραπάνω διακήρυξη δεν τηρήθηκε, δίνοντας δύο χαρακτηριστικά παραδείγματα, το Άουσβιτς και τη Χιροσίμα.</p><p>"Η ηθική και κοινωνική ευθύνη του επιστήμονα στην ερευνητική πρακτική και στις εφαρμογές του είναι ένα φλέγον ζήτημα σήμερα. Αλλά αυτό το πρόβλημα είναι παλιό. Συνδέεται με όλες τις μεγάλες φιλοσοφίες. Στην ιστορία υπήρξαν πολλές περιπτώσεις από την αρχή: πειραματισμοί σε ανθρώπους, συμβολή σε πολεμικές εφευρέσεις (Νόμπελ), συμβολή επιστημόνων στην ατομική βόμβα, ζητήματα φυλής και φύλου, έλεγχος της ζωής, Τεχνητή Νοημοσύνη κ.α. Μια ιστορική διεπιστημονική και διαπολιτισμική προσέγγιση για τα θεμελιώδη ερωτήματα μακροπρόθεσμα."</p><p><a href="https://ciahs.hpdst.gr/programme/" target="_blank">Δείτε το πρόγραμμα.</a> <br /></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-45509852132598971072023-02-26T10:39:00.002+02:002023-02-26T10:51:05.942+02:00΄Ένα μέλλον χωρίς passwords<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh7VBN4aontTw5Dz-b7gdjWiMtuR-c2nUB3XFC802Kal-RnX7Y9Iues468XeVNizkRWi4rN5TKQXZV7FL8FLfODWNP1oAmwng2sgPlKLT2xQf4Z-bs8ugnycAo9461oGQswjxfa_k6Wam6QgwmfR-OYwm4dXy4GhPqZoaqerf2KChDit4gJNegr9Uj8zw/s960/passwordmati_aftodioikisi.gr_.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="600" data-original-width="960" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh7VBN4aontTw5Dz-b7gdjWiMtuR-c2nUB3XFC802Kal-RnX7Y9Iues468XeVNizkRWi4rN5TKQXZV7FL8FLfODWNP1oAmwng2sgPlKLT2xQf4Z-bs8ugnycAo9461oGQswjxfa_k6Wam6QgwmfR-OYwm4dXy4GhPqZoaqerf2KChDit4gJNegr9Uj8zw/s320/passwordmati_aftodioikisi.gr_.gif" width="320" /></a></div> <p></p><p>Οι πρώτοι κωδικοί πρόσβασης στην ιστορία, με την μορφή που τους γνωρίζουμε σήμερα, εμφανίζονται
το 1961 για τον κοινής χρήσης υπολογιστή που είχε το MIT, ώστε να
εξασφαλιστεί η ασφαλής σύνδεση των καθηγητών του ιδρύματος. Και φυσικά εννοείται πως, με βάση
τον αστικό μύθο που υπάρχει, το συγκεκριμένο σύστημα ήταν και το πρώτο
που έπεσε θύμα παραβίασης δεδομένων.</p><div><br /></div><div>Σήμερα, ο
μέσος χρήστης χρησιμοποιεί κατά μέσο όρο 100 κωδικούς, όχι απαραίτητα
διαφορετικούς μεταξύ τους, αποτελώντας την πιο συνηθισμένη μορφή ελέγχου
ταυτότητας. Αυτό βέβαια δεν έχει αποτρέψει τις παραβιάσεις δεδομένων,
είτε γιατί πολλοί καταφεύγουν στην εύκολη λύση ενός αδύναμου password,
είτε γιατί οι κυβερνοεγκληματίες μπορούν να εκμεταλλευτούν κάθε ευάλωτο
στοιχείο των μέτρων προστασίας. </div><div><br /></div><div>Είναι
χαρακτηριστικό ότι ακόμα και τώρα εκατοντάδες εκατομμύρια άνθρωποι
χρησιμοποιούν ως κωδικό το 123456 σε έναν ή και περισσότερους
λογαριασμούς που χρησιμοποιούν, με βάση έρευνες του 2021. </div><div><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgab2GPpZM89cDGoIR7SMGDlG4mWl8GlHqIJSqW5zYzp_lLm6CdfMR-mnf7B_-0uM7xSPlQ7O_3oAXiJpY5SBBlK5brIjvPl4A2TvAg_8xRIVnOilE-T_EYtV9Ux8xc-rnwufBmeNhOZ7BFszNiIx28Ug4yRe1nz8GU8IVuDnD2Q8v4IiUmGKXL3Z5ILw/s1024/top-10-passwords-1024x447.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="447" data-original-width="1024" height="152" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgab2GPpZM89cDGoIR7SMGDlG4mWl8GlHqIJSqW5zYzp_lLm6CdfMR-mnf7B_-0uM7xSPlQ7O_3oAXiJpY5SBBlK5brIjvPl4A2TvAg_8xRIVnOilE-T_EYtV9Ux8xc-rnwufBmeNhOZ7BFszNiIx28Ug4yRe1nz8GU8IVuDnD2Q8v4IiUmGKXL3Z5ILw/w347-h152/top-10-passwords-1024x447.jpg" width="347" /></a></div><div> </div><div>Με
χρήση Μαθηματικών μπορούμε να υπολογίσουμε πως αν χρησιμοποιήσουμε ένα
password με 2 χαρακτήρες (γράμματα, αριθμούς και ειδικά σύμβολα), τότε
έχουμε 1440 διαφορετικούς συνδυασμούς. Αν χρησιμοποιήσουμε μόνο αριθμούς
για ένα password με 5 χαρακτήρες, τότε οι πιθανοί συνδυασμοί είναι
100.000, ενώ αν δημιουργήσουμε password με 8 χαρακτήρες από πεζά και
κεφαλαία γράμματα του αγγλικού αλφαβήτου και αριθμούς, τότε οι πιθανοί
συνδυασμοί φτάνουν τους 218.340.105.584.896.</div><div><br /></div><div>Παρόλα αυτά
όσο υπάρχουν κωδικοί πρόσβασης, τόσο τα συστήματα θα παραμένουν ευπαθή,
αναγκάζοντας μεγάλους οργανισμούς να ξοδεύουν μέχρι και 1 εκατομμύριο
δολάρια ετησίως σε παρεμβάσεις προστασίας. Αυτός είναι και ένας επιπλέον λόγος που εδώ
και χρόνια σχεδιάζεται η εγκατάλειψή τους και εταιρείες, όπως η Apple, η
Google και η Microsoft εκτιμούν ότι είμαστε πιο κοντά από ποτέ στην
υλοποίηση του οράματος για ένα μέλλον χωρίς κωδικούς.</div><div><br /></div><div>Δακτυλικά
αποτυπώματα, το πρόσωπο ή άλλα βιομετρικά μοναδικά χαρακτηριστικά μας
ήδη χρησιμοποιούνται σήμερα από συγκεκριμένες εταιρείες, αλλά το μεγάλο
στοίχημα είναι η διαλειτουργικότητα της λύσης που θα προταθεί, ώστε οι
κωδικοί πρόσβασης, όπως τους ξέρουμε, να καταργηθούν από παντού.</div><div> </div>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-79852651080465788742023-01-04T15:31:00.006+02:002023-01-04T18:53:04.792+02:00Ο άνθρωπος που ανακάλυψε τη βαρύτητα<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg8gnQLPkdiFX1-VMSBwQoNic4KObpoj7bxUvHGonyw2PfzLjzNnM9Lf2IK8ONiu4CVNemGB4EymyPv4Y8ypqG2C64JfEXmVtN-PJ5MT3fJOtBdTmU67YMnb3rJSJOS1nviq-OW9EQ6N8KSVXte11JmHt13MC9m27n6o_JGBrJ1Mmk5tq-EWoQXtSF2Pg/s300/isaac_newton_1689_painting_sir_godfrey_kneller_public_domain_via_wikimedia_commons.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="300" data-original-width="300" height="300" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg8gnQLPkdiFX1-VMSBwQoNic4KObpoj7bxUvHGonyw2PfzLjzNnM9Lf2IK8ONiu4CVNemGB4EymyPv4Y8ypqG2C64JfEXmVtN-PJ5MT3fJOtBdTmU67YMnb3rJSJOS1nviq-OW9EQ6N8KSVXte11JmHt13MC9m27n6o_JGBrJ1Mmk5tq-EWoQXtSF2Pg/s1600/isaac_newton_1689_painting_sir_godfrey_kneller_public_domain_via_wikimedia_commons.jpg" width="300" /></a></div><p></p><p>Μπορεί σήμερα η Κβαντομηχανική να θεωρείται πιο θεμελιώδης από την
κλασική Μηχανική, αφού εξηγεί φαινόμενα που η κλασική Μηχανική αδυνατεί
να αναλύσει, παρ΄όλα αυτά οι τρεις νόμοι του Νεύτωνα αποτέλεσαν ίσως την αφετηρία
της σύγχρονης Φυσικής. </p><div>Ο Νεύτων δεν προσπάθησε μόνο να ερμηνεύσει
το φαινόμενο της κίνησης των σωμάτων και της επίδρασης των δυνάμεων σε
αυτή, αλλά διατύπωσε και μαθηματικές εκφράσεις ώστε να είναι δυνατό να
υπολογιστεί η κίνηση ενός σώματος και να προβλεφθεί η θέση του σε
μελλοντικό χρόνο. </div><div><b> </b></div><div><b>Πρώτος νόμος του Νεύτωνα.</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiQd_vinCl63cZvgvEwL-SI3W5gNbWece_XsmnPagBJcLdBdGaPi1te33MvhCUZ9FHNRAoU0WRVClLz0K4rvwodxHAmJk8T-k-iFbuI9KvSnzp2VQrp_2KZxXb4tJsrZ-YcbKGOvyO-ggBjS9AvGlpaHZWuFGpWWqI438sU-mkVPEbQtn2qoUfjZQHAEQ/s1355/323372362_549906677197112_5569475752096200922_n.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1355" data-original-width="1075" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiQd_vinCl63cZvgvEwL-SI3W5gNbWece_XsmnPagBJcLdBdGaPi1te33MvhCUZ9FHNRAoU0WRVClLz0K4rvwodxHAmJk8T-k-iFbuI9KvSnzp2VQrp_2KZxXb4tJsrZ-YcbKGOvyO-ggBjS9AvGlpaHZWuFGpWWqI438sU-mkVPEbQtn2qoUfjZQHAEQ/s320/323372362_549906677197112_5569475752096200922_n.jpg" width="254" /></a></div> </div><div>Αναφέρεται
στην αδράνεια. Αν ένα σώμα είναι ακίνητο και δεν ασκηθεί πάνω του
κάποια δύναμη, τότε θα συνεχίσει να είναι ακίνητο. Το ίδιο συμβαίνει και
όταν κινείται, αν δεν το πειράξει κανείς θα συνεχίσει να κινείται προς
την ίδια κατεύθυνση και με την ίδια ταχύτητα. </div><div><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiePmPZj1pXUJkiOpw6bDjPF-6Gs4EaNJgaRULe05RL3nUJN8UgHZCb7AAA8RrRql7gHY2iLlWXumHeUfGKsW7QaUu9vDOFizN-ZEuRDol3kgSJzwdgxwOkgpwM3NcJyaSxKSv_LeRaCuqE6woti-OaggZxnbb1dJnE-fM_fGYbaYzcXCvsq54FEKd37Q/s1547/323697451_544130300959779_372202553942259276_n.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1547" data-original-width="1080" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiePmPZj1pXUJkiOpw6bDjPF-6Gs4EaNJgaRULe05RL3nUJN8UgHZCb7AAA8RrRql7gHY2iLlWXumHeUfGKsW7QaUu9vDOFizN-ZEuRDol3kgSJzwdgxwOkgpwM3NcJyaSxKSv_LeRaCuqE6woti-OaggZxnbb1dJnE-fM_fGYbaYzcXCvsq54FEKd37Q/s320/323697451_544130300959779_372202553942259276_n.jpg" width="223" /></a></div><br /><div><b>Δεύτερος νόμος του Νεύτωνα.</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgaoolPEkC9KICNBgySdA8NU_R6sUlxbOW6-U6w3jgps87KAJ-cBhXQhux2LJWLBSqbjHzdxXLAm737jQpANdvyQDVjEYJjtpYT0tysiQyKnKCIsGyDDjiHPLsh6yxMMZ5ia1hj7v8u8VuAaOTlfw66D_LKbSrMLZCGVrJ9xU80PcHrpnYKeitYjCbWxg/s1786/323684337_850771899486909_4787219004383717398_n.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1786" data-original-width="1080" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgaoolPEkC9KICNBgySdA8NU_R6sUlxbOW6-U6w3jgps87KAJ-cBhXQhux2LJWLBSqbjHzdxXLAm737jQpANdvyQDVjEYJjtpYT0tysiQyKnKCIsGyDDjiHPLsh6yxMMZ5ia1hj7v8u8VuAaOTlfw66D_LKbSrMLZCGVrJ9xU80PcHrpnYKeitYjCbWxg/s320/323684337_850771899486909_4787219004383717398_n.jpg" width="194" /></a></div> </div><div>Αναφέρεται
στη μεταβολή της κινητικής κατάστασης ενός σώματος εξαιτίας της
επίδρασης μιας δύναμης. Ένας μεγάλος βράχος που κυλάει με ταχύτητα λέμε
ότι έχει μεγάλη ορμή, ενώ μια μικρή πέτρα που κινείται με την ίδια
ταχύτητα όχι. Η ορμή εξαρτάται δηλαδή από τη μάζα και από την ταχύτητα
ενός σώματος και μάλιστα είναι ίση με το γινόμενό τους. Ο δεύτερος νόμος
έχει τεράστιες εφαρμογές, αφού από αυτόν προκύπτει ο Θεμελιώδης Νόμος
της Μηχανικής με τον οποίο μπορούμε να υπολογίσουμε τη δύναμη που
χρειάζεται για να κινήσουμε ένα σώμα, την ταχύτητα που θα αποκτήσει και
τον χρόνο που χρειάζεται.</div><div><br /></div><div><b>Τρίτος νόμος του Νεύτωνα</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhT_xtyoDymObNY0_-pNDzPiCgtjQMt5da5v-i_6H_RPKfnLZxulqmdqgLXFarTtAgRvc1_dRlYt8WCyOl9OubM4Qe8tQKDhidmhQPo-90-v83jxOfftoOJ5rURFbkXekmLIl9ji-yvKfoFozvxC0MH_ppGup3yD-rvxka3euLUhpy3pW13-qAclkgiUg/s1842/322480836_463669259313843_7122241949819648635_n.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1842" data-original-width="1080" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhT_xtyoDymObNY0_-pNDzPiCgtjQMt5da5v-i_6H_RPKfnLZxulqmdqgLXFarTtAgRvc1_dRlYt8WCyOl9OubM4Qe8tQKDhidmhQPo-90-v83jxOfftoOJ5rURFbkXekmLIl9ji-yvKfoFozvxC0MH_ppGup3yD-rvxka3euLUhpy3pW13-qAclkgiUg/s320/322480836_463669259313843_7122241949819648635_n.jpg" width="188" /></a></div><br /></div><div>Αναφέρεται
στον τρόπο που ασκούνται οι δυνάμεις μεταξύ των σωμάτων. Αν
προσπαθήσουμε για παράδειγμα να σπρώξουμε ένα μεγάλο σώμα και βάλουμε
απότομα δύναμη, τότε θα αισθανθούμε έντονη πίεση στα χέρια μας. Δράση
και αντίδραση.</div><div><br /></div><div> Και αν όλα αυτά μας φαίνονται
σήμερα αυτονόητα, ο Νεύτων δεν τα ανακάλυψε σε μια στιγμή, εξαιτίας
ενός μήλου που έπεσε στο κεφάλι του. Παρότι η ιστορία αυτή είναι μέρος
της μυθολογίας που περιβάλλει τον Νεύτωνα, στην πραγματικότητα όλα τα
παραπάνω αποτέλεσαν το αποκορύφωμα 20 και πλέον ετών σκέψης.</div><div> </div><div>Το
1687 δημοσίευσε το πιο αναγνωρισμένο έργο του (<i>Philosophiae Naturalis
Principia Mathematica - Μαθηματικές Αρχές της Φυσικής Φιλοσοφίας</i>), που
θεωρείται το βιβλίο με τη μεγαλύτερη επιρροή στη Φυσική και χρειάστηκε
δύο χρόνια για να το γράψει. Σε αυτό περιέγραψε τη δική του θεωρία για
τον λογισμό, τους παραπάνω τρεις νόμους της κίνησης και την πρώτη
αυστηρή περιγραφή της θεωρίας του για την παγκόσμια έλξη, παρέχοντας μια
επαναστατική νέα μαθηματική περιγραφή του Σύμπαντος.</div><div><br /></div><div><b>Ποιος ήταν όμως ο Νεύτων;</b></div><div><b> </b></div><div>Γεννήθηκε
σαν σήμερα, 4 Ιανουαρίου 1643, στο Woolsthorpe του Lincolnshire της
Αγγλίας. Χρησιμοποιώντας το "παλιό" Ιουλιανό ημερολόγιο, η ημερομηνία
γέννησης του εμφανίζεται μερικές φορές και ως 25 Δεκεμβρίου 1642.</div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj0gQnM8Q7e_yH0zTBXdti_DBtRn-BIt2EGAfAH7AJgXTBxn_EZpLNM8Cbiu3UDb_6JRgiMc3gGc0owS8M69s_UGE928z7vKU31SCjx0_fzQYKy8UP1Vpciwyu55K1dhPar_yhGIxWTFJkicCzV9Wlo-Raum-nvmBxK5VTaj0CthmBX8pYpH_GhZ6Z2dA/s576/1.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="324" data-original-width="576" height="180" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj0gQnM8Q7e_yH0zTBXdti_DBtRn-BIt2EGAfAH7AJgXTBxn_EZpLNM8Cbiu3UDb_6JRgiMc3gGc0owS8M69s_UGE928z7vKU31SCjx0_fzQYKy8UP1Vpciwyu55K1dhPar_yhGIxWTFJkicCzV9Wlo-Raum-nvmBxK5VTaj0CthmBX8pYpH_GhZ6Z2dA/s320/1.jpg" width="320" /></a></div> </div><div>Ήταν
ο μοναδικός γιος ενός εύπορου τοπικού αγρότη, ονόματι επίσης Ισαάκ, ο
οποίος πέθανε τρεις μήνες πριν έρθει στον κόσμο. Γεννήθηκε πρόωρα, ένα
μικροσκοπικό και αδύναμο μωρό που δεν πίστευαν ότι θα επιβιώσει.</div><div> </div><div><b>1645</b></div><div><b> </b></div><div><b>Ένα μοναχικό αγόρι που μισούσε τον πατριό του</b></div><div> </div><div>Η
Αγγλία την περίοδο αυτή διαλυόταν από τον εμφύλιο πόλεμο, η πανούκλα
ήταν μια διαρκής απειλή και πολλοί πίστευαν ότι το τέλος του κόσμου ήταν
επικείμενο. Αλλά ο οικισμός του Woolsthorpe ήταν μια ήσυχη κοινότητα,
ελάχιστα επηρεασμένη από όλα αυτά.</div><div> </div><div>Όταν ο Νεύτων ήταν τριών ετών, η μητέρα του τον άφησε με τη γιαγιά του και παντρεύτηκε έναν άντρα από ένα κοντινό χωριό. Αυτή
η ταραχώδης αρχή τον σημάδεψε για μια ζωή. Ένιωθε απόρριψη από την
οικογένειά του. Μισούσε τον πατριό του και απείλησε να κάψει το σπίτι
του. Όταν πήγε σχολείο αναζήτησε παρηγοριά στα βιβλία, δεν τον
συγκινούσε η λογοτεχνία και η ποίηση, αγαπούσε όμως τη Μηχανική και την Τεχνολογία, επινοώντας ένα περίτεχνο σύστημα ηλιακών ρολογιών που ήταν
ακριβές στο λεπτό. Αν και η μητέρα του ήλπιζε ότι θα διοικούσε την
οικογενειακή φάρμα, ο θείος του και ο διευθυντής του συνειδητοποίησαν
γρήγορα ότι προοριζόταν για μια πνευματική ζωή.</div><div><br /></div><div><b>1661</b></div><div><b> </b></div><div><b>Ένας μαθηματικός μέντορας.</b></div><div> </div><div>Ο
Νεύτων εγγράφηκε στο Trinity College του Cambridge και εκεί βρήκε μια
πατρική φιγούρα που τον οδήγησε σε σημαντικές ανακαλύψεις. Ο
<i>Isaac Barrow</i>, ο πρώτος καθηγητής μαθηματικών του Cambridge, οδήγησε τον
Νεύτωνα μακριά από τα τυπικά προπτυχιακά κείμενα και τον έστρεψε στα μεγάλα
άλυτα μαθηματικά προβλήματα της εποχής, όπως ο λογισμός, μια μέθοδος
περιγραφής του τρόπου με τον οποίο αλλάζουν τα πράγματα. Ο Νεύτων κυνήγησε επίσης νέα έργα φιλοσόφων όπως ο Ντεκάρτ, ο οποίος υποστήριξε
ότι το Σύμπαν διέπεται από μηχανικούς νόμους.</div><div><br /></div><div><b>1665</b></div><div><b> </b></div><div><b>Τα παραγωγικά χρόνια της πανούκλας.</b></div><div><b> </b></div><div>Όταν
το Πανεπιστήμιο του Cambridge έκλεισε λόγω της πανώλης, ο Νεύτων αναγκάστηκε να επιστρέψει στο σπίτι. Αυτή ήταν και η πιο παραγωγική
περίοδος της ζωής του. Ο ίδιος οδηγήθηκε από την πεποίθηση ότι
ο δρόμος προς την αληθινή γνώση βρισκόταν στις παρατηρήσεις και όχι
στην ανάγνωση βιβλίων. Έθεσε τις βάσεις για τις θεωρίες του στον
λογισμό και τους νόμους της κίνησης που αργότερα θα τον έκαναν διάσημο.
Αλλά, μυστικοπαθής όπως ήταν, κράτησε όλες τις ιδέες του για τον εαυτό
του.</div><div><br /></div><div><b>1671</b></div><div><b> </b></div><div><b>Νέες ιδέες οδηγούν σε ένα επαναστατικό τηλεσκόπιο.</b></div><div> </div><div>Ο
Νεύτων συνέχισε να πειραματίζεται στο εργαστήριο του. Αυτός ο
συνδυασμός θεωρίας και πράξης τον οδήγησε σε πολλά και διαφορετικά είδη
ανακαλύψεων. Η θεωρία του για την Οπτική τον έκανε να
επανεξετάσει τη σχεδίαση του τηλεσκοπίου, που μέχρι τότε ήταν ένα
μεγάλο, δυσκίνητο όργανο. Χρησιμοποιώντας καθρέφτες αντί για φακούς
κατάφερε να δημιουργήσει ένα ισχυρό όργανο, 10 φορές μικρότερο από τα
παραδοσιακά τηλεσκόπια. Όταν η Βασιλική Εταιρεία άκουσε για το
τηλεσκόπιο του Νεύτωνα εντυπωσιάστηκε. Αυτό του έδωσε το θάρρος να τους
πει εκείνο που περιέγραφε ως "κρίσιμο πείραμα" σχετικά με το φως και τα
χρώματα.</div><div><br /></div><div><b>1672</b></div><div><b> </b></div><div><b>Δέχεται την κριτική άσχημα.</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhi3iGXhv7rORkAb_u7UuwEpmaq5anWiZSKHyBCrOGA-YutNfDHyCJZjSxoAFJFunNfrTCzGmtIjzddqD3dzzwN3_ijBCjrFPo9wb0CRddShbfd1xluYFjmIC7wvBiyrH7dARPeYWEx6k5ZTCQbv_8WsFPMsXJNA4E4QosevWHC0uit3fdhSsH7bYQRMg/s576/1672.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="341" data-original-width="576" height="189" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhi3iGXhv7rORkAb_u7UuwEpmaq5anWiZSKHyBCrOGA-YutNfDHyCJZjSxoAFJFunNfrTCzGmtIjzddqD3dzzwN3_ijBCjrFPo9wb0CRddShbfd1xluYFjmIC7wvBiyrH7dARPeYWEx6k5ZTCQbv_8WsFPMsXJNA4E4QosevWHC0uit3fdhSsH7bYQRMg/s320/1672.jpg" width="320" /></a></div> </div><div>Η
Royal Society ήταν μια ελίτ ομάδα με την οποία συναντήθηκε για να
μοιραστεί και να ασκήσει κριτική ο ένας στη δουλειά του άλλου.
Ενθάρρυναν τον Νεύτωνα να μοιραστεί τις ιδέες του.</div><div>Αλλά οι
θεωρίες του για το φως δεν πήγαν καλά. Πολλά μέλη της Βασιλικής
Εταιρείας δεν δέχτηκαν τα αποτελέσματά του, ίσως επειδή και ο ίδιος τα είχε
περιγράψει με σκοτεινό τρόπο. Ο Νεύτων είχε
μια έντονη προσωπικότητα και μια ακλόνητη πεποίθηση ότι είχε δίκιο. Με
την περηφάνια του διαλυμένη, άρχισε να αποσύρεται από την πνευματική ζωή.</div><div><br /></div><div><b>1679</b></div><div><b> </b></div><div><b>Μια αυτοεξορία.</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgwCGx4fHDFQr5CQJbae_U2qdXlo9-AWwXMomw-mQhY70qRA4pBSA6rTM8-f9fCifykRTo8ihteaN3kI4gkcISfcnaJOi0GVA9aiK52XpVUxiW6exV3HD1sFIhiigvVBrJfHblkRxyJGfoNp32qoIcFNGtHt2g5zCHy3JPsad9szvNM5nY-Qgt0GCTp9g/s576/1679.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="440" data-original-width="576" height="244" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgwCGx4fHDFQr5CQJbae_U2qdXlo9-AWwXMomw-mQhY70qRA4pBSA6rTM8-f9fCifykRTo8ihteaN3kI4gkcISfcnaJOi0GVA9aiK52XpVUxiW6exV3HD1sFIhiigvVBrJfHblkRxyJGfoNp32qoIcFNGtHt2g5zCHy3JPsad9szvNM5nY-Qgt0GCTp9g/s320/1679.jpg" width="320" /></a></div> </div><div>Επηρεασμένος
από τις κακές κριτικές απομονώθηκε από άλλους φυσικούς φιλοσόφους και
αφιερώθηκε σε μια ριζοσπαστική θρησκευτική και αλχημική εργασία. Όταν
πέθανε η μητέρα του επέστρεψε στο σπίτι στο Woolsthorpe και ξεκίνησε
μια περίοδο μοναχικών σπουδών. Απορροφήθηκε από την αλχημεία, μια
μυστική μελέτη της φύσης της ζωής και μεσαιωνικό πρόδρομο της
Χημείας. Κάποιοι υποστηρίζουν ότι αυτές οι ιδέες, αν και δεν ήταν
επιστημονικές με την έννοια που τις καταλαβαίνουμε σήμερα, τον βοήθησαν να
σκεφτεί ριζοσπαστικές σκέψεις που διαμόρφωσαν το πιο σημαντικό έργο
του, συμπεριλαμβανομένων των θεωριών της βαρύτητας.</div><div><br /></div><div><b>1684</b></div><div><b> </b></div><div><b>Αρχίζει ο μεγαλύτερος ανταγωνισμός.</b></div><div><b> </b></div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhddSZ0M5ijfv3Ej7JQYzR4KuvU2lxTzgOttikWT5aijM3Tbh6ndj9I4RRQ-VQqaeKDHTPl8DAwy5d8uzk_p3tbGBzA46BX1p1BXib3tdOaeo-_C6N40VkAWfxw1jXAZpWqAEwrQdePRcmkwxy39nwb55YUkhQMJqOe86u1JoADP7KeOIqD3b4p_Kuctw/s576/%CE%BB%CE%B5%CE%B9%CE%BC%CF%80%CE%BD%CE%B9%CF%84%CE%B6.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="324" data-original-width="576" height="180" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhddSZ0M5ijfv3Ej7JQYzR4KuvU2lxTzgOttikWT5aijM3Tbh6ndj9I4RRQ-VQqaeKDHTPl8DAwy5d8uzk_p3tbGBzA46BX1p1BXib3tdOaeo-_C6N40VkAWfxw1jXAZpWqAEwrQdePRcmkwxy39nwb55YUkhQMJqOe86u1JoADP7KeOIqD3b4p_Kuctw/s320/%CE%BB%CE%B5%CE%B9%CE%BC%CF%80%CE%BD%CE%B9%CF%84%CE%B6.jpg" width="320" /></a></div> </div><div>Όταν
ο Γερμανός φιλόσοφος Λάιμπνιτς δημοσίευσε μια σημαντική μαθηματική
εργασία, ήταν η αρχή μιας δια βίου διαμάχης μεταξύ των δύο ανδρών. Ο Λάιμπνιτς, ένας από τους πιο εξέχοντες φιλοσόφους της Ευρώπης, είχε ασχοληθεί εντατικά με ένα από τα πιο δύσκολα προβλήματα στα Μαθηματικά, τον τρόπο με τον οποίο οι εξισώσεις μπορούσαν να περιγράψουν τον φυσικό
κόσμο. Όπως ο Νεύτων, δημιούργησε μια νέα θεωρία του λογισμού. Ωστόσο, ο Νεύτων ισχυρίστηκε ότι είχε κάνει την ίδια δουλειά 20 χρόνια πριν και ότι ο Λάιμπνιτς είχε κλέψει τις ιδέες του. Ο μυστικοπαθής Νεύτων όμως δεν είχε
δημοσιεύσει το έργο του και έπρεπε να επιστρέψει βιαστικά στις παλιές
του σημειώσεις για να μπορέσει ο κόσμος να δει τη λειτουργία του.</div><div> </div><div><b>1687</b></div><div><b> </b></div><div><b>The Principia Mathematica: Ένα θεμέλιο της σύγχρονης επιστήμης.</b></div><div><b> </b></div><div>Προκαλούμενος
από τον Ρόμπερτ Χουκ να αποδείξει τις θεωρίες του για τις πλανητικές
τροχιές, ο Νεύτων παρήγαγε το έργο που θεωρείται το θεμέλιο για τη Φυσική
όπως την ξέρουμε.</div><div><br /></div><div><b>1689</b></div><div> </div><div><b>Ο Νεύτων μπαίνει στον κόσμο της πολιτικής.</b></div><div> </div><div>Έχοντας
φτιάξει ένα σπουδαίο όνομα ως φυσικός φιλόσοφος, ο Νεύτων ενθουσιάστηκε από μια νέα ζωή ως πολιτικός και δημόσιο πρόσωπο. Βαθιά θρησκευόμενος κατάφερε και εξελέγη βουλευτής, ωστόσο με μικρή επιρροή στα κοινά.</div><div> </div><div><b>1693</b></div><div><b> </b></div><div><b>Εξάντληση και κατάρρευση.</b></div><div> </div><div>Στα
μέσα του 1693 υπέστη ψυχική κατάρρευση όταν υποψιάστηκε ότι οι φίλοι
του συνωμοτούσαν εναντίον του. Ωστόσο, η εύθραυστη ψυχική υγεία του δεν
έπληξε τη δημόσια φήμη του. Σύντομα του προσφέρθηκε μια σημαντική νέα
θέση.</div><div><br /></div><div><b>1696</b></div><div><b> </b></div><div><b>Ο Νεύτων σώζει το βρετανικό νόμισμα.</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgG4PpxsJtevxBp8O9-BoSiqON1nfbZ2qoNHBYOy4Nw6FrRn281GKO0p4ly9LHoNLHSD-L43uGKtHBcv48_YwPMRUV9n62E60WLMHFZcoAua2YmWn3LoWRL-nvMCKERy8jQywTbUYMriB-tTQHjV46RZ10mKx0aOr_7ELhWlkTmmWLe4Y4UW-oDvd7LbQ/s576/1696.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="374" data-original-width="576" height="208" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgG4PpxsJtevxBp8O9-BoSiqON1nfbZ2qoNHBYOy4Nw6FrRn281GKO0p4ly9LHoNLHSD-L43uGKtHBcv48_YwPMRUV9n62E60WLMHFZcoAua2YmWn3LoWRL-nvMCKERy8jQywTbUYMriB-tTQHjV46RZ10mKx0aOr_7ELhWlkTmmWLe4Y4UW-oDvd7LbQ/s320/1696.jpg" width="320" /></a></div> </div><div>Ως
σύμβουλος του Βασιλικού Νομισματοκοπείου, ο Νεύτων βρήκε μια νέα
κλήση. Προσπάθησε να κάνει το βρετανικό νόμισμα το πιο σταθερό στον
κόσμο. Τον 17ο αιώνα, τα οικονομικά της Βρετανίας ήταν σε κρίση και συχνά το μέταλλο σε ένα κέρμα άξιζε
περισσότερο από την ονομαστική αξία του ίδιου του νομίσματος. Ο Νεύτων
επέβλεψε ένα τεράστιο έργο για την ανάκληση του παλιού νομίσματος και
την έκδοση ενός πιο αξιόπιστου. Πάντα μεθοδικός, διατηρούσε μια βάση
δεδομένων με παραχαράκτες, τους οποίους καταδίωξε με μανία.
Κράτησε τη θέση αυτή για το υπόλοιπο της ζωής του.</div><div><br /></div><div><b>1703</b></div><div><b> </b></div><div><b>Εξελέγη πρόεδρος της Βασιλικής Εταιρείας.</b></div><div> </div><div>Ως
ηγετική φυσιογνωμία της βρετανικής φυσικής φιλοσοφίας, ο Νεύτων είχε
ολοκληρώσει το σημαντικότερο έργο του και πλέον αυτό που τον ενδιέφερε ήταν να διασφαλίσει τη
φήμη του. Χαρακτηρίζεται ως επιβλητικός ηγέτης και εμμονικός με την εξουσία και τη
φήμη. Αν και συνέχισε να δημοσιεύει δικά του έργα, εργάστηκε επίσης
για να χαλάσει τη φήμη άλλων ανδρών. </div><div><br /></div><div><b>1712</b></div><div><b> </b></div><div><b>Ο Νεύτων ξαναγράφει την ιστορία υπέρ του.</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzZtPYWV91FU5w5Ojw41kvJLojKK-tHemufgnf4UqqjqwQktI3HE6q-3adtEXbdBxFztc_rc8HaYjyiuWdM5icyJ2WOer_1jca_vxmY2-IrC7TzQeZpOXymD4rKyIPUEzh2rUmp83HAgkhZ16jrSI1cx82_6PIHrIv2SEPkjlIimaLbEkJlnaikaIreQ/s576/1712.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="324" data-original-width="576" height="180" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjzZtPYWV91FU5w5Ojw41kvJLojKK-tHemufgnf4UqqjqwQktI3HE6q-3adtEXbdBxFztc_rc8HaYjyiuWdM5icyJ2WOer_1jca_vxmY2-IrC7TzQeZpOXymD4rKyIPUEzh2rUmp83HAgkhZ16jrSI1cx82_6PIHrIv2SEPkjlIimaLbEkJlnaikaIreQ/s320/1712.jpg" width="320" /></a></div><br /></div><div>Ο
Νεύτων και ο Λάιμπνιτς είχαν τσακωθεί για το ποιος εφηύρε τον
λογισμό. Το 1713, η Βασιλική Εταιρεία σχημάτισε μια επιτροπή για να
αποφασίσει μια για πάντα ποιος θα πιστωθεί την ανακάλυψη αυτή. Το συμπέρασμα της επιτροπής ήταν πως ο Νεύτων είχε νικήσει τον Λάιμπνιτς με αρκετά χρόνια διαφορά. Ωστόσο, ο
μυστικός συγγραφέας της έκθεσης της Βασιλικής Εταιρείας δεν ήταν άλλος
από τον ίδιο τον Νεύτωνα. Ο Λάιμπνιτς αρνήθηκε να παραδεχτεί την ήττα
και η διαμάχη τελείωσε μόνο όταν και οι δύο άνδρες ήταν νεκροί. Σήμερα,
είναι αποδεκτό ότι και οι δύο έφτασαν στον λογισμό ανεξάρτητα.</div><div><br /></div><div><b>1726</b></div><div><b> </b></div><div><b>Ο Νεύτων δημιουργεί έναν θρύλο.</b></div><div> </div><div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKOK2Ug3dVWO_aeKAKQm9kFGnh8OYjvECt55_zXIP69bla9RQQ8NhXH8vvBprHvWi4jthnIqNRAwswq_aQlFxdmTUEOltvvwO3T3IcJojw_RapYhQ8gQceTKlnlr5ni3UhCPXmd_R9oXSN5fC5T6G6umL1VXzXTB3wTICRPqZipw7yqxkfFbSaEdxP_g/s576/1726.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="391" data-original-width="576" height="217" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKOK2Ug3dVWO_aeKAKQm9kFGnh8OYjvECt55_zXIP69bla9RQQ8NhXH8vvBprHvWi4jthnIqNRAwswq_aQlFxdmTUEOltvvwO3T3IcJojw_RapYhQ8gQceTKlnlr5ni3UhCPXmd_R9oXSN5fC5T6G6umL1VXzXTB3wTICRPqZipw7yqxkfFbSaEdxP_g/s320/1726.jpg" width="320" /></a></div><br /></div><div>Στο τέλος της ζωής του, είπε μια ιστορία που έχει γίνει ένας από τους πιο διαρκείς θρύλους στην ιστορία της επιστήμης. Τρώγοντας
με ένα συνάδελφό του, μέλος της Βασιλικής Εταιρείας, ο Νεύτων θυμήθηκε ότι καθόταν κάτω από μια μηλιά στο σπίτι της οικογένειάς του
στο Woolsthorpe και ένα μήλο που έπεφτε τον είχε παρακινήσει να σκεφτεί
τη βαρύτητα. Η ιστορία ειπώθηκε επίσης και από άλλα άτομα που τον γνώριζαν,
συμπεριλαμβανομένης της ανιψιάς του που τον φρόντιζε στα τελευταία του
χρόνια. Ωστόσο, ο μύθος ότι ο Νεύτων χτυπήθηκε στο κεφάλι από το μήλο είναι μια μεταγενέστερη εφεύρεση.</div><div> </div><div><b>20 Μαρτίου 1727</b></div><div><b> </b></div><div><b>Ο Νεύτων πεθαίνει.</b></div><div><b> </b></div><div><b><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiaWQAEUca4ijIKaoS4gdegVl-IwC9U0UjCkAi1ULfHzqoZbsDDjR0j23SY9xq2F4ZGCp8dLYp5WzE7Qdvl6lsFcz3rcaCuU4N_Kv19wtQ8cfFT9oIiaVbEAjHDGPjzXn2exDICEAV23DnfvJ2nja0BuLPaidd1Fx4IZ6vJMWopaOfHgK3aI8NuSZqrOg/s677/%CF%84%CE%B5%CE%BB%CE%BF%CF%82.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="677" data-original-width="576" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiaWQAEUca4ijIKaoS4gdegVl-IwC9U0UjCkAi1ULfHzqoZbsDDjR0j23SY9xq2F4ZGCp8dLYp5WzE7Qdvl6lsFcz3rcaCuU4N_Kv19wtQ8cfFT9oIiaVbEAjHDGPjzXn2exDICEAV23DnfvJ2nja0BuLPaidd1Fx4IZ6vJMWopaOfHgK3aI8NuSZqrOg/s320/%CF%84%CE%B5%CE%BB%CE%BF%CF%82.jpg" width="272" /></a></div><br /></b></div><div>Πέθανε
σε ηλικία 84 ετών και κηδεύτηκε με όλες τις τιμές, αφού ως διάσημος
φυσικός φιλόσοφος αποτελούσε ένα είδος εθνικού ήρωα.</div><div> </div><div>Ο
Νεύτων έθεσε τα θεμέλια για την επιστημονική μας εποχή. Οι νόμοι της
κίνησης και η θεωρία της βαρύτητας στηρίζουν μεγάλο μέρος της σύγχρονης Φυσικής και Μηχανικής. Ο ίδιος πίστευε ότι είχε έρθει στη Γη για να
αποκωδικοποιήσει τον λόγο του Θεού, μελετώντας τόσο τις γραφές όσο και
το βιβλίο της φύσης. Για αυτόν, η Θεολογία και τα Μαθηματικά ήταν μέρος
ενός έργου για την ανακάλυψη ενός ενιαίου συστήματος του κόσμου.</div><div> </div><div>Εικόνες: <a href="https://www.kathimerinifysiki.gr/" target="_blank">https://www.kathimerinifysiki.gr/</a> </div><div> </div><div>Ενδεικτικές πηγές: <a href="https://www.biography.com/" target="_blank">https://www.biography.com/</a>, <a href="https://www.bbc.com/">https://www.bbc.com/</a> , <a href="https://mathshistory.st-andrews.ac.uk/" target="_blank">https://mathshistory.st-andrews.ac.uk/</a><br /></div>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-63839978545006372272022-12-29T15:17:00.004+02:002022-12-29T15:17:37.183+02:00Πριν μπούμε στα ολοκληρώματα...(2022 - 2023)<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjsSO_CqCwA-lUFFE3SDcwfEFeUD3QZaQcgbyCy5n32kQhi_bXWGjoB9_1ECQR3-8ivSEbOS5_vaTqMB3qy-JyuICjXMn_l8TQqzT0dT-o6mII7EFLA72cA7kByegEVwtfWPWOVb5yC48KGNZ-1EHEzqPVW3sHzdjv3CxYbF_ZH2DOJDdVR831jMkj-AQ/s876/321899553_1596551117435683_5342701206285541616_n.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="576" data-original-width="876" height="210" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjsSO_CqCwA-lUFFE3SDcwfEFeUD3QZaQcgbyCy5n32kQhi_bXWGjoB9_1ECQR3-8ivSEbOS5_vaTqMB3qy-JyuICjXMn_l8TQqzT0dT-o6mII7EFLA72cA7kByegEVwtfWPWOVb5yC48KGNZ-1EHEzqPVW3sHzdjv3CxYbF_ZH2DOJDdVR831jMkj-AQ/s320/321899553_1596551117435683_5342701206285541616_n.jpg" width="320" /></a></div><p></p><p>Μια συλλογή 70 επαναληπτικών θεμάτων στα δύο πρώτα κεφάλαια των Μαθηματικών της Γ Λυκείου για όσους τα έχουν ολοκληρώσει ή θα τα ολοκληρώσουν στο επόμενο χρονικό διάστημα.</p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1w_LdjcuuEftXidS-lfimyw6UcLUgwno9/preview" width="640"></iframe>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-79040047594121902572022-11-10T18:16:00.000+02:002022-11-10T18:16:06.886+02:00Μαθηματικές ιστορίες για όλους!<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCiU1ACm10eDLRkK0yzSGzahXO79JvJt4AOnvmlfu-b3w61xv-bEoWUZuiDQLZ0YjxORtwilR3aGEDJ6zSUOiayg_CIbp2kHHPwtw6rxHysZIP12GSC-ZvMVh9yOM_A3evZ3oFzGCJSyDZ0kgntnRglKfQRvmVxSzYmtiIMDs8SyGMtjgE6uZxoGFWzA/s820/mathimatikes-istories.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="820" data-original-width="700" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCiU1ACm10eDLRkK0yzSGzahXO79JvJt4AOnvmlfu-b3w61xv-bEoWUZuiDQLZ0YjxORtwilR3aGEDJ6zSUOiayg_CIbp2kHHPwtw6rxHysZIP12GSC-ZvMVh9yOM_A3evZ3oFzGCJSyDZ0kgntnRglKfQRvmVxSzYmtiIMDs8SyGMtjgE6uZxoGFWzA/s320/mathimatikes-istories.png" width="273" /></a></div>Η ιστορία των Μαθηματικών εκτείνεται σε αναρίθμητες γενιές και αποτελεί
μια μεγαλειώδη περιπέτεια στον κόσμο των ιδεών. Στο πέρασμα των αιώνων,
τα Μαθηματικά έχουν επηρεαστεί από τη Γεωργία, το Εμπόριο, τη Μηχανική,
την Αστρονομία, τη Βιομηχανία, την Ιατρική, ακόμα και από την Τέχνη του
Πολέμου. Ταυτόχρονα, έχουν συμβάλει στην πρόοδο άλλων επιστημών αλλά και
στις θεαματικές αλλαγές που έχουν συντελεστεί στη ζωή του ανθρώπου τις
τελευταίες δεκαετίες.<br /> <p></p><p>Στο βιβλίο αυτό, όμως, μέσα από τις ιστορίες
σπουδαίων μαθηματικών και άλλων σημαντικών επιστημόνων, θα ανακαλύψουμε
πως πάνω απ’ όλα τα Μαθηματικά είναι ένα παιχνίδι του νου, μια πρόκληση
για τη σκέψη και τη φαντασία, ένας τρόπος να αντιλαμβανόμαστε τον κόσμο
και τη ζωή, ένας τρόπος να περάσουμε καλά.<br /> </p><p>Γι’ αυτό, άλλωστε, τα Μαθηματικά… είναι για ΟΛΟΥΣ!</p><p><a href="https://ellinoekdotiki.gr/gr/ekdoseis/i/mathimatikes-istories-gia-olous" target="_blank">https://ellinoekdotiki.gr/gr/ekdoseis/i/mathimatikes-istories-gia-olous</a> <br /></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-2679129155225322812022-09-27T20:30:00.004+03:002022-09-27T20:59:35.972+03:00Μια εργασία που αποδεικνύει μαθηματικά τη γνωστή παροιμία: "πολύ καλό για να είναι αληθινό!"<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgLE0RoIeUpsQB34xmMwXqcTADnlk5hb1YHZ1e77ZlWyO4_x9sIEOcdMsXrJxScV3y01YmP8g1FMfKRqc_J_BMgRgchhn0u-wFphvuZQeb3imD_wd7a3uVu24JbnmcOMbEnrD1c97HgLkJhflFgwBZRShgPlxcU0H_pqCuFd4_IuopeRoxFf-e_RuUO7A/s960/1b763b58782c833ed2d7690f96165aef.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="720" data-original-width="960" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgLE0RoIeUpsQB34xmMwXqcTADnlk5hb1YHZ1e77ZlWyO4_x9sIEOcdMsXrJxScV3y01YmP8g1FMfKRqc_J_BMgRgchhn0u-wFphvuZQeb3imD_wd7a3uVu24JbnmcOMbEnrD1c97HgLkJhflFgwBZRShgPlxcU0H_pqCuFd4_IuopeRoxFf-e_RuUO7A/s320/1b763b58782c833ed2d7690f96165aef.jpg" width="320" /></a></div><br /><p>Υπάρχει ένας αρχαίος εβραϊκός νόμος σύμφωνα με τον οποίο, εάν ένας ύποπτος σε δίκη κριθεί ομόφωνα ένοχος από όλους τους δικαστές, τότε ο ύποπτος αυτός αθωώνεται. Ο λόγος είναι ότι οι νομοθέτες της εποχής είχαν παρατηρήσει πως η ομόφωνη συμφωνία υποδηλώνει πολύ συχνά την παρουσία συστημικού λάθους στη δικαστική διαδικασία, αν και στατιστική και σφάλματα δεν είχαν ακόμη ανακαλυφθεί.</p><p>Διαισθητικά επομένως, όπως λέει και η παροιμία, όταν κάτι φαίνεται πολύ καλό για να είναι αληθινό, μάλλον υπάρχει λάθος.</p><p>Το 2016, ερευνητές από την Αυστραλία και τη Γαλλία εργάσθηκαν μαθηματικά πάνω σε αυτήν την ιδέα, ονομάζοντάς την <b>"το παράδοξο της ομοφωνίας"</b>. </p><p>Η συγκεκριμένη ομάδα επιστημόνων, χρησιμοποιώντας πιθανότητες και ανάλυση Bayes, έφτασε στο συμπέρασμα πως τα συντριπτικά στοιχεία, χωρίς μια αντίθετη γνώμη, στην πραγματικότητα αποδυναμώνουν την αξιοπιστία μιας υπόθεσης και μπορούν να υποδείξουν την αποτυχία του συστήματος. </p><p>Η ομάδα δοκίμασε τρία διαφορετικά σενάρια με χρήση πιθανοθεωρίας και στατιστικής:</p><p>α) τη χρήση μαρτύρων για την επιβεβαίωση της ταυτότητας ενός ύποπτου εγκληματικής πράξης</p><p>β) την ακριβή ταυτοποίηση ενός αρχαιολογικού ευρήματος και</p><p>γ) την αξιοπιστία ενός συστήματος κρυπτογράφησης.</p><p>Και στις τρεις περιπτώσεις διαπιστώθηκε το ίδιο. Υπάρχει ένα σημείο στο οποίο το υπερβολικά καλό αποτέλεσμα αποδυναμώνει το συμπέρασμα, κάνοντας το όλο σύστημα αναξιόπιστο.</p><p><i>"Εάν πολλοί ανεξάρτητοι μάρτυρες καταθέτουν ομόφωνα την ταυτότητα ενός υπόπτου, υποθέτουμε ότι δεν μπορούν να κάνουν όλοι λάθος, αφού η ομοφωνία θεωρείται συχνά αξιόπιστη. Ωστόσο, αποδεικνύεται ότι η πιθανότητα μεγάλου αριθμού ανθρώπων να συμφωνήσουν είναι μικρή, επομένως η εμπιστοσύνη μας στην ομοφωνία είναι αβάσιμη", </i>αναφέρει χαρακτηριστικά ένας από τους ερευνητές.</p><p>Πιθανότατα, όλοι μας κάποια στιγμή να έχουμε βιώσει το συγκεκριμένο παράδοξο και παραδείγματα από τη σύγχρονη ιστορία υπάρχουν πολλά.</p><p>Χαρακτηριστικά αναφέρω το γνωστό σκάνδαλο της Volkswagen. Η μεγάλη αυτοκινητοβιομηχανία προγραμμάτισε με δόλιο τρόπο ένα τσιπ στον εγκέφαλο του κινητήρα με σκοπό, καθώς αυτός λειτουργεί, να δείχνει μηδενική σχεδόν εκπομπή ρύπων, κάτι που δεν συνέβαινε και στην πραγματικότητα. </p><p>Οι μηδενικές αυτές εκπομπές όμως ήταν τόσο συνεπείς και "πολύ καλές για να είναι αληθινές" σε όλα τα αυτοκίνητα, είτε καινούργια είτε πενταετίας, με αποτέλεσμα να κινήσουν υποψίες. Η συνέπεια πρόδωσε τη συστηματική προκατάληψη και η εταιρεία παραδέχτηκε την απάτη και ζήτησε συγνώμη.</p><p>Δείτε την εργασία <a href="https://arxiv.org/abs/1601.00900?fbclid=IwAR2SFMoeGOxzVZvgF_CEA5Zwzgv9YIyxWlNIwHvkf3YvjUJ7eUgDCUHzTlE" target="_blank">εδώ</a><br /></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-12560889101710906552022-08-29T23:48:00.001+03:002022-08-30T09:34:51.579+03:00BIO vs MATHS? (video από την ημερίδα)<div class="article__summary"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEirlDXp_dx6EODRWCCykUdfhKJiDaPJHp3G_ShHWrrOz48Gpj_PB1x4lNP7E3-jH8fb_UTYP4BgU3zdW43uWmgULmzCAuNy_bLu5DikmIqp3XqhKBwc_KQZ3KrmtBMnUL5ph7bniXzQfYNO-4boX_ne1BJS5-1Q9zeE3to-ljUIUWZgj3odnhsuMEur-Q/s1080/278177476_5259558550742175_8679147339375020862_n.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1080" data-original-width="1080" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEirlDXp_dx6EODRWCCykUdfhKJiDaPJHp3G_ShHWrrOz48Gpj_PB1x4lNP7E3-jH8fb_UTYP4BgU3zdW43uWmgULmzCAuNy_bLu5DikmIqp3XqhKBwc_KQZ3KrmtBMnUL5ph7bniXzQfYNO-4boX_ne1BJS5-1Q9zeE3to-ljUIUWZgj3odnhsuMEur-Q/s320/278177476_5259558550742175_8679147339375020862_n.jpg" width="320" /></a></div> </div><div class="article__summary">Γιατί ο 21ος αιώνας έχει χαρακτηριστεί ως αιώνας της Βιολογίας και των Επιστημών Υγείας και τι ρόλο έπαιξαν τα Μαθηματικά σε αυτό;</div><p>Με ποιον τρόπο η Βιολογία βοήθησε τα Μαθηματικά να θέσουν νέα ερωτήματα στο εσωτερικό τους;</p><div id="_mwayss-473a050b3b0ceb484160dc5e3f17614f1661774838660"></div> <p>Πώς
η σύγχρονη τεχνολογία συνδύασε τις επιστήμες της Βιολογίας και των Μαθηματικών, οι οποίες ακόμη και σήμερα θεωρούνται από πολλούς διαχωρισμένες;</p><div class="adv" data-lazyloaded-by-ocm="" data-oau-code="/63410456/alfavita.gr/art_inline_1" id="art_inline_1"><div id="google_ads_iframe_/63410456/alfavita.gr/art_inline_1_0__container__" style="border: 0pt none; height: 0px; width: 336px;"></div></div><p>Στο παρακάτω βίντεο μπορείτε να παρακολουθήσετε την ομιλία μου από την ημερίδα, η οποία πραγματοποιήθηκε το
Σάββατο 09 Απριλίου 2022 στο Επιμελητήριο Αιτωλοακαρνανίας.</p><p><b> </b></p><p><b>Διοργανωτές:</b> </p><p>Φροντιστήριο Βιολογίας <i>bioΝΟΗΣΗ</i> - Δήμητρα Τζελαλίδου</p><p>Φροντιστήριο Μαθηματικών <i>εις τη ν</i> - Θεόδωρος Παγώνης<br /></p><p> <b> </b></p><p><b>Ομιλητές:</b> </p><p><i>Γιώργος Τσιάμης</i> </p><p>Καθηγητής Περιβαλλοντικής Μικροβιολογίας στο Τμήμα Μηχανικών Περιβάλλοντος του Πανεπιστημίου Πατρών.<br /></p><div class="adv" data-lazyloaded-by-ocm="" data-oau-code="/63410456/alfavita.gr/art_inline_2" id="art_inline_2"><div id="google_ads_iframe_/63410456/alfavita.gr/art_inline_2_0__container__" style="border: 0pt none; height: 0px; width: 336px;"><br /></div></div><p>Διευθυντής Εργαστηρίου Μικροβιολογίας Συστημάτων και Εφαρμοσμένης Γονιδιωματικής.</p><p><i> </i></p><p><i>Θανάσης Κοπάδης</i></p><div id="pa_videoslider" style="margin: 0px auto; max-width: 800px;"></div><p>Μαθηματικός - Συγγραφέας.</p><p>Μέλος της Εταιρίας Γραμμάτων και Τεχνών Πειραιά.</p><p> </p><p><i>Νεφέλη Μπιρμπάκου</i></p><p>Εκπαιδεύτρια Ρομποτικής - Συνιδρύτρια της Shift Education. </p><p><iframe allow="accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/ZSahoqz-v9A" title="YouTube video player" width="560"></iframe></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-71279300834221988212022-06-26T18:14:00.002+03:002022-06-26T19:28:25.508+03:00Ένας σύντομος οδηγός μαθηματικής φιλοσοφίας.<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjD7-jypZU4cpCNNoLyhnjVNkirgeitdkbLjJgLZlhmWySblT7vtA1hKmFito9Cph4k-YyceKiF5CRsrM3gdKjRsx4-b0e93b1V6BCI1iB7GyEIN2RdwKk7tq6E3J2sw98e5M7fAZnoPFp21Sv9ytqCQ-0xvuM0rgBcxY8dgNkFebG3H2yuS9ODB191vQ/s590/thumbnail.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="420" data-original-width="590" height="228" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjD7-jypZU4cpCNNoLyhnjVNkirgeitdkbLjJgLZlhmWySblT7vtA1hKmFito9Cph4k-YyceKiF5CRsrM3gdKjRsx4-b0e93b1V6BCI1iB7GyEIN2RdwKk7tq6E3J2sw98e5M7fAZnoPFp21Sv9ytqCQ-0xvuM0rgBcxY8dgNkFebG3H2yuS9ODB191vQ/s320/thumbnail.png" width="320" /></a></div><br /><p></p><p> <i>Τι
είναι τα μαθηματικά; Μελετούν κάποιο αντικείμενο και ποιο είναι αυτό;
Τι είναι οι αριθμοί, τα σύνολα, τα σημεία, οι γραμμές, οι συναρτήσεις; Τι
σημαίνουν οι μαθηματικές προτάσεις; Ποια είναι η φύση της μαθηματικής
αλήθειας; Πώς είναι γνωστά τα μαθηματικά; Νομιμοποιείται η παρατήρηση ή
είναι μια καθαρή νοητική άσκηση; Πώς διευθετούνται οι διαμάχες ανάμεσα
στους μαθηματικούς; Τι είναι η απόδειξη; Είναι οι αποδείξεις απόλυτα
βέβαιες, απρόσβλητες από λογική αμφιβολία;<br /></i></p><div dir="ltr"><br /></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">Η </span></span><b><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">φιλοσοφία των μαθηματικών</span></span></b><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> είναι ένας </span></span>κλάδος<span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> της </span></span>φιλοσοφίας<span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> ο οποίος μελετά τις υποθέσεις, τα θεμέλια και τις επιπτώσεις των </span></span>μαθηματικών<span style="vertical-align: inherit;"><span style="vertical-align: inherit;">, ενώ έχει ως </span><span style="vertical-align: inherit;">στόχο να κατανοήσει τη φύση</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> των μαθηματικών και να ανακαλύψει τη θέση που έχουν στη ζωή των ανθρώπων.</span></span><br /></div><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Η προέλευση των μαθηματικών ιστορικά υπόκειται σε επιχειρήματα και διαφωνίες με βασικότερο θέμα συζήτησης το</span><span style="vertical-align: inherit;">
ερώτημα αν η γέννηση των μαθηματικών ήταν τυχαία ή προκλήθηκε από
ανάγκη κατά τη διάρκεια της ανάπτυξης άλλων πεδίων, όπως η φυσική. </span></span></span><br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">Οι
αιτίες της διασύνδεσης των μαθηματικών με τη φιλοσοφία είναι πολλές,
αφού και οι δύο κλάδοι αποτελούν τις πρωταρχικές διανοητικές προσπάθειες
για την κατανόηση του κόσμου γύρω μας. Επίσης και οι δύο γεννήθηκαν
στην αρχαία Ελλάδα και υπέστησαν βαθύτερους μετασχηματισμούς εκεί. <span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></span></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></span></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Οι δυτικές φιλοσοφίες των μαθηματικών πηγαίνουν πίσω στον <i>Πυθαγόρα</i></span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">, ο οποίος περιέγραψε τη θεωρία πως <i>τα πάντα είναι μαθηματικά</i>.
Οι φιλόσοφοι από την άλλη ενδιαφέρονταν ιδιαίτερα για ζητήματα
αναφοράς. Τι είναι αυτό στο οποίο αναφέρεται ή αναπαριστά μια λέξη;
Είναι ένα αντικείμενο και πώς καταφέρνουμε να συνδέσουμε ένα όνομα με
εκείνο του οποίου αποτελεί το όνομα; Η γλώσσα των μαθηματικών εστιάζει
σε τέτοια ζητήματα και έτσι ο <i>Πλάτωνας</i></span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> παραφράζει τον <i>Πυθαγόρα</i> και μελετά την </span></span>οντολογική κατάσταση <span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">των μαθηματικών αντικειμένων και στη συνέχεια ο <i>Αριστοτέλης</i></span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> μελετά τη </span></span>λογική αυτών.</span><br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Στη
σύγχρονη φιλοσοφία ένα άλλο διαχρονικό ζήτημα στη φιλοσοφία των
μαθηματικών έχει να κάνει με τη σχέση λογικής και μαθηματικών και τα
κοινά τους θεμέλια. <span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Στις
αρχές του 20ου αιώνα, οι φιλόσοφοι των μαθηματικών είχαν ήδη αρχίσει να
χωρίζονται σε διάφορες σχολές σκέψης για όλα τα ερωτήματα που τέθηκαν αρχικά, με τρεις</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> βασικές σχολές (το </span></span>φορμαλισμό<span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">, το </span></span>διαισθητισμό<span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> και τη </span></span>λογική)<span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> να εμφανίζονται την περίοδο εκείνη και να επιχειρούν να δώσουν τη δική τους απάντηση στην ολοένα και
πιο διαδεδομένη ανησυχία ότι τα μαθηματικά</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> δεν ανταποκρίνονται στα πρότυπα της </span></span>βεβαιότητας<span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> και της</span></span> αυστηρότητας, όπως <span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">είχε θεωρηθεί.</span></span></span></span></span></span></div><div dir="ltr"><br /></div><div dir="ltr"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Η
φιλοσοφία των μαθηματικών σήμερα προχωρά σε πολλές διαφορετικές
κατευθύνσεις έρευνας από φιλοσόφους των μαθηματικών, λογικούς και
μαθηματικούς και υπάρχουν πολλές σύγχρονες σχολές σκέψης για το συγκεκριμένο θέμα. Πριν όμως δούμε μερικές από αυτές<span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> να σημειώσουμε ότι η φιλοσοφία των μαθηματικών έχει δύο κύρια θέματα: <br /></span></span></span></span></span></span></div><div dir="ltr"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></span></span></span></span></div><div dir="ltr"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Α) τον <b>μαθηματικό ρεαλισμό</b> και Β) τον <b>μαθηματικό αντιρεαλισμό.
</b></span></span></span><b><br /></b></span></span></span></div><div dir="ltr"><span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">Ο μαθηματικός ρεαλισμός</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> </span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">υποστηρίζει ότι οι μαθηματικές οντότητες υπάρχουν ανεξάρτητα από την ανθρώπινη </span></span>σκέψη<span style="vertical-align: inherit;"><span style="vertical-align: inherit;">. </span><span style="vertical-align: inherit;">Οι
άνθρωποι δεν επινοούν τα μαθηματικά, αλλά τα ανακαλύπτουν, όπως πιθανώς
το ίδιο θα έκαναν κι οποιαδήποτε άλλα νοήμονα όντα στο σύμπαν. Με άλλα
λόγια</span><span style="vertical-align: inherit;"> υπάρχει πραγματικά ένα είδος μαθηματικών που μπορεί να ανακαλυφθεί</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">, όπως είναι για παράδειγμα τα τρίγωνα που αποτελούν πραγματικές οντότητες κι όχι δημιουργήματα του ανθρώπινου μυαλού.</span></span> Από τους μεγαλύτερους υποστηρικτές του μαθηματικού ρεαλισμού ήταν ο <i>Paul Erdos</i>, ο <i>David Hilbert </i>και ο <i>Kurt Godel</i> που <span style="vertical-align: inherit;"><span style="vertical-align: inherit;">πίστευε σε μια αντικειμενική μαθηματική πραγματικότητα που
μπορούσε να γίνει αντιληπτή με τρόπο ανάλογο με την αίσθηση της
αντίληψης μας.</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><span><p dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">Από την άλλη ο μαθηματικός αντιρεαλισμός</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> υποστηρίζει ότι οι μαθηματικές δηλώσεις έχουν πράγματι αξίες αλήθειας, όμως αυτό δεν πραγματοποιείται</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> κάνοντας μια αντιστοίχιση σε ένα ξεχωριστό κόσμο άυλων ή μη εμπειρικών οντοτήτων.</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></p></span></span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><span></span></span></span><div dir="ltr"><b>Μερικές σύγχρονες σχολές σκέψης.</b></div><div dir="ltr"><br /></div><div><div>✔ Ας ξεκινήσουμε με μια ιδιαίτερη σχολή, πιο <b>καλλιτεχνική</b> θα λέγαμε, αφού υπερισχύει η άποψη ότι τα μαθηματικά είναι μια τέχνη, ένας αισθητικός δηλαδή συνδυασμός υποθέσεων.<span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> </span><span style="vertical-align: inherit;"><span>Ο<i> G.H. Hardy</i>, ένας από τους σημαντικότερους
Άγγλους μαθηματικούς του 20ού αιώνα, στο διάσημο βιβλίο του <i>Η Απολογία ενός Μαθηματικού</i>,
ορίζει τα μαθηματικά περισσότερο σε σχέση με ένα αισθητικό συνδυασμό
εννοιών. Στο σπουδαίο αυτό δοκίμιο, το οποίο έγραψε αφού
συνταξιοδοτήθηκε από την
έρευνα στα μαθηματικά, κυριαρχεί το ιδιόμορφο λογοτεχνικό και αισθητικό
ύφος του και πραγματεύεται το επίμαχο θέμα της ομορφιάς και της
χρησιμότητας των
καθαρών μαθηματικών. Η μαθηματική ομορφιά ορίζεται ως τέρψη που
προέρχεται από την αφαιρετικότητα, την καθαρότητα, την απλότητα και την
τάξη των μαθηματικών, ενώ ως δημιουργική δραστηριότητα μπορεί να
συγκριθεί με τη μουσική και την ποίηση.</span></span></span></span></div><div><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><span> </span></span></span></span></div><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><span><span><h4><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjU1GqnGV6MKT8Z0yxVKyNB5rz0Mq_ojxTWmAWHXwP-dAHoQkh83b23v1vWuKhCJ6OsvDvOfUd36R20F45cY3H-bACbcsl0Nj1-SYBCYp-6C8R9aQTLV7YoYxWBa3IwOPan-x-j3THsGL9YPtOnWA6fqNq9FiQjQ7JvuX10dcTAV34mpHpa_UoMcYgkkQ/s300/p-0.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="168" data-original-width="300" height="168" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjU1GqnGV6MKT8Z0yxVKyNB5rz0Mq_ojxTWmAWHXwP-dAHoQkh83b23v1vWuKhCJ6OsvDvOfUd36R20F45cY3H-bACbcsl0Nj1-SYBCYp-6C8R9aQTLV7YoYxWBa3IwOPan-x-j3THsGL9YPtOnWA6fqNq9FiQjQ7JvuX10dcTAV34mpHpa_UoMcYgkkQ/s1600/p-0.jpg" width="300" /></a></div> </h4><h4>✔<span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> </span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><span style="font-weight: normal;">Ο</span></span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> μαθηματικός πλατωνισμός</span></span><span style="font-weight: normal;"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">
για την συνέχεια, μια μορφή ρεαλισμού που υποστηρίζει ότι οι μαθηματικές οντότητες
είναι αφηρημένες, <span>έχουν αντικειμενική υπόσταση ανεξάρτητη από τον μαθηματικό που τα
ερευνά, </span>είναι
αιώνιες και φυσικά αμετάβλητες. </span><span style="vertical-align: inherit;">Αυτή ουσιαστικά είναι και η πιο διαδεδομένη άποψη που έχουν οι περισσότεροι άνθρωποι για τους αριθμούς. </span><span style="vertical-align: inherit;">Για
τον μαθηματικό πλατωνισμό τα σημαντικότερα ερωτήματα είναι τα εξής: που
ακριβώς υπάρχουν οι μαθηματικές οντότητες και πώς εμείς γνωρίζουμε
γι' αυτές; Μήπως </span><span style="vertical-align: inherit;">υπάρχει
ένας κόσμος ξεχωριστός από τον φυσικό κόσμο που αντιλαμβανόμαστε, ο
οποίος αποτελείται αποκλειστικά από μαθηματικές οντότητες; </span><span style="vertical-align: inherit;">Υπάρχει
τρόπος να αποκτήσουμε πρόσβαση σε αυτόν τον ξεχωριστό κόσμο και να
ανακαλύψουμε αλήθειες για τις οντότητες αυτές; Στο βιβλίο <i>Mathematical Experience</i> του 1999, οι<i> Davis</i> και <i>Hersh</i> υποστηρίζουν πως οι περισσότεροι μαθηματικοί σκέφτονται και ενεργούν σαν πλατωνιστές, ο <i>Kant</i> επίσης έγραφε ότι τα μαθηματικά είναι συνθετικά και a priori, ενώ και ο <i>Godel</i> υπέθετε την ύπαρξη κάποιου είδους μαθηματικής διαίσθησης που μας επιτρέπει να αντιληφθούμε άμεσα τα μαθηματικά αντικείμενα.</span></span></span></h4><h4><span style="font-weight: normal;"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjuSXTAVZZl9mZVv_7xEOFYlEbQCqCof1zYksvyvrZsutzMCqt-SJaV5JBqPJx6ASapMIT3jll5k7HRdNao3rRus5iGpk2z41B6Baola8umu0KemRE68VBVo1mHzhrKyFEcop7wH9M80Eip74yEMnfXtjDogjYZqLgkS1tP71oS0t_2WU1vwRfihqIzTA/s400/9780395929681.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="400" data-original-width="275" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjuSXTAVZZl9mZVv_7xEOFYlEbQCqCof1zYksvyvrZsutzMCqt-SJaV5JBqPJx6ASapMIT3jll5k7HRdNao3rRus5iGpk2z41B6Baola8umu0KemRE68VBVo1mHzhrKyFEcop7wH9M80Eip74yEMnfXtjDogjYZqLgkS1tP71oS0t_2WU1vwRfihqIzTA/s320/9780395929681.jpg" width="220" /></a></div></span></span></span></h4><h4><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><span style="font-weight: normal;"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><span></span>✔ Ένα βήμα παρακάτω από τον μαθηματικό πλατωνισμό είναι ο<b> μαθηματισμός</b> που</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">
προχωρά περισσότερο </span></span></span></span></span><span style="font-weight: normal;"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">από τον πλατωνισμό, καθώς υποστηρίζει πως όχι μόνο
υπάρχουν όλα τα μαθηματικά αντικείμενα, αλλά δεν υπάρχει και τίποτα άλλο. Χρονολογικά εξελίσσεται ως εξής</span></span></span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">:</span></span><span style="background-color: inherit;"> <i>Πυθαγόρας</i> (όλα τα πράγματα είναι αριθμοί), <i>Πλάτωνας</i>, <i>Νεοπυθαγορισμός</i>, <i>Νεοπλατωνισμός</i> (με την προσθήκη της αριστοτελικής μαθηματικής λογικής), <i>Καρτεσιανισμός</i> (εφαρμογή του μαθηματικού συλλογισμού στη φιλοσοφία), <i>Λαϊμπνιζιανισμός</i>, η φιλοσοφία του <i>Alain Badiou</i> και η υπόθεση του μαθηματικού σύμπαντος από το Φυσικό <i>Max Tegmark</i>.</span></span></h4></span></span></span></span></span></div><span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><div><div dir="ltr"><span style="background-color: inherit;"></span>✔ Ο <b>λογικισμός</b>,<span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> η άποψη ότι τα μαθηματικά μπορούν να αναχθούν στη λογική</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">, είναι γνωστά εκ των προτέρων</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> και αποτελούν απλώς μέρος της γνώσης μας για τη λογική. Η γνώση για τα μαθηματικά είναι επομένως αναλυτική και δεν απαιτείται</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> καμία ειδική ικανότητα μαθηματικής διαίσθησης, αφού η λογική</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">
είναι το μόνο σωστό θεμέλιο των μαθηματικών και όλες οι μαθηματικές
προτάσεις είναι αναγκαίες λογικές αλήθειες. Βασικοί εκφραστές της σχολής
αυτής είναι οι <i>Rudolf Carnap</i>, <i>Gottlob</i> <i>Frege</i>, <i>Bertrand Russell</i>, <i>Bob Hale</i>, <i>Crispin Wright</i> κ.α.</span></span></div><div dir="ltr"><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><i>"
Τα μαθηματικά και η λογική, από ιστορική σκοπιά, ήταν εξ ολοκλήρου
διακριτοί κλάδοι... Αλλά και οι δύο αναπτύχθηκαν στους νεότερους
χρόνους: η λογική έχει γίνει περισσότερο μαθηματική και τα μαθηματικά
έχουν πάρει περισσότερο λογική μορφή. Κατά συνέπεια έχει γίνει αδύνατο
να τραβήξει κανείς μια διαχωριστική γραμμή μεταξύ των δύο. Στην
πραγματικότητα οι δύο κλάδοι έχουν γίνει ένας..."</i></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><i><br /></i></span></span></div><div align="right"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">(Russell, 1919)<i> </i><br /></span></span></div><div dir="ltr"><br /></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">✔ Ο
<b> φορμαλισμός</b> που υποστηρίζει πως οι μαθηματικές δηλώσεις είναι
συνεπείς όταν βρίσκονται εντός του συστήματος και της μεθοδολογίας που
τις περιγράφει. Μια λίστα επιτρεπτών κανόνων και χαρακτήρων δηλαδή, όπου
τα μαθηματικά δε χρειάζεται να αναφέρονται σε κάτι περισσότερο από τη
λίστα αυτή. Μια εμμονή γενικότερα σε ένα ήδη μορφοποιημένο, τυπικό και
γενικά αποδεκτό περιβάλλον κατά το παρελθόν με μια ανώτερη εξουσία να τα
καθορίζει στο παρόν.</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> Ο σημαντικότερος και πρώιμος υποστηρικτής του φορμαλισμού δεν ήταν άλλος από τον μεγάλο <i>David Hilbert</i>, </span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">ο οποίος είχε ως στόχο </span></span>την πλήρη<span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> αξιωματοποίηση των μαθηματικών για να δείξει τη συνέπεια όλων των μαθηματικών συστημάτων. </span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">Η βασική κριτική που δέχτηκε ο φορμαλισμός ήταν η αδυναμία του να δώσει απάντηση</span><span style="vertical-align: inherit;"> στο ερώτημα ποια συστήματα αξιωμάτων πρέπει
να μελετηθούν, καθώς κανένα δεν είναι πιο σημαντικό από το άλλο από
φορμαλιστική άποψη. <br /></span></span></div><div dir="ltr"><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><i>"Ο
φορμαλισμός αντιλαμβάνεται ως μια άποψη των μαθηματικών, ίσως αγνοώντας
ή παραμερίζοντας οτιδήποτε άλλο. Για καλό ή για κακό, το μεγαλύτερο
τμήμα της βασικής αριθμητικής μαθαίνεται ως μια σειρά από μηχανιστικές
(τυφλές) τεχνικές, με λίγες ή καθόλου υποδείξεις του τι κάνουν αυτές οι
τεχνικές ή γιατί λειτουργούν. Πόσοι δάσκαλοι θα μπορούσαν να εξηγήσουν
τους κανόνες της διαίρεσης ή ακόμα και τον αλγόριθμο για να υπολογίζουμε
τετραγωνικές ρίζες, αποκλειστικά με όρους εκτέλεσης μιας ρουτίνας; Αλλά
μάλλον αυτό είναι περισσότερο μια παιδαγωγική κριτική παρά μια
προσπάθεια δικαίωσης μιας φιλοσοφίας."</i></span></span></div><div align="right"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">(Shapiro, σελ.154)<br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi9s-qqybEnjRBZ_EnlHKicTF6hr76eFIRxYBk52H1XQ2g8LtFYbDVOkrhFW-qCqQ_HH01zxgy1vi1XhV_s-JQDWibmN79k8k9hl8lwrxB-W497wTbiMSyD5N45L-J4c_oJXPAMf2uROs_-47qX6XDQh8lPbLvkxRWDD2pl_bzCGfzmF7xx2Eiw8zAicQ/s499/41SmVjTM5aL._SX322_BO1,204,203,200_.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="499" data-original-width="324" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi9s-qqybEnjRBZ_EnlHKicTF6hr76eFIRxYBk52H1XQ2g8LtFYbDVOkrhFW-qCqQ_HH01zxgy1vi1XhV_s-JQDWibmN79k8k9hl8lwrxB-W497wTbiMSyD5N45L-J4c_oJXPAMf2uROs_-47qX6XDQh8lPbLvkxRWDD2pl_bzCGfzmF7xx2Eiw8zAicQ/s320/41SmVjTM5aL._SX322_BO1,204,203,200_.jpg" width="208" /></a></div><br /></span></span></div><div dir="ltr"><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">✔ Ο <b>συμβατισμός</b>,
η άποψη ότι οι προτάσεις στη γεωμετρία πρέπει να επιλέγονται για τα
αποτελέσματα που παράγουν και όχι για τη φαινομενική συνοχή τους με τις
ανθρώπινες διαισθήσεις για το φυσικό περιβάλλον. Για παράδειγμα, ο <i>Poincare</i>,
σε μια εργασία του για τις διαφορικές εξισώσεις, ήταν ίσως από τους
πρώτους που διατύπωσε την άποψη πως η ευκλείδεια γεωμετρία δεν πρέπει να
θεωρείται a priori αλήθεια. <br /></span></span></div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div><br /></div></span></span><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr">✔ Ο <b>μαθηματικός διαισθητισμός </b>ή <b>ιντουισιονισμός</b><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">, ένα πρόγραμμα ουσιαστικά μεθοδολογικής
μεταρρύθμισης με βασικό σύνθημα πως δεν υπάρχουν μαθηματικές αλήθειες μακριά από τις αισθήσεις και τις εμπειρίες μας.</span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> </span><span style="vertical-align: inherit;">Ο <i>Brouwer</i>, ιδρυτής του κινήματος, ήταν αυτός που πρώτος</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> απέρριψε
τη χρησιμότητα κάθε είδους λογικής στα μαθηματικά. Η βασική κριτική που
έχει δεχθεί η συγκεκριμένη σχολή είναι πως δεν ορίζεται ξεκάθαρα ο όρος</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> "σαφής κατασκευή", ενώ έχουν</span><span style="vertical-align: inherit;"> γίνει προσπάθειες να χρησιμοποιηθούν οι έννοιες της μηχανής <i>Turing</i></span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> για να καλυφθεί αυτό το κενό, οδηγώντας στον ισχυρισμό ότι μόνο ερωτήσεις σχετικά με τη συμπεριφορά των πεπερασμένων αλγορίθμων</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> έχουν νόημα και θα πρέπει να διερευνηθούν στα μαθηματικά. <br /></span></span></div></span></span></div><div><br /></div><div dir="ltr"><i>"Ελπίζω
να έχει καταστεί σαφές ότι ο ιντουισιονισμός αφενός λεπτολογεί με
έξυπνο τρόπο τη λογική, αφετέρου την αποκηρύσσει ως πηγή αλήθειας."</i></div><div align="right">(Brouwer, 1948) <br /></div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen="" class="BLOG_video_class" height="266" src="https://www.youtube.com/embed/rHeUr178Y1Q" width="320" youtube-src-id="rHeUr178Y1Q"></iframe></div> </span></span></div><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">✔ Ο <b>κονστρουκτιβισμός</b>, που όπως</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> ο διαισθητισμός, περιλαμβάνει την αρχή ότι
μόνο οι μαθηματικές οντότητες που μπορούν να κατασκευαστούν ρητά με μια
ορισμένη έννοια πρέπει να γίνονται δεκτές στο μαθηματικό λόγο. Τ</span><span style="vertical-align: inherit;">α μαθηματικά με βάση τη σχολή αυτή είναι μια μελέτη της ανθρώπινης
διαίσθησης και όχι ένα παιχνίδι που παίζεται με σύμβολα που δεν έχουν νόημα. Βασικός υποστηρικτής ο <i>Christofer</i> <i>Bishop</i>.</span></span></div><div dir="ltr"><br /></div><div dir="ltr">✔ Ο <b>φ</b><span style="background-color: inherit;"><b>ινιτισμός</b>, η πιο ακραία μορφή του</span><span style="background-color: inherit;"> κονστρουκτιβισμού,
σύμφωνα με τον οποίο ένα μαθηματικό αντικείμενο δεν υφίσταται καν,
εκτός κι αν μπορεί να κατασκευαστεί με πεπερασμένο αριθμό βημάτων από
τους φυσικούς αριθμούς. Διασημότερος υποστηρικτής της σχολής αυτής ο <i>Kronecker</i>, με τη χαρακτηριστική του φράση: <i>"Ο</i></span><i><span style="background-color: inherit;"> Θεός δημιούργησε τους φυσικούς αριθμούς, όλα τα άλλα είναι έργο του ανθρώπου."</span></i></div><div dir="ltr"><span style="background-color: inherit;"><br /></span></div></span></span><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit;">✔ Ο <b>μαθηματικός σ</b></span><span style="background-color: inherit;"><b>τρουκτουραλισμός</b>,</span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> μια σχολή με βασικό σύνθημα <i>τα μαθηματικά είναι η επιστήμη της δομής.</i> Οι μαθηματικές θεωρίες λοιπόν περιγράφουν
δομές και κάθε μαθηματικό αντικείμενο ορίζεται αποκλειστικά από τη θέση </span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">του σε τέτοιες δομές, οπότε δεν έχει εγγενείς ιδιότητες από τη γέννηση του ή εξαιτίας της ίδιας της φύσης του.</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> </span><span style="vertical-align: inherit;">Για
παράδειγμα, το μόνο που χρειάζεται να γνωρίζουμε για
τον αριθμό 1 είναι ότι είναι ο πρώτος ακέραιος αριθμός μετά το 0. Ομοίως
όλοι οι άλλοι ακέραιοι αριθμοί ορίζονται από τις θέσεις τους σε μια
δομή, που δεν είναι άλλη από την αριθμητική γραμμή. </span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Ο στρουκτουραλισμός αποτελεί ουσιαστικά μια γνωσιολογικά ρεαλιστική θέση</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> στην οποία οι</span></span><span style="background-color: inherit; vertical-align: inherit;"> δομές θεωρούνται ότι υπάρχουν, εφόσον κάποιο συγκεκριμένο σύστημα τις εξηγεί. </span><span style="background-color: inherit; vertical-align: inherit;">Αυτό προφανώς δημιουργεί και όλες τις γνωστές διαφωνίες σύμφωνα με τις οποίες ορισμένες απολύτως νόμιμες δομές
μπορεί κατά λάθος να μην υπάρχουν και πως ένας πεπερασμένος φυσικός
κόσμος μπορεί να μην είναι αρκετά μεγάλος για να χωρέσει κάποιες κατά
τα άλλα νόμιμες δομές. Κύριοι υπερασπιστές της σχολής αυτής οι <i>Paul Benacerraf, Geoffrey Hellman, Michael Resnik, Shapiro </i>κ.α.<br /></span></div></span></span></div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><br /></span></div><div dir="ltr"><div class="separator" style="clear: both; text-align: center;"><iframe allowfullscreen="" class="BLOG_video_class" height="266" src="https://www.youtube.com/embed/36MiLt_Wcro" width="320" youtube-src-id="36MiLt_Wcro"></iframe></div><span style="background-color: inherit; vertical-align: inherit;"><br /></span></div></span></span><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;">✔ Η <b>θεωρία του ενσωματωμένου νου</b>, ένας καθαρά γνωσιακός κλάδος των μαθηματικών, σύμφωνα με τον οποίο η μαθηματική σκέψη αποτελεί απλά μια</span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> φυσική απόρροια του
ανθρώπινου γνωστικού μηχανισμού. Στη σχολή αυτή,</span><span style="vertical-align: inherit;"> η αφηρημένη έννοια του αριθμού</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> για παράδειγμα, πηγάζει από την εμπειρία της μέτρησης διακριτών αντικειμένων. </span><span style="vertical-align: inherit;">Θεωρεί
δηλαδή πως τα μαθηματικά δεν είναι καθολικά και ούτε υπάρχουν με καμία
πραγματική έννοια, εκτός από τον ανθρώπινο εγκέφαλο. </span><span style="vertical-align: inherit;">Οι άνθρωποι κατασκευάζουν, αλλά δεν ανακαλύπτουν τα μαθηματικά. Τ</span></span><span style="background-color: inherit; vertical-align: inherit;">ο φυσικό σύμπαν λοιπόν μπορεί να θεωρηθεί ως το
απόλυτο θεμέλιο των μαθηματικών που καθοδήγησε την εξέλιξη του εγκεφάλου
και καθόρισε ποια ερωτήματα θα έβρισκε άξια έρευνας ο
εγκέφαλος αυτός. Υποστηρικτές της σχολής αυτής οι <i>George Lakoff</i>,<i> Keith Devlin</i> και </span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">ο σπουδαίος νευροεπιστήμονας <i>Stanislas Dehaene</i>. </span></span></div></span></span></div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">✔ Ο <b>α</b></span></span><span style="background-color: inherit;"><b>ριστοτελικός ρεαλισμός</b>, μια θέση που</span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> υποστηρίζει πως τα μαθηματικά μελετούν τη συμμετρία, τη συνέχεια και την τάξη, ιδιότητες που μπορούν
κυριολεκτικά να πραγματοποιηθούν στο φυσικό μας κόσμο</span><span style="vertical-align: inherit;">.
Η βασική του αρχή είναι πως τα αντικείμενα των
μαθηματικών, όπως οι αριθμοί για παράδειγμα, δεν υπάρχουν σε έναν
αφηρημένο κόσμο, αλλά μπορούν να πραγματοποιηθούν φυσικά, ενώ το κύριο
πρόβλημα</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> για
τον αριστοτελικό ρεαλισμό είναι η δυσκολία του στο να βρει αντιστοιχία
για τα
ανώτερα άπειρα που δεν είναι πραγματοποιήσιμα στο φυσικό κόσμο.
Χαρακτηριστικό έργο επηρεασμένο από τη συγκεκριμένη σχολή είναι το
βιβλίο <i>Foundation of Mathematics in the Theory of Set</i> του J<i>ohn Penn Mayberry.</i></span></span></div><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"><br /></span></span></div></span></span><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">✔ Ο μαθηματικός ή <b>λογικός ψυχολογισμός</b>, μια ιδιαίτερη σχολή κατά την οποία οι μαθηματικές έννοιες και αλήθειες βασίζονται</span></span><span style="background-color: inherit;">, προέρχονται, αλλά και εξηγούνται από ψυχολογικά γεγονότα ή νόμους. </span><span style="background-color: inherit;">Υπέρμαχοι της σχολής αυτής οι J<i>ohn Stewart Mill</i> και <i>Gustave Le Bon</i>, ενώ επικρίθηκε έντονα από τον <i>Frege</i> στα <i>Θεμέλια της Αριθμητικής</i>.</span></div></span></span></div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit;"><br /></span></div></span></span><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><div dir="ltr"><span style="background-color: inherit;">✔ Ο <b>μαθηματικός εμπειρισμός</b>,
μια μορφή ρεαλισμού ουσιαστικά με βάση τον οποίο τα μαθηματικά
αντικείμενα ανακαλύπτονται με εμπειρική έρευνα, όπως συμβαίνει και στις
υπόλοιπες επιστήμες. Βασικοί υποστηρικτές της σχολής αυτής οι <i>John Stewart Mill</i> και <i>Karl Popper</i>
που επισήμαναν τις εμπειρικές πτυχές των μαθητικών παρατηρώντας πως οι
περισσότερες μαθηματικές θεωρίες είναι υποθετικά απαγωγικές, όπως
ακριβώς συμβαίνει στη φυσική και στη βιολογία. </span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;">Ο σύγχρονος μαθηματικός εμπειρισμός διατυπώθηκε από τους <i>Quine </i>και <i>Putnam</i> με βασική αρχή το επιχείρημα της αναγκαιότητας. Αυτό σημαίνει πως</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> τα
μαθηματικά είναι απαραίτητα για όλες τις εμπειρικές επιστήμες και πως
αν επιθυμούμε να πιστέψουμε στην πραγματικότητα των φαινομένων που
περιγράφονται από αυτές θα πρέπει επίσης να πιστέψουμε στην
πραγματικότητα των οντοτήτων που απαιτούνται για αυτήν την περιγραφή.
Αυτή η θέση έγινε ιδιαίτερα δημοφιλής προς τα τέλη του 20ου αιώνα μαζί
με τον ισχυρισμό πως κανένα θεμέλιο των μαθηματικών δε θα μπορούσε ποτέ
να αποδειχθεί ότι υπάρχει και συχνά αποκαλείται</span></span><span style="background-color: inherit; vertical-align: inherit;"><span style="vertical-align: inherit;"> "μεταμοντερνισμός στα μαθηματικά", αν και ο
όρος αυτός θεωρείται από κάποιους υπερφορτωμένος και από άλλους
προσβλητικός.</span></span></div></span></span></div><div><br /></div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"></span></span><div><div><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><p>✔<b><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> </span></span></b><span style="vertical-align: inherit;"><span style="vertical-align: inherit;">Ο</span></span><b><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> μαθηματικός</span></span></b><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> <b>φαντασιοπλισμός </b>ή <b>μυθοπλασία</b>, που έγινε γνωστός όταν ο <i>Hartry Field</i></span></span><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> δημοσίευσε το 1980 το περίφημο</span></span><i><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"> </span></span></i><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><i>Science Without Numbers</i>.
Το βιβλίο υποστηρίζει πως δεν υπάρχει λόγος να πιστεύουμε στην ύπαρξη
μαθηματικών οντοτήτων ή στην κυριολεκτική αλήθεια των μαθηματικών και
συγχρόνως ότι η φυσική θεωρία δεν το απαιτεί αυτό. Η εξήγηση της
χρησιμότητας των μαθηματικών στην περιγραφή του φυσικού κόσμου δεν
απαιτεί τα μαθηματικά να είναι αληθινά, αλλά να είναι συνεπή. Ο <i>Field</i>
προσπάθησε να το εξηγήσει δίνοντας μια πλήρη αξιωματοποίηση της
Νευτώνειας μηχανικής, χωρίς να κάνει καμία αναφορά σε αριθμούς και
συναρτήσεις. Στη συνέχεια, έχοντας ήδη δείξει πως να κάνουμε επιστήμη
χωρίς τη χρήση αριθμών, προχώρησε στην αποκατάσταση των μαθηματικών ως
ένα είδος </span></span>χρήσιμης μυθοπλασίας<span style="vertical-align: inherit;"><span style="vertical-align: inherit;">. </span></span></p></span></span></div></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgwQvZhPva4Bs_IFB234vzCN0eFWfExM3Nz1-7tQIJRNvmWwxD-tzGh9OpS3zT-sYcoDoVQfv12kUiBAqs90iBkkuTGYRFQulwoa2bAvbck7IhsdYau5SQXl2upUa3g6VCzqeFARNhjweLaJR1DdxKvCJg28agxTlIxudYn3MO-WGThVH0Jiq9I7ZVekg/s1000/9780198777922.png" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="750" data-original-width="1000" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgwQvZhPva4Bs_IFB234vzCN0eFWfExM3Nz1-7tQIJRNvmWwxD-tzGh9OpS3zT-sYcoDoVQfv12kUiBAqs90iBkkuTGYRFQulwoa2bAvbck7IhsdYau5SQXl2upUa3g6VCzqeFARNhjweLaJR1DdxKvCJg28agxTlIxudYn3MO-WGThVH0Jiq9I7ZVekg/s320/9780198777922.png" width="320" /></a></div><br /><div dir="ltr">✔ Ιδιαίτερο ενδιαφέρον παρουσιάζει τέλος η σχολή του <b>κοινωνικού κονστρουκτιβισμού</b>,
που αντιμετωπίζει τα μαθηματικά ως ένα κοινωνικό κατασκεύασμα, προϊόν
του εκάστοτε πολιτισμού, που υπόκεινται σε διόρθωση και αλλαγή. Στη
συγκεκριμένη σχολή η κοινωνική φύση των μαθηματικών αναδεικνύεται
ανάλογα με την κάθε ειδικότητα η οποία σχηματίζει τη δική της
επιστημονική κοινότητα. Έχει αρκετά ανθρωπιστικό υπόβαθρο και
υποστηρίζει για παράδειγμα πως μεγάλες ανακαλύψεις μπορούν να γίνουν σε
ένα κλάδο των μαθηματικών που να σχετίζονται με έναν άλλο, ωστόσο η
σχέση να παραμείνει άγνωστη λόγω έλλειψης κοινωνικής επαφής μεταξύ των
μαθηματικών. <br /></div><div><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgrFKPFH4XI39a4VhMfITK1lW4hbtyWxQZrzqQIgFJlJhkRwAeyOi1qLsg0eXZRFCwPKM4qww9bM9V7HWhqJdUIKsEu1AOcmt_KhsWIW3rOsbkRKsaBDl6yF3bpILkMNV1VQXdeQ7uqAGyhYWkL4oaQb6_SJJbIIwiE6DHuZBzU0W_r8ahxN0xcPleCew/s1861/epp-bk0034.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1861" data-original-width="1313" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgrFKPFH4XI39a4VhMfITK1lW4hbtyWxQZrzqQIgFJlJhkRwAeyOi1qLsg0eXZRFCwPKM4qww9bM9V7HWhqJdUIKsEu1AOcmt_KhsWIW3rOsbkRKsaBDl6yF3bpILkMNV1VQXdeQ7uqAGyhYWkL4oaQb6_SJJbIIwiE6DHuZBzU0W_r8ahxN0xcPleCew/s320/epp-bk0034.jpg" width="226" /></a></div><br /><span style="vertical-align: inherit;"><span style="vertical-align: inherit;"><table class="yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62ebox-More_citations_needed yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62eplainlinks yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62emetadata yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62eambox yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62eambox-content yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62eambox-Refimprove yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141yahoo-compose-table-card yiv5261819760ydp1ce4f7d7yiv9438885930yahoo-compose-table-card yiv5261819760yahoo-compose-table-card"><tbody><tr><td class="yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62embox-image"><div>Η
φιλοσοφία των μαθηματικών ανήκει συμπερασματικά σε ένα είδος που
εμπεριέχει τη φιλοσοφία της φυσικής, τη φιλοσοφία της βιολογίας, τη
φιλοσοφία της ψυχολογίας, τη φιλοσοφία της γλώσσας, τη φιλοσοφία της
λογικής, ακόμα και τη φιλοσοφία της φιλοσοφίας.</div><div><br /></div><div>Τα
μαθηματικά αν και έχουν τη φήμη ότι είναι ένας ξεκάθαρος και
αδιαμφισβήτητος επιστημονικός κλάδος, στην πραγματικότητα κάτι τέτοιο
δεν ισχύει. Ιστορικά υπήρχαν και μεγάλες επαναστάσεις στα μαθηματικά,
αλλά και μακροχρόνιες αντιλήψεις που στην πορεία εγκαταλείφθηκαν. Και
αυτό γιατί η βαθιά κατανόηση του κόσμου (με επιστημονικούς όρους)
προϋποθέτει μια εξίσου βαθιά κατανόηση πολλών μαθηματικών. Ο φιλόσοφος
των μαθηματικών νιώθει την ανάγκη να πει κάτι γύρω από τα μαθηματικά
καθαυτά, κάτι για τον άνθρωπο μαθηματικό και κάτι για τον κόσμο όπου
εφαρμόζονται τα μαθηματικά. Μια πράγματι δύσκολη δουλειά!</div><div><br /></div><div dir="ltr">Πηγές: <br /></div><div dir="ltr"><br /></div><div dir="ltr">✒ Stewart Shapiro, "Σκέψεις για τα Μαθηματικά - Η Φιλοσοφία των Μαθηματικών", Κώστας Δρόσος, Εκδόσεις Πανεπιστημίου Πατρών.</div><div dir="ltr"> </div></td><td class="yiv5261819760ydp1ce4f7d7yiv9438885930ydp321c1391yiv2797880141ydpca8bb62embox-text"><br /></td></tr></tbody></table></span></span><div>✒ Wikipedia, Διαδίκτυο.</div></div></div></div></div></span></span></span>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-28103818213225796122022-05-22T18:48:00.007+03:002022-05-22T23:33:12.462+03:00Τεχνολογικοί "δεινόσαυροι" που εξακολουθούν να λειτουργούν σήμερα!<p style="text-align: center;"> <a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEigP_K6YIBbWXCTZA5cCudL3S6_lOFkvKdIwi-R7W5rjvCZvZPNNgIJoLtq94heiBiMsRjY0JMYyYtGbBirvjM7C4zqF51ANfpjkg3ZMEGQbwml0hogPQnbq7HK8yDDwkSuH12uwRSIudngPSeBGLihHxEOvEv-ovpP1wK-zwP-vXThBke9zNozHb8dWw/s735/com.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="468" data-original-width="735" height="204" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEigP_K6YIBbWXCTZA5cCudL3S6_lOFkvKdIwi-R7W5rjvCZvZPNNgIJoLtq94heiBiMsRjY0JMYyYtGbBirvjM7C4zqF51ANfpjkg3ZMEGQbwml0hogPQnbq7HK8yDDwkSuH12uwRSIudngPSeBGLihHxEOvEv-ovpP1wK-zwP-vXThBke9zNozHb8dWw/s320/com.jpg" width="320" /></a><br /></p><p><span data-offset-key="3lm6c-0-0"><span data-text="true">Οι μεγάλες καινοτομίες κάποτε ήταν σπάνιες και παρέμειναν στην καθημερινή μας ζωή για μεγάλο χρονικό διάστημα. Σήμερα οι νέες τεχνολογίες γίνονται απαρχαιωμένες σχεδόν τόσο γρήγορα όσο εμφανίζονται.</span></span></p><div data-block="true" data-editor="96kf6" data-offset-key="97b86-0-0"><div class="_1mf _1mj" data-offset-key="97b86-0-0"><span data-offset-key="97b86-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="14v0f-0-0"><div class="_1mf _1mj" data-offset-key="14v0f-0-0"><span data-offset-key="14v0f-0-0"><span data-text="true">Υπάρχουν όμως κάποιες τεχνολογίες που χάραξαν μια μακροχρόνια πορεία στην ιστορία των ανακαλύψεων και ενώ θα έπρεπε να έχουν εξαφανιστεί, χρησιμοποιούνται ακόμα και σήμερα όσο περίεργο κι αν φαίνεται.<br /></span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="b2b3g-0-0"><div class="_1mf _1mj" data-offset-key="b2b3g-0-0"><span data-offset-key="b2b3g-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="c6ab6-0-0"><div class="_1mf _1mj" data-offset-key="c6ab6-0-0"><span data-offset-key="c6ab6-0-0"><span data-text="true"><b>1) Δισκέτες.</b></span></span></div><div class="_1mf _1mj" data-offset-key="c6ab6-0-0"><span data-offset-key="c6ab6-0-0"><span data-text="true"><b> </b></span></span></div><div class="_1mf _1mj" data-offset-key="ek28n-0-0"><span data-offset-key="ek28n-0-0"><span data-text="true"><b><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhCMztNc0g4GKwkzZTlPJsNpbw3hpWghmqUw2c8osjJ0prJz2IT8FDJrwISyMCDnABvNMAln_DSqLh_eOz02iIpnF_pcesHly9zyls7wnC20tO17fzuChVKQxvLolbAc2I9CTsRvuqOkaFxRq_k6NEwst_2BLK3igldT3elJCAIRrD2VuDyFziCkwHehg/s1200/1200px-Floppy_disk_2009_G1.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="583" data-original-width="1200" height="155" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhCMztNc0g4GKwkzZTlPJsNpbw3hpWghmqUw2c8osjJ0prJz2IT8FDJrwISyMCDnABvNMAln_DSqLh_eOz02iIpnF_pcesHly9zyls7wnC20tO17fzuChVKQxvLolbAc2I9CTsRvuqOkaFxRq_k6NEwst_2BLK3igldT3elJCAIRrD2VuDyFziCkwHehg/w320-h155/1200px-Floppy_disk_2009_G1.jpg" width="320" /></a></div> </b></span></span></div><div class="_1mf _1mj" data-offset-key="ek28n-0-0"><span data-offset-key="ek28n-0-0"><span data-text="true">Η δισκέτα εξακολουθεί να χρησιμοποιείται κυρίως σε συστήματα που δίνουν προτεραιότητα στην αξιοπιστία έναντι της εφευρετικότητας. ΑΤΜ και ορισμένα ιατρικά μηχανήματα τις χρησιμοποιούν ακόμα σε κάποιες χώρες, ενώ στις ΗΠΑ το Υπουργείο Άμυνας τις χρησιμοποιούσε για να ελέγξει το πυρηνικό οπλοστάσιο τους μέχρι το 2020 για λόγους ασφαλείας.</span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="6vssh-0-0"><div class="_1mf _1mj" data-offset-key="6vssh-0-0"><span data-offset-key="6vssh-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="3h182-0-0"><div class="_1mf _1mj" data-offset-key="3h182-0-0"><b><span data-offset-key="3h182-0-0"><span data-text="true">2) Τηλεειδοποιητές.</span></span></b></div><div class="_1mf _1mj" data-offset-key="3h182-0-0"><b><span data-offset-key="3h182-0-0"><span data-text="true"> </span></span></b></div><div class="_1mf _1mj" data-offset-key="3h182-0-0"><b><span data-offset-key="3h182-0-0"><span data-text="true"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgul2GmQUYiH5wTyhMKXwf0sijYxFwfrwmpxNuVkwI3GDwVs8DA9Tvv_Dt-ykI4Q5LAO6uEFkL6cZ_qnCy2hnJcPMhk8hbFutEKF8g8g5ReLFbjsCWK1YS4yVBw0EHQGOZLD2VBeLxB0dADGoYJv9qlG3MZE8PMrtpha3vP9JmiJ7hFeZYMPMokJ0yuuQ/s1628/Dme_motorola.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1148" data-original-width="1628" height="226" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgul2GmQUYiH5wTyhMKXwf0sijYxFwfrwmpxNuVkwI3GDwVs8DA9Tvv_Dt-ykI4Q5LAO6uEFkL6cZ_qnCy2hnJcPMhk8hbFutEKF8g8g5ReLFbjsCWK1YS4yVBw0EHQGOZLD2VBeLxB0dADGoYJv9qlG3MZE8PMrtpha3vP9JmiJ7hFeZYMPMokJ0yuuQ/s320/Dme_motorola.jpg" width="320" /></a></div><br /></span></span></b></div></div><div data-block="true" data-editor="96kf6" data-offset-key="7fp9a-0-0"><div class="_1mf _1mj" data-offset-key="7fp9a-0-0"><span data-offset-key="7fp9a-0-0"><span data-text="true">Μόλις τα κινητά τηλέφωνα εμφανίστηκαν, η ανάγκη για τηλεειδοποίηση εξαφανίστηκε. Παρόλα αυτά μια δημοσκόπηση που έγινε πριν 2 χρόνια σε νοσοκομεία των ΗΠΑ έδειξε πως πάνω από τους μισούς γιατρούς εξακολουθούν να χρησιμοποιούν τα beepers ως μια προσπάθεια διαχωρισμού της επαγγελματικής ζωής από την προσωπική ζωή στο σπίτι.</span></span></div><div class="_1mf _1mj" data-offset-key="7fp9a-0-0"><span data-offset-key="7fp9a-0-0"><span data-text="true"> </span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="5q5q4-0-0"><div class="_1mf _1mj" data-offset-key="5q5q4-0-0"><b><span data-offset-key="5q5q4-0-0"><span data-text="true">3) Διαστημικοί ανιχνευτές.</span></span></b></div><div class="_1mf _1mj" data-offset-key="5q5q4-0-0"><b><span data-offset-key="5q5q4-0-0"><span data-text="true"> </span></span></b></div><div class="_1mf _1mj" data-offset-key="5q5q4-0-0"><b><span data-offset-key="5q5q4-0-0"><span data-text="true"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjjiBdXMva5xmuqD6ficH7f6t_SHSWS0R4c6oW3aG4XW1u3AFix1qPPu_j_MN4Rgsnvt-c4l5Twdxkdd7ZOgAmUWiG1XOceOrZj5uY0coIMhYMdmHZePjiwUM3VlpwC9OXWgmvFKpMIRXFWWqc8IDck3-OqHSGsuxsw2mMUC00Ff55-R93Wi8-H1Y8g3A/s780/voyager1_nasa.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="439" data-original-width="780" height="180" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjjiBdXMva5xmuqD6ficH7f6t_SHSWS0R4c6oW3aG4XW1u3AFix1qPPu_j_MN4Rgsnvt-c4l5Twdxkdd7ZOgAmUWiG1XOceOrZj5uY0coIMhYMdmHZePjiwUM3VlpwC9OXWgmvFKpMIRXFWWqc8IDck3-OqHSGsuxsw2mMUC00Ff55-R93Wi8-H1Y8g3A/s320/voyager1_nasa.jpg" width="320" /></a></div> </span></span></b></div></div><div data-block="true" data-editor="96kf6" data-offset-key="7gfkp-0-0"><div class="_1mf _1mj" data-offset-key="7gfkp-0-0"><span data-offset-key="7gfkp-0-0"><span data-text="true">Η αποστολή ενός αντικειμένου στο διάστημα είναι αναμφίβολα ένα από τα πιο εντυπωσιακά επιτεύγματα που έχει πετύχει η ανθρωπότητα. Τα Voyager I και II, τα πιο απομακρυσμένα ανθρώπινα κατασκευάσματα που έχουν δημιουργηθεί ποτέ, διαθέτουν υπολογιστές με μέγεθος μόλις 68 kilobyte. Kι όμως, 45 χρόνια μετά την εκτόξευσή τους συνεχίζουν και λειτουργούν, στέλνοντας δεδομένα πίσω στη Γη από απόσταση 14,5 δισεκατομμύρια μίλια μακριά (156 φορές την απόσταση της Γης από τον Ήλιο). </span></span></div><div class="_1mf _1mj" data-offset-key="7gfkp-0-0"><span data-offset-key="7gfkp-0-0"><span data-text="true"> </span></span></div><div class="_1mf _1mj" data-offset-key="7gfkp-0-0"><span data-offset-key="7gfkp-0-0"><span data-text="true">Για την ιστορία ο Vanguard 1 συνεχίζει να σπάει το ρεκόρ του παλαιότερου δορυφόρου σε τροχιά, καθώς ξεκίνησε το 1964 και πιθανότατα να συνεχίσει να το κάνει για εκατοντάδες ακόμη χρόνια.</span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="64bnl-0-0"><div class="_1mf _1mj" data-offset-key="64bnl-0-0"><span data-offset-key="64bnl-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="12j6v-0-0"><div class="_1mf _1mj" data-offset-key="12j6v-0-0"><b><span data-offset-key="12j6v-0-0"><span data-text="true">4) Διαδίκτυο μέσω τηλεφώνου.</span></span></b></div><div class="_1mf _1mj" data-offset-key="12j6v-0-0"><b><span data-offset-key="12j6v-0-0"><span data-text="true"> </span></span></b></div><div class="_1mf _1mj" data-offset-key="12j6v-0-0"><b><span data-offset-key="12j6v-0-0"><span data-text="true"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjs4TfBXNm3swzy8O30lgxL5-62om2SRvuD-v5sNMJipMwrbLeeCkjiQ6jmytpZjyTvD4a3ssU-SCZ1zFpbGDIR6YNxKPOnyVEISLElPsczPQcIqlBxyghvhXeb7H-WPT8m8jrOj2Vk_xLI8x1ABO8V1yazmnFJrmPMHHDV07nOjTEK8D0n2wuIo-wYYQ/s500/artworks-000573302048-th9at9-t500x500.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="500" data-original-width="500" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjs4TfBXNm3swzy8O30lgxL5-62om2SRvuD-v5sNMJipMwrbLeeCkjiQ6jmytpZjyTvD4a3ssU-SCZ1zFpbGDIR6YNxKPOnyVEISLElPsczPQcIqlBxyghvhXeb7H-WPT8m8jrOj2Vk_xLI8x1ABO8V1yazmnFJrmPMHHDV07nOjTEK8D0n2wuIo-wYYQ/s320/artworks-000573302048-th9at9-t500x500.jpg" width="320" /></a></div><br /></span></span></b></div></div><div data-block="true" data-editor="96kf6" data-offset-key="bk248-0-0"><div class="_1mf _1mj" data-offset-key="bk248-0-0"><span data-offset-key="bk248-0-0"><span data-text="true">Οι χρήστες διαδικτύου μιας συγκεκριμένης ηλικίας (όχι εγώ) θα θυμάστε την συγκλονιστική αλληλουχία των ηχητικών σημάτων που προανήγγειλαν τη σύνδεση στο διαδίκτυο. Αν πιστεύετε όμως ότι το dial up μπήκε στο μουσείο, τότε κάνετε λάθος αφού η AOL (κάποτε το μεγαλύτερο όνομα στο οικιακό διαδίκτυο) έχει σήμερα περίπου 2 εκατομμύρια πελάτες που προτιμούν την ασφάλεια και την προστασία ταυτότητας που τους παρέχει η σύνδεση στο διαδίκτυο μέσω εισόδου.</span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="eqlnq-0-0"><div class="_1mf _1mj" data-offset-key="eqlnq-0-0"><span data-offset-key="eqlnq-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="9fe28-0-0"><div class="_1mf _1mj" data-offset-key="9fe28-0-0"><b><span data-offset-key="9fe28-0-0"><span data-text="true">5) Καρτοτηλέφωνα.</span></span></b></div><div class="_1mf _1mj" data-offset-key="9fe28-0-0"><b><span data-offset-key="9fe28-0-0"><span data-text="true"> </span></span></b></div><div class="_1mf _1mj" data-offset-key="6iit2-0-0"><b><span data-offset-key="9fe28-0-0"><span data-text="true"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgVDplQPHRZidSJe6dnijpuTB13EvMn8NP2L2a46L1Qa7vBY05vnJZgPKaLVzJz2SAgqDmGhJNx0tUm-0tRMTxGjXebHAwHo_yWDPj4bdf6yoZD9NEowip_KjA-QsyL92PNDbXjVvqjxqp_Dg5-37zwOIV9UCpCNAa-yZx64EYjQbwKlufqt23wyqQC3w/s620/neakriti-news-image.aspx_.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="465" data-original-width="620" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgVDplQPHRZidSJe6dnijpuTB13EvMn8NP2L2a46L1Qa7vBY05vnJZgPKaLVzJz2SAgqDmGhJNx0tUm-0tRMTxGjXebHAwHo_yWDPj4bdf6yoZD9NEowip_KjA-QsyL92PNDbXjVvqjxqp_Dg5-37zwOIV9UCpCNAa-yZx64EYjQbwKlufqt23wyqQC3w/s320/neakriti-news-image.aspx_.jpg" width="320" /></a></div> </span></span></b><span data-offset-key="6iit2-0-0"><span data-text="true"> </span></span></div><div class="_1mf _1mj" data-offset-key="6iit2-0-0"><span data-offset-key="6iit2-0-0"><span data-text="true">Αν και η υπηρεσία κινητής τηλεφωνίας έχει γίνει ο κυρίαρχος τρόπος τηλεφωνικής επικοινωνίας, μόνο στη Νέα Υόρκη έχουν παραμείνει σήμερα περίπου 100.000 καρτοτηλέφωνα, κυρίως σε πάρκα και κατασκηνώσεις, των οποίων η χρήση αυξάνεται σημαντικά μετά από έντονες καιρικές συνθήκες ή φυσικές καταστροφές, όταν τα κυψελωτά δίκτυα ενδέχεται να διακοπούν ή να κατακλυστούν.</span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="femff-0-0"><div class="_1mf _1mj" data-offset-key="femff-0-0"><span data-offset-key="femff-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="2asct-0-0"><div class="_1mf _1mj" data-offset-key="2asct-0-0"><b><span data-offset-key="2asct-0-0"><span data-text="true">6) Ηλεκτρονικές λυχνίες.</span></span></b></div><div class="_1mf _1mj" data-offset-key="2asct-0-0"><b><span data-offset-key="2asct-0-0"><span data-text="true"> </span></span></b></div><div class="_1mf _1mj" data-offset-key="3mj9m-0-0"><b><span data-offset-key="2asct-0-0"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh1YWULueZ_MNg549Ix6JEV83F8H0WxLfidQkkI33gONRkFxffvLEZfXPbUn6dGTEuoPKNsOfF_6GmAB7dOD-YCTK60FGF0WA2B-dgVnltqzPArloyKnEbeVwgT-yweGpC2f3ZCRoqLuuwtS2e-5hYrqROWCZpDVHIajiTwFJdk6Pzymq0Ppt9PE7fVsw/s2468/Elektronenroehren-auswahl.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1200" data-original-width="2468" height="156" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh1YWULueZ_MNg549Ix6JEV83F8H0WxLfidQkkI33gONRkFxffvLEZfXPbUn6dGTEuoPKNsOfF_6GmAB7dOD-YCTK60FGF0WA2B-dgVnltqzPArloyKnEbeVwgT-yweGpC2f3ZCRoqLuuwtS2e-5hYrqROWCZpDVHIajiTwFJdk6Pzymq0Ppt9PE7fVsw/s320/Elektronenroehren-auswahl.jpg" width="320" /></a></div><br /><span data-text="true"></span></span></b><span data-offset-key="3mj9m-0-0"><span data-text="true">Όταν εφευρέθηκε το τρανζίστορ το 1947 ο θάνατος της ηλεκτρονικής λυχνίας φάνηκε πως ήταν αναπόφευκτος. Παρόλα αυτά οι λυχνίες χρησιμοποιούνται αρκετά συχνά μέχρι σήμερα σε συγκεκριμένες τεχνολογίες στις οποίες οι ανάγκες ισχύος υπερβαίνουν αυτές που επιτυγχάνονται εύκολα με τους ημιαγωγούς, όπως στο εσωτερικό ενός μαγνητικού τομογράφου ή ακόμα και στους φούρνους μικροκυμάτων που έχουμε σπίτι μας.</span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="c66fu-0-0"><div class="_1mf _1mj" data-offset-key="c66fu-0-0"><span data-offset-key="c66fu-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="30fot-0-0"><div class="_1mf _1mj" data-offset-key="30fot-0-0"><b><span data-offset-key="30fot-0-0"><span data-text="true">7) Καρμπόν.</span></span></b></div><div class="_1mf _1mj" data-offset-key="30fot-0-0"><b><span data-offset-key="30fot-0-0"><span data-text="true"> </span></span></b></div><div class="_1mf _1mj" data-offset-key="b1em7-0-0"><b><span data-offset-key="30fot-0-0"><span data-text="true"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiOrcgZ2dwUnPHS5_uYftumrvlnTvgeDqvP-375iToyx7hShtwPfQBDrtZRyHjbWzfd-Z6eTzclLW7jYec6pBaVlnxz2P2IsLvpwPJzDWIhhOQfRnW-V9L_y4lXi8K0soTdlowpIbM2m8o_fS8m7DPHSgf4DJZhO0s_AkCPyYpR0wZgzSwBGJo-5p6m8w/s800/30335-0.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="800" data-original-width="800" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiOrcgZ2dwUnPHS5_uYftumrvlnTvgeDqvP-375iToyx7hShtwPfQBDrtZRyHjbWzfd-Z6eTzclLW7jYec6pBaVlnxz2P2IsLvpwPJzDWIhhOQfRnW-V9L_y4lXi8K0soTdlowpIbM2m8o_fS8m7DPHSgf4DJZhO0s_AkCPyYpR0wZgzSwBGJo-5p6m8w/s320/30335-0.jpg" width="320" /></a></div> </span></span></b><span data-offset-key="b1em7-0-0"><span data-text="true"> </span></span></div><div class="_1mf _1mj" data-offset-key="b1em7-0-0"><span data-offset-key="b1em7-0-0"><span data-text="true"> Ανθρακικό αντίγραφο αλλιώς ή carbon paper, αν και οι νεαρότεροι σε ηλικία το έχουν συναντήσει μόνο ως "cc" στα emails. Οι σαρωτές και τα φωτοτυπικά μηχανήματα το έριξαν σε αδράνεια, όμως σήμερα έχει βρει μια δεύτερη ζωή στον κόσμο της τέχνης, αφού η ικανότητά του να μεταφέρει άνθρακα χρησιμοποιείται για να μετακινήσει σχέδια σε λεπτεπίλεπτα υλικά.</span></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="2kqgd-0-0"><div class="_1mf _1mj" data-offset-key="2kqgd-0-0"><span data-offset-key="2kqgd-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="96kf6" data-offset-key="fu1a3-0-0"><div class="_1mf _1mj" data-offset-key="fu1a3-0-0"><span data-offset-key="fu1a3-0-0"><span data-text="true">Προτού λοιπόν θεωρήσετε το περσινό smartphone σας ξεπερασμένο τεχνολογικά, αναλογιστείτε πως το Apollo 11 πήγε στη Σελήνη με 100.000 φορές μικρότερη επεξεργαστική ισχύ από ένα μέσο κινητό τηλέφωνο σήμερα. </span></span></div></div>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-46940176906603671802022-05-09T12:38:00.005+03:002022-05-09T12:49:53.654+03:00Καγκουρό Ελλάς 2022 - Τα θέματα και λύσεις για όλες τις τάξεις (new)<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhALG_HnvrNjnhDLnQOBwsyjOLXWCCcra2rFw0bmu5b8vW6EwgQtFhnjM9mGSqyzhiGh7jlDvt3wRTAR_zJfI__Sr70YhthNhsAYTJTTm_x7d7xT-Io-BmapG79yTkb2s2AaFWVMf5JP1Kt_1c_oBq1dTY5a3UQyG8-uAWtou_IaiUjwHOehFIYV-raPg/s900/i284571214468449673._szw1280h1280_.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="663" data-original-width="900" height="236" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhALG_HnvrNjnhDLnQOBwsyjOLXWCCcra2rFw0bmu5b8vW6EwgQtFhnjM9mGSqyzhiGh7jlDvt3wRTAR_zJfI__Sr70YhthNhsAYTJTTm_x7d7xT-Io-BmapG79yTkb2s2AaFWVMf5JP1Kt_1c_oBq1dTY5a3UQyG8-uAWtou_IaiUjwHOehFIYV-raPg/s320/i284571214468449673._szw1280h1280_.jpg" width="320" /></a></div><br /><p></p><p> Τα Θέματα και οι Απαντήσεις του Πανελλήνιου Διαγωνισμού Καγκουρό Ελλάς 2022.</p><p>Ο Διεθνής Οργανισμός Kangourou San Frontiers με έδρα το Παρίσι, ιδρύθηκε το 1994 και στόχο έχει την προώθηση των Μαθηματικών με διασκεδαστικό τρόπο, χωρίς φυλετικές ή κοινωνικές διακρίσεις.</p><p>Η χώρα μας έγινε μέλος το 2006, ενώ σήμερα μέλη είναι σχεδόν όλες οι Ευρωπαϊκές χώρες, οι ΗΠΑ και χώρες της Ασίας, της Αφρικής και της Λατινικής Αμερικής.</p><p> </p><p>Καγκουρό Ελλάς Β Δημοτικού 2022</p><p>
</p><p></p><p></p><p></p><p><iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1af5jj0XfDk_Oor0laU97sQLtTgBbYaHm/preview" width="640"></iframe> </p><p>Καγκουρό Ελλάς Γ - Δ Δημοτικού 2022</p><p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1gRDmA4coBdE6zvxu8Af_uRQkopD4WmDv/preview" width="640"></iframe> </p><p>Καγκουρό Ελλάς Ε - Στ Δημοτικού 2022</p><p>
</p><p></p><p></p><p><iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1o2xJn9ANKgcuWJ2DOl0oaueXkediB88b/preview" width="640"></iframe> </p><p> Καγκουρό Ελλάς Α - Β Γυμνασίου 2022</p><p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1dLnSPkzf1GBpy96LjjknIcSACK7PZoMp/preview" width="640"></iframe> </p><p>Καγκουρό Ελλάς Γ Γυμνασίου - Α Λυκείου 2022</p><p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1UN8NPeDgGIIDS_UJ4EveDWUCe9u7ABFH/preview" width="640"></iframe> </p><p> Καγκουρό Ελλάς Β - Γ Λυκείου 2022</p><p>
</p><p><iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1mR8SHyXuRRJZzntV2UB2t7qyUrC0ZilC/preview" width="640"></iframe> </p><p>Απαντήσεις Δημοτικό 2022</p><p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1thJDk1ByiSwhFCKxSbRoLFVzrH3JQslr/preview" width="640"></iframe> </p><p>Απαντήσεις Γυμνάσιο - Λύκειο 2022</p><p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1HuyroBN9x-69tkTk54hIE6mwuA7xMyZx/preview" width="640"></iframe> </p><p>Το 2022 ο διαγωνισμός δεν πραγματοποιήθηκε στην Ελλάδα, λόγω κορωνοϊού, ούτε διαδικτυακά, όπως τα δύο προηγούμενα χρόνια, καθώς θεωρείται ότι ο σωστότερος τρόπος διεξαγωγής του διαγωνισμού είναι στο σχολείο, με φυσική παρουσία, σε ένα πανηγύρι μαθηματικών.</p><p>Παρόλα αυτά η σημαντική δουλειά υπάρχει και προσφέρεται σε όλους εκπαιδευτικούς και μαθητές. </p><p>Ελπίζουμε την επόμενη χρονιά να μπορέσουμε να διοργανώσουμε στα ανοιχτά σχολεία μας τον διαγωνισμό, υπό κανονικές συνθήκες και οι μαθητές μας να επωφεληθούν παιδαγωγικά από αυτή τη διαδικασία.</p><p> <a href="http://www.kangaroo.gr/" target="_blank">http://www.kangaroo.gr/</a></p><p><b>Σημείωση:</b> Το Ευρωπαϊκό Πρότυπο / E.P.S. σε Ελληνικό και Πειραιά θα είναι πάντα ένα φιλόξενο εξεταστικό κέντρο για εσωτερικούς και εξωτερικούς μαθητές που θα θελήσουν να ζήσουν την όμορφη αυτή εμπειρία.</p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBTWD4mkkc4OYBh9DC-re3vh6pz7zOwFQ2dbLG_cr2tJxnY2gAEq5wSmHV-DqzSDfhn8E4_Uex3K5k8Jbv_tNq5qlGIi2YDNh1NFR8JZPay7o3fa0cvWcdUaMcbJGf6MRWp1DY1akvcUfswJ9MlkmSrxm469FI-uHIIT1JcZ0kdMIkpnRrjW51HSaaIA/s120/Logo_ep-schools-.png" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" data-original-height="120" data-original-width="120" height="120" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhBTWD4mkkc4OYBh9DC-re3vh6pz7zOwFQ2dbLG_cr2tJxnY2gAEq5wSmHV-DqzSDfhn8E4_Uex3K5k8Jbv_tNq5qlGIi2YDNh1NFR8JZPay7o3fa0cvWcdUaMcbJGf6MRWp1DY1akvcUfswJ9MlkmSrxm469FI-uHIIT1JcZ0kdMIkpnRrjW51HSaaIA/s1600/Logo_ep-schools-.png" width="120" /></a></div><br /><p><br /></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-55361009571445193662022-04-16T19:47:00.003+03:002022-04-16T19:47:55.324+03:00Μαθηματικά και φυσική στις πιστωτικές κάρτες<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjaehtD1T8MWRMg-i0LKNDO1CvU-tjE4cKcFEA7oODHlqavIvdzx3sKGKc0-Noh0E_iOd9_5YTWmWKsmGYVa1Rfu0k9kPJtnInFiD_1M3xC0CAFMtn3_3h2i1sN_ufDWxLgYe2x8eX-gVffnWmrtCC1yba3k1SYsLhvcAJ5G9VsdHR8EjeZLqqzyAnyuA/s400/ti-simainoun-oi-arithmoi-stin-pistwtiki-karta.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="257" data-original-width="400" height="206" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjaehtD1T8MWRMg-i0LKNDO1CvU-tjE4cKcFEA7oODHlqavIvdzx3sKGKc0-Noh0E_iOd9_5YTWmWKsmGYVa1Rfu0k9kPJtnInFiD_1M3xC0CAFMtn3_3h2i1sN_ufDWxLgYe2x8eX-gVffnWmrtCC1yba3k1SYsLhvcAJ5G9VsdHR8EjeZLqqzyAnyuA/s320/ti-simainoun-oi-arithmoi-stin-pistwtiki-karta.jpg" width="320" /></a> <br /></div><p></p><p>Σαν σήμερα 16 Απριλίου 1951 εκδίδεται η πρώτη πιστωτική κάρτα.</p><div data-setdir="false" dir="ltr"><span>Μια μικρή πλαστική κάρτα που περιέχει ένα μέσο αναγνώρισης, όπως μια
υπογραφή ή μια εικόνα και εξουσιοδοτεί το πρόσωπο που αναφέρεται σε
αυτήν να χρεώνει αγαθά ή υπηρεσίες σε έναν λογαριασμό για τον οποίο ο
κάτοχος της κάρτας χρεώνεται περιοδικά.</span></div><div data-setdir="false" dir="ltr"> </div><div data-setdir="false" dir="ltr">Ας μην μείνουμε όμως σε άλλες χρηματοπιστωτικές λεπτομέρειες και ας δούμε λίγα μαθηματικά και φυσική πίσω από αυτές.</div><div data-setdir="false" dir="ltr"><br /></div><div data-setdir="false" dir="ltr">Να ξεκινήσουμε με το τι σημαίνουν οι αριθμοί πάνω σε μια πιστωτική κάρτα και ποιος είναι ο αλγόριθμος που ακολουθούν.</div><div data-setdir="false" dir="ltr"> </div><div data-setdir="false" dir="ltr">Το
πρώτο ψηφίο είναι η κύρια ταυτότητα της βιομηχανίας και προσδιορίζει
την κατηγορία της εταιρείας που εξέδωσε
την κάρτα. Για παράδειγμα αν το πρώτο ψηφίο είναι 1 ή 2 η κάρτα εκδόθηκε
από αεροπορική εταιρεία, το 3 σημαίνει ταξίδια και διασκέδαση, τα ψηφία
4 και 5 είναι τράπεζες και πιστωτικά ιδρύματα κ.λ.π.<br /><div data-setdir="false" dir="ltr">
<p>Τα πρώτα έξι ψηφία φανερώνουν τον εκδότη της πιστωτικής κάρτας και προσδιορίζουν το ίδρυμα που
εξέδωσε την κάρτα. Για παράδειγμα η Visa έχει 4xxxx, η Mastercard έχει 51xxxx έως 55xxxx κ.λ.π.<br /></p>
<p><strong>Τα ψηφία από το 7ο έως το 15ο</strong> είναι ο προσωπικός λογαριασμός του κατόχου της κάρτας κάτι που δημιουργεί συνολικά ένα δισεκατομμύριο πιθανούς συνδυασμούς.</p>
<p><strong>Το 16ο ψηφίο</strong>, δηλαδή το τελευταίο είναι το ψηφίο
επαλήθευσης και χρησιμοποιείται για να επαληθευτεί η γνησιότητα της
κάρτας με τον αλγόριθμο Luhn.</p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgmGX-hJleDzxlBYJbgdohNZ6P8Y-5X5VzDK9daWemX886lw00YfE0JDPVP-2csk6JMMRN1FkSlXe9KWNiecQgKMmeDfpraBaxKpAfJgDHsFGmAJRaoc7g3gmbE3N0vpNfkEQD38HdBy64dQv8xyuDw0e5IQgDavDmb89n47GWbcCMNRoO9v79HAU_epw/s533/ti-simainoun-oi-arithmoi-stin-pistwtiki-karta-02.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="465" data-original-width="533" height="349" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgmGX-hJleDzxlBYJbgdohNZ6P8Y-5X5VzDK9daWemX886lw00YfE0JDPVP-2csk6JMMRN1FkSlXe9KWNiecQgKMmeDfpraBaxKpAfJgDHsFGmAJRaoc7g3gmbE3N0vpNfkEQD38HdBy64dQv8xyuDw0e5IQgDavDmb89n47GWbcCMNRoO9v79HAU_epw/w400-h349/ti-simainoun-oi-arithmoi-stin-pistwtiki-karta-02.jpg" width="400" /></a></div><p>Το σχήμα τους είναι ορθογώνιο παραλληλόγραμμο. Όχι όμως ένα οποιοδήποτε ορθογώνιο, αλλά το <b>χρυσό ορθογώνιο παραλληλόγραμμο</b>.
Σε ένα χρυσό ορθογώνιο ο λόγος των διαστάσεων δύο πλευρών προς τη
μεγάλη πλευρά ισούται με το λόγο της μεγάλης προς τη μικρή πλευρά.</p><div>Τα
χρυσά ορθογώνια παραλληλόγραμμα είναι ευχάριστα στην όραση, ίσως επειδή
προσεγγίζουν το σχήμα του οπτικού μας πεδίου. Για τον λόγο αυτό
χρησιμοποιούνται συχνά στην αρχιτεκτονική και στη ζωγραφική. </div></div><div data-setdir="false" dir="ltr"><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgJOZyWKUDrkT5nWYMt-XMM4nK8oGUcyyndVFTN6Z023MCVYxH2TReVWpc4l5-X1fyMzQfqIP1d4qbaaZ__lxGNW4duebaRDg9w2cdm_Rh8ly3MlIxthan4XYq4tO3eWA7BV0XfsCuhvSL890GM1H5Yknf6gbgJ5MEhCJPOjCwzJLzhzCme9OW4Bikx1A/s608/%CE%BA%CE%B1%CF%84%CE%AC%CE%BB%CE%BF%CE%B3%CE%BF%CF%82.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="416" data-original-width="608" height="274" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgJOZyWKUDrkT5nWYMt-XMM4nK8oGUcyyndVFTN6Z023MCVYxH2TReVWpc4l5-X1fyMzQfqIP1d4qbaaZ__lxGNW4duebaRDg9w2cdm_Rh8ly3MlIxthan4XYq4tO3eWA7BV0XfsCuhvSL890GM1H5Yknf6gbgJ5MEhCJPOjCwzJLzhzCme9OW4Bikx1A/w400-h274/%CE%BA%CE%B1%CF%84%CE%AC%CE%BB%CE%BF%CE%B3%CE%BF%CF%82.png" width="400" /></a></div> </div><div data-setdir="false" dir="ltr">Η θεία αναλογία επιτρέπει, όταν τοποθετήσουμε δυο
χρυσά ορθογώνια όπως δείχνει το παραπάνω σχήμα, η προέκταση της
διαγωνίου του οριζοντίου ορθογωνίου διέρχεται από την κορυφή του κάθετου
ορθογωνίου. </div><div data-setdir="false" dir="ltr"> </div><div data-setdir="false" dir="ltr">Η πλειοψηφία των πιστωτικών καρτών είναι κατασκευασμένες έτσι ώστε να αποτελούν χρυσά ορθογώνια.<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhT3ajCsMHuB0cP7swll3PzXarN-EdEhzx7bYUNUqN5ISrYqowFcXD1BjCRqE7_GPMJA1uhRXco_OH29BH2Km8Z_USMWQwGDtanxzS_TavDObTNQ4yMB-Bl_jrGlkwcoJ5b7deby_fUTWEA9gml5cN9CDytVV8zc18TSSDaajFW6r7MqEXrUk7gZ1vkRw/s627/%CE%BA%CE%B1%CF%84%CE%AC%CE%BB%CE%BF%CE%B3%CE%BF%CF%82.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="441" data-original-width="627" height="281" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhT3ajCsMHuB0cP7swll3PzXarN-EdEhzx7bYUNUqN5ISrYqowFcXD1BjCRqE7_GPMJA1uhRXco_OH29BH2Km8Z_USMWQwGDtanxzS_TavDObTNQ4yMB-Bl_jrGlkwcoJ5b7deby_fUTWEA9gml5cN9CDytVV8zc18TSSDaajFW6r7MqEXrUk7gZ1vkRw/w400-h281/%CE%BA%CE%B1%CF%84%CE%AC%CE%BB%CE%BF%CE%B3%CE%BF%CF%82.png" width="400" /></a></div> </div><div data-setdir="false" dir="ltr">Τέλος πληροφορίες σχετικά με τον τραπεζικό λογαριασμό είναι
αποθηκευμένες στην πιστωτική κάρτα και σε μια <b>μαγνητική ταινία</b> η οποία βρίσκεται κατά μήκος της. <br /><p></p><div data-setdir="false" dir="ltr">Η ταινία περιλαμβάνει μια σειρά μαγνητικών
περιοχών, εντός των οποίων οι βόρειοι πόλοι των μικροσκοπικών μαγνητών
του μαγνητικού υλικού είναι προσανατολισμένοι προς μια κατεύθυνση ή προς
την αντίθετή της.</div><div data-setdir="false" dir="ltr"> </div><div data-setdir="false" dir="ltr"><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhwaEK_CXt68pDQ__e3-280Ts2FZDNcmy9B9ZJ6fdf-E--NCqFbt_YzOzm8BwUU1MWWSO1oFPi9qAGOggp7iwCIfQJ3EPSnulRjb7qQSEHLgweFu7hupdNiXu82NSYU7st4cmCjvzQPs5dSL4yvhNlWimhDdG7nm5xy1Sqfua1Wn1UcGTy6hb2AQAwMDQ/s489/card.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="372" data-original-width="489" height="243" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhwaEK_CXt68pDQ__e3-280Ts2FZDNcmy9B9ZJ6fdf-E--NCqFbt_YzOzm8BwUU1MWWSO1oFPi9qAGOggp7iwCIfQJ3EPSnulRjb7qQSEHLgweFu7hupdNiXu82NSYU7st4cmCjvzQPs5dSL4yvhNlWimhDdG7nm5xy1Sqfua1Wn1UcGTy6hb2AQAwMDQ/s320/card.png" width="320" /></a></div> </div><div data-setdir="false" dir="ltr">Οι ατομικοί αυτοί μαγνήτες είναι ιδανικοί για την
εγγραφή πληροφοριών<span> και η ανάγνωση των πληροφοριών γίνεται με τη βοήθεια του νόμου του <b>Faraday</b>,
σύμφωνα με τον οποίο μεταβαλλόμενα μαγνητικά δημιουργούν ηλεκτρικά
ρεύματα. </span></div><div data-setdir="false" dir="ltr"><span> </span></div><div data-setdir="false" dir="ltr"><span><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0ah_7-fhpMzl_FqhCQSjCMjpnYHxAOqpnk5TpX8ulFb-lCA6zHSmao2wgtBS2MM9x0LceG-mrjiM3C95TzmD60LajcsE2XvB2AKD6NveOB_yJbnT53sdBAgOdLl7jL8gx5rtgkdDnUcP1jr3XWnAh61RpYrWv9ezglB_rCE8Jd0NorrPmqVu2IrhBKA/s320/faradyanim.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="292" data-original-width="320" height="292" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0ah_7-fhpMzl_FqhCQSjCMjpnYHxAOqpnk5TpX8ulFb-lCA6zHSmao2wgtBS2MM9x0LceG-mrjiM3C95TzmD60LajcsE2XvB2AKD6NveOB_yJbnT53sdBAgOdLl7jL8gx5rtgkdDnUcP1jr3XWnAh61RpYrWv9ezglB_rCE8Jd0NorrPmqVu2IrhBKA/s1600/faradyanim.gif" width="320" /></a></div></span></div><div data-setdir="false" dir="ltr"><span><br /></span>Για την ιστορία η <strong>Franklin National Bank</strong> ήταν η πρώτη Τράπεζα που εξέδωσε τραπεζική πιστωτική κάρτα
ακολουθώντας την καινοτόμο και ριζοσπαστική σκέψη του Άρθουρ Ροτ
(γνωστός ως κύριος Λονγκ Άιλαντ) που από ταμίας εξελίχθηκε σε έναν από
τους ισχυρότερους τραπεζίτες του κόσμου!</div><div data-setdir="false" dir="ltr"> </div><div data-setdir="false" dir="ltr">Πηγές: kiosterakis.gr , mathhmagic.blogspot.com, physicsgg.me <br /></div></div></div>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-48740798161624805942022-04-03T20:33:00.001+03:002022-04-03T20:33:40.351+03:00Είστε γραμμικοί ή μη γραμμικοί στοχαστές;<p> <img alt="Το άγαλμα του Στοχαστή Διανυσματικό σχέδιο Εκδοτική Στοκ Εικόνα - εικονογραφία από arroyos, ancientness: 157465754" class="n3VNCb" data-noaft="1" src="https://thumbs.dreamstime.com/b/%CF%84%CE%BF-%CE%AC%CE%B3%CE%B1%CE%BB%CE%BC%CE%B1-%CF%84%CE%BF%CF%85-%CF%83%CF%84%CE%BF%CF%87%CE%B1%CF%83%CF%84%CE%AE-%CE%B4%CE%B9%CE%B1%CE%BD%CF%85%CF%83%CE%BC%CE%B1%CF%84%CE%B9%CE%BA%CF%8C-%CF%83%CF%87%CE%AD%CE%B4%CE%B9%CE%BF-157465754.jpg" style="height: 445px; margin: 0px; width: 385.667px;" /></p><p>Όλοι μας λίγο ή περισσότερο έχουμε προσπαθήσει να λύσουμε απλά αριθμητικά παζλ, επιπέδου Β ή Γ Δημοτικού, όπως το παρακάτω:</p><p>1⇾5</p><p>2⇾10</p><p>3⇾15</p><p>10⇾?</p><p>Πολύ εύκολο το συγκεκριμένο, καθώς ακόμη και αν δεν έχουμε ασχοληθεί αρκετά με αυτά, καταλαβαίνουμε ότι το ο αριθμός που βγαίνει ως έξοδος είναι το 5πλάσιο του αριθμού στην είσοδο, δηλαδή ακολουθούν τη γραμμική σχέση y=5x. Επομένως αν x=10, τότε y=5×10=50. Άρα 10⇾50</p><p>Ας δούμε και το επόμενο:</p><p>1⇾4</p><p>2⇾6</p><p>3⇾8</p><p>10⇾?</p><p>Λίγο πιο δύσκολο από το προηγούμενο, αλλά και πάλι μετά από λίγη παρατήρηση αντιλαμβανόμαστε ότι ο αριθμός που βγαίνει στην έξοδο είναι ο διπλάσιος του αριθμού της εισόδου αυξημένος κατά 2.</p><p>Δηλαδή ακολουθούν τη γραμμική σχέση y=2x+2, επομένως αν x=10, τότε y=2×10+2=22. Άρα 10⇾22.</p><p>Τι συμβαίνει όμως με το παρακάτω παζλ του ίδιου επιπέδου μαθηματικών γνώσεων;</p><p>1⇾2</p><p>2⇾6</p><p>3⇾12</p><p>10⇾?</p><p></p><p> Το σίγουρο είναι ότι και εδώ θα προσπαθήσουμε να αναζητήσουμε ένα μοτίβο, δημιουργώντας διαισθητικά έναν οπτικό χάρτη εισόδου - εξόδου. </p><p>Για ποιο λόγο όμως τα δύο πρώτα παζλ ήταν εύκολα, ενώ αυτό είναι πιο δύσκολο;</p><p>Γιατί απλά οι περισσότεροι άνθρωποι είναι <b>γραμμικοί στοχαστές</b>.</p><p><b>Γραμμική σκέψη</b> σημαίνει ότι βλέπουμε κάτι από μια άποψη, κινούμαστε αρχικά σε μια ευθεία γραμμή σκέψης, δηλαδή παίρνουμε πληροφορίες από μια κατάσταση και την εφαρμόζουμε σε παρόμοιες περιπτώσεις. </p><p>Οι γραμμικοί στοχαστές θεωρείται ότι είναι λογικοί και τακτικοί χαρακτήρες και διακρίνονται συχνά σε μαθήματα όπως τα μαθηματικά και οι θετικές επιστήμες.</p><p><b>Μη γραμμική σκέψη </b>σημαίνει ότι κάτι δεν πάει σε ευθεία γραμμή και ένα άτομο, που είναι μη γραμμικός στοχαστής, πηδάει εύκολα από την μια ιδέα στην άλλη, ενώ αποδίδει καλύτερα στις τέχνες και έχει πιο αφηρημένες δεξιότητες.</p><p>Το μεγαλύτερο πλεονέκτημα για τους γραμμικούς στοχαστές είναι η ικανότητα να σκέφτονται λογικά και διαδοχικά, ενώ ως μειονέκτημα θεωρείται η δυσκολία στις τέχνες και τις γλώσσες και η έλλειψη αφηρημένης σκέψης που μπορεί να τους στοιχίσει νέους και ίσως πιο συναρπαστικούς τρόπους για να αντιμετωπίσουν ένα πρόβλημα.</p><p>Σημαντικό μειονέκτημα της μη γραμμικής σκέψης είναι μια δυσκολία στις επιστήμες και στα μαθηματικά, αν και φυσικά τίποτα δεν είναι απόλυτο όταν μπαίνουμε στη διαδικασία κατηγοριοποίησης των τρόπων σκέψης. Ο Einstein για παράδειγμα, αν και είχε θεωρηθεί μη γραμμικά στοχαστής, διέπρεψε στις επιστήμες. </p><p>Τέλος οι μη γραμμικά στοχαστές αντιμετωπίζουν συχνά ελλειμματική προσοχή, αλλά συνήθως παράγουν θετικά αποτελέσματα, παρότι τα μέσα που χρησιμοποιούν δεν είναι πάντα τα παραδοσιακά.</p><p> </p><p><b>Απάντηση 3ου παζλ</b></p><p>y=x×x+x, άρα y=10<b>×</b>10+10=110. Άρα 10⇾110.</p><p> </p><p>1. Λύση για μαθηματικούς: y=ax²+bx+g, βάζω τιμές στο x και λύνω 3x3 σύστημα.</p><p>2. Δοκιμάστε και αυτό:</p><p>1⇾5</p><p>2⇾30</p><p>3⇾55</p><p>10⇾?</p><p> <br /></p><p> </p><p><br /></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-11577915846060663122022-03-13T19:28:00.001+02:002022-03-13T19:28:36.864+02:00Ανθρώπινη Νοημοσύνη: φτάσαμε στο όριο της γνώσης;<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEjk7MCQgevzr2SUmRT3CkAldwueHJXUrxb7xgpA74FXTltmjiyYfZRLVXoTK8BKCwvWugsFHacHWKDn7q3dvT4-zWgeTNdKjIoy2FSN2zDr1qQg2Yq5TlvYpr1dxUr4t3oAFnEaYQh2Ip7D3TcmsTBGw2Plm8dNUDz0P7iT0gFUDzKOv3EYG9u6LkP7_A=s480" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="480" data-original-width="480" height="320" src="https://blogger.googleusercontent.com/img/a/AVvXsEjk7MCQgevzr2SUmRT3CkAldwueHJXUrxb7xgpA74FXTltmjiyYfZRLVXoTK8BKCwvWugsFHacHWKDn7q3dvT4-zWgeTNdKjIoy2FSN2zDr1qQg2Yq5TlvYpr1dxUr4t3oAFnEaYQh2Ip7D3TcmsTBGw2Plm8dNUDz0P7iT0gFUDzKOv3EYG9u6LkP7_A=s320" width="320" /></a></div> <p></p><p>Αν και η επιστήμη τα τελευταία χρόνια έχει κάνει τεράστια
άλματα προόδου, η κατανόησή μας για τον κόσμο απέχει πολύ για να
ολοκληρωθεί. Οι επιστήμονες, όχι μόνο δεν έχουν καταφέρει να βρουν το
Άγιο Δισκοπότηρο της φυσικής, την ενοποίηση δηλαδή του πολύ μεγάλου
(γενική θεωρία της σχετικότητας) με το πολύ μικρό (κβαντομηχανική), αλλά
ακόμα και σήμερα δεν γνωρίζουν από τι αποτελείται η συντριπτική
πλειοψηφία του σύμπαντος.</p><div dir="ltr">Θα μπορούσε κάποτε η επιστήμη να δώσει<b> όλες </b>τις
απαντήσεις που υπάρχουν; Ή μήπως ο εγκέφαλός μας έχει σχεδιαστεί μόνο
για να λύνει προβλήματα που επηρεάζουν την επιβίωση και την αναπαραγωγή
του ανθρώπινου είδους και όχι για να ξετυλίγει το μυστήριο του
σύμπαντος;</div><div dir="ltr"><br /></div><div dir="ltr">Το ερώτημα αυτό
έχει οδηγήσει πολλούς φιλοσόφους σήμερα να ασπαστούν απαισιόδοξες
θεωρίες για την ανθρώπινη γνώση, υποστηρίζοντας ότι η επιστήμη μια μέρα
θα φτάσει σε ένα όριο και ίσως ήδη να το έχει κάνει ή να είναι πολύ
κοντά σε αυτό.</div><div dir="ltr"><br /></div><div dir="ltr">Στο σπουδαίο βιβλίο <i>The Modularity of Mind</i> που εκδόθηκε το 1983, ο συγγραφέας και φιλόσοφος της γνωστικής επιστήμης <i>Jerry Alan Fodor</i> γράφει: <b>"είναι σίγουρο ότι υπάρχουν σκέψεις που δεν είμαστε σε θέση να σκεφτούμε".</b></div><div dir="ltr"><br /></div><div dir="ltr">Το ίδιο και ο φιλόσοφος <i>Colin McGinn</i> στα βιβλία και τα άρθρα του υποστηρίζει ότι ο ανθρώπινος νους υποφέρει από ένα <b>"γνωστικό κλείσιμο"</b>
σε σχέση με αρκετά προβλήματα. Όπως ακριβώς οι γάτες και οι σκύλοι δεν
θα καταλάβουν ποτέ τους πρώτους αριθμούς, έτσι και πολλές πραγματικές
απαντήσεις σε μερικά από τα θαύματα του κόσμου είναι απλώς απρόσιτες
στον ανθρώπινο εγκέφαλο.</div><div dir="ltr"><br /></div><div dir="ltr">Σε
μια σύγχρονη σειρά επιστημονικής φαντασίας ένας εξωγήινος πολιτισμός
κατασκευάζει έναν τεράστιο υπερυπολογιστή για να υπολογίσει την απάντηση
στο απόλυτο ερώτημα της ζωής, του σύμπαντος και των πάντων. Όταν ο
υπολογιστής ανακοινώνει τελικά ότι η απάντηση είναι <b>"42"</b> κανείς
δεν έχει ιδέα τι μπορεί να σημαίνει αυτό και συνεχίζουν να κατασκευάζουν
έναν ακόμη μεγαλύτερο υπερυπολογιστή για να το καταλάβουν.</div><div dir="ltr"><br /></div><div dir="ltr">Αυτό
ίσως σημαίνει ότι κάποτε στο μέλλον ο άνθρωπος καταφέρει να φτάσει σε
μια αληθινή επιστημονική θεωρία, αλλά θα είναι κάτι σαν το "42", κανείς
δεν θα μπορεί να προσδιορίσει τις ιδιότητές της, όπως ακριβώς είχε γίνει
και με την κβαντική μηχανική. Ο μεγάλος νομπελίστας θεωρητικός φυσικός <i>Richard Feynman</i> είχε κάποια στιγμή παραδεχτεί:<i> "μπορώ να πω με ασφάλεια ότι κανείς δεν καταλαβαίνει την κβαντική μηχανική".</i></div><div dir="ltr"><br /></div><div dir="ltr">Από
την άλλη όμως πλευρά υπάρχουν και οι αισιόδοξες προσεγγίσεις, οι οποίες
υπενθυμίζουν πως όταν προωθήθηκαν για πρώτη φορά απόψεις, όπως ότι η γη
κινείται, ότι υπάρχουν μικροσκοπικοί οργανισμοί που μπορούν να
σκοτώσουν τον άνθρωπο ή ότι τα στερεά αντικείμενα είναι κυρίως κενός
χώρος, ήταν τελείως αντίθετες με τη διαίσθηση και την κοινή λογική, αλλά
αποδείχτηκαν στο πέρασμα των χρόνων.</div><div dir="ltr"><br /></div><div dir="ltr">Μπορεί
λοιπόν ο ανθρώπινος εγκέφαλος να απαντήσει από μόνος του σε όλες τις
πιθανές ερωτήσεις και να κατανοήσει όλα τα ζητήματα; Δεν πρέπει να
ξεχνάμε ότι ο <b>Homo Sapiens</b> είναι ένα είδος που μπορεί να
κατασκευάζει κατάλληλα εργαλεία για να επιβιώσει, αλλά και γνωστικά
εργαλεία για να πάρει απαντήσεις.</div><div dir="ltr"><br /></div><div dir="ltr">Χωρίς
κάποια βοήθεια τα αισθητήρια όργανά μας δεν μπορούν να αντιληφθούν το
υπεριώδες φως, τις ακτίνες Χ και τα βαρυτικά κύματα. Αλλά με τεχνολογικό
εξοπλισμό, όπως μικροσκόπια, μετρητές Geiger κ.α. μπορούμε να
ξεπεράσουμε τους αντιληπτικούς μας περιορισμούς. Είμαστε τελικά
"κλειστοί" στο υπεριώδες φως; Κατά μια έννοια ναι, αλλά στην ουσία όχι.</div><div dir="ltr"><br /></div><div dir="ltr">Σύμφωνα με τον φιλόσοφο και καθηγητή γνωσιακής φιλοσοφίας <i>Andy Clark</i>,
το μυαλό μας επεκτείνεται πολύ πέρα από το δέρμα και το κρανίο μας με
τη βοήθεια των ηλεκτρονικών υπολογιστών, ακόμα και με το χαρτί και το
μολύβι, αυξάνοντας εκθετικά την χωρητικότητα μνήμης του γυμνού εγκεφάλου
μας.</div><div dir="ltr"><br /></div><div dir="ltr">Τα <b>μαθηματικά</b>
αποτελούν ακόμα μια περίπτωση επέκτασης του ανθρώπινου νου και μας
δίνουν τη δυνατότητα να παραστήσουμε έννοιες που δε θα καταφέρναμε ποτέ
με γυμνό μυαλό. Τα μαθηματικά μοντέλα, τα οποία αποτελούν μια νοητική
αναπαράσταση όλων των περίπλοκων και αλληλένδετων διαδικασιών που
συνθέτουν το κλιματικό μας σύστημα ή οτιδήποτε άλλο, είναι ένα
παράδειγμα.<br /></div><div dir="ltr"><br /></div><div dir="ltr">Αν και <b>βιολογικά</b>
δεν διαφέρουμε από αυτό που ήμασταν 40.000 χρόνια πριν, τώρα γνωρίζουμε
για βακτήρια και ιούς, για DNA και μαύρες τρύπες, για την μη Ευκλείδεια
Γεωμετρία και την καμπυλότητα του χωροχρόνου, ως ένα συμπέρασμα
απέναντι στην απαισιοδοξία για την ανθρώπινη γνώση.</div><div dir="ltr"><br /></div><div dir="ltr">Επιπλέον, αυτό που μας κάνει μοναδικούς είναι ότι είμαστε ικανοί για <b>πολιτισμό</b>,
για συσσωρευτική πολιτιστική γνώση, αφού ένας πληθυσμός ανθρώπινων
εγκεφάλων είναι πολύ πιο έξυπνος από κάθε μεμονωμένο εγκέφαλο σε
απομόνωση.</div><div dir="ltr"><br /></div><div dir="ltr">Μπορεί σήμερα,
περίοδος που η ανθρωπότητα δοκιμάζεται με πολέμους, το τελευταίο να
αποτελεί και το κλειδί της επιτυχίας της ανθρώπινης νοημοσύνης.</div><div dir="ltr"><br /></div><div dir="ltr">Ο <i>Einstein </i>έλεγε χαρακτηριστικά:<i> "Δεν ξέρω με τι όπλα θα γίνει ο τρίτος παγκόσμιος πόλεμος, όμως ο τέταρτος θα γίνει σίγουρα με πέτρες και ξύλα."</i> <br /></div><div dir="ltr"><br /></div><i>(Από σκέψεις και άρθρα του φιλόσοφου σκεπτικιστή Maarten Boudry)</i>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-45124590928675610262022-02-13T13:24:00.002+02:002022-02-13T13:24:57.021+02:00Αν ο Cauchy αναστηθεί, μπορεί σήμερα να διδάξει;<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEhmuvkeDXEE-tY1SMk1IdwoZ-HapGFvX9nYoaz0Ue1t6KqZRqDe1xAY2D49HObeOq5g3YkZYA8tLvMDQYkJRHmW3diYcRbyUA1i2YzoQIdoXXbxBvzSWDMI-Mtn-o0xf-O03_Zog8e1fBM2y6dnLfwcO-85CLPYOkFBmz_GZlAjkFuLD_NYKzo8Lqu4lg=s3070" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="3070" data-original-width="2161" height="320" src="https://blogger.googleusercontent.com/img/a/AVvXsEhmuvkeDXEE-tY1SMk1IdwoZ-HapGFvX9nYoaz0Ue1t6KqZRqDe1xAY2D49HObeOq5g3YkZYA8tLvMDQYkJRHmW3diYcRbyUA1i2YzoQIdoXXbxBvzSWDMI-Mtn-o0xf-O03_Zog8e1fBM2y6dnLfwcO-85CLPYOkFBmz_GZlAjkFuLD_NYKzo8Lqu4lg=s320" width="225" /></a></div> <span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41"> </span><p></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">Διάβαζα πρόσφατα κάποια άρθρα που αναφέρονταν στο UCLA και στο μεγάλο πρόβλημα που αντιμετώπισαν με το μάθημα των μαθηματικών στο πρώτο έτος των τμημάτων
Βιολογίας και των Βιοεπιστημών γενικότερα. </span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">Τα μαθηματικά που διδάσκονταν ήταν καθαρά μαθηματικά, διαφορικές
εξισώσεις, αριθμητική ανάλυση κ.α., με τους φοιτητές τελικά να αποφεύγουν να τα
επιλέξουν. </span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">Η φράση που μου έκανε εντύπωση ήταν ότι ακόμα και αν ο Cauchy σηκωνόταν
από τον αιώνιο ύπνο του το πρωί, το απόγευμα θα μπορούσε να πάει να
διδάξει το μάθημα, θέλοντας να δείξουν την προσκόλληση στα μαθηματικά του
19ου αιώνα. </span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">Όταν κάποια στιγμή γράφτηκαν καινούργια συγγράμματα αποκλειστικά με εφαρμογές
βιολογίας, τότε το πρόβλημα μετατοπίστηκε στους διδακτορικούς φοιτητές των
μαθηματικών, καθώς δεν μπορούσαν να τα διδάξουν. </span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41"><i>"Αυτά δεν είναι
μαθηματικά"</i>, υποστήριξαν.</span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41"> Όμως, πρόβλημα με την απότομη αυτή αλλαγή είχαν ακόμη και οι ίδιοι οι
καθηγητές των τμημάτων αυτών, που δεν ήταν μαθηματικοί, αφού οι
διαφορικές εξισώσεις για παράδειγμα έχουν τεράστια εφαρμογή σε κλασικές
εφαρμογές της οικολογίας (κουνέλια), αλλά και σε σύγχρονες εφαρμογές
της επιδημιολογίας (Covid). </span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">Η τελική αίσθηση ήταν ότι ακόμα και τώρα είναι σχετικά αμφιλεγόμενο το
τι μαθηματικά πρέπει να διδαχθούν οι διάφορες ειδικότητες και μέχρι πόσο
πρέπει να εμβαθύνουν στα καθαρά μαθηματικά, ενώ πρέπει να σημειωθεί ότι βάση στατιστικών στοιχείων, γυναίκες και
μειονότητες στην πλειοψηφία τους δεν δηλώνουν μαθήματα με αποκλειστικά μαθηματικές θεωρίες και μεθόδους, με
αποτέλεσμα να υποεκπροσωπούνται σε μια STEM προσέγγιση. </span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">Σε ορισμένα βιβλία πάντως, αντί για θεωρήματα και άλλους
παραδοσιακούς κανόνες λογισμού, η ύλη επικεντρώθηκε κυρίως στην ανάπτυξη
μαθηματικών απαντήσεων σε βιολογικά ερωτήματα , όπως για παράδειγμα:</span></p><p><i><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">"Τι θα συνέβαινε αν
ένας δεδομένος αριθμός από τόνους για παράδειγμα, έπεφτε σε μια
δεξαμενή με μερικούς καρχαρίες;
Ο καρχαρίας θα φάει τον πληθυσμό του τόνου, αλλά τότε και ο πληθυσμός
του καρχαρία θα μειωθεί επίσης."</span></i><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41"> </span></p><p><span class="tojvnm2t a6sixzi8 abs2jz4q a8s20v7p t1p8iaqh k5wvi7nf q3lfd5jv pk4s997a bipmatt0 cebpdrjk qowsmv63 owwhemhu dp1hu0rb dhp61c6y iyyx5f41">Στην συνέχεια με την φράση: <i>"Θα κάνουμε
διαφορικές εξισώσεις μοντέλων για αυτή τη διαδικασία"</i>, οι διδάσκοντες μπόρεσαν και άλλαξαν σε σημαντικό βαθμό τον τρόπο
που οι φοιτητές τους έβλεπαν τα μαθηματικά, με το μάθημα να
περιλαμβάνει κυρίως μοντελοποίηση και προγραμματισμό υπολογιστή.</span></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-85526824164974031692022-02-10T15:33:00.001+02:002022-02-10T15:33:19.985+02:00Διαγώνισμα Μαθηματικά Προσανατολισμού 2021-2022 <p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEgSgzw3Fj-XZf_GglWN6Yu5DU4nA0IA5gm7cf5gZkYIC3T19y9tC5jiDMnaN8FkzLV6DrFetLrW9vKsb0n_aGyZsXguJoQwEco3TAjeim76cb1TVu-GnoevWETzM88T6us0uSWIjN1BzO-rhsznNW3vPRJCfUFzsD6CXf_rNQpLnFNd1fa4VLR5T2wfuw=s750" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="420" data-original-width="750" height="179" src="https://blogger.googleusercontent.com/img/a/AVvXsEgSgzw3Fj-XZf_GglWN6Yu5DU4nA0IA5gm7cf5gZkYIC3T19y9tC5jiDMnaN8FkzLV6DrFetLrW9vKsb0n_aGyZsXguJoQwEco3TAjeim76cb1TVu-GnoevWETzM88T6us0uSWIjN1BzO-rhsznNW3vPRJCfUFzsD6CXf_rNQpLnFNd1fa4VLR5T2wfuw=s320" width="320" /></a></div><br /><p></p><p style="text-align: center;"> Επαναληπτικό Διαγώνισμα 1ο και 2ο Κεφάλαιο.</p>
<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1Foi6knIl_kBxBgZQ8ioaOHMFSqbEFMmr/preview" width="640"></iframe>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-85848739077737857262022-02-06T18:58:00.002+02:002022-02-06T19:11:28.011+02:00Η στατιστική και η ψευδαίσθηση της οπτικής μας σταθερότητας.<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/a/AVvXsEht1mZnwSOfi4s7h-j9eWCkHZ34PGbSnV7TzUi5BAj5Ades-XJ2kKvNhYmoyfPD5x_hExSUoz8actnUa2hXChdvJm08EZR_brVHOq5rZZvmWkSL_kiAupEFsGEFrz1iPOkmRgwLTgRaXuiwDvuOk5teKZgrsyiQaJwFnBvQ-GE2Uftw-sDLB-rn9kUhGQ=s480" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="360" data-original-width="480" height="240" src="https://blogger.googleusercontent.com/img/a/AVvXsEht1mZnwSOfi4s7h-j9eWCkHZ34PGbSnV7TzUi5BAj5Ades-XJ2kKvNhYmoyfPD5x_hExSUoz8actnUa2hXChdvJm08EZR_brVHOq5rZZvmWkSL_kiAupEFsGEFrz1iPOkmRgwLTgRaXuiwDvuOk5teKZgrsyiQaJwFnBvQ-GE2Uftw-sDLB-rn9kUhGQ=s320" width="320" /></a></div><br /><div data-block="true" data-editor="es0hp" data-offset-key="a918s-0-0"><div class="_1mf _1mj" data-offset-key="a918s-0-0"><span data-offset-key="a918s-0-0"><span data-text="true">Τα μάτια μας βομβαρδίζονται κάθε στιγμή από τεράστιες ποσότητες οπτικών πληροφοριών, όπως χρώματα, εκατομμύρια σχήματα και συνεχώς μεταβαλλόμενες κινήσεις. Ο οπτικός μας κόσμος βρίσκεται σε μια <b>διαρκή μεταβολή</b>, εξαιτίας των αλλαγών στο φως και στις οπτικές γωνίες, του βλεφαρίσματος, αλλά και του γεγονότος ότι μάτια, κεφάλι και σώμα είναι μονίμως σε κίνηση.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="123ic-0-0"><div class="_1mf _1mj" data-offset-key="123ic-0-0"><span data-offset-key="123ic-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="8042s-0-0"><div class="_1mf _1mj" data-offset-key="8042s-0-0"><span data-offset-key="8042s-0-0"><span data-text="true">Για να πάρουμε μια μικρή ιδέα για τον <i>"θόρυβο"</i> της οπτικής εισόδου, μπορούμε να τοποθετήσουμε μια κάμερα μπροστά στα μάτια μας και να βιντεοσκοπήσουμε ενώ περπατάμε και κοιτάμε σε διάφορα σημεία. Το ακατάστατο αποτέλεσμα που θα έχουμε είναι ένα μόνο μικρό δείγμα του τι αντιμετωπίζει ο εγκέφαλος κάθε στιγμή της οπτικής μας εμπειρίας.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="f4kip-0-0"><div class="_1mf _1mj" data-offset-key="f4kip-0-0"><span data-offset-key="f4kip-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="85rat-0-0"><div class="_1mf _1mj" data-offset-key="85rat-0-0"><b><span data-offset-key="85rat-0-0"><span data-text="true">Πώς γίνεται όμως και εμείς αντιλαμβανόμαστε ένα σταθερό περιβάλλον;</span></span></b></div></div><div data-block="true" data-editor="es0hp" data-offset-key="ell2m-0-0"><div class="_1mf _1mj" data-offset-key="ell2m-0-0"><span data-offset-key="ell2m-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="38df1-0-0"><div class="_1mf _1mj" data-offset-key="38df1-0-0"><span data-offset-key="38df1-0-0"><span data-text="true">Η διαδικασία κατά την οποία ο εγκέφαλος δημιουργεί αυτήν την αίσθηση σταθερότητας είναι ένα από τα θεμελιώδη ερωτήματα της όρασης και έχει απασχολήσει για πολλούς αιώνες τους επιστήμονες.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="517vp-0-0"><div class="_1mf _1mj" data-offset-key="517vp-0-0"><span data-offset-key="517vp-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="508bn-0-0"><div class="_1mf _1mj" data-offset-key="508bn-0-0"><span data-offset-key="508bn-0-0"><span data-text="true">Σε μια τελευταία έρευνα που δημοσιεύθηκε πριν λίγο καιρό, δόθηκε μια απάντηση που εξηγεί το πως ο εγκέφαλος μας εξομαλύνει αυτόματα την οπτική μας είσοδο με την πάροδο του χρόνου.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="29rpo-0-0"><div class="_1mf _1mj" data-offset-key="29rpo-0-0"><span data-offset-key="29rpo-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="3b023-0-0"><div class="_1mf _1mj" data-offset-key="3b023-0-0"><span data-offset-key="3b023-0-0"><span data-text="true">Χρησιμοποιεί <b>στατιστική</b>!</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="30h5a-0-0"><div class="_1mf _1mj" data-offset-key="30h5a-0-0"><span data-offset-key="30h5a-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="d0siu-0-0"><div class="_1mf _1mj" data-offset-key="d0siu-0-0"><span data-offset-key="d0siu-0-0"><span data-text="true">Αντί να αναλύουμε κάθε οπτικό στιγμιότυπο, αντιλαμβανόμαστε σε μια δεδομένη στιγμή ένα <b>μέσο όρο</b> αυτών που είδαμε τα τελευταία <b>15 δευτερόλεπτα</b>.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="cls4l-0-0"><div class="_1mf _1mj" data-offset-key="cls4l-0-0"><span data-offset-key="cls4l-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="55pca-0-0"><div class="_1mf _1mj" data-offset-key="55pca-0-0"><span data-offset-key="55pca-0-0"><span data-text="true">Μαζεύοντας δηλαδή αντικείμενα για να φαίνονται όμοια μεταξύ τους ο εγκέφαλος μας ξεγελάει, ώστε να αντιληφθούμε ένα σταθερό περιβάλλον, σαν μια χρονομηχανή που μας στέλνει συνεχώς πίσω στο χρόνο.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="m3ic-0-0"><div class="_1mf _1mj" data-offset-key="m3ic-0-0"><span data-offset-key="m3ic-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="7cfdp-0-0"><div class="_1mf _1mj" data-offset-key="7cfdp-0-0"><span data-offset-key="7cfdp-0-0"><span data-text="true">Μια εφαρμογή, με άλλα λόγια, που ενοποιεί την οπτική μας είσοδο κάθε 15 δευτερόλεπτα σε μια εμφάνιση, για να μπορέσουμε να χειριστούμε την καθημερινή μας ζωή. Διαφορετικά, αν δηλαδή ενημερωνόταν σε πραγματικό χρόνο, τότε οι συνεχείς διακυμάνσεις στο φως και την κίνηση θα μας έκαναν να έχουμε παραισθήσεις όλη την ώρα.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="1m5ge-0-0"><div class="_1mf _1mj" data-offset-key="1m5ge-0-0"><span data-offset-key="1m5ge-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="9pt61-0-0"><div class="_1mf _1mj" data-offset-key="9pt61-0-0"><span data-offset-key="9pt61-0-0"><span data-text="true">Το οπτικό μας σύστημα θυσιάζει την ακρίβεια για χάρη μιας ομαλής οπτικής εμπειρίας του κόσμου, κάτι που εξηγεί πολλά θέματα της καθημερινότητάς μας, όπως για παράδειγμα όταν παρακολουθούμε μια ταινία και δεν παρατηρούμε ανεπαίσθητες αλλαγές με την πάροδο του χρόνου.</span></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="8li8f-0-0"><div class="_1mf _1mj" data-offset-key="8li8f-0-0"><span data-offset-key="8li8f-0-0"><br data-text="true" /></span></div></div><div data-block="true" data-editor="es0hp" data-offset-key="2ijt2-0-0"><div class="_1mf _1mj" data-offset-key="2ijt2-0-0"><span data-offset-key="2ijt2-0-0"><span data-text="true">Η βραδύτητα του οπτικού συστήματος στην ενημέρωση λοιπόν, μας κάνει <i>"τυφλούς"</i> απέναντι σε άμεσες αλλαγές, αφού αρπάζει την πρώτη εντύπωση και μας τραβάει στο παρελθόν, ενώ δίνει και μια διαφορετική ερμηνεία στη φράση που λέει ότι πρέπει να πιστεύουμε τα μισά από όσα βλέπουμε. <br /></span></span></div></div><p>
</p><p></p><p><iframe allow="accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture" allowfullscreen="" frameborder="0" height="315" src="https://www.youtube.com/embed/Lub3lsJdko0" title="YouTube video player" width="560"></iframe> </p><p>Η έρευνα πραγματοποιήθηκε από τους Mauro Manass και David Whithey.</p><p>Πηγή: <a href="https://theconversation.com/global">https://theconversation.com/global</a><br /></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-44187859874441482452021-11-24T16:46:00.004+02:002021-11-24T17:41:36.562+02:00Δύο σημαντικές εκδηλώσεις για τα 200 χρόνια από την Ελληνική Επανάσταση με θέμα την εκπαίδευση, τα σχολικά βιβλία και τα μαθηματικά<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-KDDsPaZSZW4/YZ5QCRPfW1I/AAAAAAAADCs/vtdTdIUsgnMQvfRy2CvJOBUJtzDIOt-UwCLcBGAsYHQ/s2048/16_5_18_safety4sea_web_c_dimitrisparthimos_0012.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="1367" data-original-width="2048" height="214" src="https://1.bp.blogspot.com/-KDDsPaZSZW4/YZ5QCRPfW1I/AAAAAAAADCs/vtdTdIUsgnMQvfRy2CvJOBUJtzDIOt-UwCLcBGAsYHQ/s320/16_5_18_safety4sea_web_c_dimitrisparthimos_0012.jpg" width="320" /></a></div> <p></p><p>Το επόμενο χρονικό διάστημα πραγματοποιούνται δύο πολύ σημαντικές εκδηλώσεις με αφορμή τα 200 χρόνια από την Ελληνική Επανάσταση. </p><p></p><p> Η πρώτη είναι μια διαδικτυακή ημερίδα που διοργανώνεται από την Ελληνική Μαθηματική Εταιρεία το Σάββατο 27 Νοεμβρίου και ώρα 11 το πρωί, ενώ θα είναι διαθέσιμη μέσω της πλατφόρμας zoom.</p><p>Ομιλητές της ημερίδας θα είναι οι:</p><p>1) <b>Χριστίνα Φίλη, </b>Καθηγήτρια Σ.Ε.Φ.Μ.Ε. - Ε.Μ.Π.</p><p>"<i>Η Βιέννη ως προεπαναστατικό εκδοτικό κέντρο μαθηματικών πραγματειών"</i></p><p>2) <b>Πέτρος Στεφανέας, </b>Αναπληρωτής Καθηγητής Σ.Ε.Φ.Μ.Ε. - Ε.Μ.Π.</p><p><i>"Αυγούστα Άντα: η μαθηματικός κόρη του λόρδου Βύρωνα"</i></p><p>3) <b>Μιχάλης Λάμπρου, </b>Καθηγητής Πανεπιστημίου Κρήτης</p><p><i>"Οι λόγιοι και τα βιβλία Μαθηματικών την εποχή της Τουρκοκρατίας"</i></p><p>4) <b>Μαθητές του 14ου Γ.Ε.Λ. Λάρισας</b></p><p><i>"Τα Μαθηματικά κατά τους προεπαναστατικούς χρόνους. Το έργο του Λαρισαίου διδασκάλου Κωνσταντίνου Κούμα.</i><b> </b></p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-TIIRSHrLXjs/YZ5NRygsZNI/AAAAAAAADCc/IN96XSzj60c-E-a8u9BpafVcY1mYiZQrACLcBGAsYHQ/s2048/259213533_2011066582400736_5144419829345231011_n.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="2048" data-original-width="1448" height="320" src="https://1.bp.blogspot.com/-TIIRSHrLXjs/YZ5NRygsZNI/AAAAAAAADCc/IN96XSzj60c-E-a8u9BpafVcY1mYiZQrACLcBGAsYHQ/s320/259213533_2011066582400736_5144419829345231011_n.jpg" width="226" /></a></div><p> </p><p>Η δεύτερη είναι ένα τριήμερο επιστημονικό συνέδριο που διοργανώνεται από το Ινστιτούτο Εκπαιδευτικής Πολιτικής (Ι.Ε.Π.) σε συνεργασία με την Εθνική
Βιβλιοθήκη της Ελλάδος (Ε.Β.Ε.) με τίτλο
<b data-uw-styling-context="true">«Αναζητώντας τη γνώση: Τα σχολικά εγχειρίδια στο Ελληνικό Κράτος»</b> και θα διεξαχθεί στις <b data-uw-styling-context="true">17-19 Δεκεμβρίου 2021</b>. </p><p data-uw-styling-context="true" style="text-align: left;">Σε αυτό συμμετέχουν πανεπιστημιακοί και επιστήμονες-ερευνητές της
Πρωτοβάθμιας και Δευτεροβάθμιας Εκπαίδευσης και αντικείμενο
του συνεδρίου θα είναι μια κριτική προσέγγιση των διδακτικών
εγχειριδίων της σχολικής εκπαίδευσης από την ίδρυση του Ελληνικού
Κράτους μέχρι σήμερα, με έμφαση στα γνωστικά αντικείμενα της ελληνικής
γλώσσας (αρχαίας και νέας), της λογοτεχνίας, της ιστορίας, των
μαθηματικών και των φυσικών επιστημών.</p><p></p><div class="bgks"><div class="indiv" style="text-align: center;">
<p data-uw-styling-context="true" style="text-align: left;">Το Συνέδριο θα διεξαχθεί στην αίθουσα του Πύργου Βιβλίων της <b data-uw-styling-context="true">Εθνικής Βιβλιοθήκης της Ελλάδος</b>
στο Κέντρο Πολιτισμού Ίδρυμα Σταύρος Νιάρχος, με φυσική παρουσία των
συμμετεχόντων και παράλληλη ηλεκτρονική κάλυψη για όσους το
παρακολουθήσουν εξ αποστάσεως.</p><p data-uw-styling-context="true" style="text-align: justify;">Δείτε παρακάτω το πρόγραμμα του συνεδρίου:</p>
</div>
</div><p>
</p><p></p><p><iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1hfiV5Ps7CJo4M9lxx_fNwWbiNmN-Tw_V/preview" width="640"></iframe></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-59555870352461320402021-11-12T14:14:00.000+02:002021-11-12T14:14:54.335+02:00Τι αλλάζει σε κάθε τάξη με τα νέα Α.Π.Σ. στα Μαθηματικά: μια αποδελτίωση (Γυμνάσιο - Λύκειο)<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-OGavtHWDPkU/YY4rsarz-iI/AAAAAAAADBo/_Al_feL0ys0M-Y9nRHqUzFXquRUIZ7aJQCLcBGAsYHQ/s710/epistimi-mathimatika.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="446" data-original-width="710" height="201" src="https://1.bp.blogspot.com/-OGavtHWDPkU/YY4rsarz-iI/AAAAAAAADBo/_Al_feL0ys0M-Y9nRHqUzFXquRUIZ7aJQCLcBGAsYHQ/s320/epistimi-mathimatika.jpg" width="320" /></a></div> <i> </i><p></p><p><i>"Τα Μαθηματικά στο παρόν Πρόγραμμα Σπουδών γίνονται
αντιληπτά ως ανθρώπινο δημιούργημα που μπορεί να προσφέρει σε όλους/ες
τους/τις μαθητές/τριες τις γνώσεις και τα εργαλεία ώστε να γίνουν
ενεργοί, χειραφετημένοι και κριτικοί πολίτες του αύριο, που θα είναι σε
θέση να λειτουργούν δυναμικά και αποτελεσματικά τόσο ως άτομα όσο και ως
μέλη μιας συνεχώς μεταβαλλόμενης κοινωνίας."</i></p><div dir="ltr"><br /></div><div dir="ltr">(Από τον πρόλογο)</div><div dir="ltr"><br /></div><p><span style="color: #fcff01;"><u><b>Α΄ Γυμνασίου - Θεματικά Πεδία</b></u></span></p><p><b>Α) Αριθμοί: Φυσικοί Αριθμοί, Ακέραιοι Αριθμοί, Ρητοί Αριθμοί</b></p><p>(Μ.Κ.Δ. , Ε.Κ.Π., πράξεις ακεραίων, ποσοστά κλπ.)</p><p><i>Ενδιαφέρον παρουσιάζει η πρόταση διδασκαλίας του δυαδικού συστήματος, της γλώσσας της πληροφορικής δηλαδή και η σύγκριση της με το δεκαδικό σύστημα αρίθμησης. </i></p><p><b>Β) Άλγεβρα: Κανονικότητες, Αλγεβρικές Παραστάσεις, Αλγεβρικές Σχέσεις.</b></p><p><i> </i>(Διαδικασίες μαθηματικοποίησης και μοντελοποίησης προβλημάτων της καθημερινότητας, λύση πολυωνυμικών εξισώσεων 1ου βαθμού κλπ.)</p><p><b>Γ) Γεωμετρία: Γεωμετρία στο επίπεδο</b></p><p>(Γωνίες, μεσοκάθετος, διχοτόμος, είδη τετραπλεύρων, χρήση γεωμετρικών οργάνων και ψηφιακών εργαλείων για να διαπιστωθούν εικασίες σχετικές με τις ιδιότητες του παραλληλογράμμου, του τετραγώνου, του ορθογωνίου, του ρόμβου κλπ.)</p><p><b>Δ) Μέτρηση: Μήκος, Μέτρο Γωνιών</b></p><p>(Μονάδες μέτρησης μήκους κλπ.)</p><p><b>Ε) Στοχαστικά Μαθηματικά - Στατιστική: Διαχείριση Δεδομένων, Μέτρα Θέσης και Μεταβλητότητας</b></p><p>(Απογραφή πληθυσμού, διακριτά και συνεχή ποσοτικά χαρακτηριστικά, κυκλικά διαγράμματα, ιστογράμματα, μέτρα θέσης για εξαγωγή συμπερασμάτων)</p><p><b>ΣΤ) Στοχαστικά Μαθηματικά - Πιθανότητες: Πειράματα τύχης και Πιθανότητες.</b></p><p>(Δειγματικοί χώροι, κλασικός ορισμός πιθανότητας κλπ.)</p><p><b> </b><br /></p><p><span style="color: #fcff01;"><b><u>Β΄ Γυμνασίου - Θεματικά Πεδία</u></b></span></p><p><b>Α) Αριθμοί: Ρητοί Αριθμοί, Άρρητοι - Πραγματικοί Αριθμοί</b></p><p>(Ιδιότητες δυνάμεων, τετραγωνικές ρίζες θετικών αριθμών κλπ.)</p><p><b>Β) Άλγεβρα: Κανονικότητες, Αλγεβρικές Παραστάσεις, Αλγεβρικές Σχέσεις, Συναρτήσεις.</b></p><p>(Λύση προβλημάτων της καθημερινότητας με κανονικότητες, απλοποίηση αλγεβρικών παραστάσεων, εξισώσεις με άπειρες λύσεις και με καμία λύση, μεγέθη που συμμεταβάλονται, γραφικές παραστάσεις, ανάλογα και αντιστρόφως ανάλογα μεγέθη κλπ.)</p><p><b>Γ) Γεωμετρία: Γεωμετρία του επιπέδου, Μετασχηματισμοί, Τριγωνομετρία</b></p><p>(Πυθαγόρειο Θεώρημα και το αντίστροφό του, συμμετρίες, τριγωνομετρικοί αριθμοί οξείας γωνίας κλπ.)</p><p><b>Δ) Μέτρηση: Μήκος, Μέτρο γωνιών</b></p><p>(Μήκη τόξων, μήκος κύκλου, εμβαδόν τετραγώνου, ορθογωνίου, παραλληλογράμμου, τριγώνου, τραπεζίου, κυκλικού δίσκου, κυκλικού τομέα κλπ.)</p><p><b>Ε) Στοιχεία Αναλυτικής Γεωμετρίας: Διανύσματα</b></p><p>(Σύνδεση διανυσμάτων με φυσικά διανυσματικά μεγέθη, ταχύτητα κλπ.)</p><p><b>ΣΤ) Στοχαστικά Μαθηματικά - Στατιστική: Διαχείριση δεδομένων, Μέτρα θέσης και μεταβλητότητας</b></p><p>(Χρονοδιαγράμματα, θηκογράμματα κλπ.)</p><p><i>Ενδιαφέρον παρουσιάζει η πρόταση διδασκαλίας παραδειγμάτων χρήσης στατιστικών διαγραμμάτων που μπορούν να οδηγήσουν σε εσφαλμένα συμπεράσματα και να παραπλανήσουν.</i></p><p><b>Ζ) Στοχαστικά Μαθηματικά - Πιθανότητες: Πειράματα τύχης και Πιθανότητες</b></p><p>(Ασυμβίβαστα ενδεχόμενα, απλός προσθετικός νόμος κλπ.)</p><p><br /></p><p><span style="color: #fcff01;"><b><u>Γ΄ Γυμνασίου - Θεματικά Πεδία</u></b></span></p><p><b>Α) Αριθμοί, Άλγεβρα και Ανάλυση: Αριθμοί/Πραγματικοί Αριθμοί, Άλγεβρα/Κανονικότητες, Άλγεβρα/Αλγεβρικές Παραστάσεις, Άλγεβρα/Συναρτήσεις, Άλγεβρα/Αλγεβρικές Σχέσεις<br /></b></p><p>(Άρρητοι αριθμοί, ιδιότητες τετραγωνικών ριζών, πολυώνυμα, ταυτότητες, παραγοντοποίηση, πράξεις ρητών παραστάσεων, γραφική και αλγεβρική επίλυση συστημάτων 2X2, πολυωνυμικές εξισώσεις 2ου βαθμού, ανισώσεις)</p><p><b>Β) Γεωμετρία: Γεωμετρία του επιπέδου, Μετασχηματισμοί, Τριγωνομετρία, Γεωμετρία του χώρου<br /></b></p><p>(Κριτήρια ισότητας τριγώνων, ομοιότητα, τριγωνομετρικοί αριθμοί αμβλείας γωνίας, στερεά, κύβος, πυραμίδα, κύλινδρος, κώνος κλπ.)<br /></p><p><b>Γ) Μέτρηση: Μήκος, Όγκος<br /></b></p><p>(Εμβαδά επιφάνειας σφαίρας, κώνου, κυλίνδρου, όγκοι κύβου, κυλίνδρου κλπ.)</p><p><b>Δ) Στοχαστικά Μαθηματικά - Στατιστική: Διαχείριση δεδομένων<br /></b></p><p>(Δειγματοληψία, επαγωγική εξαγωγή συμπερασμάτων, συσχέτιση)<br /></p><p><b>Ε) Στοχαστικά Μαθηματικά - Πιθανότητες: Πειράματα τύχης και Πιθανότητες</b></p><p>(Νόμος των μεγάλων αριθμών, ανεξαρτησία δεδομένων από την εκτέλεση πειραμάτων τύχης και προσομοιώσεις κλπ.)</p><p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-pnDWrssJFsc/YY4r2LFP_FI/AAAAAAAADBs/74PC9sr9nAM738qJeii9kwM4V0fUIcvvQCLcBGAsYHQ/s800/23-16-1.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="600" data-original-width="800" height="240" src="https://1.bp.blogspot.com/-pnDWrssJFsc/YY4r2LFP_FI/AAAAAAAADBs/74PC9sr9nAM738qJeii9kwM4V0fUIcvvQCLcBGAsYHQ/s320/23-16-1.jpg" width="320" /></a></div><br /><p></p><p><span style="color: #fcff01;"><span><b><u>Α΄ Λυκείου - Θεματικά Πεδία</u></b></span></span></p><p><b>Α)
Αριθμοί: Πραγματικοί αριθμοί, Σύνολα, Αλγεβρικές παραστάσεις, Αλγεβρικές σχέσεις, Συναρτήσεις<br /></b></p><p>(Διαστήματα, απόλυτα, ν-οστή ρίζα, διαγράμματα Venn, ταυτότητες, εξισώσεις 1ου και 2ου βαθμού, ανισώσεις 2ου βαθμού, ορισμός συνάρτησης, γραφικές παραστάσεις, πολυωνυμικές συναρτήσεις 1ου και 2ου βαθμού, τριγωνομετρικός κύκλος, βασικές τριγωνομετρικές ταυτότητες)<br /></p><p><b>Β) Στατιστική: Διαχείριση δεδομένων, Μέτρα θέσης και μεταβλητότητας, Σχέσεις εξάρτησης μεταξύ δύο μεταβλητών<br /></b></p><p>(Ποσοτικά και κατηγορικά χαρακτηριστικά πληθυσμού, μέση τιμή, διάμεσος, διασπορά, τυπική απόκλιση, εύρος, συντελεστής μεταβλητότητας κλπ.)<br /></p><p><b>Γ) Πιθανότητες: Πειράματα τύχης και Πιθανότητες<br /></b></p><p>(Ισοπίθανα και μη ισοπίθανα απλά ενδεχόμενα, αξιωματικός ορισμός πιθανοτήτων, κανόνες λογισμού πιθανοτήτων κλπ.)</p><p><b>Δ) Γεωμετρία: Γεωμετρία επιπέδου, Γεωμετρία χώρου<br /></b></p><p>(παράλληλες ευθείες που τέμνονται από τρίτη ευθεία, άθροισμα γωνιών τριγώνου, γεωμετρικές κατασκευές, κύκλος, εφαπτομένες, παραλληλόγραμμα, τραπέζια, η έννοια της γωνίας στο χώρο)<br /></p><p><i>Ενδιαφέρον παρουσιάζει η πρόταση διδασκαλίας της σημασίας του 5ου Ευκλείδειου Αιτήματος στην εξέλιξη της γεωμετρίας.</i><b> <br /></b></p><p><b>Ε) Μετρήσεις: Μέτρο γωνιών</b></p><p>(Μέτρο δίεδρης γωνίας)</p><p><br /></p><p><span style="color: #fcff01;"><span><b><u>Β΄ Λυκείου Γενικής Παιδείας - Θεματικά Πεδία</u></b></span></span></p><p><b>Α) Άλγεβρα: Πραγματικοί αριθμοί, Σύνολα, Αλγεβρικές παραστάσεις, Αλγεβρικές σχέσεις, Συναρτήσεις<br /></b></p><p>(Ακολουθίες,
αριθμητική και γεωμετρική πρόοδος, ακτίνιο, τριγωνομετρικές
συναρτήσεις, τριγωνομετρικές εξισώσεις, τριγωνομετρικές ανισώσεις,
ιδιότητες συναρτήσεων, μονοτονία, ακρότατα, προσεγγιστικός υπολογισμός
ρίζας πολυωνυμικής συνάρτησης μέσω οπτικοποίησης του Θ.Bolzano, γραμμικά
και μη γραμμικά συστήματα κλπ.)<br /></p><p><b>Β) Στατιστική: Διαχείριση δεδομένων, Σχέσεις εξάρτησης μεταξύ δύο μεταβλητών<br /></b></p><p>(Πίνακες συχνοτήτων και σχετικών συχνοτήτων, ραβδογράμματα, ομαδοποίηση, συσχέτιση κλπ.)<br /></p><p><b>Γ) Πιθανότητες: Πειράματα τύχης και Πιθανότητες<br /></b></p><p>(Συνδυαστική, διατάξεις, μεταθέσεις, συνδυασμοί, αρχές απαρίθμησης, κανονική κατανομή, δεσμευμένη πιθανότητα κλπ.)</p><p><b>Δ) Γεωμετρία: Γεωμετρία επιπέδου, Τριγωνομετρία<br /></b></p><p>(γεωμετρικοί
τόποι, κριτήρια εγγραφής τετραπλεύρων σε κύκλο, Θεώρημα Θαλή, ομοιότητα
τριγώνων, Πυθαγόρειο Θεώρημα και γενίκευση, άλλοι τύποι για το εμβαδόν
τριγώνου, κανονικά πολύγωνα και κατασκευές, νόμος ημιτόνων και
συνημιτόνων κλπ.)<b> <br /></b></p><p><b>Ε) Μετρήσεις: Μήκος, Μέτρο γωνιών, Εμβαδόν, Όγκος </b></p><p>(Μήκος τόξου, λόγοι εμβαδών, εμβαδόν κυκλικού δίσκου, κυκλικού τομέα και μεικτόγραμμων χωρίων, κύλινδρος, κώνος, σφαίρα κλπ.)</p><p></p><p><span style="color: #fcff01;"><br /></span></p><p><span style="color: #fcff01;"><span><b><u>Β΄ Λυκείου Προσανατολισμός Θετικών Σπουδών - Θεματικά Πεδία</u></b></span></span></p><p><b>Α) Αναλυτική Γεωμετρία: Διανύσματα, Ευθεία, Κύκλος<br /></b></p><p>(Η έννοια του διανύσματος, άθροισμα και αφαίρεση διανυσμάτων, γινόμενο αριθμού με διάνυσμα, συντεταγμένες διανύσματος, εσωτερικό γινόμενο, εξίσωση ευθείας, εξίσωση κύκλου κλπ.)<br /></p><p><b>Β) Αριθμοί: Φυσικοί αριθμοί<br /></b></p><p>(Μαθηματική επαγωγή)<br /></p><p><b>Γ) Άλγεβρα: Πίνακες, Συναρτήσεις, Αλγεβρικές Σχέσεις<br /></b></p><p>(Η έννοια του πίνακα, γινόμενο αριθμού με πίνακα, άθροισμα και γινόμενο πινάκων, αντίστροφος τετραγωνικού πίνακα, ιδιότητες συνάρτησης μέσω της γραφικής της παράστασης, ίσες συναρτήσεις, σύνθεση συναρτήσεων, 1-1 και αντίστροφη συνάρτησης, εκθετική και λογαριθμική συνάρτηση, εκθετικές και λογαριθμικές εξισώσεις και ανισώσεις κλπ.)</p><p><b>Δ) Ανάλυση: Σύγκλιση<br /></b></p><p>(Σύγκλιση και μη σύγκλιση ακολουθιών, αθροίσματα απείρων όρων γεωμετρικών προόδων, μέθοδος Ήρωνα για την προσέγγιση τετραγωνικής ρίζας κλπ.)<b> <br /></b></p><p><br /></p><p><span style="color: #fcff01;"><span><b><u>Γ΄ Λυκείου Γενικής Παιδείας - Θεματικά Πεδία</u></b></span></span></p><p><b>Α) Αριθμοί: Άρρητοι και Πραγματικοί αριθμοί<br /></b></p><p>(Δεκαδικοί και φυσικοί λογάριθμοι)<br /></p><p><b>Β) Άλγεβρα: Συναρτήσεις, Αλγεβρικές Σχέσεις<br /></b></p><p>(Εκθετική συνάρτηση, χρήση λογαρίθμων στη μελέτη πραγματικών φαινομένων, λύση εκθετικών εξισώσεων με χρήση υπολογιστή τσέπης)<br /></p><p><b>Γ) Ανάλυση: Διαφόριση<br /></b></p><p>(Λόγος μεταβολής, εφαπτομένη γραφικής παράστασης συνάρτησης, κανόνες παραγώγισης, ρυθμός μεταβολής κλπ.)</p><p><b>Δ) Στατιστική: Διαχείριση δεδομένων, Σχέσεις εξάρτησης μεταξύ δύο μεταβλητών<br /></b></p><p>(Θετική και αρνητική γραμμική συσχέτιση, ευθεία παλινδρόμησης κλπ.)<b> <br /></b></p><p><b>Ε) Πιθανότητες: Συσχέτιση </b></p><p>(Δεσμευμένη πιθανότητα, Θεώρημα Ολικής Πιθανότητας, Θεώρημα Bayes κλπ.)</p><p> </p><p><span style="color: #fcff01;"><span><b><u>Γ΄ Λυκείου Προσανατολισμού Θετικών Σπουδών - Θεματικά Πεδία</u></b></span></span></p><p><b>Α) Ανάλυση: Σύγκλιση, Διαφόριση, Ολοκλήρωση<br /></b></p><p>(Σύγκλιση και μη σύγκλιση συναρτήσεων για τον υπολογισμό ορίων, ασύμπτωτες, συνέχεια συνάρτησης, Θεώρημα Bolzano και Θεώρημα Ενδιαμέσων Τιμών, εφαπτομένη γραφικής παράστασης συνάρτησης, μέθοδος Newton-Raphson για τον προσεγγιστικό υπολογισμό ριζών εξίσωσης, παραγωγισιμότητα και συνέχεια, παράγωγος βασικών συναρτήσεων, κανόνες παραγώγισης, ρυθμός μεταβολής, μονοτονία, σταθερή συνάρτηση, τοπικά ακρότατα, κυρτότητα, γραφική παράσταση, ορισμένο ολοκλήρωμα, παράγουσα, Θεμελιώδες Θεώρημα Ολοκληρωτικού Λογισμού, ορισμένο ολοκλήρωμα και όγκος στερεών εκ περιστροφής κλπ.)</p><p><b>Β) Στατιστική: Διαχείριση δεδομένων, Μέτρα θέσης και μεταβλητότητας, Σχέσεις εξάρτησης μεταξύ δύο μεταβλητών<br /></b></p><p>(Σύμβολο αθροίσματος, μέση τιμή, διασπορά, θετική και αρνητική γραμμική συσχέτιση, συντελεστής γραμμικής παλινδρόμησης Pearson κλπ.)<br /></p><p><b>Γ) Πιθανότητες: Πειράματα τύχης και Πιθανότητες, Συσχέτιση<br /></b></p><p>(Δοκιμή Bernoulli, δεσμευμένη πιθανότητα, πολλαπλασιαστικός κανόνας, Θεώρημα Ολικής Πιθανότητας, Θεώρημα Bayes στην επίλυση πραγματικών προβλημάτων κλπ.)<br /></p><br />Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-61097843602143289662021-10-18T13:43:00.001+03:002021-10-19T13:46:33.068+03:00Επαναληπτικό Διαγώνισμα Μαθηματικά Γ Λυκείου 2021-2022 (new)<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-SfU9lOlxiEE/YW1O3A8SJhI/AAAAAAAADBA/jrMUNlsbkhoyVyxtBrGY0qt0POk1aZC3ACLcBGAsYHQ/s900/math11.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="638" data-original-width="900" height="227" src="https://1.bp.blogspot.com/-SfU9lOlxiEE/YW1O3A8SJhI/AAAAAAAADBA/jrMUNlsbkhoyVyxtBrGY0qt0POk1aZC3ACLcBGAsYHQ/s320/math11.jpg" width="320" /></a></div><p></p><p>Ένα καινούριο επαναληπτικό διαγώνισμα στα Μαθηματικά Γ Λυκείου με εξεταζόμενη ύλη το 1ο Κεφάλαιο. </p><p>
</p><p><iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1suabUIWJvIION3pu0ijylk-fwkAsCV1n/preview" width="640"></iframe></p><p>Οι απαντήσεις του διαγωνίσματος από τον συνάδελφο και φίλο Γιάννη Κάκανο.<br /></p><p><iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1tLr2Pba75cEjnEI5prKtia7BSppkseyO/preview" width="640"></iframe></p>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-91861880283367163432021-10-03T18:25:00.005+03:002021-10-03T18:35:32.555+03:00Bernand Bolzano: Λίγα λόγια για τη ζωή του και μια συλλογή ασκήσεων <div class="separator"><p style="margin-left: 1em; margin-right: 1em; text-align: left;"></p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-fUHsX7-Gbok/YVnA6ofM1LI/AAAAAAAADAY/0XXliyIsxisyvMElLvFSWEoLLgSfoyfbACLcBGAsYHQ/s253/bolzano.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="253" data-original-width="220" height="253" src="https://1.bp.blogspot.com/-fUHsX7-Gbok/YVnA6ofM1LI/AAAAAAAADAY/0XXliyIsxisyvMElLvFSWEoLLgSfoyfbACLcBGAsYHQ/s0/bolzano.jpg" width="220" /></a> </div><div class="separator" style="clear: both; text-align: left;"> </div><div class="separator" style="clear: both; text-align: left;">Ο <b>Bernand Bolzano</b> γεννήθηκε στην Πράγα στις 5 Οκτωβρίου 1781 και πέθανε στις 18 Δεκεμβρίου 1848.</div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: left;">Σπούδασε μαθηματικά, φυσική και φιλοσοφία στο Πανεπιστήμιο της Πράγας, ενώ το 1800 ξεκίνησε να σπουδάζει και θεολογία, ώστε να γίνει καθολικός ιερέας σαν τον πατέρα του. Το 1818 εξελέγη κοσμήτορας στη Φιλοσοφική Σχολή, όπου προσπάθησε να προχωρήσει μια σειρά μεταρρυθμίσεων σε εκπαιδευτικά, κοινωνικά και οικονομικά ζητήματα με κύριο στόχο τα συμφέροντα του έθνους να έχουν ως αφετηρία την ειρήνη και όχι τις ένοπλες συγκρούσεις μεταξύ των κρατών.</div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: left;">Αυτές οι πολιτικές του πεποιθήσεις όμως ήταν υπερβολικά φιλελεύθερες για τις αυστριακές αρχές της εποχής εκείνης με αποτέλεσμα μετά από μόλις ένα χρόνο να απολυθεί από το πανεπιστήμιο, καθώς δε δέχτηκε να αρνηθεί τα πιστεύω του.</div><div class="separator" style="clear: both; text-align: left;"><br /></div><div class="separator" style="clear: both; text-align: left;">Ο Bolzano ήταν αρκετά δημιουργικός στο κομμάτι των μαθηματικών με πολλές και πρωτότυπες συνεισφορές.</div><div class="separator" style="clear: both; text-align: left;"> </div><div class="separator" style="clear: both; text-align: left;">Συνέβαλε στα θεμέλια της μαθηματικής ανάλυσης με την εισαγωγή ενός αυστηρού ε-δ ορισμού του μαθηματικού ορίου.</div><div class="separator" style="clear: both; text-align: left;"> </div><div class="separator" style="clear: both; text-align: center;"> <span style="font-size: 13pt; line-height: 107%;"><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAioAAACcCAYAAABRPIDyAAAgAElEQVR4nOy9Z1RVWbq/ez/cD3eM+7/33PM/qTp3V1X3qe4+VV1V3V3ZiIpkiYIgiCKKEsSAiqgkFRAUUFEMKAqISJKMgSg555wVEJXMZhP2fu6HtdlCqdVd1XY33bWeMd5RJXvtteaaa645f/Od73z3/4GIiIiIiIiIyCLl//h7F0BERERERERE5HWIQkVERERERERk0SIKFREREREREZFFiyhURERERERERBYtolARERERERERWbSIQkVERERERERk0SIKFREREREREZFFiyhURERERERERBYtolARERERERERWbSIQkVERERERERk0fJXEyoymYyZmRlmZmaQy+UvfT47O8vs7Oxr/w0gl8uZmZlFJpO9dNz8vwnHzSht/nnmyvFty/71sszx4jovfy6XyxeUa34dvK4eRERERERERF7PGxcqz549w/O4FxpaepiZb8HE1AJ9I1MSEpOZmppSHnfqdCCaOgZorzNER289JmaWGJlsRFVdh/CbUczMzPD06TP2Oh1Ez2ADmjoGaK0zxHyTFefOX+TYiZOoaeqipWPAehNzNlpYYWa+BTPzLejoGrHTzpG+vn7u3nvARgsrNLX1Wa2qhYPjPh4/7l1Q5unpGS5eDmHNWm00dQzQN9yAl7cv09PTymNyH+ZhtnEz+kYbhGvoGbHL0Ymurm7lMU3NLWww24Squg7a6wzZsNFSWS7TjZtRWa2Ov//ZBdeWyeTsczqEu6fXm34UIiIiIiIi//C8UaHS1NTMalUtfvfRp1y9doO+vn56e/s44eXLr//nY7bvcGB0dBSAwcEhYmLv8M6v3ucPny4hKzuX/IJCVq5W55fvfYD3yVPMzs4yMPCUU6fP8P/+61t89PsvKCktY2homPqGRnT1jfl//vUtNm6yoqOjk/7+J/T19RMTG4+unjE1tXVMTEzQ1taBqpoOP/zJO/z8nV8TeStmQbn7+5+w0cKK9377Ef/1w19wIfgKz58PAoIHJ/hiCG//6rcYmWyksqqavr5+SkpL0dEz4ncff0ZcfCIymYypqWni4hP4xbu/4Qc/eptz5y8qy9TT8wjHPfuxc9gDwNTUFJ1d3XR0dLL/4GE8PL14+vQZHR2dCwSdiIiIiIjI95k3JlQGBgYwMt7Iz97+NYFnghZ8Nj01xbbttvzgJ+/g5e3HzLSwFFNQWMz7H37CchVVqmtqAfAPPMePf/4rPvtyOc+ePwfgRthN/uOtn/HV0lX09r7whmTn5PLr9z/m5+/+hrT0u8q/SyYnSUu/R0trGwCzslmOuHqwWlWLH//sl9g57GF4eAQQlmeampqxs9/D7z/5ip+/82ti4xKUnyUnp/HOr95nxSo1mpqaF9xXfn4h7//uj/zxsyWUlVcAggA54e3LT99+Dx299bS0tCmPb21tIyExCYDGxmY+/XI5S5avJvjiFQ4fcWeVqibLV66lo6PzL3sYIiIiIiIi/yS8MaFyPSyCX773AUuXr6GsrPylz0OuXucnv/hv1qhpU1tXD0Duw3ze//ATlq1UVQ70ly5f5e1f/paP//AF3T2PALgWGsZ//uDnfLV01YKlllnZLL5+/vz0F++xZPlq5Xm/ztjYOIFngzh23Juf/PxX/PHzpVRWVgMwNDxMTNwdbt+O4/0PP+Xn7/ya29FxwmdDQ1hYWvNfP/wFzi6uSKXSBeft7e3FzHwzb/3obTyOeSmXigaePmX9BnP+93/8GFv7PUxMTLxUpoGBAc6cu8BRt2O8/7s/smT5Go6d8OF6WAQjIyPfpupFRERERET+aXljQsXN4zg/f+fXrNVY90qPQEJSMu++9wG//u1HJCWnAi+EynKVtbS1dzA2OsaWrTv497d+ymar7cqA1tcJFYC+vn4sNm3lrR+9zT4n5wXBrHMMD49w9doN8vML+fyrFbz147e5eDkEmUxGe0cHt6NjKSgo5Lcf/GGBUOl59JgVKmt568dv4+fn/8rz2trv5oc/eRfjDeYMDg4qP8vMyuaTz5fyo5/+kvS7919ZZ7MzM9wIu4n1dlv2OjkTG3fnJTEkIiIiIiLyfeaNCZWDh47w01+8h6q6Dm1t7S99/uBBBr987wPe/dX7xMULSyu5D/P5/R+/5IOPPmXTlm2YmG7i7V/+lqOunnR2dim/+01CZe48+oYbSE27+8qdNUPDw1wOCWV0dIw9+w7yw5+8g4mpBX19/aSmptPc3Exubt5LQqWzq5vPvljOD37yDid9T7903okJieJ876Krb8yzZ88WfH7S9zTbbOxpam55ZZ0VFZfyu48/IzwikoDAc7z3m48oLav4hloWERERERH5fvHGhIqP72l+8e5vUFV7tVCJiY3nF+/+hs++WEFefgEgCIzfffwZn325nJCr18nLL6C8vJIp6cJg0m8SKuPj43j5+JGVlfPSNeVyOXK5nKHhYYKCLwMQH5/Eu//9Pr99//fcCLtJ0IVLyOVycnLz+O37C4VKX18/ahrreOtHb79SqDx/Psj2Hfa89eO3cXDcy/j4uPKzsvIK/E4HLhBcc8x5fUZGR2loaGJsbIznz59TU1PH2LxziIiIiIiIfN95Y0IlL7+QDz76lD988hWZmdkvfX7a/yw/+Mk7mJlvobe3D1i49NPQ0Pjac782RmV2lmuhYYSGhr/0nZaWVmLjEpiYmGBsfJygC5cA6O/vZ8NGS374k3dZuUqd6BhBlOTkPHxJqEinpvDwPMG//9dP2WnnyNjY2IJrdHd3o6VjwI9++kuuhd5QenP6+vs5HXCWktKXY3VyH+aRnv7qpSARERERERGRhbwxoTIzM8NRt2O89aO3sXfYu2CLbVNzC7//5Cs++sMXCwbpispqpVBpaWl97blvRUXz7//1M5YsW70gDiQmNh4bWwfy8gupqa2jqrpGaR7HvHA54q48NuTaDeX/nzl7nh/+5F0+/XwZTwYGACgpLee37/+Bn739HsnJacpj6+sbWLZclV++9wHp9xYKjDNnz/Mv//YDtu+wp7//CQByORx29cDd4wTV1bVU19Qqy5Sbl4+d/W6iY+K/Ze2KiIiIiIh8P3mjeVQmJiQcOerBkuWrsbXfTURkFOERkaiqaaOja8RthfcCBA/GgUNH+NFPf8l//+ZDjrh6Ulu7cNfO2NgYickpbN1my//9L//Ju//9PueCgskvKCT+TiKff7WSf/33H/Efb/2Mf/vPnyyw//P/+hfOnQ+mrb2Dq9duYGZhRXRsPP39Tygtq+DD33+O454DTE5OUlRcgrOLKz/48Tv87//4EXYOe8jIzFYG8xYWFaOjtx6VNRqcPRdMRGQUHp5efPj7z9l/wEUZPPz06VNOnQrk//u3H/Ifb/2Mf/+vny4o0//6l//kg48+Jfdh/pusdhERERERkX9a/iop9PPyCjh81J2jbsc4fNQdv9OBDAw8XXBMRGQUzodd8TsdiO+pAA44HyErO3fBMc8HBwk8G4SHpxenA85y0s8fz+PeRMfGcyM8khNevsrvf908j3vT2NRMeUUl7p4ncHU/zkk/f9rb25meniYsPJLy8kpmZ2e5k5CEq/tx/E4Hcup0IO6eXly/Eb4g9b5EIuFKyDUOHXbjqNsxnF2OcichaUF5u7p7OH7iJCd9T+N36uVyeXn7cSXkOn19/X+NahcREREREfmnQ/xRQhEREREREZFFiyhURERERERERBYtolARERERERERWbSIQkVERERERERk0SIKFREREREREZFFiyhURERERERERBYtolARERERERERWbSIQkVERERERERk0SIKFREREREREZFFiyhURERERERERBYtolARERERERERWbSIQkVERERERERk0SIKFREREREREZFFiyhURERERERERBYtolARERERERERWbSIQkVERERERERk0fJGhMrYrJx2iYymcdFEE0000UQT7ftgzRMy+qTyNyEjvpE3IlSSB6b5Ve4Y/3p/jLcyRRNNNNFEE020f2b7r8wx/te9ETZUSd6EjPhG3ohQSXwyzb89GEW9dAKnpkn2NoommmiiiSaaaP+Mtq9pkl0Nk/zrg1FWl0y8CRnxjbwxofKDzFEudEt5LJXRLZHRJZpoookmmmii/dPZI6mM5nEZvy8YZ80/mlA53SmlcXyWurFZakUTTTTRRBNNtH86axifpXxklg/zRaEimmiiiSaaaKItMhOFimiiiSaaaKKJtmhNFCqiiSaaaKKJJtqiNVGoiCaaaKKJJppoi9ZEoSLam7NxmWB/73K8IatbzPfyD1LXi6IO31AZFsW9/AOYWE+ivWn7XgqVunEZ9RNy6ibk1H+D/b0fzj+S1U3IaZmB5mn+8TuqcRlNU9Aqg5aZxXc/deMv6noxi5VGKbTOQoOEv1MZZDRPC8/wL32fGyeF8zRK/1738o9hTYpnXj8hp3b0Lz9f3bjs7/L+/S2u+be8t/lj3dwk5y+59t96rPzeCpXqkWmqhqeoGp6idmxW+PeQlKohKZVDUmpGZxbdALVYrXFSTn73AI6uJ7Bz8aDg0TMapf+YQq9uXEanHC7EJqOhZ4LTcT+K+4YXzf00TMopePSMXUeOs/PAUUr6hmmcXBxlm1+HdeMygmNTMN1mz427OTRP/23LWC+RUzk4icfZK1g57CelopGm71CGunEZ9RK4lpLBxu0OXEq4KwjERVDPi806ZHApPo11JptIrWqiZea7P/O6cRkNk0I914zO/E3vo2Z0hprRGRokf71JSr1EEHPVI9N/9fuZu4/KISk1I9PUz5s4zNXxtyl34yTUjExTOW+sbJz8yycD33gP3yehUj8hp2Z0Bp+QcEy32rHvmC/6G7egqmOIltFG9Ew3o2e6mXUmFhhZWJNc3kDLrNgp/Slrk8HNzAJMt9pyLeUBteNT1E3844m8BomcxknwvngNcxtH/K7dxMRqJ3fr2mieWRztoGUWIrMK2LDVjmspD6ifWHyCul4CFc8l2B3y4ICXP4WPn1Ev+duWsUkKDzufsMFqJ6dCI6l4Pkb9d2iT9RNyKp5N4HbmIqdCo3A8epyS/iEaJItLHP69rWkK8rr6sN59kKP+56kZ+W71XTs2S924cL6M5h72ewcSV1j5F4meb9du5OR09LHvRABxRdU0SvnO9/E6a5iEysFJTofH4B0SQfPUX69vaZyEvK4Bdrp4stZgA2pG5tzOKyOhtA4n7wAKHw/S8mf2bfUTchonZ4ktqMBkyw7WmViwzsQC48023K/voFH61/OufK+ESqMUcjr62OJ4gOCYZCqeDxJ+P4/Pl6/B7cwlcjr6yW7rpeTJU7wuhhL9sJSWGTl14zLaZNDBQptza3/9783TUDsqdNhzx9WNy2hVnKPxNSp27jrN01CjcJvO/3e9BNrkCkU7+qKD6ERYpqifkNOqOP51jbadl8vbMiP8vV0ulLNxUrjOXKNrmRHuoXZsVnlf8z/vAVKrmridW0Kn4pwNEkUZx2W0zKD8e9OU4l4mhOt9vT5bZxXfnxTc7B0IZZu/xDH/fHPWplim6QCaZ6BuQq6810bpi/p67UsogR4gKqeIdcabiC8sp00OpU9GlV63+gn5gjLXS16ct2ZUGBzn34vy71NCfdVNyKkZnX19e1I8wzYZNE+93AZqxwShcju3hPTqFvoV36tT1PF8UV0vQXmeTl644+eu+02dY9PUy2VrVzzT+gk5bfKFbedVHVrlkJQrCfdonRXqtVEqfL8dFBOGWeX9zN3b3HXbZELdts6++vy1o0Jn//X2M1fvbXLoAnLaerkUn0YnL96h5mnFsxmXKdqhUCcNky8+70CosxZFnWW1POJGehblz8Y4H53Ireyil96xRunCtlj3ig67ZnRW2UaVx8qFsrXLFfeteIfnl3l+u5/73qvadPO04tqKe5v7t7J/Udxr57xzfH0AbVfc+9fvoWVG0fdIX5R77v1vk8FjILG0nssJd+lXnGNOQNeMvji3sn6+QVw3T0NaTQtGVrb4h0fTKJFSN/7XGchf7oNnaZTOcDOrAL1N27mWlqVYYn1T55dRMzrDfu8ArPcfpbhv+K83uE9C1bCUTQ5OmNvvo6q3j0OngjC2diCjuQfPC6GYbHOg5MngS23tVe909fA0zj7+rFTT4czNWAoe9fGws4/Dp86xYq02/mG3hQmqIrRirp9olKJ8X+slfKclwe+VUGmYlPOw8wnBcanKGIS7tW2s0tTjzM04mmeEyix5MkrBo+fUT8iol8hplEL0w1LORSVy+U46IUn3OR+dSGRWEaUDowTdTiQk+QHXUjIIik7kTkkNTYqB4HLCPSKziqgckhJ+/yEhSfcpHRgVPp/3wOomZFQMSogrrORefQeNEsF9HltQwd3aNsUAP0NMfjm5nf00SmQ0T0F2Wy/nohKIyimmakjKnZIa0qqbFyxdzQ2WpQNjQhlvJ3Il8R5XEu9xLiqRhJJarqZkEJlVSN2YjAfNPdzMLKBmdJp24F5dO8kVjcrZRVHfEFE5xZQNjNEyAwmldRy/EMqdomoqhya5lVNMXtcADZNymqYgobSWwJvxXEvNJK97gNZZKHs6ztXkB1xOuMvVlAyCY1OIyikmOq+M0LQsKp5LyGnvE+o5s4CGSeHaLTOQWtXMuagELsQkC/cTlcDNjHzii6q5kniP+w0dNE4KbuiryQ8o6HlG0zcs3dSNyygdGOVSXCoaeias0TYgp72Tpim5wjUqEwaGkRlu3M3hXFQCVxLvCQJB8YK3y4UZfFBUApfupJNc0SAMvHLI73nG7YellD+boHFSiH+JySv7WntKIvx+HmVPx4krquJ+QyeNCi9EbH4F9+raqZ+Q0TQNt7KLOR16i4vxqdzOLaF5Gu7WtZFS2aSIvZJR1DvEneJq7tW3cz46iZTKRurGZYTff8ilO+lktT5+ye1bNy7EdGS39XIhJpnz0clcTX5AcFwqF+PSyOt6Qu3YLLeyizgXlcDlhLuk17YJ35838DRJofDxIP43bnM+OomQ5AcUPh6kcnCS27klVA1JaZgUll+TyupJrWqieRryup9yITaF8Ad5VA5JSSyrI6m8geqRl9tyxXMJN+7mEKQox5XEe5y9lUBMfjmRWQWEpmWR1zVAfs8zIh7kUfFcQieQ2dxNUnm90B9IZJQ8GSUmr5y87gHaZJDR1M356CSCohJIqRTKJcyoZbQjiESfK+F08KLumqeh6PGg8nuxBRWKzvlFnEbN6Cyts5BYWsf56CRC07IIjk3hWmomSeUN3LibQ3xRFQ2TcCu7iKDbiWS2PKJlGurGhHZ/p6SWoNsJBN1OFNrHpEz53OrGZdyv7yC2oIKK5xLqJ2Tcq+8gNr9Cca9yGiQQlVPMmch4riqeScvMC4FW3DfM5TvpBEUlkFBSo4hrkNE6K7xzN+7m8LDzCeejk4jIyKd2XLinmxkFXE/PpmpoioedTzh7K56YvHKhD1K8s2VPx7iScJdzUQmE38ulYnDylZ6KRimUP5dg4+yO69krdPJC2NaNy+hAEL5z4v3rwvfr1joL3UDLNFSPztIyLfz7m5bv6sZldAJXUjLRNLEkpbJpoeBTTAz+1ASocXLeBE9hbbNwPjaVDTa7KewdUk4Y2mQvBP38cjdN/elJ1uusSQp3SutYqW1Eel0HA4B/RBzrzK3J7RygSSrn4MmzbHU6Qs3o+Dd6jhonheXPP36xnNM3opRla50VxtE9Hif5fOkqIrMKaVXEhN3KLuJ8dBK5HX0U948QmVVIUe/Qd/Kufq+Eylwja5IKM6pGKaRUNqGioUtwbAq9CI3ldNhtLifeU6rBoKgEVmvps8PpAFpGG9HQ38D2vS4c8j3Lmch4bPcfREVDly+Wr8HK8SCX4pOoGZ1kn4cPS1Q0OBUaRtM0uAUGs2y1Bo5Hj1PcP7hASTdNCd4e1XXrcfL0pRvhYa/W0mOfx0lKBwY54HWa9z/8hItxqXQD6TUtWOx0RM9sM1sVXiJNA1NcfM8oA4YFNSyjuH8Ix6PH0TQyw2rXAdR0jVlnsgn7Q4exP3wMi52OfLZEhbTqZlJKK9HQN+FU6C1u5xby5Yq1qK1bT/mzcVplcDu3mC9XrCWprJ6we7loGppibbeLfR4n8QoOZcVaHeIKKmmSyonMKsDW2ZVtDnv44KPP2GjjQF53L9dSM9i214W1uutZqqLGFvt97HX3YavjAZaorGX7Phdc/c9jbuPIH79YTlxhFW0yiM0vR9PAFKNN29ji4MRXK1WxdXbD4fAx9rj5sEbLAKNN2zh6+jxbdx9kqYo6+4/70SCZfu1yVL1ETm5HPzv2H+azJSvRMbYg/H4OrQp3c4NERu24FO/LNzDYuIWde/fzxbLVOHsHUP50iPYZyG3vZK+7D1aO+1FRW8ey1erEF1eTUduAttFGVqnrktXyiA7gQkwyq7X0sXE6gPZ6c9T1TLDe7YzH2Qs8aOxCVceIg94B9CB0WipqOjgd86VpCiIzC9ExFtyt6y1t+N3Hn+F7NYLPvlJB12QTJf0jtM5CdG4pny9dhbNPIFqGZmgabsDZO4CdB1xR0dDFatcBqocnX7RBRUxAem0bptZ2rDPZhO2BQyxdpYHZdgf2uHoQV1iBz5Vw1q4zUt7nGm0DSgfGlKKnXiKn4NFTdh05hrbRRjY7OPHxp0vY4uCE49HjvPPub7iVVUibDMqfTWBoYc0eN28KegbY4uCEgbkVW3cfwO9aJEYW1uxx96ZRMvOiLUtkVDwbxcnzJFqGZmxx2I+GgSnrjC3YefAQds4eWNru4aM/fklqdTMZzV2orVuPV3AoSSVlqKjrslRFjfzup3QACcW1rNbUJzQtk4cd3Wy224f1Hmf0zaxQ1zMh7F4OdRPCJKd5Wob3pevYOrvRqgiybpiEvO4B7JzdMbDYiqXdPlZp6OF37SYNklllp9wwKSO7tZP9J05hts2BP36+HD3Tzex29+agdwD6G7ewQlUL9zMXcXT1YsVaHTZuc6BmcIR2OdxIz2bnQVesdu3Hatd+IrOKlO1TcMnD/uOnWK2hS05bL62z4OTpi4qajqKcMs7cjMNo0zYs7fagabCBLQ5OZLX10DIl52FXP55BV7DZ58K6DZt477cfcTnhLp1AckUDWoZm2DgdxjXgAgbmVmgZbcTzfAj36lvZ4XSEpas0cDjkifPJMxhZbmPZag2icorpAEoHnuPiexarXfvZssuJw37nKH0y+tLymdA3y7iS/AB9SxuK+4eU3ue5ZdmLd+7i5BPIjXu53G/o5FLCPYr7h4V39GvnqhmdIexBHu5BISRVNPIISCyv52jgJaLzypXHvXJglMhpkMxgbr+fAz6BNEsF0VU/IaPiuYTYomoyWx8rxeKrxpnstl5iCiqpHpkWnoFETnH/c/Qtd3AlOYPmqTmv7AyXkx7gcvo8WW2Phfc3v5wjgRdJKm+gaerbD+x14zLqxmbZe/wUm3cf4gnQNgMb7faxy82H6pEJOuRwv6ETXXNrLiXep5PXe/rrJLDJdg8r1mqT0dhFRnO3cvUgo6mTuMIq3vvNhzi6nqBtFgIiYlDXXY/pVjvcAi/ie/UmXy5fQ0pl83daRv/eCZUFKlEKqdXNqKivQ8fYAsejx9i62xn9jVZEZhXSCSSW1bNyrTaB4bEMAKX9zznqH0xKZSM1Y7OEJGfwFHA67seRU0E8RXB3+YZE8OmXK8hsbKFqeBz/sGjKno6TVFbHirXaeF++QZv8xQNrmoLczn6015tzyCeQLgShomkgDDDFfc/Y4+7Dx58uISTpPh2AnbMbqtqGNEjkZDT3sMl2D598uYLbD8sWzBhaZeB96QYaeiak17TShzDguwVeomZ4nNy2LvK6B1BRW0dgeAwDwLlb8SxVUcfnSjgufmdZo6lHSJLQmGPyyti+9xBJ5Q2s1tTH7pAHE8DF+DTWaOljZLmNysFJHjR2sd5yOxH3HzIMXE/L5sPff47DkWNEZhbQPgO+VyM44HWK5imoGpKQWtnItj0H+WyJCjczC2iVgbbRRpx9Aih49JT1ltvZ7epFu1zwfnmcu0RkZiF1EzMU9PQTGB7D7z9dygEvf7qAI6fPo65nTE57n9LL9SprnYWygTH0TTcTk1dOBy+WrpqkcC0lkzVaBiRXNDIIRDzI4/0PP+HYhWvUDo3heOQ4Tsd8GQAymrpQ19+A/kYronJK0F6/ES19U3I7+rnf2IWK2jpOX49iACh7OohbQDB3imvoBXI6+tEwMOXIqSC6EcqrrrueQz6BdMzC/uOnWaGqTf2EnB7g7K14AiNuY+/iwVodI27czaUbiC+qRmf9RtJrmrhTVMWnX65g+14X6sYkBN1OZIWqFum1bcoZXL0EKgcl7DhwBHObXVQNSXgKnLkZS2B4NI+A0idjrNbUx/HIcSaBvM4n+F27SdnTF7OxRikkldXzh8+WcSXxLs8RPGo+V8I5eSUMHRMLHA57UDc+S/lzCTud3QiOS8Xz3BWWrlKjbGCMgkfPMbfZxVKVtVxLyVjQgXYC527dYYWqFneKq+kDUqqacA+8SMWzYQoe9ZNa2YyW0Ua8LobSCYQkP2CVhh5ugRc5fuESy1ZrciE6iXbgTnE1Nk4upNe0sGP/UXbsPyLM2GfAeo8zXy5X5V59O11yyO95zgpVbXSMzSl89Fzxjs1w+FQQRhbW1E/M8hhw9vbn40++Iiq3mEYp1Cne76jsEu7Xd1AzNoPBxq3cr++gHchtf8z1tCy+WrGWzfb7qBmdIOJBHl8uX0N8cQ3ptc0c9PYnpbKRHoRlrfkz7Tmh4uJ7Fk19E3Lb+2idhUM+gajrrqdlFhLL6lira8RVRX+VWt3Cp0tUsHV2oxtw8T3DjoOutMqgbmJWKa6TKurYuN2BbXsPkdc1wK6jx3nYNUBoWhafLVXh5JVwCh49x8J2D18sW0NcfjH1ElDTM+bI6SDKnw3jcyUC36s3aZQKE8F2Xr300yCByueTbGT+JSkAACAASURBVD/oxo5DHrTLhQll/bic5hnwuhLOMnV9nI55sd87gLWGZmywcaSwd+il5fQXQiUbk20O2Lt6kVpagYObNw5u3tzKLfmTu266EDwQOmZWPGjqpnlaWHYvePScXe4nuZKcIZTxlUIHQtNz2OFyjIpnE8KS3qwgtNYabiSjqVvYjaYoZ/CdVFQNTDkWHEpkdjG2h4/h5O3PnZJamqe+/dJQwwRUj0yzznwrh06d57B/EDaHPDl65hIFj54InkIJVA1PY73/KNud3WgYn3rlMlT9hBD+oKK+jjVa+mQ2dbN9rwvWe5zZ4uDE/uOnuN/QwQcff471HmcyWh7x6Vcr8Q2JoEcxLnzyxQos7fZSPy79TjE/olCpakZFQ5ctDvsJCI/C83wIFra7Cc/Ipxs4HXoLVW0DqkemqJMIa69el26w2X4fhY8HaZTKKH8uwWrXAU6F3hI69IExjMy34uDiwQAQmVnAHz5bSnReGe1ysNl/GBOrndSOSpUNQylUjC0WChVDU5w8fekE7ta1o6Khy6U76bTJYZ2xBVscnGieFsrl4nuG1Zr6ZLf1LhAqncBm+33YH3JXui0rn0vYuusAh08F0QMU9Q6xREWdU6G36ECIOVmiosa11Ew6gZ0HjrLP8yR9QNDtRMLu5pJc3sBnS1TwvxGtiNeRom9uxba9zrTMCC7sVZp6pNe00DIruGs3OzhhbuNA9fAUvYDj0RM4+wRSPyGjTS649M222WG9x1m51VnfbAsufueIyS9Hw2ADtx+W0onQWcfmV6BtZE5GUyePAb/QWyxdpUFx/wgdgGtAMGq668ls7n5tXEadwrt2NTkDdT0Typ6Nz5vBCy+8vYsHhhZbhc5FIrjELXY4Ymm3h7t1HRhaWHM2Ml4ZD3Lq+i2WrdGkamiKgPBYVmvokdvRz/noJFZr6lM5OEm9RBh0fEMi2GS7m9KBUfK6n6JpaLZQqOgZ4+wdQMsUFD7u40RwKJZ2e7GwdSSlsonHCDMbix27cfYJoG0GQlMzCYpK4BFwPS2LJSvXEl9UxSPgTGQ8Kuo6JJbVK4VKo1RYotIyNONsZLwQgyCRU9Q7iI6xOTfu5lIvkXOvupYj/ucx3mTFrqPHqR6ZWSAA68ZlVA9PcTOjALtDbhhtssb70g3aZdALhCTdR13PhOqRaTKauvG+dIOi3iHMd+zCaJMgcLuAk1fCWb5ak5TKJmXsTd2EnGapHDtnNyzt91IzOk3rjLAOv/OgK07H/OgH8rufoqptiOfZS7TJheWeFaranI2MZwjY6+GD/SF3OoCwe7mcu3WHzOYeVNR1CYpKoEHxXCKzCvnoj18RkZFPD4InbKmKOgdOnCa+qEq5TLzOZBNHTgfROgtN05DR2MlKNR3cz1ykblxIg1A7LqNqSErjJKRUNKBpYEpR75AydiMqu4ilq9QJu/+QXoTnt1xVi7jCSvyuRZJYVk+r7NXb0RcIFYMNC4WKnrHQxq5GsFbHiKyWR7QrYkQcXU+gZWhGfs9TTLfa4uwTQN2EnE5Fn7VGywC3M5dYq2PE5YS75Hc/Y6/nSdJr26gclKCz3pxj50OoGJxk/WYbdh505YmiL9Feb85hv7PcrWvnaMAFmqf5kztMGiehsHcI9fUWuJw6T4ti+32TFEJSMvnj0jWcj01hHAh7kM97H37O5eQHiuWVVw9+PcDDrgH0Nm3DzHYfMfmVdPPykswrJy8yuJlZyEptI2IKKmmTzQmVQfb7nOH63dwFS0ILnokEbmYVcSTgomIpTk4H4OwXhIaxJbmdTxa8N93Ag8YuNIw3YbXXhbSaNuV7/V2WfhonIamikZXahiSW1XM1MQULeyf8rt9WlFlYzuyUgfv5q6gZmvGw6+krJ3NzqTxUtQ1Yo6VPRmMXTp6+HL9wDbfAYFz9L/CgsZNPv1rFjgNHiHiQx8effEX0w1J6EYJ5l6qo4xpwgS6+W+Dw916ozC39XIhJpgchKCw4LpUb93Jpl8nwDQlHRW0due19NEqF4L6rSQ9YqqLO/YZOOhFiE8y22XPmZhyPgdKBUfRMLTlw3I9uILG0Fu31G7lTXEPzNOxxO8G6DZaUPhlT5piYL1RcTp4RZk1S0DIyY/8xP8FNXVLLclUtLt9JpwPQMdrI9n0uNE7CI8DpmB8brHZS3De8wL3WieC222S7h+qRaZqmhEHe3sWT9ZbbqHguobhvmCUq6viHRdOBEMy2Uk0H/xu3hYE39Ba6ppZkNrRzQbHumFBSy+dLV3NOMbCV9A+hY2yB57nLtMkgKCoRFTUd0qqblYGJezx82LbHmSYpNIzPYrHTkaOnzyuDHEv6RzDbZse2PYcUQcMz6Jlu5vCpIGLzK1BR1+F6WpYykDOnrRcV9XUERMTxCPC9FqkUa21yOOp/AXU9Y7Jael4rVOZ2gzkcOcb2vYcW5IIRPA2TWO3aj/EWGyGIdkKY4dkdcmOL/V6SKhpQ11vP2cg4OhE65CuJ91itpUfZk1G8Lt1gjaYeD7sGuBCTxIq12mS1PFLmGbmelsUSFTUymropfDyIpqEZR0+fpxshAFVD3wQX3zM0SSEw4jbbnVy4nHCXiAe55Hc/pUkqCNVjF65htGkbue19BEUlkN/9lE6EQU9FTUcZ7Bx4Mw4V9XUklTd8Tag8Z7WWAV4XQ4Xg33FhFqhlaMahk2co7hviwDEfXPzOcisjk8isQmpGphcEZTZMykmracFm/xF8LocRmpZFUlkdDRKhzRU+HmS1pj430rNJLK0jJPEej4D1ltsxsdpJ1ZCUdpkgMPVMLcnvfqoUKvUSqB+XY7P/CBusdlD2dEyRI0XGQW9/dEwsKH86Sl7XAKrahhy/cJVWGWS1PEJFbR0+IeE8QhAc2kZmpFU1cTnhLg+aukipbGLpak0uxCQLuUBkwvv25XJVwh/kUT8xi8nm7Rz0Ok3Y3RyuJj+gCyHWaq2OEUf8zwvB0BIhXkVNdz1H/YOEWfvEiyWaJqnQNjQNTakdnaFxShiMIjMLWLZag7B7ufQgxAMsV9UivqiKkyERZDT3vDauYr5Q0TI05WFHP20yOOx3DnU9Yx4BJy6GslJVm5z2PmUwq9uZi+isNyehtA49s80cPnVO2V/EF1WhZ7oZtzOXUNUx5GrSffIfPWePx0nSalqon5BjZGHNEf/zlDwZxdTaDrtD7nQiCBUto40cOXWO+/UdHA++JvRHf2J3WqMU8h89Y7mmAa5nr9AyLbxrDRI52qZbWG9tT+24ID5cz15G23QLBT3PvjHepGFSWGLcccgdF8U7NX9G3yhFEYf0siehdRaicktZoWXI7bxyZZB31ZCU/d6BXIhNfeVySd2YEIcWHJ+Oe1AIVUPChLQT2OV+Eg1jS/J7nr0k8OsloGtuzZmohIUBx4q8Tn92jirF8X7XozDcspOKwUmGgEsJ99E0sSS9rkMZpN4D+ITeQlXPhJyO/lcKlbmy7TzoKnjNCqsofzZGOyjiDUeJyinm/Q8/wfPcFUJTM/nkixXE5JXzCHjQ0Im6nglnb91R9p+iUPkzrWZUUMwZTd2s0tLnXFSCMtq/eRpKngxz+sYtLsansXyNFl7BobQjBDh5Bl1h2RpNslofKz0dmvobCI5NoWNmlsLHg5jvcGSz3T7FizGDq/8Fstt66QB2HjiCgflWKgcnXhIqWoqlnwEE78IaLX2cvQNomJzidm4pK9V0uJ6eTePkFGbWtlja7hHWgZ8Mo2lgyk5nN2pGpyl7Oq7MP9AmA89zl/lyuSp3a9voAyqHpBhu2saWXfupHZ2muG+YL5er4nctkudA+P2HrNHUJ65QmIGkVDShu2ETOw64cqe4mjaZjNyOfr5cropvSAQDQNjdXP7w6VIiMvJpnZrB53IYS1auJbGsjn6ganiKTTscOREcSssMFD4eYp3JJjzOXqJBIqdqaJzivmHBo7LbWbFzSBAqzicDedjRi4b+BmycDtMkFWbosYWV/OHzZVxLzqAHQais0tD7VkKlQSIs++iaWHLiwjXBXT8nVCbk1I7N4Bpwni9XqBKbVyYEvU2CoflWPM5eJk2xfOh77Sa9CEt/bmcuYm6zi06ZnBPBoajpGPGwa4A7xTV8tWItx4JCaJcLrvATF6+zdJUGuR1PKHj0HA2DDcplxLKBMVZp6OJx5hIPO/tR1TbC3GYXXcAAQqeZ29FPq0xYxtDUN2W3mxdJZXXUK4IPQ1MzWblWm6ic4tcKlQbF0o/5zt2sM9lEo3SGR0Bmcw9LVqoREBZNUnkDH3z0GX7XbjKGIOrze55R1DukrMuWGfC+HMb//O6PZLb0MIiwQyS3s5+KZxLqJTIcjhxDz9SSC9FJ1I5P0S6HbXsPYWBhTf2EnKohKbobNrHFwYmakWnKn08o1/nbZeAfFs3nS1S4/bCUPoSBx3zHLoy37KBmZIrCR89ZramP+5mLwjJnYRVr1xkRdk9YFsvtfMI6k004HPLkRlo2rTLIbe9jjbYhVo4HqB2bpR+4FJ+O2joj0mtbuXEvl6Uqa4kvLOfG3VyC41J4DBT0PEPfbAtaRhupn5jmMQjLu2o6XEvJWNCW5mJafEPCUdczpmZ0mvLnEurGZ7iVVciy1RrcuJuzUKgUV+MWEExqVRPdCMudX0+oNl+oaOibUPR4kC7A/pAHGgYb6AICwqL54KPPCEm6T5+i/VrvPsh2p8OU9I+gZWTGHg8fWmaE9yo4LpX1lttJLKnG0Hwru928yGnvw/lkINltvdwprkbLwJSYvDJqRqYxsdqJrbPbQqFyOojU6hb2n/BbsMvpdUuwjVIoePyc1bomHA28RMu0MFlLLG/g81WaBEbeoRvIaunhy9Wa7D1+irY/kVCwaUrodywchFiTHoTrzy1nPOwaEDxEQ9KXYmZaZ4XA9RVahkTnVyi9Jx1y8LoSgb2rlzLYeMG4MiN4Yc1t93EtPYcGiVwZoLvvhD+aJpvJ617ovWiQCOU03bEbn2uRNEy+CPhtkEBm6yPS69oU7eibxzbBQyxnp4sHe4+fonpkShAkV2+yZK0uKVXNyjJ3Aycuh6Gqv4HczifKHV9fFxONkxBXUMknX6zA9qCrcvdgl6IPsti5GxUNXTKauojMLubL5apEPMjjCUKM52dfqRBXWEX9xAxlT8e/9S6u761QaZDIyGl/jM+VcD765CvsXTwJf5BH2L1cYvMKsLTdi2vABWpGJvE8d4W164wICI8h6HYiGgYbOOh1msrBSdpkkNPexxotA7btPcTp0FskltYRHJuCmq4xgRGxBIRHY737IBdikrkYl4qmvgmBEdELcgM0TQkuazU9Y1R1DIm4n4vbmYt8vmw1xpbb8Q2JICIjH00DYSC6EJ3IySthqOoYERAezW53b7TXb2THgaO4BQQTFJWgiLqXUy+RU/h4kC27nIT4m8wc3M9cZMlKNSIycumchcohCda7D6JlZEZ8VjY2+49w2O8cNaMzNE/JqR6exGb/EXTWb6TosTDLrR6Zwv6wB9pGG7mZmYOhhTX6Zls4cOI0rgHncfYJ4H8+/ISDXgHEZGVz5NQ5bJwOUzIwQvO0nPKnIxhbbsfQwhrfkAiicooo7hvGwHwL5jaOC4TKXs+TdMrgeloGX61Yi2dQCOEZ2awztcR6jzPFvUN0IAz6XyxbQ2bLoz9fqEwKM8hVGnrE5JW9tN7dJJWT3/NEGJAMzQi7m8uxoBBMtthQ0vucjKYulq5Sw8RqB9fTsrmelsX6LTZEZhfRgyAMVqrp4OwTSFROCR5nLqGmux7/sGguxCShaSh4zerGZ8jvecYaHUPU9YyJeJDLUf8LfL50NaZbd3Ii+BoOLp6s1THE/8ZtIjJysd59kGNBV4TOd3wGix2OGJhbUdw3otxKeiXxHp9+tYKbGfl08WqhUjs2S/O0nPsNbazS0MX+kDt3cnLZbL8PTUNTSp4MU9j7nPWW2zG23M6NuzlcT89mveV2QlMzlEmlGqVCDJO6njEOLh5E5eTiGRSCpd1e7tY20y6HqykZfPqVCjfSc2iZFQaO0NQsVq7VxjckArczF1mxVgvHo8fZ5+nLpbg0KgcnqJuQ0zgpp6hvCBunw+husORqygMCwqL5crkqwbFJSve83SF31HTXcy01A1tndw6cOCV4MKRCm9rj6oWarjE5Hb00TQlesHO37rBstQYHvf0Ju5vNZvt9uAUGk9f9FGOrHZhutaV5BrJaujjqf56A8Bi8Ll7nelomy9dosdXxAPHZuTgeOcauo8cpeTIi7PyZN4A0SOFiXBqffqWC+5mL+IfdpqTvuXJ5+GpKxgKhEldURWRWPieCrxGalkVoejaxBZWUP5tQBofPCZWjp8/zm//5GK9LN7iadB81XWM+X7pK6IMiYtjteoIVa7U5H5NMcGwKJpttiMkrobh/BB1jC9bqCDEsl++kY+XgxMW4ZLplEBSdiJquMQe9/Nmyaz8eQVcw3WbPgROnqBmRUv5sgnUbNmHleIAuXgiVw35nyevuxyPoCsGxKYTff8j19GyyWh8pvCuyr/XJgvfD3M6JnYc8aVdsh06raeWL1ZqEZ+TTCxwOCOZ/PllKUHQy2W2PqRoWxG4nC1M3tM4Kf7udV4653T4c3U9S+HiQ7LbHVI9IyW7vZfNuZ1QNzBQ7QRfmJOoAguPSUDcyJ7W6RenZa5RCwaNnWO8/iuvZyxT1PqELYdDuBfK6+3Bw9cLBzYfSgVGlkGqTQcDNeFbrGpPZ0qP0arTJBAEXEBGLo8dJdnv6UjE4KXjRpEKAu9FWW1brGhOeka8UVHXjMtoVW/Hnl7thErLbHrNMQ4+Am3H0A1mtj1imrsu2A65UD0/SIJnLKivD3tULM9s9VA9OkFxeT/iDPEqejC4455ywO3PzNqo6hji6niAqJ4+IBw+x2n0Q3Q2WhN9/SMssFPUNYWm/F1NrO4JuJ6BttJENW205dj6EE5dCuVNc82fnbvneC5XWGTnXUjIx22aPpf0+NtnuwXyHI+Y7HNm43YHN9vu4W9umXM89dyueDVttMbHaiV9oJNUj00LnrFi/O3frDobmWzkRHErlkJR6iZyzkfEYbtqGs08AJf0juPiewcDcihMXrytzq8wXKjntfWzZtZ8NW20xtbYjICyas7fusMXBicCIGGrGZvG5HIahhTVXUx5QOy7jbGQ8ptZ2bNzuQGJJHbeyi7DefZC0mlahQSuuIWQOBIfDnhhvtsHSbi9R2UVCjpKxWZqm5OT3PMPSbi+Gm7bhfTlMuMfJF9vlYvLKuRiXSpvihW2Syil9Msq+Yycx3mLDHncf8nuecSI4lIPe/pwOjUJtnRH7j/lhYrWDHQeEvAFzM4W2WTlXkx9gutWWg97+VA1NUTU0iWfQFU5eiaBBER+ia7KJvZ4nlTlrbmbks8l2D+s3b2e36wlljo6mKTlh9x+y1+Okcuvl4VNB3yxUFHljTt+4jYXNLioHpa+cobXMCstMds5ubNhqy7Y9zuR1PaEbIZ5Hy9CUHfsPY3vwMGbWdtzOLRHcyjNy0mvbsDvkjpXjAR52DdAyA+ejEzG1tsNkyw58QyKoHp6iTQZZLY/ZbO+EqaINBIbHcCYyjs32+zgXGU/9hOChMd5sw4atttg6u1E1PEW9RE7rjDDA3coqFNrluIyWGTkJJTXscfMiraZFGZH/KqFSOyZss37Q0Mlm+32YWtuyba8LeYoyz21ddnQ9wYattphtd8AnJJyakel5OTcEsRJbUIHVLidMre0U2WlzFbNfOQWPn+NzOVwxaxMGrCYpnI9JZuN2B8x3OHI7t4SE4hrMbXYJg8Q8Ud84CdVDUpx9AjCy3MYm2z2EpmUr36kGiZy8zifsOHAUA3MrjvpfoFaRabR2TNgNl1hSy4XoJOWstn5C2IoeHJuCuc0uDC2sOR0aRcuMMFDYOrtxLSVDiCmRweU76RhvtiHsXi4tM4I4m+sf3M9cpPzpuLC78KUJkpyK5xJsnI5gabeXyKwi2mfkpFY24Xj0OIlldXQDV5MfsGy1JtF5ZXQiBMObbbPHbNtOzHc4CttAZfPKLpHjczmMteuM2GTriO1BN+IKK7He44yj6wmK+4YoezrOgROnMdq0ja2OB0goqRGCeTv60TGxYPveQ2zfdxizbfZcjE1RLP8JW+JjC8rZuN2Bpas10TIyIzAihiapIDLLn03gfvYyp29E0TYrxHBoGppx0Ps0LTOCV26zvRMbtztgts2eQz4BC3aKLRByEhleV8LR2rCZ+olp6iXCctkmeydMtjtwwOcMBpY7CE1K4+iZy+ht2k5my2PCM/I4G5VAXvdTGiTC7pzYwkrczl7G7VwId0prsbB3wmqvCz5XIynuH+bc7UQ8zl/lbl0be4+dIr22Tdk31Y3LaJsF2yPH2XHIg5phCfXzPC7N0/CguZsdhzzYutcF75AITobewv96GFv3HWaniyclT0YXeE0apXIeNHWwQtOAyOxiWmeF/u1WTjHOfuc4GXqLhNIa1NdbsNvDF++Qm/QjeGEuxKWSWt3M1n2HhWcuEXIVXUq4y6kb0VSPTCt3mLXMQGh6Nis1DXFw88bvRiTrre1Q0V5PanWj0pvSPC14Fw237OBUWAyPAbfAi2xxcCKzpeeVu7I6EcICTKx2Ym6zC7Nt9ti7eFL+dFwpPpqmhGe+68gxDC22ctDbn7IBoe0du3CVysHJb50w8XsrVGpGFyZp6kCR9IwXiYnmkkDNBaDOHdcyK6zfLxjIFEnI5n4bZv53lMnYZhcmA1swa5+Ce3VtOB33o3RgTNjrPzMviZlifXJultA0xUvlalR0HHPJub5+jTkFPnevX3fBziWoe3GPsgX11SR9ObhrfmKfNrlw3TaZoPJPX49m5Vpt7tW38xhFwp+JhW7SuQRbrfPWZFtnFcm2FOvBJlY72HfMl3rFrH3uHjt4kaROWcapF4mFWqaFZQg13fUvCZW5a7fLhXJb7TrAxdhUGiSv3wkwP2nVXB0LeV2aWK2hy7moOzzhRWK7uevMJTqby/lQ+6r2NCGneQrSqls4cOIUZU8nlPkeXtUGOl5z/83TC5/r/GRbjZNCmYPjUlFR132lUJkTAvPfh/ltaX6itfZXtJP57Xn+uzS/THPvwkticF6dNE29SC6mTB449rV2J3tRjq/HKczV+dfb1otB4+Vkci+954q4inrJwmvMb7dz9zU/SZ5yaeY1fc9cPpB2XuTimCvv3LO6cTeHNVoGROWWLEhm+AQIu/+Q8zGJyqWI+gk5VcNT+FwJ49KdNPoV7+JcAsI5V/78d3XOW9EoFYSKlpEZLn5nlcnyvl6fbXIo7h/B6cQpMlp66GDhktaL38WSUz0iQc9sCwe8TlEzMkOT9EUiuS7A/exlslofv7LtNU0JsVKmO3ZzIS6NR4p3Jr22DUePk9gdPUFCWT39wNnbiRy/FEZx/zD+N2Ow3HWAc7eTFP2MnOD4dBw9hODfugk5gbfusNPlGPk9z6gZmeJwQDChaVkU9Q7h6OHL7bxyWmeF59EJ3K3vQGvDZsLu59Ehf8V7oqjfc9HJbD/oho2zO5t3O3M56b7yWX79O20ycAu6yvYDbsq2E3AzHntXL3I7n9AyA+5BVznoe1YIth6TstPlGNH55ZQOjGFmu1dI7z8phAa4n7+K0VY7bj8sU8bedABHAi+x2fEQnheuY+Pszr4Tp7nf2EWb/MWY1oGQ08Vwiy35PX00SoXfEJurv9e13/mJONt59fHz+4m55IBtsu/+22nfW6Gy2KxlRthCqKptKCTxWiQp27+LzS0BnAqNYrWWPvcbOr9xa/DrTMiGOMVm+z04HfdTCpU/9/tdwNmoBFS1DchufbRAqLROywm7l8OFmGSickuwcTpMUd/wt/7RuZYZSKlsRG2dEecVW16/a721zgpLUKrahsTmV7zxNjD3XK6nZqOirktyxauFimh/X2uTC8G1moam3MopVgqSpikhLig0PZug2wnKvzdKhd0yZtvsOex37lvtrJgTKhoGG/A4e1mxo+3lQapRqvCmuXmRXNn42nZTNy4kxlu/2Yb9x/2oGRVy4MxlGm6Xw9GAYLJaXi1U5nb53MotQdfcmrD7WXTIBNHVzYtkbdWjs0qh2iARllxuZhXhdTlCmfahdVYQRnPXmYsJE2IQRzkSeJFrqZkU9w2z28OXaIVQaZmBrLZuzHbu4eS1W9T9iZ8EaVOctxvhv3OerldZ/YSckv4RbJzd2X3Ml2bFxKqbF8JmTtA1TkLd+JQgVPLKKXs6rhQqc8LzMRAUk8LlpHvC+SVyGidnMN5mj8+1SHoQNlrMTx4neK7gUsI9DLfsJKGsmjbZd08s97cwUagsEmuZEYLwlq/RIjQ18x/6N4bmtrO5nbmI7gZLSvpHvtMv6M7txtm+z0XYg68475/7/Q7gcsI9VqzVJr6oasEsXvD4RPHBR5+x2X4faVXNih/3+3Zqv3UW4gurUNcz5mZmwV/03Npmhfwny1ZrEnY356/SBpqmILm8gSUr1xKakin+wN4itFbZi5ipi3GpdMmF4Hf3c1fQNbXA8ehxstt6lUtLjVIhq6zBRiv2uHsrt7X/ue3hXn07qzX1uJJw97Xbbf9coVKr8PhtdnDCatd+KgYnaZ+FhJIaNu3cjb7ZFq6nZ1M3IX3tpKN+QvCa3sopxvbI/8/ee/5FmXX9nn/HzLw4M3POnDnznPOEO3W0zSJRguSoiAExoGICFRVERcSACphAJakgoojkDJJzJXLOkouigKrvvLiqSpK23Xff3X0/7Yv1UaCuuva19t5rr2uF3y+A1xV1H+X60ZJPngy6zQHfSxT39P8o8qnWhtx6/ppztx8QX1TF/jMXdRGH4s4BDp4NJDgqnrqxGeFZf8FDXKYUUJi9r97m6uNnn3yJawdOBIYQ8iyJqKxidh/3pWFSiFhUDk3hef4yh84HClD8mghvYmkdRjYuJJbWLcN596Vy8QAAIABJREFU0Top8cXV7DjiwzMN1MPv2UlpmPziqPxuRDQ1T/XINNmyTioGJn41bot/pBR1DJLb1P13f09Bez/Zss6ffJ1YPk/F4CQZ4jYqBicQy5f/7VVFA1nSDsTyn0c+JpLPUzk0RZa0Qyhw/DvmTTQ1T/V7zRoYnPyHrAHR1Dx1Y0rSRS2U9o7+p1hn/9lEawsyxG2U9IwgkQuMvumiVp7ll5ElbV/k+Ismhb/ntfRQ2DGwaJ1/1r3eT5MpadMA9338c7WjMxS2D1D9fvqT60Y0NU9BWz85jV3Uj88imRYoHRJLanheUKGhUPj0C4doSkhDFLQP8K5n5KN7UzQlUDGk1jfrWrg/59CVzUB+ez9uXqcwsXflcXoBMqVgF6qG5WRKOz4wBf8DDnGZUnA+sxu7PhkllioEfBWbnfvZaGZLprQDiUKtwyt6UyOloH1ASKlPqehQC63bjh5HNDhfK5cACEXFvZ+FJ/N7kC+Oyu9IRHK1DjHwtx7LLyFajIK/93u0RXs/9TotkWPT3PIcqrYuoHn+Q73Pzx2fWDtvvwC5mOgX/K6P3kNTi/Fzolxf5NcRkVytm6OFBKTNqo/vBW1dz089WEVTKhrnfpwwTps6/JyopharqWFyXkf+qCU3Xdha/WMinfk8IrtG5U+3EaIpFaV9YxS0CxxWYrmKBk1qRKb8vOf8e0Q8vZwY8mOfK+4aFjjeFCwiSGycXfwdoql5ygcmKB+Y+CRujXj659nU30r+mI7KxPwidt2VSK20BXNauOpfWvHa4tROPs1k+2uKTCmM51M60X7mn2mR/+LzpvzHrYuPiWhKQO5tZ+Xi0l9bB9qC6U8Rwv1nEYniA6Pwbz2W34ss3Ae/afpQ41h08IGs8KfO7UKsm19KxBoU849B7P9UkSpYsYtsxWea/nEU4JX0+Hte539IR0UsV1HzXkH4ixRuP0ui+v30MlIrybSKlFoZVx5G86qi4RdfyDKlirzmHi7eFfrKf07a4ZeUpjnIaerm7PUw7r5MpWJwclmut1GpIlPSjt+t+ySVNwhj/oX18nsXmVJNlrSdi+GRpFTLfpV5E9pPITqjkOBHTynuGkLyETK0lUTL3KstqtNKFx93Sj/1XS3zAj3CxfBHlPWNL9s7/5lELFdR3DXM9SfPiUjOXGQHpDPCQd2JpkPoN3bYtBHENn7eof1TRDKtIkPcypWIGF4UCwR/v4UtkEwLdWwB4ZGcCb7D09wSIVL494xFU2fTxc97MRDJVZT1jxES95LwF2+E9v3fuZ0Uy1UUdw5yIyaBiDdZAgbX72jMf0hHRVusdvDMBezcPIjLebfs7bhFDfu8z2Fm50Liu5qf3HHyyYWsgSY/6ncFQwtbUiprEWvQC3+LRaAlktMys+qb2RCTXbyE2lxNyzx4+l5ko6E5KVW1OhCg33oR/1oimlLTNAv7Tp7F3H4b6fWSf/i8aYvfYrKKsNuxlwOn/IjOKPhkZ8HS6xtn1Tx4k4W793m8Ll7D4/QF3L392H3iLNeiE6gdUwpva59hjCUKNZUDw1i77MLN8wRVw+M/Wm/wzyxSpQC5v97AlFtxLxchSee39HL8YjD7T/kRX1jxC+f7VTowvIapz3shkCmhcniKgLBIdnv5EJ74Vkid/ANSGG0IlB0GFnY8zS35TWyBQE8wR1xOCWdvhGPv5sEmk628rZXpOua0NBU/RkCoFS143pP0PHZ5+eB7I5yS3pGfBFAmmxXay9cbmnPp3mNEU/P/8DTS3ytNc3D7WRJ6Wyy5EZ2wiPrh9yB/OEdFNKWiYULJ/VfpvCqvJ6GokutPnlGlYbjULtbKwXECwiLIlLTp3jq1f1uIBbL0Z5EGOEqiwaxYaXNIZ4QisdNXb5NW30w3i79Pd71GtJvsY98nnl7wOe31n1l/IFNCWe8otq7u+FwJoXEWXleIyG3qXvTWLp0RAOkuhkWQ09hFNx/GIlEsxkcRTy/Q1/SH51hYe/OxZ9HOkWSaZXrQGsNl+tHca6HuP1bno71e+3ftvT6nLkimFHhjTgWFkNPUTRd8fNzTi3Emlj7vwuf41L2lCoHk0sLBldD4ZIo6B0ksqV3GE7JMXwu+sw3wD3/ENxsM+a//8894B9/hdtwz3L3P8y9//o6jAcGUD4wjnflxw9SiEtiIgyJjaZpfjKsj/sgYFo5Pu0a1jv/CtbLws0sPZsn04mcSL5izj32HVufa9tiPrbNFqJ4LrhOcPLjx5DnPCyt02EoShUDWuOPgMXyuhHDu5l0snd1IrhTp0riSj6z7T61z3X7SgMKduRZKxJss2jT4RJ/aMxKFmqrhSQ6e9sf92GluPInGfqcHt54madpcl689nf6W6GclG7Tw85JpqBub5vK9J7wqr9e1CH9sHyyyU0vvs3CNrGA3tW24H9Nf7dgMF8MiqRqaQqoQqD9yW3qQzggdgo/T8vAJCtGRImrtyKfmI/xFCtYuO7n1JBr3Y6c5eMaf0r6RZftDtKKtFmrM7jx7RXRmkQ7fakW9LnnOD+NbrsulKLGfehbxCmvqU6LFVLkRHU90ZuGiMX+WTdbM49Iz63P3wefIH9JRqRufpbR3RMdqeSEsgvzW3kUEbfktfaSLWqgYmKBq+ANvTu3oDLWjM7rvW/izFrmwfGCC0t5RqoblKx8+M1A+ME6WtIOyvjHqxmd1xqR2dIbSXgFFsrx/nNLeUaFyXgHVIwrdOBZK1bCcyqEpJAqoG1NS2juqY+f9lC7qxmepHZPje+0Om7dYkdPULRTszS+vdpcqBRbMlGoJlUNyKgandPos7RvVdAKodIiJVcNyDY24MJ6y/jFqRhXCG8uMUPFeNz77UWNRNSynpHeU8oFxKgYmKOkZoeq9nPqJOY1+JqkYmKC0b5Sq99M6g1fWNyY8/+jMijnd2tEZyvrGqB6Z1um8fGCCisGJFXW7UGQzAjx4tqyDsv5xHfDSQoNaoZn76hGF4ADJheepXfC82iiMbqwjimWHiVYX0hm4/zKVrY47KOkZ4W2NjMKOwQWHtGAkyvrHKekdpbR3VNCbZnwNk4JzcT85k13Hz/C9ngnvukcYRAht7z8dwP/xf/8LiaX1P5pP1xYZ5jR2kd/WT+3o9CJDWjk0RVn/mPBv3xhl/eO6A6hqeIqSnhEaJoUOlZoRBSK5mrrxWR2Pj3ZN1owoqF+wNsRyNeUDE0JXikZ3tWNKqoblOvTi2jHlsnko6x9HJBe6I6pHphfNr3ZctaMz1I0pdbou7x+nrG+M+olZHajW87wy3Weq30/TNK/iZnQCNtt2UTk4RYsKtnkIaLCtauEQqRlRCOu+b4xazbUrr/MpzTqf0P1esFFK0utFHPINwMTSlruJqZQPjOucp6UHVKta4HQytrQnXdTCMEL7vaGFHQWtfYschLrxWcoHJgQEbbmKqmG5Bi1UcPprRhSU9wv7rqxvjKphOWV9Y5QPTAjEikpIq2/hbY0UyQw0TM5R/X560dou7x+ntG9M4NBRCI5n1dAUFYMfnrN+fFbD+6L6cE3vKFXDgm3RkpLWLLC3yw6waTXpohYO+V6koLWPDj7UZ4imVLzr7uV6VDyG5jZ4X75BflsfdeNKXeHxou9SCPNv7bKLwAdRvEfggttsasWd568XFd1rMZ7K+saoHJzU2fyaEYXuZa+grZ+q4SlqNKzZwpoYEfTZP0aZRj/a5yzV7F/tebCS7dDSipT2jlLaN0bdmFJH+bHIdvaMUNo7Su3Yx3WnfWaxXE3F4ASvyhso7x+nanhKt7cWviRXDk1RqrEtFYOTlPQIZ1ztmJIyze+0trpmRIFsRjizPrUPvjgqP/bgGu9ePK1m5+GTvK1r1CB/ziOZnuVmzAvM7LZhbOXIOn1T/G7fp1EJnmcC2HfyrMaYznHAx4993udoU0P9hIILYZEYWzlgZGHHekMzbsa+WJRCkSiEQ8UnKAQTa0cMLWzZd/IcxZ1DQq41LBKjrfZsMDTHwMwGKxc34nJLCU1IxsTKkVeldR/Cmgo1eS297PA8jr6pFfdfpXHlQRT65jYCfsnAxEedFdmMmvzWXjzP+PHvf/6Gr1dtIPBhjA56fbFRnUemnOP+q3T0zayxsHNhrZ4xAaEPSSqtY5OxBYfPXqJ6WI5oahYbV3fOXA8lW9aJ+7HTGG61Fa6z30ZeSy9Pc0sxtXXmQXLWonC5aGqexjmIzS3B0mUnpjaO6JtZY2xpj5GlPb7XQ4lMyWaLjTObjLeiZ2KJheMOwhJe0zYzy+X7Ueib2WBi5Yj19j3ktfQugsQWT6t58a4aQwtbdnl506xQEpNVhK3rXrwuBArO3kegnSUKeNf9nmMXgjC2csTAwpZDvhcFFtQZkM7M8zy/HGd3T/RMLFmnb0pCURVNcypisorQN7PmcWou7WrBsN94Es9mU2uMLR2w3+nB60qRbv3p9KE5jHZ7eeN36x5pDS3cT0rTvdkJzzRLVFYxZk47MbRxxshuG/pWjmw/dFIDUy4gQoYnpbH90Am+3WhEYecQfYBkWoXz/qP8j//4hjc1sh9NXciUal5XinA7eBxTGyc2GVlwPSoe8fQs2bJO9nidRt/Mmo1GFhiY27Dz0HGkMyqeFZRjtW0Xxha23Hn2ihvR8Tjs2sfTvFKst+3GO/CmrnPqSVoels47yZK065B0S3tH2eq4A+e9h2iYFByLXUe82X7Ai8R3NWzzOMTZ66GaLpk5Qp+/Zou1E1Yuu3iclsfp4NvsPuJD1dCkprVzHrF8ltjcd5jauhD6/DXdCOSils47cdy9n7T6JhIKK7By3oWxpSO3nr7ketRzHHcfIL+1B9f9Xnic9EWmFMDGrj9+zgZDM3KaOslr6cF2x15hHxuZYevqTnHX8IIDVKhRSyiqxMLRFTNbJ9Zt3sLNmBdCmkCz/1pUUNI7QkqNjMNnL2LpuINrj5+RJWuldnRGB+AlOGtK9p08h9vB44g1XV35bf2YWDkS+SZLd8hKptXce/kWvS1bcd7rSefsPMGPnmK3Yy95zT3Ujs5wOug2Bua2GJjbsMVGGJuBuQ2HfQNomp0n/EUKG43MsXTeSWJpLT5XQvA4cRapAqQzczxJy8PezYMNhuZs3mJNhriNgrZ+dh46iZXzTrJlnchm4OSla7jsPUxJzwhXHkZjbOWAsZUjG43MuRGdQEnPMK4HjuJ52l8XMVm4HsVyNa1qqB2b4diFqxhutSNd1Loo2qiNcGVJGzU23QWv84G8rmigtHfkQyGwxnF9lJrLJmMBpFKiQFMCcB5P34APztzUPBKFkhvR8ZjZbWOjsQV6WyyxcHTlwasMcpu7cXb3xMDclg0GZths30N5/3vO3ghH39yGdfpbMDC3xWHXfl6V1dIiV+B9JYQNhuZssXbCzfM4pT0jSJVzRKbksHmLFU/zSmlXCySlvtdDdfOzx8uH3KZuZBoCx9S6RvYeP4ORhS0WDq68LK3VtTMve/GQq5AplFyNiOWbHzZyMyaBoo4B7Hd6YGzlQHxRlUBPohBssqmdC1usHTHaaoeBuQ3m9i74377PlQdRWDq5scl4K/pm1uibWvE4PY/a96NYuezE2MqBDQZm2O/aT15r389qQvjDOipaQ/A4NY+/fP0D916m6fKZbypF/O27tQTej6JpFi7cecihs5doVKrZ5nEYh50eVL+fpn58DqfdB3HYtZ9eICo9n//4y3dEpefTMDmH1/lAfK+H0aoSDhaJXE3d2CwnLl/DafdBSnvfk1rfiKGFPc7unryplnLraRLZsk5stu/mzvPXiCcmSCqrYaOROd/8sIH4gooFsOVzpNU3cTcxBVvXPXz9/XpuP31FprSdNZuMCHoY86OLomp4DFNbF4HbZ0zBUmqAhkkhf5kubuH7tXqcvRFOH3DlYTR7j5/hdtxLUmtl3IlL4lV5PfcSU1mz0Yi0hmaOnA9ko5E5pX1jZIrbcN3vxaO3OWx1cuM//vodd+KTFzlxjbOQUiNhvaE552/dQzI+QcSbLE5fvUVeSw+vK0XcefaKysExDWlkOBUD40jlCoIjY7Fy3klGfSMVgxOY2W9ns6k1Ff1jizg6RPI5gXvnlB8nLl7lTPAdUmok1I7JPxpR0UazPH0D2HHwGBUDY7yubGCjsQXb9x9FIp8lOrMQN8/jpFRJyZa2s97AjM1m1qTUSNnheZz/8l/+Ow+TM+kCzUHqyJsaKWX9o7jsPcQ6fRMypW2L3vIkCkirb8LY0p6whDdcjYzjVXmd7tARy+eJeJvNwfOXBcwExQfuqYWGSeuouB4+ydfrDbgWncCr4ndcehDDV2s3c/7OQ00E7uOpn6Y5gejM0mkHl+4+QjI+zq24l3y3Vo+A0IfEZBURX1DKvaQ0nNw9Sa6SIJmaIkPcxg8bDDh19TaN4+Ps9zmPlcsu7Hfu4/K9SL5bswlTa2dyGjsFgL6kNEysHCnrHdGFi689ekZs9jtCn7/mflI6OY1dbDa14srDGI75X+Xf/vQVXucv043A4P39Wj3C4l+TLevA7eBxttg44eUfSIdarXPSS3qG2L7vCP/9f/wb95LSyBC1sH2/FxmiJkSTkyRXitlgYMaZ4DtUDIzhcfIsNtt3s32/F9Xvp7F03on9rv08SS/gaW4Rnr4BrFqnT1pdM+7HzmBkaU/tmJJ0cSsOO/eRVFaPbFZ7fyjsGGCrkxvnQ+7SrYaQuCROBt6krH9xzY9UIRTq1o3PkN/Sx5ng2zjvPUhQRCzl/QKvjZAenMBh5z6O+l+hEzRMxCMYmNvif+fhImqPR29zuBoZxzr9LaTWyqgdkeO05yC7j3jzPL+c6PRcwl+kcCb4jo4l+XlBBbIpOTFZRXy/ZhNhCclkN7bjeTYAPZOt+ATdpE0tpE32ePmQKWkjuVLMN6vWY+Wyi9icd0RnFfDwdSYxmUWki5oFgsT4ZOILK/m3P33NkzSBydonKISTgTcIiozlf/zLn9h5+ASVg5OLHBWRXEjpJVeJOXLuEhYOrvz56x84efkGLfPqRalDbat3w5SKyqEJwl+ksH3fEY76BZJa16g7yCUKuPb4Kfpm1hq+NqEw+ci5QKy27aa0d1RHU/K2VsrdxLfkNnezw/MYl+4+pnJogoZxBa4HjrHFypGKgQneVElwO3SCoIgYHqZkk9fcg76pNbE576gbn0QqV+B7PRQ7t70UtHbzrvs9a/WMcdl7iLSGZhz3HOT//L/+X2Jz3tGqEkhWbV3dKe4cJFPahqndNrY6uVHeP06mqJXDZy/xJD2P6vfjn4yoiOUqRFPzXLjzkDWbjInNKqCsf4hMcRuF7QMc8r2I4VZbsmTtpNY1CsjFt+9TOzZBVEYhh30DKO3uJVPcRuiz17ytbWTvCV/8bz+gZmQciWIWt0PHMbF2RCxX86Zagsvew7ws/Th43xdHZQURwtjz7Dx8ku/Wbibw/hPqJwReinfdw/jfuYvfrXvciIrhSXo+slkQTarYcfAYLns9dY7K9n1euHgcphOha+ZM8G0uhT/m+pNY4gsrF7XuyZSQ19yDgbkNN2Ne6HgQrj15zterNhCdWUjdqJxMSTs7Dh4lQUNI1o5AxPfdGj0SCisXIZY2zkJZ3yjWLrvY7eWDZFpN7egMRpYOnAq+Ldz/I+E2YcMJhHpvqqU66OnlB7WQkw8Ii8D3eijXo2KJyijQhR3bgOf55USlC2y7Z4LvIJbPE5cjEARejYjj2uNnFHcN066GtHrBSC10VLRve/63H7DFxpmy/nEdR5LX+csEhEUIodb+cZrnwdbVnQevMugE3nUNY2rrjO/1UHoRDHtcbgnfrd7EzeiERfoSTwt1FQGhEeib2VDQ1iXc5xNpsqY5YcybTLYKSKEIDm1AWCSr1m0muULEUf8gXPcfRaoQ+C+eF1bww3p97ia+JUvSxuoNRtx/lY5sFhx27+eofyAtKqF9MaGoiu/Xbebyg6hFRYkypcB8bGBmg9f5y9x+lqR5QxSMdPWIgj0nzxFw7wnXohMIjoon+Ek8QY+fEf4yVRfa1zoqO7y8+WqdPuYuu/lukzF/XrWBt3VNP4pkKuCuqLnz/DUbDM3IknYIeWwFOO4+gKG5LSXd7+kCQmITOXjan7K+MbqA+6/S+fNXq4jLLaELSCqt5dvVG/G9HkY7kNPYjdFWB+4npQn1L8kZBIRH6pwx0ZSK2Ox31E8oSWtoISQ2kQevM7F2dRfwLybmsNm2i6N+gfQDp4JusXqDAXnNPXQAt5+94i9freLey7eL6A2a5iC1oQmjrfYcPH0B78s3yZS006ISUmLhL1L4y9c/EF9USQ8QX1TF19+v52J4JNXDcmy27+H7dfq47D3Etn2H2WS8ldUbjXhd3kBUeg7HA4IJioglLCFZQ5T3wTgLe1TB9egEzt+6z72kVMr7xz/Z5ts4C4NA9Xs5/nci2HfyLEll1TTPCcWf5QPjOLh5cDzgKl0Ijkpx13v0zWw5F3JPVwyqTR09SS9gzUZDnuaV0I3gPK9ap8/zgnK6gLsvUzkfco/0hmacdu8nW9ZB0zwc9Q9i8xZLcpu66QCCImP5etV6HqfmIlWo2HnoBAd8/GiaFWxbREo236/VI/JNNu0I0PVh8ckcvXAF6+27qR2doaC1jzPBofjdfsCNmDieF5QjmxXWuev+o2zfd2SJoyKkIO8mvmXNJmNOXLpGw5SKk4E3sN2xl5qRmWX7WRt56kKIgN1NfIvnmQCuPIyhcfaDoxL8KA4DcxvqJuZ0HE9HzgVi4eSmA1ATydVCimpoCtks2Lt58Dgtj8ZZaFdBREoGh89eJCgyltDnr4W09dAU1e/lpDc0Y79zHxmiVrqBDFErhua23IgWSAEbZyEsPplvV2/gWX45KdVSvl+rR0x2MbWjMxhb2nPlQbQOWiM0PplvftjAvZep3IiKJyariGbVj9eoaElwDSzsOHMtlAHgVtxLTKwdKesb413XMPqmVgQ/iuPKwxjs3Two1TDU143K8fIL5ELoQ6qGphBNzVPaN8qeo6eIeJNFq1pw5h68SufE5esERcQSnvCGovaBz6qD++KoLJAWFbx4V8MmYwtC45MJioylcmgKmVIINT94nYKX3xXcj53k0r3Hul77Tzkqhe0D3Hn2Gk/fANyP+XDraZKOSE5rbDLELXy7ehORydk0zQkGJbGklrWbTbj3MpUOIL6oEue9h0mqaBD4MRC6PlZyVGRKwbGydHbj8NmLNM0KuUQjSwfOXA/9pKPSpobgx8+wd/Mg/xMhOcm0iqrhKcLik/HyD2LvcW8u34+ialgIxzbNCg7PnqOnMDCzJlPSTvM8JFfVcO7mXTyO+7L3+BkyxG10qgXivaWOirZF9ljAVSyd3agcmtSF/q9GxAhv2X1jNM9Dfms/RlvtefGumm4EdtuNxlu5Ghmnw3h51/2ezVusuBAWuSilUT8xTydCPt/OzQPZzNyyQsylz9+sgbb/etUG4rKLdTU8cbklbDA04/6rdHZ5ebPz0AndIVjSO4qptTPhCW/IFLeyeoMhD15nIFGAgYUd527dQ6YEsUJYb4Zb7TkVFIJo8kO1fYtKYDreYuNMQFikYIAWFDRWDcsxcXBlz4mzeJz2Z6+PH3t9hG4en+A7mjqhxamf7/RMKO+f4G19M99uNOLYpetIpuc+yWaqnZsTl29gYuMspLtmhbGcDrqNvqkV4mkN4VzIXQ6e9qNyaIqmeYEUctU6fRLf1dAK5Lf1scnYgvCENzQqoXkOdh/x5sjZS1S/n+ZGVDx5LT2L5kRLIJgmauHak+cc9b+C9+UbNM0KOrB22clRv0AGgCPnLrPewJR8Tb1CbHYxm0y2kviuelHnhpYV2djKkX/5179iu2MvFYOTNM0Jz3EjOp6/fLOaV+UNdKCpVdhiTURyJrWjSqxcdnHo7EWaVdAH3H6axFo9E7KkHbwqq+DkpWt4nDjL8YCrpItaFtURNEyqSK6q59zNcDy8z3H6agj5rb0r4inJNC3Q+a19nL56jcPnLnPk/AXSG5pp1RDMSRVQOSzHZe8hDvj40TIn7IGSnvdsMrbg2uNni1KgUiU8epvLmk1GPMsvpQN4lJLN16vWkS5qQaZUczEskltxiURnFWHn5kFuczdiOew74YuprQtFnYO0qOFhcibrDbZQ2D5A5fAUNq57OOR7UQBTVAt6MzS35eGrDFpUwkF8WuNMhr9IoWUeijoHuRnzAs8zAXicPEVIbCJSjS627/Na5qg0KoU0nZGlA/637wu1VVMq9nj54OJxGJlicZeNWK4W2owVcCM6gcPnLnPw9AXuJibruue0jsqt2ET0TCwp6RnRren93udxcvekYsEYRFNCJKu0dxSjrXY8yy/TgMTBi+IyTl6+gceJs3j5BZIhbkOqEF5uYrIKcdpzgCxpB13Ai+Iq1m82ISI5U0c8mtfSy3drNhKRnKVzVGJz3lExOMn3a/WEvaNJ9aRUS9AzscT3RhiX7z2hbnTms7q8GmcFJ2mtngkhT5PoRjgLNptaUdgxQNWwHAv77Zy6egu/W/dx2LmPMg0XWjeCg2pgbktR5yBtCNFWe7e9xOYUI1MKz/G8oIJTQSF4nPDlxMVrpNU3/WzsqT+koyKeViOeUrLf5zwWDtvIa+nh/O0HVL2fpge4l5TG//q3v5JUVscowmJtVgsV3TsOHGX7vsPUjikRT6nZceAYLh6HeQ9cCI3gz1+toqTnPcMsZjnWLo6cpi7+9s0a/O881DEkR2UUsnqTESk1UjqAyJRszB1ceVMtpR3Bc47KKODb1Zt4qTH4Wk6ahY7KId8AGpWf56iIptTIFPO4eZ7A/dgZofhTsXwRad/AHrzO4K9f/0B0ZiEjWp1oWKQblVDY3o++mRUHfPyQKAR4emNLB7bv86If4S2mRS04XW9rG1m72YSwFym0s6DDYk7NrbhEvv5hA0mabgKpEs7dCGeDkTnlmmhKcqWI9QamvCyrpw8hSrV5ixXlhpveAAAgAElEQVSevheRKgRgtML2AdbqGRMa/3pRHlqArp7idPAdXPd78aZaKjDBairXm+dZ5FxqHZWUail/+ut3BD96KhCbKeH+qzQ2GlmQXCXGZe8hdh/xEdij1VDcNcQm463E5ZWSVt/MqvX6PEzOpEUFhhZ27PA8pjNMOU3dbDSy4HrUcySaYkTxtJqy/lHsd+3j6IUgHUtyef84oimhYLRqWM7uE2fJkLQziEBY1635t1Oj14aJxamfbzcakdPcQydwIy6Jf/t6DbeeJ+s6S7SGXbTEeRNPqwkIjeSbNZt4VdFAO4Kz5uV3BbsdexHL1XQCh89ewu3QcWpHFXQjRCa+Xb2JpLJ6OhG6IVZvNCSnqVvHAh0S84It1k6ExSfzLK9sUdfDQmeluGuYEwFX2Xv8NGn1TbSpoaJ/HCtnN475X2EIIaKiZ2pFUecQzWo4ffUWRlvtKO0Z1bWpah2V1PomNhia430lBBtXdzxP+yOZnqcHIcLw3Vo9kqvEdAKh8a9Zs8mYtIZmuoCDp/1xdj8oFNfOwYmLwTjuOUBZ3xh6JpZ4nrlAh2bdt6o/MLFrHUy3g8fYfcSb2jEFfWiJ7Bbv0xY1pDe04HnmAruOeOMTeJMHrzPo5QPB3Ic9quJCaAR2O/ZS3j9BKxBfWMHaTca8Lm/QpRS1RcMRb7JZvdGQhOJKuoGw+DdsNLIgv7WP4q4h7N32EZNVzL1X6Th5HKaoc4imOThy/hJbbJwp6XlPB+B96Tpmts5IZ9CkXLdx1O8KjRo26fSGFjYYmpFQXKVjAt930hcDMxvK+sfpBi7de8KfvlpFdmMn7zV2s0UN9eNzbNt7GNf9XtSOKHSOXBsQEvcSa5ddFLYP0INQ4P3DBgOCIuNoY3HEuXZ0hovhkWzf78XxgKtcCA1HNKVaRt4opFqbMbKw42luKS0qIXpg7rCds9dDEU+rljnQSWV1bDQyJ6Goig6gsG2A9fqmHDoTQBeCE9uimf/meSHCZ+m0g7yWHnqB5Cox363Vw//WA1rUwmdevKvhhw0GvCyt43V5A9+t2cTTvFLqJ+b4dvUmTgWF0IGgy/iCctYbmBH+4i2+N8Ko0TQJLOyWEmn/v8CmNc5CtqyLTcYWXHkYQzeC0+MXcpfKoSkqh6Ywt9uGd+ANbj19xbdr9Mht7taxJZ+7eRc9463kNHbTDmRJ29HbYsnT3BLagZKeIfS2WHLIN4BOjU3SMkr/HIDIP6Sj0jQvVGWv2WTM1cg4ZLNzBD9+KvBoSIT6hW9Xb+RGdAKNs3Nkyzrw8rvC2xope46eQt/MmoL2flJrG/nT31ax4+AxMutl7PA8zqp1m4nOLKRZOUdiSQ1efoHkadrltGmZA6f8+GGjIQnF5bQq5zh0JgA3z2PUjSnpQAiZbTDYwrOCciLeZFI3riC+sIKNhubceZrEy7JayvvHEU+rdY6Kuf02Dpzy+2xHRaYUPHd9U2tuxrygZf7jkRdtKuXf//wtVyNiaZmdI1vWyT7vc7ytkdGphsdpeXy3Ro8n6fl0AOX9Y9hs342Vyy7e9QwiVcxy5UEUd54mklon1F0EPowhqbSa/NZeJAo1jXOCg2Fq58L2/Uco7Rsmr6UXAzMb9hw7jVQpbM6XpTWs3mhI6PNknuUVkylpI/B+FP/yr3/hcWoeLXNzXL73BEsnN8oHxhcZl+qRae69TOXSvUd4X7pOWEIy91+9JVPSToaola1Obpy4eE2o2dBcpyUA23n4JOv1TUmurKdRKZAlHjzlT+XgJG4Hj7HRyILU+iakM3NcCI1gz7HT1E8oyJJ2sN7AlDvPXpH4rgr/Ww/4y1erCEt4TbtyjqCIGLY67SBb1qk7UFpUcCsukW37DnPy8nWKu4a4fPcxl+4+okWFznkIfZGCsf12XpTUIJqapWZ0hprRGV0XjPa7Ql+k4LTvCH9bo0dqfTPNcyqalHMc8rvC//enb7kR95K6UaWu82wp4JNMKUTC9LZYsm3fEUp7h8lt7sHE2ombMQlIFUJYfZ/3WSyd3cht7uZJWjZvqqWsWm/ApbuPaBifwcplJ/pm1jx8nc6TtDwKOvop6hhC39Qaxz0HqRiYWNFhFmDX5zgTfJuTl67RPCe80VYOTeHsfpBjF4LIb+rgdNAt1huY8ehtDoXtA6zbvAWHnR5EpuQQk1VEcecQEoVQs5BSK2Odvimh8clkiFr5Yb0Bl+9F0aSc43WFiPX6plwMj6R+QslWpx2YWNkT+jyZF0VlBD96iqGFLdEZheS39rHFxomQ2ESq309jYuUoPMvgJFXDcvxu3eNWXBIt80JHUPnABFbObpy5eot2FcRmv8P7SggFbf06O1H9Xs75kHC27T3MtcdPefGuQvfSspKhb56HTEk7JlaO3H72iua5OQ6e9ufIuUtCx9KCPSCkfBtZtU6fKw+jkcjnhJTt1dvUjSk5FRTC9+s2k1bfxL2kNMwdtpNcKeZFUSUPk7NYtV6fJ+n5ZElb2WRkjp2rO/GFlVx78hzHXfswsXYkr6WXhkkl3ldu4ukbQN24UPyb29yNiaUDp4JCdBGLG9Hx/M9/+yuxue9om53jbW0j+73PU94/wYFT/jju3s/j1FxyGjsRTaloVcO9pFTs3PaSIW6l+v0k2/d7sd/nPDUjk4jkKl0bfHRWAU57DnL2ehiRKelUv5fTw8ogh9qOpUNnL7LD8xjtc3OEvUjBZvse3tY2LosGSGeE6PcaPWNCn7/mxbsKotLzsXDcgYv7Icr7x6kelhMQFsHtpy/pAq5Hx7PRyIIX76p5mJyOeErB8YvB/PtfviWxtBaJYg4vv0B2HDyGRKEktVbGmk1GPEzO5FleKQdP+7NqvT6xucW0zc5xPCCYbfuOUNQ5xNVHcTxKyUEsFzql6ieEbrq6MeWizjqtTasYnMR1vxfbPA4jnprjwesM9h4/TWnfKKn1zazXN+VmzAvEo+MYbhVerhomlWRKOliz0Yij/ldoUszSNAeZkja+Wb2RyJRsEkuqeFZQgaWzG3Y73Kl+P031iILTwbe58+wVrfNfalQ+K5pSN6Hk1NVbGFs6kCluox3hrdzCwZVt+4+SUiPjenQChha2bLFxxMTGCe8rN6l5P8mBU3786398hYmVA3u8TnE+5B7f/LCBA2cukClp51zIXfTNbDDTXHfx7iNEUwodTbhUAaV9Y+z3Oc/qjUaY2Tpx1P8KhW39SDT1ExniVmy272K9vilXHsYgVcyT09SF1bZdrNtsQsSbbGTKOV27aEnPexz3HOD4xWCdo2K41f6TjkqrGqKzCrFw2kFyleSTHR9iudD1ExKbyAZDMyzsXTDaasexC0FUDU8hmhCiU3/62/e8LKnRvEGoSa1rwmXvIfTNbDB3cMHSaQcpNTIqBiZwP3qKr75fR/DjZ8imFbpNpCXhcj1wlE0mlhhZOui6a7T1G+JpBds8DvP9On28r4RQPTJN08wsJy9dZ+1mE8zsnNnpeZzcpm5dNEU6o+ZFcRX2bh6cvHwd2dQ0IbGJfPX9Wi7dfUx5/xjHL1zldlwSp66EcCvu5aKaHeGNfojdR7xZo2eCub0L3oE3KO8fo2p4CtcDRzGydGDXYW+MLe3Zd/IcRV1DNM0LbYl7jp5i1QYDLoY/onZ0hkvhj/hurR5mNo7sOnySFA0jrbbrRyyfp7hziJLeEdwOncTY0h7f62EUdvTqEIMFXSgJS0zlB30zTOy2YWy/HQNrJ1wPe2tC1UJnhG/IPf79mzX86fv1GFg7cT0mkTagYmACc5fd/K+/rcJx3xFSamQYWzpw4uI1XepIuJfwFvaiuAoLB1c2m1oLh+LTV9SNf6iFCY1PZt3mLZjZbeNtbSPNyjnuJr7FwMwGo60OuHgc5nlhBRYOrnj5BSKWK2iag+MBV7kV9xKxHN1eWcm5fvGumidpubSotIfNHBfuPOC7NXocPh9Iac8wF8MfYWBmg6GFLZ6+AcRkFbHRyIzrUfHIFIIz1jQLaQ3NmNg4ExKbSA9CIeVaPWOstu0kOrOIB68zMLSww2irPS57DxFfUIGpjRPegTeRjU8SlpDMFhtnttg4cSn8EfXjAtNuSrUUM/vtGFoI3RF2bh5CSmUGGqbmkc6oeF5QwVo9EyzsXdAz3srN2EQk0zO6Q7ZufJa0hmZS65ponP0MKPapeWSzah69zcXSeScm1g4cv3CVsr7RZY6fWK5CLFcR9DCG1RsNMTC35dSVEGpG5dSOzuC45yDOez1pVs6SIWrFwtGVzVusCIlNpHlmlkt3H7Nq3Wb0tljh5RcotM877cDnSgguew9hbr8d1wNHMbFy4ohfIOUDE0hnBKTca0+esXqjEWevh2kOTDUNk3LOBN8WOklsnTCzc8Ev5D6tyjlCYl6wZqMhzns9KWwf0LTTziOelON5JoD1BqaYO7jiE3iTqmG54ExoHZApFYUdgySV11MzovgslFmpQgDy2+3ljfFWW5zdPUksqVnWkad1nqvfT+Owaz9rN2/B93oodWMTvKmWYO2yG31zYQ1ab9tNYXsfzbOQUiPDxNqRzabWXI9KoGkOZHIFe0/4smqdPuYO2/H0DaC4S4hgVQ5Nsn3fEdbqGXM1Ipay/jGO+l/hh41GmNk4CkzazT00zUFuUxcex33ZYu2Iqa0LHsfPkNvcjU9QCA679pNQVEXj3OKIUGp9I87unmw2tebYhSAiU7Jxcj+Ivqk13pev0zAxTcscFLT1Y71tN8ZWjuiZCJGS+rEJpAq17kxz8TjMqnX6nL91H+mEnPzWPqGTy9IeQws77Nw8SKmR/SzKhT+co9IwKeA4lPUJfewNE3NokQMLOwYp6hzSED+pKOocJKepm/zWPuon5qgdneHsjXAevMqgpKefd13DiKZUFLYPUNIzgmxGwHQoaO8np6mbwvYB6idml+UMJQoBRyS/tZecpm6qhuXLevrLBybIa+nR4ZPUT8xR1j9OQVu/5m1fteh5ygfGdVgq5QMTbLFxXtFR0XY2tanhYvgjDpzyo2ZE/skahYZJoQBQLFdT2DFAblM3eS291I4paUGgYzezc8Hz7EViMgupH1fSNCc4XRWDk+Q195Db1E1p78gHzI3BSfJbeqkaXtwSrA1NVw5Nkdss3KdmdGZxN8y0msqhSfJb+ygfmECkQZNsmJgnv62PnKZuyvrHloCiCXgz2mu0WC65zT3UjSkp6X6P634vGmchPPEt3oE3aWd5aLh6REFeSy+5Td1Uj0zTPC8c9k57DuB28BhFncPktfZRMTixKJ9dOTRFXksvlYOTuoNDu07K+saW46hMfOD3KO0b060FmRLql4xJMg15rX3kNHeT29xDTlM3Be0DmqjIB6KygvYBiruFKFVp35hGl1D1fpr81j7yW/tomJwjt6mbi2GRJBRV6lrhGyaFTgstZktucw/5Lb06jAXtYVk3Psu77vfkt/ZqAL2EdVPcOURuU7dujRZ3DQtRQY3zqcM5+UhUT6oQHMVzN0KJzixaVKdVM6KgoK1ftwfrJ+YobB8gr0VotxXJ1TrWX92+0Yy1rG9swe/nKOoYJK+5RwcAWdy1YNzTUNw5RPnABDJNzVphxwD5Lb3Ujc/q9CCdgbK+MXKbu8lt6tZ08iwH8SrqEOxLQVu/7iVqqWO2NA35KdF2whR3Devsysc4X0RyFQ0Tc5o12CVg+Wh0V9YvYINo92VZ3xh5Lb1Uv5fr1nR+S69gAzQYJ6V978lr6WGr0w48T1/gXdd7zf6Wa9qWhaJ/CwdXTl65if+dB9Rq9nXzvJDmKWjr1+mjfmIOsVyI7hV3DvGu+71u3rR7o2poapEtWongTzKtISX9CWBjWsyQ7MYuSrrfawAFV54DAYNkkoK2PioGhD2vhaDQzn9p3+iisZX1jZHf2kfNiEKY5xkB/yqvpYfc5h6hVnJBqq5ycJK8BbqsHVOS3yrYucqhKU2Br+DglvaOaHTYx624l0SkZFE3ruDuy1SuRMQucni167B8YIKcxi5d9LmgrV83t1KFYG8aZwU7t1DfC9OPDZMCi3xec4+ulkemXLwPhCzAlxqVn/bg0yw7HKQzfDhcNMBkAkYGmvbMXlw8DvE4NZcuPiDzyZQfQIbES677WGGTeFr4jGxm+SbSFnbJlB+u1xZvyT7CXqo9sCTTQq+94859uoLND8ZfRV5LLzmNnRS2D7Dn6CkhF/uZxFlaJ0L7bAIq6RzuR0/j7O5JpqiJsIQ3VAxNUt4/Ljh9Mx+ec2F74dLnW2l+ZMqV9bPw+qVIl9p7rVhvo5mbhbUY2ntkiFrZ7eVD05zQEbCSo7LSuKQzgr6ddu/H/dhpmmeFuqOlyMDa6xaigX5qrMuedWYxYuXSeZEt0PNSXS8d91KdanUpvMGNczUyjsv3nvCue4il8PgL1+FKZG7a9b+Y0fXDutF2IiycB+1++BRkd9McvKmWYGbrTFR6weJOLjkf3YNaBNyV9qL2WRaiTmvHrnWgPjbu+gXPtdJ3a3X00bW4ZC+tBAvwc2Th9/7YoaBbg8rl62EhaJpUt/4+6GnhHhBNCXVhpb0jmDts53hAMK2awllhjlW0AteiBKyZ15Vibj99RfWIgtoxJTmNXTo9LLWbujlZQYfaNf2PoAnQffcnOmeW7U+dw65aNP+L2qpX0Kd2/Wt1usx2LLGVC8+OpZ+VzQgp2EHg3stUojIKeF5Ygf/tB8TmFNI0u1RPqkW29FPrR6JY2X4sG+eCv/3YPvjs+fijOio/VYQugWb+9u0agiLjlhVi/V5EMi28aVi57GLvCV9dREXr/IQlvOH7tZvZ7+NH4P1ozUb86Ztc2HAq7iWl8t2ajTx4nUEfEPggCs8zAXj5BZJa1/R3wSb/mjqrGJhg+34vaseUXH/yHJ8rISs6KktF22FkauPE0QtXl8Hq/zOJTKkmW9aJp28AqfVNvy0r7hJpUUF8UQXrDcxIfFe9KNLzRX57aZwV6k82GVlwITRi0T5onINMcRtr9Yw5HnAV6dQMz/LLOHz2EofOXuTey9TfJWPvP5uIp1VUDEwQlpDM6au3OX7xGvltfVy+H0VIbKJQoPxPynT+xVH5KYtgcIJbT1/yplpKo/L3ScanzW9HpGQL7bDTKp1+xNMqAbPg2h2uRsZRO6b80ZTPp+7TMDFHdGYhN2MSNK3dApy177VQQuNff5Kb5PckIrma+slZrkYIoHE7D58go0GC9DPmWGsc7r54S2JpLbLf6br4HNF2pbSjiYj8joyaVKEiv7WPe0lpVAxMfDQU/0V+G5FMqyjtGSH02WtSaqSL9oFMqSKtoYWL4ZHktfTQOiekXc+H3OPyvceU9ozwn5mB+9ebAzXl/eNcj3qOp28AcTnvEGmiWc3zv6/9/JOf7Yuj8pkyIYQh22BZbu73KC1qVvSgJQqhdbWNXyZc2jQvHGzaKnqZUqjkXwiu9c8gYs0mvxoZqyOg+6w5nhAcnVaE1MnvfV38qjr9BKHcT5X6CWHttv4d61b0C47niyyfH619bFxiH+snhLR6B2jqYOZ17cHtCKmCL/vmF5AFtqgLfmE2799WvjgqX+SLaESi0ODDqL4Yzr9HtFG0NzUynhdV/S6cA4lCTWp9M88Lq3RkpL/1mL7IF/kinydfHJXfSKQzi4GgfuvxfJEv8kuJtkvtTkIKlx7E6LrofssxNc3B/eQs/O8+pnxgYlkR4s8RbcGlFmH6t9b7zxVtJLRFvbw484t8kd+DfHFUfgMRa9olo7OKKGgbWJSfbZwV3urb+PGe/19btAZNS3D2a95XMo0O6OwfcQ9tK+iv8TyNmvRYJ9rOKSFV91uHwLX1KR0LxvVzvkfrqNx6nsxFTcH278FRufc6A7/wR7+IoyKeVlMxOEGmtJ03NTJK+0aX4Wz8s4i2/icmq4iizqF/irqyL/LHki+Oyq+t8Gk1DZNzHPW/wrerN/KqXCAW08K7Z4hbuXzvCeGJKR9wM34Hzkr9hAASV9g+QEJxNTWjMx8F5vrFdaZQUdA+SExOCU1zv7wD16ISqA2SyuuXITj+sqLSdUcEPXrGxftRZEraaZ+HiLc51I3PLuKj+TVFqsH2uRH3kksPokkXt31+nc4S0Toqt+Pf/M4iKpm/SERFKFifIejRU64+eY797oM4HzhKbnPP39WC+VuIaEpFyzy47j/KRmML3taIdDQOv/XYvsgX0cof2lFZuhkX/bwiP86n//6xvy2FIs9t7uZ0UAhva6U63h7pDKSLWnB292TXER+2Orrif/s+DZMKXcRFy4nzaxuR+ol5WlWQ09yGy4FjBD+O16CR/jp5ftmMmsL2bnafOIt/WCT1E3M/m4Vz6XO1qCHhXQ07j54h/GXqiuviF9ts0wIRns3O/TjtP4qp4w6c9x+lrLOHk1dvc9g/iHfdgytiRvxc+Zw1I5KrqB6Wc/RiMBbb9mDnfgiHvYfJkjbTPPfj3QICu/KHiNR/BkdFy3G1EuCaFvTO0tWd6Ox3JJU3cPp6ODlN3T/eRfcjehBNqT5PVx+xT0tF99mln9f8TqaEbGkHh89eJEvasawI/rNszueO+Yt8kZ8pf1hHRaJAR4ddPykYH+3PWrREbSeLSK6mcVb4nRYYp2l+JQAbYeN/ID8THJCm+Q/khM3zAlpfal2jLsTeNA+1YzMcCwhm7/EzDAAvS2vZZGxBTFYxjRrgoWaVkHZpVvFRFkrRlGoxqZz2549gpWg/v1CWGiWZUk1Z3xC7Tpzl1LVQxPJ5pAr1suu1/Bo/dtAvvc+HboyVr6ufmKdlHkq6erFy24dvyP1lBGGf48At/UyjEnKbOnA5cJygx/E6UCWdDqdUi57x73FgRFMCuJa793mcDxyjRS0w4hpaO3MvOYvWeTh49hLbPU9QOTS5DKV0JdEepCv//GEtateMRLGC06E5rO7Ev8HIdhuFHYP0ALuO++Lk4UX92MdRi0VTKho1++FJRiERb3N187uSo7IQ5G4lUMOfrlMNOJVSwAJaCqq3UD7XURFNfQBwjMkpISIlZxGVgPa+MiUcD7yJsd02sqSd9PIR/a5kG7R2RePgCY6p8Pem+Q9AaU1zK+/zhbZK+z2L5nr+w/+1YJWNsx8A9bTkgE1zQqovvaGZLFmHQAK6oNZGplxscyQK4TsWOqUL192XKMwX+UfJH9JRaZ1XE5NVhJ6JJU9zS+mYh5QaKS4eh3mSUcCL4io8TviS1tBMy7yamhEF/rcfsMXGiYDQCNIamtl/yo+ojIJFB5hkWsWjtzns9vKhrH+cDrVAOLbV0Q3f4DtUDk3xOC0PCwdXPE74kiVp5+yNcK48jCavpZfNplbcefZK195rs30PB7zPI1MKYHOWzjuxdXVnq+MOQuOTaZicX4YnUT8+S+2YcpEDUTumpG4BSZ1u8jWOVs3IzAcyu9EZ6sZndZ8RDpFZLtx9zN5T/jQqBWRFrQMnmRbgn2vHlDpd1E/MfVL/tWNKHemdkMbRkmh9/Lr6iXk6gYSSGjZbORJfXL0YUfdzjaTmcwK8u4q9Pn6cuXGX1nmBn6h+QhifNgWkPdBqR2eoX6CXn7zRFJAmamWdsSVv65oYAGJzS9C3dCQuv4wuBKh82537ufQg+pOthQLYnhrf62H433mIaEpFzegMvtdD8bv9gLrxWcTTau4mvsXG1R3rbbux2e5OYkkNzUsIwbSHpe3ugxy9eA2xXE0XEPk2F2O77SRXSZeNRbwA1Tm+uJp9py9gt+cQEal5SGfUKzoq0hmh6+Z69AueZBQikqtJrpZw9clzshu7fnKETCxXkyXr5GbcSx68yaJuTEmmtIOrUc9JqZUtc0p/zFHRogw3TM7zsqwed+/z2LsfIvJtLrWji6OH4mmhBbe8fxwju20Y2jhT0N7/yWhK46yKu4kpHPA5T3HnIM3zat51DXM84CoPXqXTqYY7z15j6byTA6f8yJZ2cOLSNYIfPV1kY6QzKrIk7ezx8iE25x2t82rE03D/VbpgH3a4Y7vDHTs3D1wPeBEa/wr3Y6c55HuRwvZ+mufh8t3H7PbyweOELzsOHiOprI5MSRu7vXx4UVyNTAmt82oi3mRhauuCzfY92Ll5kFBcRdXQFD5BNwkIi9Qx8h487c+eo6c0cPNfuqm+yC8vfzhHRToDuY0dBN6PIvhRHBfuPKS4rZfgx0/ZYGjGrbhENhia85evVpFUVkfzPPgE3sDIwo7n+WWcCrrFfp/zrNEzJqm0Tkc93jSnJia7iHWbt/Cv//EVdWNKYjLy2HPEm6d5pWQ3tnLv5Vv0tlhyPSqekNgXHLsQhJ6JJf637/OqrI5V6zZzM+YFxV0DVAwOYePqjv3OfWRJOzCxcmTv8TMUyRrZ7eWDy74jlPePL0oTyGbUPMkowMxpJwd8L9I0pyI2pwRju+34XLuj4Zn5EAlpGJvAJziUDaZWGNtvx9DGBRN7V8JevNUdaEKqqgcTe1ciUnI0dPQfoiA34pLYYGqNqZMb4S9T2etznuCoBJ2jtGixTaupHJrC3fs8Zk47efGuhuapafadCUDfyoHkGqkwvo85HVPztKnU7PA6xcFzgTRMztE4K3CbXHoQTcK76hUgojX3VqiJzS3hSkQsVcNy2tTwoqQWUwc34ourNMXLaqqG5fjevMtqQ3OiMouQTc9w6noY5i67eZSWh+xnppya5+Hi/Wi2OOwgp7mH4s4B9p8J4EjAVRrlM4inhbfi4CfPMbHfTvnA2CcjGTIl2Gx3x9njMCINOZr19j04u3tSPzHL07xSVm805PK9xySV1WFuvx3vKzcRTS7mnpJMQ2nfKJss7Ai4+wSxBofhWUEFqw0siEzLp43FcOoNk3O8LKvn4NlL2O7xJDAijuzGLp3zuVLqRyxXUT0yxalroaw13krQ4+fsOXGWg+cu8bKsXleboy1qXkmWQpHXjExz9Uk860ws8Q25h9fFa+w+4UtUZtEysMFPOSpaPpOk8gY8zwdi6bqXq6tTLaYAACAASURBVI+fkVrfRMPkYhZp8bRAMhn+MpWTQbc5fSOc//nX7zh/++FHowrN82oSisrRM7bgv/33/0VkSjZtQG5TN1ZObtx++pLHb7NYtd6AyJRsHrzOxHW/F0aW9ly+/4Q2tVY3agraetm27wj/+//2XwhLeEMXApOwvpk1Vx5Gk1ZTy56jp7gQ+pDkKhGhz18TEvuCwAfRRGUUkNfSzXoDUw6e9ufs9TD0zay5dO8JzdMKvC/fwNjKgZpRBa9Ka1i1bjN+t+6RI2vEettujpy/jO+1UP7r//Mv7D7iI+zxaUiuEvOqvIGaEcWXqMoX+YfIH9JRSRe18uhtLt3A5ftRvKoQcfC0Pz5BITQrlQQ/fsp6/S28rhBRPz7HBgMzPM9coAco7OjDwsEVo612lPaOLiCPmqdufJqA0AjWbDIiLOGNwOz7foJmlRAh2ePlg6GFHWK58Ebmdf4y//7nb3ld0UBypZi/fruWTcYWbHV0ZauTK3/5ZjUuHofJlnWyz/ssl+8/IaNBQkq1lKLOIRomF0cgRFPz1IxMk1LbiO2ug/iHR3LkQjCvKhoo6x/VkL4Jhrmkd5RDfoHcSXhNw9gE5QMfpGZEQcP/3955BUWZrvv++tydi3Nx9t05tevUqV1n19p7T+2VZq1JhhlzzgooiggqIoqIiopiwIBhxCzmgAEDkkQkiOQMHcnZACLQCZru37n4uhsQ0JnZ4xpm5vlX/coq/Ojur7v53v/3vE8w9IfWL8Sl8MWE6cSV6FzzXSqtcOzmfb6YMINzscnczSrCbfUGxkyby6MC9QcraHKa29h29DR+oeFsi4jk+1v3yWlqodjxvB/6/OqBveeuMn2JF+nVLdTYIaP2JYH7jnAtJXPESITWAhceP2WbI7JVb4eDV6KZONeNp9p610KpDJ98R9jpS6wJ2Uvwoe85eCma1CplyNtPreyossLyjVvZsOcw246cZPyshWw+eAKNyeJagKv64GGBijFT53I1eeRzcRoVD98AvDZscRkVd9/1rFi/mbLOXhJLtSzxXsvZB4nEFatJKNOT/7Jz6AXABJl1rxk/ayHhUTddRiU6I58/j5nEhThlUVUZlA7HjwoqWBOyh0U+ARy6eofM+teoHVujzq2F4YyKc5sosaKaz/42honz3LmfW0bxW6MrAqhMDK4mvkRHfKl+MCU60qqah+R75bR08PWUOYyZNo9LiWmUdhhdw94GMpxRcZrphwUVrNu5nzmevhy7GUOKvsE1z2agqVOGZRpZs30v385axIO8MorbTfzhT1+y0Hv9iNVwKoMysK3gVRveG7bit3UXWosyJTx43xHSq5tZ4b+ZafPdqei2oTXZWB20nb+NmcD9nBJXe3mVoQ+N2crt9Dz+9tW3nLmfQKUV3H3WsWnvYSqtSiVZbGEFPoHbSKtqQm1UvlcxWcXczshjz6mLzF/mTf6rTnKa3zJ9gQdB+47QAhS3mxg7aQaHom6QUKrF028jp2PiSFZrSSzTU/C6i7TKRma7LcdnUwiqbsWoOLeSxKQIn4rfnVEZSFUfHL16lyuJacxe4sm9rCKagKjYZMZOnE5sgYqSt2b+8sVYdh4/Q6VV6TWwKjCElQHBQ6aTVvXBqduxfPanL/hizEQOXrxBjR3XdN8Fy31ZtMKX8s5emoFj1+4yZc4i0qqaSCjV8/cxEzj3IBGVoZcqWx9LvP1YssqP4jYjt9PzWL99LzMXe7A94qQyqXO4aaFm0JogKPw4kxcuJbWqiar38mmqbXAtJYvlG7ZyPjaBc4+ecPbhE848SOLsoyc8UdeiMdtcUZOd35/jm6lzSK9pcQ0/zKhp4S9jJ7H5wHFq7FDe2cvcFWtYHRJGeZflg2HwOuBxsZbPx03h0JU7NNCfw/Oxz6zaBiduxzJxrhtJqhpqgef1rwk+HMm1lKwPGpVLCansP3+Nko4edBbw3xXO5PkeZNa/HpQLUGWD57WtTJznTtCB41R096C3/vRcCq1ZmZQ7Ye4SzjxMpKavj5icEjz8NinjGHqdUTnFRE+c686JO49HnH/yMaNS0mGh5G0XFx8/ZZnfRmYs9ODY9XuuHIOBj6VMf+1k/KyFhJ2+7DIqN1Jz+GLCTK4kZzr6/dgpbjeyNSKSP4+ZxPrdB0nVN1DL0EVqpGRa5/bK+FmLmLXMp386sNGO2qScw7aIk6zffZCNeyJcbNhzmPW7D/J99KNBFSnOqMhi3w1MnOdOdvNbqh25ZbUoi7bzez+cUXF+nlsjIvnTNxNZs30vKdp6qu0D88wGXC+scCHuGf/nD39kf9R1GoAXDW/4w5+/YmXQjg8u1iqjnWo7nImJZ47bCrKb2ojJKeF0TDwVXTZmLVrGcr9NFLebqLfDoYs3mThzPuk1rYO/m33wpLyKr8dP4UxMPLoemDbPjQPnr7kGkNbYYY67FzuOnkLjMBIvGt5w4Pw1vhg7kRPRD6mxQ05TO1PnLmHz/qM0oWzBznFbwYawg5S9M3D+4RO8N25hjrsnR6/eQWeB4nYjS7zXsipwm8uo/NKLmPDb53drVJxZ/ZfiUli3bTdbDxynrLOXOuDs/XjGTJjG40IVaoONL8dPJuxkFLVAbvNbpsxdzM5jp9ENk8x4/Po9vhw3mYDQcL75bioxWcXUoVww3X3W4e6zTrmQ9oH/jn3MW+pN6TsLxW/NjJsyk+M3YhzHW5nj7sWu789yKy2Xr8ZPJiouxdUaeaTW085w7PGbD1mxcZvrbnjgMXXAqZgEPh83BZ8tISxbH8yygGCW+gfhGbCFy0kZ6K12l1HZfvQ030ydQ0bdS7RmZWEKOXqav383jafaOpqBaykv+MvYyUQ/L3BtFYxEpVW5m/TetJ2bqTmu0ePlXUpo/UOttRWj8thlVKr6QNVtYcvhk4RH3aSZ4UtqG4BN4UeVxc6sLHJ+O/Yyeb4HLxreDFoMnFOKF/mu51RMglIJMSCxtgZo4oeXSVda4cazHKYvWUFCeSVNQGplE+NnLuTAxVuu4YdOozJpngcnbsf+IKOyalMIKqOdss5elvsHscI/CF2PEin8YuxEMutfU4PSg6bG3p8g7no8R4K3u98m1u8+hMpgoxk4cfsR46YvILGi2hVt0pjslHb0cPlJOh5+m1jsu56Qo6dJ0SkRqYGj6d83Ks6GYk8qqvlm2jy+njybjNpWSjosSv6U4/3V9SjRRt17OBPKnd8TnSPh/XndK6YtXs5fxk4itkhDeZdiQiPvPmbXyShymjtQG20jbv04c7iuJGfi7reJxb4BBB88QYquQdly6uk/rqK7j4Cww/x13GQSyytpACKu3eMPf/mK0w8SlPP/gNnWmJUy+MmzFxFx6RZnYuLJbmpDY7IqM6b8N1PRZaWi28Zy/yA8122i0mIbZIAqrRBfrOXLsZM4ExNPPTB94VJ8grZTB6hMoLPYme22gjXBOynv7HXdvHj6bWLc5BlkNbZTB2TWv2LSrIVsPXSCVhTDOG2eGzuOniLicjTfTJhGQqmORsf3pxHIf/mOhSt8WBW4TflMRkjqF4Sfk9+tUanoVu50E0p0zPVYSUxWETpHt9iox0/5bvpcksoreZhXxqxFniz330QzcPreYz7709/Ze/IiTzW1xBVrXPvy+l44cuU233w3lbyXnQSGHeS7GfPIa31NCxB67BTfTZtD3st3PNXWM3bSDJau2UBaZRN3MwvwDdqOx+oAqvrgxrMsvps+l4d55dxMzeFf//2PnH+YxGug6I2RsMgLZNS0DklCdFYt+e86yOylq8h/+U6JqAxYVGuAsw+T2Lj3CK1AM8rdZyODm5CpjHY0Zjh6/R5fTZpJsqbWVUXguzWMJas3KNtD3Ra8g3bw9++mk6JrUC6YI5Q1OkPqj4s1jJs+n/Com7SgvGZ9L+Q0d7Bp/zFCIy+Q2/puyPnV2CHi6l0mL1jKU209uh6os8PlpHTc/QLJqmse8vwNwP3cYma4efFUU6dURVhhZ+R5Js51I626eVC1TA0QX1bJdDcvQk+cp7zbSpVNWeTLOnuJuHoXzw1beNH4ZpBRdVY9vb9YNQDbj51hsW8Aea3vqLXD2YdP+OvYyVxNfuEyJFV9kFBexbgZCzjzIIk6cN3dV7wXsdD1gPsqf+YtW0Uj8EzfwJ//PpZ12/dwKz2XNVtC+fuYiaRXt/ASSFbXEnElmhcNb1wVW050FriYkMaEuUtI1tZTZenDKzAEvx37URmU/JmBz11jh9J3PZyLTcZ3WxieAVvYeuQUqZWNSiLvgGTa8KgbaMyQrKklvlRH4L4jrNu5n8/HT2bbkdMcj35E4RvD4Dvz4Rb7AT/TmOwka+tIqqhm54nzBO47wp++nsD6XQc4F5vM5aQMvAJD8AoMYfvxs64mhSPlqKgMNsfYhF7OxT5lTcgelq4LIuToGZ5q6ynv7HWZJL8d+/lm6hyym9opeWtg0oKl+GzZTVGbwRU5rWH45oHOz80/ZA8TZ8wnKvYplValueOGXQcYP2UW5Z29JJZW8se/fkXAzn2kait5XKSmuN3sqj58oqpmzIRpXIh9SnpVPQeirvPZn7/g3osC2lAS+P/9Pz/n3IMktBalSietqokJ0+cTdvICOotS8Zb/qpMFnj4sW7uR2j6ILahg+gJ3Ekq17Dl1kc/++DmJpTpeAym6BvafvUxu6zs8fNezLiSMxFI92Y1t1PJpmzEKwu/aqKi6bVR09XHwwnXlAu5YhOOKNUyatYBJsxZyNiaB2xn5TJm7hAXLVzN+yiz2nr6If8geZi5cSlJFlSu8rO+FiEu3+OuX4yhsM1LwuouZi5cxZuIMNu3ex6P8ClYGBDNtvhvfTp3D+h172Xf2MtMWuHPqTiwp2nq8AoKZvsCDuUu9OXknFl2PDa3FyvYjp/jb19+yfK0/0+a7s2xtINlN7YO2f5zG4lRMAvvOX2NNyB6i4p5xOSmd2CINekeiqd6RILtwlT8hx86iMihbI2qTwvt5AAnllXw1eTaXElJdpYmhJy4ww30lhW1GDl6+zZSFSwkIO8yVJxnceJZFwetudBaGTWp8pm8kPOomWw5HsnFvBA9yi7j+LJvCti6+j37Iup378d262xH9GFwW3Aj47z7AUv9gCt8YXPkPGpOViKt3mLZ4BVHxyagdpaoaMxy5fpupi5ZzOSkdtVFZMGqBK8mZjJ+5kHvZJa6ojr4X0msa2X/hOjtPXGDj3iMkVlRz/OYDqu0QFZ/K6m1hbNgbwe5Tlyhq73ZtczmrhAYuumqTnbIOI3OXr8Z9bSBqo52clg7+86vvcFsTiNpgRm3sN7rnY58yfuYCMmpfklimw3vjVsJORlHSYXFVVDiP9VgdwL/862csXOHDhl3hLFuzkc+//hav9cE8yC1l7ZZQvps+F8816/h22lx2Hj9D2buuQcbD+b0p6+wh+FAk385ezHQ3LwLCDlH4ul2JKAwTNVKbcEXrrj/LYk3IHg5eukV5V6+rkivybhyHLt+ivMuKf+gBZnp4c/bRE1IrG/luzhLmea3ldmaB65x+6N9trR1Cjp1h4jwPjly7S1bjG+Z4rmbCHDce5qvw3bqbOy+KKHpjxN1vEznNb6m2fbw8WWPqH9Z5LSWL9bsPcuDiTQpedaOxKGb69vMCFvn4s+XQCXadukjw4UheNLYpLQ2sdqLTc3D3Xc+J6Acu0zboOcxwJTGdeR4ryWpqQ2OyozHZyahtYd7Slcx282TSrIWsD91H+NnLjJk4g0vxqWjNVldJd2GbgSUr1/Ll+MmEHj9LeaeZfWcu8813U/Fc7cfYiTPYcfQ0amMPGpNi1COjH/K//vf/5cy9eKoc25i6HjtXktL5duocZixaxuIVvlxPfk4tUPKmHa+AzXzz3TQ81/gzafYiNu09TJXFyp5TF/m3z/6CT2AIz7T1BIcfZe3WXVL1I3wyftdGRWux8yi/nPCzzlHjyoW3tMNCQqmeq08yyH/Z6biLqeFyYhoxWUWoDDZS9Y3cfVE4pN/Gi4Y3PC5UU/quB41ZyXW4+iSD2xn5lL3rIaepnetPX3D96QsKXnVR+MZAdHou+S87qbRCVsMbLiek8iC3zHFhsruiCjdTs7mSlMG15OdkN7UPWhArrXauP8tmtqcvmw98T8Hrbnadusifv57AnrNXKGnvGLBAKdUbCWV6Fq5ax/iZC5jh7sXURZ7McPPizIMkV9WPxgxF7UbW7thH8KETSq8FM2Q3tTPTw5uvJ89m1lJv4sv03HiWzaQFHhy9EcPD/AomznNjS8RJKnv7XBew1SFhzFnmw+MSLYkVVUxZuJR5Xn4klFWSWf+GdaHhpFY2EZ2Rz+YDx8luejso2TSzroVpS5Zz6l6CIxLhKNs0K3f5MblFLPUPZtJ8D6a7rWDczAWs2b6XpxVqNCZcpkJrhoLX3cxbsYaIa3dpRunMuvPEOWZ6eHM1+Tk5LR3McPdiwlw3HuZXoLXY2RZxiuO3HtIEuK0N5Km2AV0P1PbZOR79kK8mz+JCXApqkw2VQbmbjS3SMsfTF3e/TSz0Vt7vRT7+ZDe9dkWvlJJvK2tCwli3cz/VNqVc+W5mAWu3hZHV2O4yxCqDDZ0F1m/fw7kHSVxLTie+REfBqy6i03N5UlGN1gy5LR3cfJbFlcR0bqXlKJ2OLcMbD40Jit+auZGazZXk52Q3v6Wq7+NbW87RBgWvu0mvbnG9vv6IipKgm1hRzf3cMso6e1CblFLtZE2dkjfzI+/ENSYbKdp6bmcWKgMGTYr5TSyvohbw3ryT+7ll5LW+w3vzTp7pG6ix//CGb2rHORW+MZBR0+pK9lUZleTbtKpmYgvVJFZUUfLW7LpZ0JhsvGh4za20HIL2RfC89uWQPDKlWslMRnWLa4tR+fvtv1bcSsuh+K2JvNZ33ErLoeB1Nxpz/9+u8/pz9clznukb0FoUQ343s5DLienceZ6PymB39ZjJaXqDm7cfHqsDOBMTT07zW1c/m4ruPhJKdVxOTONRfrkrWb7KCvmvurj6JIMrSelEp+VS1GZEZ7aT2/qO6ykviC/RUdph4V5WMdHpeRS3mySqInwSftdGpdoGO46ewmfjNvJa3w1YCJQFpsY5pMtR5VJjx7UF4GyG9P5jas2DE/F0PY7fczR60lqUcH61XVnwnRd654XTuf3kbDhX0dWfu1FjH/C7718AjX1KI7nyKuVcTMqFJrGiyhXdGLhAOe/Ks5raiCvRkVCmVFcklFUqJsjYf6y+F+JK1Hj4BXH92Qu0Fjv6HiVBL65ER0btS/S9ilFI0dVT+MaAs4R1x/fniSvRuHJAnmrrSdbUoTZBWWcvadXNpFUpWy8p+ka8g3aQ29LBncxCthz8ngzHxV5rhsqeXrYeOY1P8C4KXne5LrQV3X1UDHiPXjS8Ib5UqRx5XKwl7+U7Jan5/eTIPria/JzlG7ZxP7cEXY/ShC1ZU0fZux40JkivaSVJVYPeCvmvutlyOJJzj5JpBJas2Uiypk6pDjH0UdRm4GpyJqEnzpPV2IbGkW9z+kEi81as4VGhmmf6OhLKKil8Yxg0T6eyF6Iz8pi2ZDnJmlp0PYpxyKhuYevB42Q3vhlkVMo6e5m/bBXJ6hqacJTvOr5b+l7lOzvwu+YcOPch46ExKcfVOL5fP6Z9vnPL0fn63s9R0VsHfKe7+/qbkP2Ehc01RM/WH71yVp7UAN5BO7mXXUJuSwdL1wfzvO7ljzIq75/T+4nC+h6odOSvDN5CUqru7r4oZN+Zy+Q0tQ3bUl9ttLtyXwbizOOpdjRX05gZcQaUvlc5V92AHJpqW//vO9/nWuD0vXi+HDeZpDI9p+/F8dzx95rb3IHaaKeyT/nMKwdct8q7HINTGfCaHK9D49zesvZXAA6XfCwIPxe/a6NSC/gEhrBiXRCF71Xw/Bpxlok6z0NjUi6oH7ooay2Oi+4A3j9eZVBM3c30LOYuX83V5EzUJqtr79+VRDng+fNfdbgSGvNedrgiGc7kyApH/sjAhMn0mpf47QwntaqZ6ylZBO6NIKf5LfpeKHvXRWjkBdzWbiS9uuWD5c/OfBd9r+P8HX0y3j9OZVAqOU7ejWPJ6g08zC93vRfO6hhnZYraaEdtsLI14iTHbz2k1g6LV28gRadEVLQmGxk1jew+dZHT9xMo7TCjNtmp6bOzKfwYPlt2Udmr5Ma83xNEa4bT9xNY4O3HrYxcdBbQ99p5kFuKh28A8SVadD2Dy2QTyyr5/KvxHL58a8j22i/NSFU//4jn1vcq7+Wm/cfYcjgS/10H0JjtVPX9fLN+RqKqz87VJxmsDNhMsroG3Qg9ff5RaC3wVFPL+CmzCAjdTytw5Oodjl2/R8TlaC7Fp7puxH7p74wgfIjftVGptNo5dv0eF2KTqej+dDNefhvYqLbD/dwyTt6LdyRADr0QK3kadh7klbEqOJSEssoR2/0PRElUNXPs5n3WhYazMmgHR2/EKJGUXjtJqhp2njhP8VvTsGXZPxWVIzp290URZx8mUeYI8w93bI1d6SmzelsY/rsOEBoZRVG7AY3JTo3Vzve3HxGw+yB5LztdVSmPi7WMnT6fE3ceU8/wCZYak53gQydIrWwaVF7t6i48pIuqndzmtwTtO8KNZ1n/5fb+PzdOo/LLTE+2obdCQNghPPwCyax/hcZkd01P/pRGxfWZmX56KfvP+To0Jjt3nxewevMOEkp0VPUpSbWrAkPwDdpOeZf1F3+dgvBD+F0blfKu/hD0L/1B/FrQWpSQ98cWRo3ZsXX2I6JUzgZegfuOsD/qBsVvza629mrT4K2DnxudZeT5SU6cVT+Hr95hzfa95La+c4Xwy7uUJOVq28CZKnbiS/XsOXOFzLpXH2wT76zMev/nI/blMCjGUfczmrafC6dROXkvnr3nr/0iQwmrbY7EWFN/6fe52KfsjLxA3svOT2ZUnJHCX/ozcOKsQnKOvXBujw63FSoIo5XftVERRhcD+6jU0p+j80u/roE4+6g08PGcD+c+f90POPa3SFpVM0mqGlTGX35BVJtspFe3El+ql1bvgvArQ4yKIAifBO0PiFL9o3BWVsmUX0H49SFGRRAEQRCEUYsYFUEQBEEQRi1iVARBEARBGLWIUREEQRAEYdQiRkUQBEEQhFGLGBVBEARBEEYtYlQEQRAEQRi1iFERBGEIzmZ1P7RRnbNPiWsA53u9SpzzjT70WFrzJ+i74hi+WWkd/Jqcg0V/6fdZEISPI0ZFEIQhqE02MmpfktPSgfojnWXLu5Thjvmvurny5DmPClWUdlhQGWyoHFN9n2rrSKtuQWMa+bHSa1pIq2oeNO/ov4Iy7waSKqp4VKBy/UxlsFH4xkBaVbM0fxOEXwFiVARBGEItsOP7c5x/nEK1fWTjUN7VR2UvFL95y7rQA3w7axH/+eV4YgvV1PSB1gI30nJY6h/M3cwcqqzDD7JUG+FaShYrg3Zw50URtfBfHp+g74VkdS2Lfdfjuy2MFG29axr24yINAWGHZM6XIPwKEKMiCMIQaoHQyAtExad+0KhozXZU3WbW7dzP0nVBFLd3EXHtDk81ddQCd7IKmTTfnZupz6lH2fpRDTO4T220o7VA5J3HzPFcTVyJiqq+nz4fSWOyU9phYUPYIQ5cvElSRTX3sovR9ypGJa5Yy8a9ET/IqHxwcKnjXCQyIwifDjEqgiAMoRbYdTLqg0ZFZbBRbYOjNx8wbsYCnukbXVOLK62Q/6oLr8AQwi/coIV+01FpdUzCNimTpp05JBqTMn06POoGC7zXkdfajsb806Zl6yxw5clzpi7yJEXXQLKmjqI2AyqjzWVUAvcdGdGAqAx2tGaotsOlxHQuJ2VQ3mUdZEhUBpvrXKr6cE3SFgTh50WMiiAIQ6jlw0ZFbbRT3mXFa9N2/u2vX/PP/+8/OHTlNrWORFqNGU7ejWfakuWUvTOjNtpRG+2UdfbisS4ItzUbyahppbDNSMCew8zzWkN6TSsNQIqunpluXpx5kETNB6I5I6E22inrsrIu9ADrdx8isbySq8mZrvP4kFHRmJSkX53FRlyxFs+AYHy27CKuRDsocuI8x9UhYUxZtIxpS5Zz8FI0VVaJrAjCz40YFUEQhlDLh42KymBDbbJzO7OA6W5e+O3YR2Z9MxpTn8uQrN2+l8WrA6i241rkVUY7d7OK8Nuxjy2HIwk9GcW+81eJKymlqM2IzgLF7SaWrQ/Ge/NO1EYbaqN9SPTifbSW/teoMUHey07me63lxJ1Yjt6IIa5U56ryGcmo6Huh9J2Z+FI9Plt2smjVOs49ekJ20yu0lsFVQ1V9sGFvBDM9vIktVHPo6h3meK4mrbIBneWnRYEEQRgeMSqCIAyhlo9v/egskNPylqmLPLn+LIsau7K9ozFBUZuROZ6+rAnZg7538CLfCDzIK+c/Ph9DxLW7VFmVLSQlqdaOxgTrQsOZ4+lLwSsDOguUdlh4VKDiblYR97KLXdzNUkitbHJVJ2nN8KhAxbezF7HrZBSRdx+j6+k3D8MZFbXRzuNiLcGHvsfdL5Dzj5+S19o+bMl0eZfy/oQcO0PoySgSK6ooeN1FXus7St5aUBl++c9PEH5LiFERBGEItXzEqDhKf88+esK4mQvIrH+FxqQcpzFB0RsDM9xX4rdj3xCjUmWDJFUNC739iS/VU2ntf3y1UckNCQg7xJxlPuS/7KLKCrmt71gRGMLMpd7MWe7rYvYyH2Yv8yHi2l30PXbXlkxMdgnTFi8n+FAkWguojSMbFWcZs9+O/XgH7eD0/QQK24w0g2OLa/C5q002spvfcjX5OcvWB7Ng1TruZRcP6dUiCMLPgxgVQRCGUMtHtn4cC//a7Xvx8AtCY+5fpDUmKH5rZrFvAKuCQwc1gFMZbOgsdm6m5TDLw5vT9xNopD9qoTbaURtsrN4WxnyvtRS3mV2P7Uy6HQ6tuf811gGbD36Pf2g4OgvUOB7faTiGi6iofif6lAAABO5JREFUDDZ0PXAuNonlG7bit30fZx/Fo7MoycHvvzc7T5znq0mzeFSgoh5oADQfaWgnCMJPQ4yKIAhDqOXDRkVjhPLuPqYuWsb242cHGRWVwUaFwcbWiFNMXexJqSOZVmW0UwukV7ewKzKKoPDjbDt6mmeVtcRkl1DRbUXXAzktHSzxDWDL4chBUQrVgFLg93G+Ln2vnch7cfjt3Mf+89epMPRxMSGVezml6HrtjmOGz1FRGWzUoJieyDv38d26G6/AEC7Gp7iSgSu6la0rD/8gPPw2UQeUd1nZe/YqSRXVaH9ilZIgCCMjRkUQhCHU8mGjojVDXImOLyZMJ65YOyiZtaK7D20PxOSUMm2xJ48KVFTblATXtTv2sshnPSnaOqIz8vnbt1NZuWkHD/LK0Zjs1KH83pSFy7iXXUy17cdV/WjNNqIz8slrfUfwoRPMWe7L5kMnSK2qQ2tRDM3HypNVRjuNQP7LTo5HP2DN9n2cj01W/s9go6oXLj/J4Jupc5nh7sVMD288/DaR1fjqJ5dTC4IwMmJUBEEYQi3DGxW1UamwqbTCocvRLFu/hZIOiys/pf84G2qTje3Hz7BqcyiVvb2UdfYSnZHP3RdFSjfbdhN3MguJK1ZKf/U9UNTWTVD4UTbtP4rW3Pujcz7Ku5SKHK0ZnukbuJaSRVZjG5XWD2/9DPc4WjPUAxm1L3mmb+jvo2KwoTLYiSvRcjEhlWtPX5DV0CazgwThEyFGRRCEIdQB24+d4VzsU6px5nH0UfC6m/xXXagMvXgGbOH84xQ0puGTSLUWRxRl+x7W7thDbus76sA1y0ftmAPkbPaW3dROwO5DrA7ZQ3mXeVDeyU9B16M0kNOaB7fj1/dCbKEa/9DwH9SZVmdhSMRIZbBR1acMYay2g84iJkUQPhViVARBGEJ1n50Ttx9x+3kBlX3KdkYdcComnmmLlxO47wihJy5Q8LoLzQcMhcYElT1WwqNucCkxjeq+kWb92LnyJIOwM1coajd90oVfZ7HzVFNHeNQN6XkiCL8CxKgIgjAsGtPgst7KXjvxpXqW+gexLjSc7Oa3PygioTbaByXbjoSztHjgc34qnCXJv/R7LAjCxxGjIgjCsLxvLMq7+tCYlXLdavuPMxTO3I4PH/ePHe4nPU8E4deBGBVBEARBEEYtYlQEQRAEQRi1iFERBEEQBGHUIkZFEARBEIRRixgVQRAEQRBGLWJUBEEQBEEYtYhREQRBEARh1PKrNirH6y1UGfvQGfrQCoIgCILwm6PS2EdZVx//8WsyKo9e9fI/UrrYpDWT1GYl4Y2VeEEQBEEQfnMktVl5+NrKv2QaGJv3KzEqSW96+adnXfz35C7+Z6ogCIIgCL9V/snx739L7GRa4a/EqLRYbJxq6CWsuoc9giAIgiD8pgmr7mFvtYWHr3p/DhvxQf0sRkUkEolEIpHoU0iMikgkEolEolErMSoikUgkEolGrcSoiEQikUgkGrUSoyISiUQikWjUSoyKSCQSiUSiUSsxKiKRSCQSiUatxKiIRCKRSCQatRKjIhKJRCKRaNRKjIpIJBKJRKJRKzEqIpFIJBKJRq3EqIhEIpFIJBq1EqMiEolEIpFo1EqMikgkEolEolErMSoikUgkEolGrcSoiEQikUgkGrUSoyISiUQikWjUSoyKSCQSiUSiUav/D3vIEuAOLglcAAAAAElFTkSuQmCC" /> </span></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: left;"><i>(Σχολικό βιβλίο μαθηματικών Γ Λυκείου, εκτός ύλης)</i></div><div class="separator" style="clear: both; text-align: left;"><i> </i></div><div class="separator" style="clear: both; text-align: left;">Η αντίληψη του Bolzano για το όριο ήταν παρόμοια με αυτήν που έχουμε σήμερα. Δηλαδή, ότι ένα όριο, αντί να είναι μια σχέση μεταξύ απειροελάχιστων, θα πρέπει να αντικατασταθεί με τον τρόπο με τον οποίο η εξαρτημένη μεταβλητή πλησιάζει μια ορισμένη ποσότητα, καθώς η ανεξάρτητη μεταβλητή προσεγγίζει κάποια άλλη καθορισμένη ποσότητα.<i> </i></div><div class="separator" style="clear: both; text-align: left;"><i> </i></div><div class="separator" style="clear: both; text-align: left;">Έδωσε ακόμα την πρώτη αναλυτική απόδειξη του Θεμελιώδους Θεωρήματος της Άλγεβρας, το οποίο αρχικά είχε αποδειχθεί από τον Gauss, ενώ έδωσε και την πρώτη επίσης καθαρά αναλυτική απόδειξη του <b>Θεωρήματος Ενδιάμεσης Τιμής</b>, γνωστό και ως Θεώρημα Bolzano.</div><div class="separator" style="clear: both; text-align: left;"> </div><div class="separator" style="clear: both; text-align: left;">Γενικότερα, το πρόβλημα της εύρεσης γενικών τύπων για τον ακριβή προσδιορισμό των ριζών πολυωνυμικών εξισώσεων είχε απασχολήσει τους μαθηματικούς για πολλούς αιώνες, από την αρχαιότητα μέχρι και σήμερα.</div><div class="separator" style="clear: both; text-align: left;"> </div><div class="separator" style="clear: both; text-align: left;">Όταν δεν ήταν δυνατή η επινόηση τέτοιων αλγεβρικών τύπων, τότε η προσπάθεια τους εστίαζε στην αναζήτηση δεδομένων και πληροφοριών που θα έκαναν τον προσδιορισμό των ριζών κατά προσέγγιση και με όσο το δυνατόν μεγαλύτερη ακρίβεια. <br /></div><p class="MsoNormal" style="text-align: center;"><span style="font-size: 13pt; line-height: 107%;"><img alt="" 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" 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" 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" 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YfSQnXmKCjj5e2H/+r1rN+wBWtbJ6ZOn8vFSyGcOHkGN3cvps2cR8DOvUJ/sn7jVmYrKAttff/+AyZNncXWbW/jO8vLK7Cwtsd1iSeubp7ExMZz8FAgc+erjBC+PwfGXKg8eVLNhk3b+PSzr/jDJ58xc7YiKSlp37uckNAwPhs/CTUNXU6eOo27hzdLPLyJiomjv7+f1PQMSsvKmDlnARMmTsPE3IaMjCzWrt/Ef/7mk2EXg4Tm5mb0DEz5xa//yN79stgQb9+V/Oq3f8bW3lkYRdyJjOa3f/wry/1W0dfby94Dh/jbF1/z2biJbNy0DYCWlhYcnZfw//7Lv+Hu4U1Ly+gBuw2NjVjZOKKqrk3Ajj3s3nOAbQG7cHBaQkhoOCD74LzpdFauWkdPTy8REXcxNbdBKpF9lCQSCf6r1mFsagVAX28fy1esxs7BhSVLlxEefp1NWwKYN38hO3buFV7QmzdvY2BoTlNTMyGhV5g5d4FghTh4KBC3pctQU9ehrOytNau1tY1F6jrMmqskZ2EA2LP3AIs1dGkdHiGvWrMeV3cv9I3MhJiW7QG7UVPX4dVrmZXm8eMnTJk2l917DgBvLSrLfFYIQqi2phblhers2LUPiURKckoacxRUSB92jcXExuPu4Y2KqibHT57m2IkgTMxtUNcyoKFRNup58fIldvbOhIVfp6a2Dl0DUy5cvCzU3We5PzNmK3L9xi2qqh5zK+Iu4yZMEdr+afUz5istYt/ws5GYlMKkqbMF61VPTw+OLu7oG5rR3tYOUim+y/0xMDKnd/ijFR0Tx6mgs3KjZYCS0jJhdBN49ASbtgQIv5WVV1BSUoqBkTmKSou4cDEEgH0HDqGhbcCVsHD2HTiEtq4Rdg4udHZ2DZdZjompNXHDQvwNXV3dXL12naGhIS6FXCEzM5tHjyqxsnHg0TuWh6ioGHT1TQRrW1R0LOMnTMXT24+enl6ysnNQWqguWKLq6xswNrNm0WJtysorKC4pJSo6lomTZ2Jl40hBQRFDQ0MYGpvj7buS8KvXyc7O4fXrGtZt2EJTUxM5OfdQWKAqiAjXJZ4s81kh1OnipVAmTJzOhUsh5BcU0t7egYaWPr5+/oDMIrNq9Xr0jcyoH7Zkmprb4OW9XCjjxs3bfDF+MolJslFyTEwcM2Ypkp6eCcDr17UcOnyM7Tt2s2bdJqbPms/lkCtCNt7RE6cwMbOmoLCIwvv30dQxRF1Tj5u3bgOwfsMWtHQMR3VHSqVS4uMTMbe0Y/uO3RQXl7Jpy3YWqmlRWVnF3ahoNLQNWKimReF9WWZdRlY2cxVUiI2VtUlCYjLLfFYwR0GZO8Mfz3t5BZiYWbPSfx0VFY9Yu24j85XUePz4CekZWejqm/DXz7+iqOgBTU1NrFm3ic/HTWLHzn00NjVx8FAgIaFhhF+9ztlzF2lsasJ1iSfOrksB2Qg88NgJFigvxtt3JX19feTl5TN7nhKngoIBWR90/GQQN2/dEa511+79TJwyC0dnd+HjefBQIAoLFtE1PPDbu+8Qjk5L0NYzFkSw/PPaxQr/tWjpGvG6plZ4J7YH7Bb6qqTkFBoaG3n27AWubp5yGYKvXr1GR8+Y4ydPC/XauHkbU2fMIyU1fcT5QGaZcPf0wcXNg4yMLG7eusNXk2aQnJJGecVDLKzt+dOfvyAyKgaQDTj1DM3YNNz/5+Tm4eu3Ck0dAyGEIS4+kclTZwvnbGtr4+Cho0L/8ezZc9IzsgDYsWsvm7e+FRdFRcU8ffqcxRp6KCiqcjkkDIDdew8wX2kRlcOeiK3bd6GsqiG09YMHJcyep8SuXXuFspxdl2Jj7wzI+sTtAbvR1TdhqacP7e3y/dLPgX9YenJY+HVUFmnyy1//iaUe3oL6/FBCQsP427iJKC/UEG6Yo/MS/vTpOOITkwGZS2PhIi1+94e/snP4pi319OE3f/gUdw9vBgcHaW5uRt/QjF/+5k+CUPFZ7s+vf/cX7Bxc6O/vp6+vn9VrNvB/f/l7tg4/SIlJycyco8i4CVM4e+6iUK8HD0o4dfosVe+YV79JQ4NMqGho63Pw8FGOHjvJgUOBuLkvEx7GNwFo7W3tLFnqTV1dPUFnzmFj5yz8Vl39lEXqOuzddwjJsHjJvZfHhK+nE7DjbWzPxs3bMTAyF4JU4+OTOBx4HIlEgoPTEpxc3AXrT01NDYpKi+Q6GYDLIWHMnquMu4c3Oe9EwdfXN2BobMGqNRvo65PVq7KyillzFuCz3F8wR24P2M1iDV05oTJ1+rxRhcobcTgwMMDmrQEsUtehsbGR7TtkZbwxvfb09GJt64SWrpEw+s3JzWPWXCVSUtOE8+zZe4Dm5mZOnzmHgbG5nGvoyZNqJk+dzeatMpEQHRPHlOmzyb2XN1yHQfxWrsHIxILu7h5S09KZPG2OnFBxcl2KgZG5zJUhlbJ5awAOTm5Cp/w+3oyIent7WeG/loBd8vFY7e3t6OgZ4+XtJ2w7e+4CM+coUjjcKd+4eQsFRVXKh+MBSkrL2LV7n+BWeYNUChLJEI2NTezbf4js7FzSM7KwtnUSTOL9/QMs81mBtZ2T3LH79h9mxuz5PHpUxbr1m/H0Wi73e8TtSD4fN4m7d6MBSEpOZer0ucLIs7e3F3tHV6xsHSkqKqanp4eBgQFu3IwgPj6RI0ePY23rSGtrK+UVD1mwUJ3sYQEHso+WnYML+oZmgpnawMicVWvWC/vEJyQxaeps0tJlrjJZvNPbdrtx8zbjvpxCYmIyIMuYUVBUJWfYCvNNXN298PD0RSKRIJFICAu/zvnhoO5nz56joaXPxs3bhP0PHApERVVDzpX4hsbGRkzMrNm7722QfEHBfebOV+HQ4aOALGNEZZGmcF937t6Lkoo6L4fdr4ODgzi7erBYQ5cnT6ppbmnB3NKOPXsPCmU+elTJtJnz2BYgy5yMi0/kq0nThWe5p6cXLV1DvLxXcCviDrHxiXL1LC9/KLPEnn/bn0VE3GH8V1M5f/Eyg4OD+K9Zj66+qVzfUFpajpGJJXFCeVKcXNyxc3BhYGCA9o4OTMys8VnuLxxXVfWY6TPn4evnP2qwbWXVY6bNmMf5C5fltm/aEoCXtx/d3d1Cf5OSmo65pR3578y7df7CZRZr6sl9hB9VVqGiqon/6nX09spbvvr6+lm3YQtOLksF1/bQoMwyZ2XrCEBxSSkTJ8/k9p1IQNZXzJ2vIghsgNPB5/nbF1+TmCgTxFY2jjg6L5E7V2xsAjr6xpSVVwh9XUdHB8t8VrBz18g4SpVFmnj7+gv/nzt/ka+nzOL+8HQRW7fvQmWRppxQmaOgLIil6qfPmLdAlaDTZ4UyYmLj+PSzrzh7/uJPHtP0Q/iHzqMSfu0mv/rdnzGztOX58++XwvZGqKioalL0oBiAlf5r+Y///AM+y2UPf3NzC0oq6vzl0y85Mays3wgVDy/fDxIqQ0NDtLS2Ymvvwq9++2c2bd4OwJ3IKKZMn8OkqbPJ/xYX1Wi8df1sktuel1/AmeDzctuysnPw9PKloaGR/QcO4+zqIfx2v+gByqoanD779pjy8odMm6HAxUuhwraklFQWqmmRn19IW3s7ly5dofrpU1rb2jAxs2bVsMUGoLmpGQ0tfdauf+uW6unuwdrOCVc3T1JS0rl+I0L47fHjJ2hqG7Jrz36GhmSipK6+gfkLFrFv/2Fhvx8iVACCzpxlvtIinj17xuq1GzE0NhdcQZ2dXbi5e2Fj70L3sAjr6enF1t6FTZu3MzQ0RE7OPS6HXAFg+YrVmJhZCzEeIBOz2rqGwgg+MiqGydPeCpXBwUF27NqLlo4hTU3NZGRmvleotDbLxHZjYyNXwq/huWw59o6uwujzfXR0dOLrt4rDgcfltjc2NqGrb8KmLdsFwXcm+BxTZ8wTYldaW9vQ0jHk5KnTDAwMEJ+QxN3hEfdoPHv2HJ/l/pSWlRMTG4+NnZMQL9HV1YWRiSVWNo5yx8TGxjNHQZn8/EIsrR3YsGmr3O/3ix6goqrBsRMyd1NCQhLz5i+Uc4/Z2jtjYmYt5w7NzMxm2/ZdrFqznpBhgX7u/CUUldRGxFts3b4T5YUavHoli0XSNzSTEyqZWTlMnDJLmPfiu4QKQHpGJmvXb8LW3oV1GzbLzWtyKeQK6pp6vH5dw8tXrwk+e5HWVpn4e/z4CRraBhw8HCjsv+/AYRSVFpE37Lp5l8ePnzBj9nyuhF8TtrW0tGBobIHfyjX09fVx6fIVOaGydv0mNLQNqKuvE9rQx3clpuY2DAwM8KC4BIUFCwkJDRPKbG5uQVPHUBC2UdGxTJk+R3iWG5uaMLWw4evJM1FaqD7CspCRkcUcBWVu3Hz7fsfExjN52hwhTsJliSdmFrYjrtHKxoHVazYglUrp6enBzd1L6D9f19SgrWfCtoCdggh4+fIlC5QXywmtdyktK2filFlyfQ3I4keUFqrLWXvj4hOxsXWk9J1t/qvXo6NvIndsV1cX1raOuLp5jHDL19c3YGxqxao1G4R4voGBAdas3YiWjhG9vb3kF9xn2kwFIm7LhEpIaBgLVBbLid1Ll68wfeZ8QfzL7vFquXPV1tahqW0g1y80NzezzNuPwKMn5Pbt7x9gsboOW7btFLadCT7PuAlTyBtOGvkuoZKRmY2ishrXrt8QykhJTWPy1NnExslbXn8ujKlQ+Wb6YHX1UyZOnYWD0xKam5u/V1nvCpU3o5jlK9fw69/9BVsHF7q7u2lpaUVJRZ0/fzqeo8dOAh8mVHz9VskJlYbGRsyt7GVCZYtMqGwP2M2fPh3HPMWFI0xn35Um+b5g2v7+fuEj+qaM/QcOs3zFKlrb2ggI2DVCqKgs0uTU6bPCtojbd5k7X4W04Q8ZyDIB1LX0Cdixh6rHT4Q4mMamJlk9Vq4RhEr102fMmqtE8DtWoszMbOYoKBMRcYe6+npOnnr7glVXP0Vb14gdu/YKQiUzK5t58xfK+XK3B+yWdfzDrqCnT5/JCZWuri7MLe3wWe4v1ybHTwahqKzGixcvWLt+M/qGZkIsSF1dPdq6RmwcFo9v2LVnP+qa+lQ9fsLFSyG0DwcTbtm2k9lzF8h9kJqbZSPTN+67u5HRTJo6S8gcGxoaYsu2HRibWjEwMChYVN5YbPr6+nB288DAyJzO4c7vcOBxfJb7ExkdS1JyKhUVj751Qr+2tjacXZcK9+XNfm+EyvqNW+SEyrSZCqQNuywAvH1XYG3rxOMn1Zw9d1Gu/b5JZFQ0+oamNDU1ExFxB3NLG6E9Ojo60NU3wdpW3qISGxePlo4hpWXlWNs6YWHtIPd7SWkZKqoaQkxTfHwicxVUBNHwRqiYmtvIBbOWVzxkyVJvtgXsEupw/UYEcxSUuRspL7YCdu5Fz0BW76GhIfQMTFm9doPwe1p6JvMUVYV2MbOwxdv3rfvoVsRdmVAZdv2kpKbh6+fPufOXSExK4V5eAe3t7UI7l1c8YoHyYoLPXpC5AW7Ki3MNbQP2HXhrIdl34DALlNVGHbRUVT1m8rTZXH5HVHR0dGBkYsmqNRvo7+8XLCr3h+cM2rBpK+pa+tTVy+JCWlpaMTKxYMXwdA35+QXMU1zIpctvByQtLa3oGZrhs1w2+n4jut88y42NTRgYmWNr54KLmye6BiZy70J2di5zFJS5fuOWsO1UUDDzF6jypLoagLXrN6OlazTCYufk4o6tvcyC0tvbi+sST+wcXJBKpdQ3NKBrYMrmrQGC9eRBcTHTZ83n2vXR54x6/PgJs+cqEXTmrNz2hMRk5ikulJuI7VbEHcwtbIXgUalUSsCOPSgtVBcSNUD2rlrbOuG/et2IWKKamlqMTCzwX73+rUVlaIj1G7egq29CX28fefmFTJ0xj9t3ZM9m+NXrKCqrkZ391sK8ect2dPVNhH7O0XkJdg6ucud6Y4Vet36z0B61tXU4uy4l+Nx54RqkUin9/QOoqevI9XFngs8z/qupQjzTG6HS3y+7ppKSMubOVxGEyr28AhSV1eRiDi9dvsczTNoAACAASURBVMLseUoUFRWP2v4fO2MmVO5ERqOlaySX919SKmvQEydPI/me5qd3XT9lw9k5ru5e/Mev/sDqtRuHRUjLBwuVX/z6jxw6cgyQBdP+5vd/wcbemcysHArvP2Dj5u38n//4LVuGA5SWevrwi1//SRiJ9/X1MTQ0RODRE0ydMY+Ll0Lem9bW0SELHF21Zv2oH6+bt26TlJRCTU0tGtoGbNy8jY6OTlb4r8HU3IYnT6q5GxlNZmY2ltb2gttCKpXiuWw5C9W0ePhINgnam9HBpi0BzJ6nxOkz54TOaWhoiBX+azG3tBeEyomTp5kyfS6xwx3B4OAgq9duZIHKYhoaGujo7OTwcDtVVj4mMTEZDy9fvLz9hGvZvCWAeYoL5awS2wN2o6qmJXS8JSWlTJoym4OHZKPSlpYWLKxkwV5v6tzf14e7hzfOrh4MDg5y4uRptHQMhLknYuPi+Xz8RIKHLUqDg4PCpIKKymps2rxdrtO9ees2f/viazlzcvXTpxiZWBJ+VTbaiIyK4atJM4RRZXt7O47O7uzdLxv5JSWnMmnqbOGD19nZiZWtI8amVvT391NR8ZA5CsqC8AFZGq2rm5dcdti7tLa2Ym5py67d+yh6UMKtiDuCRfBDhMqtiDvMVZB1TMnJ759sqq2tDQcnN4xNLZFKpZy/cBkFRVXu3csjMiqGe/fyMTS2wNzSTi5LbNOWAPxWrKalpYU9+w4yc44imVlvU+jj4hLQ0DIQRpGxcQkfJFSqHj/B0NiSM8Hn32ZpVFahoKiK57LlgOx5GhoaYslSb9as28TQ0BADAwNoaBng6PTWpH4qKBhLawchU83U3AbPZb7C75dCwvhi/GQys3IYGhrC23clSgvV6ep8657bvHWH4IoZGhpiqYc3ixbrcPLUGbq734q/7ytUXr16zey5SqwbDugGmfVUWVWDiNt3kUqlnDl7AWVVDR48KGZwcJBTQWdkbp7qpwCkpWcwbsIUjgTKRtwVDx+ipqGL/+r1DA5/WMsrHqK8UIPQMFk6/+07UUycMov8gkL6+/upr29AV9+Enbv28aT6KaqLtfFZ7i+40+rrG1isocfR47K+srOzExs7ZxZr6tHU3IxEIiE+IZGZcxZw7sLbuY3elBWwcw9SqZTu7h4cnZfg6LyE3t5eQbi4uHkI93nP3gNMn6kgTMXw7vMG0NbWjruHN8amVrx6Z66ZAwcDmaOgwsuXbzMSr9+IQEVVk7z8AsKv3eDFy1ckJCYzdcZcAof7fZAFbevoGXPxUsiIfre9vQPXJZ4YGJlTN5yh197RgYWVHZu3BiCVSsnOzmXytDlERsUwMDhIfr5MALwZkL148RJ1LX2cXGWB80NDQ5w9d5H5SovecYvJBnJzFFTkguBrauswNrViz96DlJWVczcymq6uLiQSyQcJFWVVDUH03LuXz7SZChw4eASJREJHRweL1HWEvrarqxsnF3cWa+jy+nWN4N78OTFmQiUkNIxPPh3PJ5+O48DBI5SWlrN77wGWr1j9nb7895X3xYQpTJupwPmLIcQNj+ImTJou+O5q6+qYMVuRX/7qjxw4eAQYFiHfECoGRub8+y9/z6o160lLz0Df0Iw/fPIZC4cnG+vv7+d+0QOmz5ovBLwqLFBl0tQ5LF+xioSkZMKv3qChoRFzSzv+n//+v7GycRQyRd6loaGB1NQMFi3WwdbemcLCIsrLK4S/k0FnsLN3oa6ujt17DvCb3/+Vm8Mfrl179vPJp+P56+dfsXrtRnp7+wg+dwFVNS1ycu6RkJCEyiJN1qzfTMiVcO7ciRJiFzIys5k6fa4gMt7w5qMScTuSoqJidPSMcffw5vyFyyQlp3D4yDEWKC/m4HAH3t8/wOWQKwSfvcD1GxGkpKQRGRXDAuXFREfHUVh4H9XF2vivXseZ4PNEx8RRXvGQwKMn+MMnn3Hu3EVKSkrZsGkrs+YoscJ/LcmpaWRmZePovIQp0+aQlpFJaWk512/cQkVVk4REmQuhuLgEXX0T9h84TF5+Abb2LhgYmRMWdo3Q0HCSU9IYGBhAIpFgZmGLhraBnC+6u7sb/1XrmDp9HvEJSZSWlbNpy3b8V60XsoQeParE2MQSJxd38gsKOX4yCDd3L+qEAL5Ups2Yh9cyP+7ff8DlkCuoa+ihpq7L9es3CQkNZ5nvCvQNzUhNy6C0rJyt23diZGLJw4ejz6Db1dWFg7Mbf/zzF3w1aSYXL8mCOBsaGlFV02blqrXfKlS6u3tQVF6Mo7P7t875cPPWbf74yeesWy/7YF67fou/fTGRTz+bgIm5DU+qn2Jj58SM2YpcuBRKSWkZwWcv4OTiTvmwK6a2rg4dPWP0hyfbK3pQjLuHN0eOHBfOLcvmmM3dSFnMyvuESnX1U/buOyg8oyAT26eCglmgosahI0cpLS3n4uUQnN08KBkWQoODQ2zeuoMFKurExCWQmJSCvYMrkcPnk0qlmJrbMnXGPDIyskhJTcfN3YvJU+dw5uwFomLi2Lh5G2oaupw+c5ayMlm6uqKyGlfC3s7Zc+36DSZNmc3Nm7fl2rGysooFKovZ8U5M0bcJlf7+fg4eCmSOgjIng4IpLS3H23elXN93Jewas+YsYM/eg9yNjCY2LgEzSxsCduyhoPA+zq5L0dEzJiQkjNCwcDKysjlw8AgTJk7n7LkLFJeU4rvcH7+Va4SP/pvA7917DnAm+DyPn1Sjq2/MruH5pG7fiWTchMns2rOf8vIKGhqb2B6wGz1DU4qLSzgVFIy6pj6+fqtITUsnJDSM1tZWjhw9waLFOlwKuUJpWTnLfFagoqopDIC6urpZvmI1izX0OBl0hrS0DK6EX0NhgSqJSSlk5+SiqW2A57LlhIZdJeL23VGX53j0qBINLQPcPX0oLSvn2vWbaOkYsnf/QcF6C7L4pPFfTeXPf/sSE3Nr6urrGRoawn/1BlTVtLh6/aYsdmvPfnz9Vr936oiY2HhmzFZk3fotFJeUceBQIHYOLu+khhczc84C1m3YwslTwTx/8YKVq9ZiZSNzO+07cBgtXSM2bdlObFwCN25GUFNTy7oNm9HUMSQ+MZm8vALsndywsXOWS+tvam7GwWkJf/jkc774cjI3bkYgkUjo7x9AQXEhq9a8tR5+U6js2LmPydPmcCb4HIWFRezctY+vJk3Hb8VqQkPDqK2tY/+Bw2ho6VNaVs7FiyFoaOmzYuVaYmMTuBJ+7VtTxD9GxkyodHR0sm7DFnT0TTC1sMHS2oELFy//4ECekNAwxk2Ywtz5Kiz19MHMQjb9fNY7ZrjmlhaWevpgYGTOteuykfUynxX8+vd/EYRKY2MjegamKC/UwNjUiu0Bu0lMSsbHzx8jE0shBRJkrhYn16UYm1lhamFDds49YuNkmSf38vKFUaqqug43b90Z9dquXruBvpE5Ftb2WFo7YGXjKPenpWsoZHicCT6PvaOb8BC9ePEKWzsX7BxcyX9ndL57zwGMTC0xt7LjcsgVWlpaWL1mA1u37RQydLq7e9ixc++os/aGhl3Fwspedv079tDT00Pg0ROsW7+ZTZu3Y25pz5Mn1cL+r17XYGXjyKYt24XMppOnzmBkYoW5pS1Hj52kvb2dgIDdrF67gdbWNk4Hn0NX3wRjUytc3DyJT0jiwoXLaOsaceBQIDU1tdg5uODu4S1LxTa1wsXNQ27kDpCckoaDkxsGRjITd3NzMzduRowIpou4fVfIyPgmW7ftRM/AFFMLG7bv2DPiPpWWluHu4Y2egSnePivk5o1JSEzGzsEVM0tbLKzsCTp9lqysHIxNrfDyXi7MHbFl2w4MjMwxNbdmydJlI+ak+SbxCUlo6Rqxes0GGoczblpb21i5ai2ngoIFoRJ0OniEUJFIJJy/cPk7s+cSE1NwdHEXMl1aWlvZvCUAdU19YmLjh+OEbDExtSLozFkMjC1wXeI5YuKu2to6vJevxMzSFn0j8xET8uXk5uHi5in47ru7u7GxcxohVCoqHhIUFDzqPA7Xb9zC1MIGI1Mr/PzX8uSJfHB6T08Pe/YdxNjUClsHF7lrl0qlePuuxNjUCiMTC9au20R2di4BO/ego2fMzVt3GBoaIjomDgsre8wt7TAxsxaE1RuamptZt37ziHmDXr16ja/fKkKuhAnn27v/0HuFCsgCio+dOIWBsQVGplYcDjwmN0BraGjEb8VqDIzNuTMclJyVnYOzy1IMjM1Z6ulDfV09UdExmFnaCqnYRwKPY2RiiYmZ9Yhnuaenl81bd6BrYEJIaBgNDY2s37hVEGNDQ4Ps3LUPbT1jrG2dSEpOob29nW3bd2FmYYu2rhHxCYk0t7SyzHcle/YfEsq/dPkKBkYWmFrY4L9q3Yjnu6SkDG09Y5Z6+lJWJnt+gs+ex8LKHiNTSw4eOkpvb68wWH3ftP+PH1ezzHclpubWGJtacWOUd7qxqYlt23eiulhbmJ5Cdv09HD58DGMzKwxNLNm998B3Jm3cvRuNpZU9RiZWuC7xFBIQZO0ls5hrahtyJPA4g4ODdHR04uHli4mZNbb2zuTm5vHwUSVu7l5CP97f38/hI8cwMbfB0NiSnbv3jcicBIiJTUBNQ5eNm7fROBwCMDAwiLfPCoKG3cIgmzdn3IQpglA5ePgoVrZOGJta4ezmQXJKKpcuh6Kpbci+/Yfo6uoWXNimFrYYm1px504UTU3NLF+xmj17D8hd58+Bn3z15A/l3RiV+6OsBfM+NmzYyn/+9hM8ly1HIpHw+nUNU6bP5eCho2NYWxG/lWsEd8lodHd3C8G0Ax/xlNvXrt/iwKHAn2za/pDQMKbOmCcnVH4sOjo6MDW3wfedDIMfg/7+fpxc3DExs5YTKlev3cTD0+dHb8u2tjYcnb9/3NsPRSKRcuToiW8VKiIiPxbnL1zm68kzhcDt7Tt2C2ns/yz8bIRK6JVw/vbF1yxarC2YhD+ENes28otf/xHXJZ709/dTXFzKr3//F5YsXfaTrf/zX526unr0jcwFn+loNLe0YGxqxcpVaz/atXukUinbA3ZjZeMgzNfxjyY2LoHJ0+YIcy/8mHR0dMiyZbxXfOe+3xcvbz+MTa1oGc6M6u/vZ/XajcIUAD8mWVk5qKhqCplZ/wjOnrvIAmU1cbVvkTHnavgNZs9TIr+ggN6eXoxNrdh/4MhPXa1/KD8boRJ49AT/95e/Y+EiTWrfmWL9u9i5ex//5xe/Zb7SIjo7OykqKuZ//O9fYufgIjcFusiPx+PHT1igsng49bh31H3KKh4yd74KO3bt/WgDu6RSKSv81zJl+lyqHld/9wFjQFx8Ip99MXGEm+LHoKWlFaWFGvj8yBYVAG+flSipqAtLCXR1deHh5csyb78ffYAQHR3HpCmz5OYDGWuuXrvJF19OJvkHTF4pIvJ9uHEjgnFfTiE5OZWenh7mKCizZKn3R9tvjgU/G6FSVl7Btes3SUlNF6LeP4Tqp7K1R6Kj4xgcHKS3t5fwq9dFk+0Y0tvbR0pqOoWFRe/9KDW3tBA7vL7Fx0x5ecVwPMf3DwD/MWhoaCQyKobnz1/86GX39fURF5dIcUnpj152cXEp8fGJdPfIfOGDg4MU3i+SC6T9sWhsaiI2LmHUeKyxor6hgYjbkWO2uriIyBtqa+u4GxktZD8mJaWQX1D4s5y47YfysxEqIiIiIiIiIv98iEJFRERERERE5KNFFCoiIiIiIiIiHy2iUBERERERERH5aBGFioiIiIiIiMhHyz9MqDQ1Nv1TpfI9ffpsTDIcRERERERE/pn4hwiV8ooKVqxcw9VrN+S2R8fEEXz2wqhTao9GSWkZJ0+d4dTpYA4fOU7GGEyCBXD8RBDRMXHf6xiJRMLl0DC279hNQmIyhYX38fTy/ejEWW1tLcFnLxB+9fpHO9GaiIiIiIjIG8ZcqDx99hwbO2dCQsOFbZVVVWzctI3Px01i/FdTeflq9HUf3qW/vx8rG0f+5V//g3/51//gX//tPwk6Hfyj1jUpORUPL1/++//8v1jZOn7wcXn5Bdg7uqKpbcDO3fuE6c6jomOxtXcmJzfvR63n38ObhcdEoSIiIiIi8nNgzIXKpi0B7Ni5T25bXX09d+9GY2XjxLz5C3n1+tsXcANISU3Db+UaUlLSSEhMJjUtg5bvWHDq+1JR8YgLF0OYPU8JN/dlH3RMXn4h02cqsNxvFeXlD0f8HhZ+HQ9PX2H59p+S3t5ejh0P+s7F7ERERERERD4WxlSoFBTcx9jUmucvRp9VM2DnHmbNWfCdK80ODAxgY+vEzNmKXLgQMgY1fcvg4BBauoa4uHl+574VDx+hskgT1yXv37etrR1rO2cOHf72RRAlEoncTIMSiWTENtnMum+tIFKpVG4a5W/u/02am1uoevyY7u4eBgYGRhz7TYaGhuS29/b20dfXN2Lf/v5+ufMODI5cmuCbdftm3d+WNUBfX9+IFWxl+//zzMQoIiIiIiJjTIXKmrWbcHJZSnf36EtKb9y8ndlzlb5TqBTeL0JVTZvxX03lL3/7EgcnNyrHaOr1lpZW1LX0vlOoDAwMsGPXXmbMViQpOYXGpiaaW1pG/fju3L0PIxNL6uvlF7aTSqV0dnZy+sw5NLX1hanMW1vbCNi5B0VlNU4Fydxb6RlZWNs5oaNnzJng8zQ0NOLi6kHgsRN0d/cQHn4dNXVdYTn4byKVSsnLK8B1iScGxuZo6RqhZ2hKV1c3pWXlTJw8iw2btjE4LDJu34nEyNSKrOwcurq6OHAoED1DM3T1TXF29aDi4SMAUtIyMDAyx8zCluLiEvr6+li/YQs7d+8T1vlpbm7BzsGVk6fOCPU5f+Ey2rrGPH78BJCJojt3o9DQ1sfEzBpVNW3WbdhMe3sHAJ7LlmPn4Pqt90RERERE5L8eYyZUWlrbMDS2YNee/e9d7+VDhcrz5y9oa2un+ulT7B1d+eSv43F29aCxqenHr/cHCpWXL1+xWFMPGztntgXsQlvPiAXKizl4KJCuLnlhdiviDiqqmiNWWh0cHOTCxVCmTJ/LxCkzeVBcQktLKxs3bePgoUBU1bQ4e/4iz1+8RE1Dl5OnzlBTW8vGTds4cvQEc+ercDkkjKjoWGbOXcBf/voliUkpo9b34aNK9AxM2bFzL7W1dSQmpmBkYsmly6HsP3CYSVNno6FtQFZ2DhKJBHNLO5xdl9LQ0MiqNRtY6ulLbW0dDx9WYu/ohpqGLqWlZUTcvktScioTJk7n6LGTSKVS7hc9QEfPmH37DyORSGhqbkZRSY2t23cK9dl/4DBfjJ8sZEZFx8ShskiDa9duUltXx4lTZ1DX1OfRI5kgtbV3xtbe+XvfTxERERGRnzdjJlQeVVaxWFOPM8Hn37vPhwqVdxkYGOTI0eNMmDiN6JjYH6OqcnyoUCkqKubrSTNYuEiT5JRUent7OXg4kAkTp3Mq6IzcvqlpGUyeNoe4+MQR5QwODnIyKJipM+aSkprO2XMXyc7JFVwjEomE08HnmKOgQnmFLAbm9evX2Dm4MF9pEY8eVTE0NMTVazeZ8PV0kpJGX+o+OyeX2fOUiEuQr8PTZ8/ZuGk79fUNXA4JIyz8OvHxicyep0ROTi6PKitRVtUkKytbOCY/vxAFRVXWb9rK0NAQjY2Ngkh7w569B1FSWUxdXR0dHR0sWqzDzt1vY5UOHznGpCmzeThsmQkOPo/CAlWam1uEfd51F71pCxERERGRfy7GTKjk5xegrKrB2W9Zev2HCBWA1tZWTMysOXb81N9bzRF8qFDJyMji8/GTuRMZLWxra2tD18AUG3tnOStSSmr6e4UKwPUbEcyaswANLX0OfiOWpb+/n5Wr1mFmYUNtXZ2w3c3dCx09Y+H/xMRkZs5WJCEhedRzdHd3c/rMOQ4HHufCpRCuXb9JY2MTTc2yVYwBcu/lceLkaXT0jPHy8aOnp4fAYyfQ0DagoaFRKGtgYAAbe2dMLWwZGBigrq4eJRV1Dh85Juxz9dpNJk6ZRWXVY7q6ut4rVN5YVNpa29kasItTp4O5FHKFpKSU97oMRURERET+eRgzoVJSUsoidR2Onwh6b4DnDxUqAOs3bOHosZN/bzVH8KFCJS+vgLnzVUbMt+K3cg36hmb0978NBk1Ny2DilFnExMaPWta167dkrhctfZQXapCami781tvbi9/KNZhb2soJFUtrezy8fIX/4+ITv1WoNLe0cONmBLt272eJxzL8V6/n5Uv5tPCOzk68vP34fPwksrNzAZllZNFibaqqHsvtu8TDGxs7Z0GoKC/UIPDocblrmjlnAY+fVH+rUKkYthJVVlUReiWctes34blsOYFHT4jp0yIiIiIiYydU6mrr0NI1YsOmrSMyON7wRqi8fl3zvcru6uzkwMEj743H+HtobW37IKHy/MULtHWN2LvvoNz2pZ4+eC1bLuemiImNZ+58FdLfM0FdWPh1FBYsJCExGV+/VWhpG/L02TNAFmS6d/8hdPSMeT2cxl1ZVcUcBWUOvONqiY1LYNacBSQmjt4mZ89d5Muvp5H7zpwuRQ+KiYqOkbt2a1snvH1X0tsrC4SNiLjLxCkzCb3ydh4cpFJs7JxYv3ErUqmUmppa5sxTZs87bXHi5GmMTa1oamqmvb0DNXVd9u4/JPx+/MQpJk6eRWWlTAB5LPNFW9eYjo4OYZ+bt+6Q857gYBERERGRfw7GTKgMDgzi67eKZT4r3mvC37JtB7PmLKCx8W1QbFdXF+cvXGbdhi08e/YcgLDwa3Jukxs3bxMSGkZ3T8+o5b58+YqNm7dxJvjcB896+4aenh7UtfRwXeIlt/1RZRVbtu3gdPA5pFIp/f39HDsRxIxZ8ym8/wCAvLx8lFU1uJeXL3fsxUtXMDKx5MmT6lHPGXrlKgtUFvPwUSUvX71GSVkdJxd34fe09EymTJ9LQmISAFu2BqCwQJWjx07S1tZGecVDEpNS+OLLySQmpXDvXj4NjfKBxsdPBPGbP/yVjMy3sSYmZla4e3gL/8fExPGb3/+F06fPCtsaGhowMbNG18BEqH9ScgpGJhZk58pERGNTE4vUdbC1d2FIMkRNTQ1m5jaEhl5FIpHS3NyCguIi3NxlbVr99Bl2jq5Mnzmf6upn5ObmYWhsgZ6BqWA1qqh4yFcTpxMWfh2QTVS3/+CR9984EREREZH/koxpevLtu1FYWjvQ9I3snKdPn7F23SZmzVVi/FdTsbR2IOL2XQBqamoxMrXif/7bf3LoyDEkEgkHDh5h/gJVrGwcsbV35kjg8W/N+MnKzuUPf/qccV9OIT0j84Prm56eib2jG19NmsHUGfNY5rOSB8WylOHbt+/y6WdfMnHKTO4XFQPQ3d3DvgOH0dIxxNLaAX0DM+7ejZYrs6+vj2U+K1izdiP9/f2jnvdySBiLFutQWlYOwJWwa3z59VSMTC1Zv3Er9fUNHDl6HA0tfSytHVisrkdKShrHjp/CzsGFmNg46hsaMTKxZL7SInbu3kdra5vcORqbmti8NQAtHUOsbJ2wsXPGd7m/kB7c1NSMs+tS5iku5OKlENrb24Vjq6oe47bEC1U1bSysHXBz9yI1NR3JsEtvcGiI1PQM9A3NMDSxwMrGgUuXQ4U5X9ra29E3MmfCxOmYmduyZu1Gjp04hbqmHrr6JoSFX6e4pJTlK1ejrqWPrb0zGtoGHAk8TkdHBwMDAyipqKOgqPrB91JERERE5L8GYypUenp7cXH14NLlULntXV3dlJSW8aC4hIqKRxQU3ud1jcz9Mzg4SG1tHTduRhB87iIdHR20d3RQUlpG7r188gsKaW5u/vbz9vTy5Ek1h48cJz4h6YPr29jYREHhfcrKKygpLeN+UTFtbbIPdmdnJ0+eVBN49IQwRT7IXDPFJaXk3sujrGzkIoQFhUVY2zqRmpbx3vO2trbxpPqp4G4ZGBzkUWUVOTn3KC0rRyqVMjAwIJznTbxIc3MLRQ+KBatRXV09eXkF1NbWjXqet3XNJy+/gJaWtzP7RsfEMWP2fG7cjCDodDBPqmXWk8ioGOFcBYX3yb2XR3X101HLf/78Bbn38ikuKZVzfb1+XYOHly9lZeXk5ObxpPop/f39PHv+nLz8QsHd09raRkHBfe7l5XO/6IEQkCyRSHjypJrqp8/e24YiIiIiIv81GfMp9JOSUjEysaSq6skH7T80NERzczM3b90hKzv3B6Wk9vf38/BhJdeu3+Txe9wt35fe3l5qamoIPntBEC/fRUNjI2vWbSL47IWPOrW2rbUNKxtH3D28kUgk+K9ez82IO9TV1bPEfdnfnX2TnJKGnqEZLS3fLjBFRERERES+yT9k9eSw8Ou4uHmQnZ3znfs2NDTiv3o9hwOP/+CP+4PiEuwd3X7UlYtTU9NxcfUgL6/gg/ZvbGxk0+Zt7N1/6KMWKYODg4RfvcGXX08jITEZgDt3o5gyfS5//PPnrF6z4b0T9n0oQWfOMmX6HKF8ERERERGRD+UfIlQAqqurOX7i9Aft+23r1fyUfJ965ebmcSXs6hjW5sehs7OT7QG72bw1gOZhV1BPTzcbNm7FysZJiGH5e8jIzGb5itUUDcf2iIiIiIiIfCj/MKEiIiIiIiIiIvJ9EYWKiIiIiIiIyEeLKFREREREREREPlpEoSIiIiIiIiLy0SIKFZGPEolE8ndnG4mIiIiI/PwRhYrIR4VEIuHho0ouXb5CSmo6veLChCIiIiL/1IhCReSjYWhoiHPnL7FkqTdJyan09PR+tKnqIiIiIiL/GEShIvLRkJdXgL6ROWnp719uAKC+oYGWlpZv3efdVZjfMNaip7Oza0zL/xgRhaSIiMhYIwoVkY+CoaEhDgcex8vbj4GBgVH3aWpu5tbtu5w4eYblfqu4diNihDjo7ukh4s5dModXiW5qbiYzK4fEpBT6PsCNJJVKKS4uJTIqluiYOO7cjaKoqJjBwUFZ+d3dJCQmWVmMtgAAIABJREFUc+bsecKvXpdboiE2LoGExGQ+hk93SUkpkVExRMXE8ehR1QcfV1HxkFsRd4hPSKS84uGo+zS3tJCZlUNCYjI9Pb0/Uo1ltLd3kJiUQmR0LEkpaX/38g0iIiI/f0ShIvJR0NnZyao1G9i5e/+ovw8MDLB5SwC+fqvIL7iPu4c34ydMkbO+dHV1cfxkEPsPHuHly/+fvfeMqipJ+/a/vGu973896wkzT555Zp6enumothkDKKIogiI5SxQRFUUFRMwiGDCAkkQFRAUkGRFURLIKmJWkJCXnLPlc/w9Ht5wGlLbtbqZ7X2udD9Su2lV7H07Vr+77rqpyCgqe43HwMBMmzWDtOscRDaplZeXMX6jO51+M4W9fjeMvf/uWA4e86O7upqu7Cx+/ACytbdHQ1uevX45FWUWd/PwCAJ7l5GK/3onQ8Ihf1NKQmJSChZUNPr4BeB31xcTMiqdPcz5Y7k5mFqZm1nh6eXP8RBDmljbcvpspXO/p6SEvv4BDh72YOHkGq+zW0d7+6axI9Q0NuO/xwHa1PeHnIlmxai179h+kexjhKiIi8ttAFCoio4LW1jacNm5mz76DQ15/9PgJMxSUhJO4y8sriIiMpqi4BJBaQo6fDGb1mg3CoZE5uXl4HfFmspw8Dk4uwunUw9Hf30/I6VBctmzn+o2bxMdf50ZCIpVVVQBk33vA/oOeFBYWUVlVhY/vMf79v/6Xna7uwr1zcnPR1jPi2vWEH/1OPoaCgucsXqKLy+btgPQsJ3NLGyysbKitrR22XHlFJYuW6LBytT19vdLVVvbrndDSNaKyUvr8PT095Oblc9Tbj8nTFLBf70T7J7J49PT04HvsOLOVVEhJTQMgMTGZ6fJKxFy4NKrPyxIREflpEYWKyKigtbWNjc5bhhUqV+OvM3X6bCKjYoa8/vTpM1RUNQgLj5RJLyh4zvyF6qzbsPGDQqWk5CVauoacv3BxyOvl5ZU0NTULfz/LyWXSVHl27t5Dd3e3kL5330H09JdSVl7x3vp+Cry9/fnqmwlcvnJVSIuOucCf//IVMecvDVvuXEQ0n/3tWwKDTwtpFy/FMllOnmPHA2XyvigsQkV1CXZrN/xgodLe1k5EZDRZ92QP96ytrWOushoGRmY0vjlzqq2tDV19E+YvXELbJ7TciIiI/H0hChWRUcH7hEpgcAgWy1bw3cTpGJlYcPDwER4/fiqTx9VtH7PnLKD05UuZ9NLSlyxaooP9eqcPChUf32N8PWYiinNVMF5qSWRUzHtn8om3kjEwMuPJ02cy6Rl37jJughxBAwb9n4Purm6Wr7DjT599xb0HD4T09Izb/OO//Ce73ffDEBE0r1+/ZsvWnfz1y3FcuRovpKel32b8pOmsXGUvk/9VWTlLNPVYvWb9iIVKZ2cnoWER2K5cy0bnLTz5nisqMzOLP332JStWrZVJN7NczudfjCU3N29E9YiIiPz6EIWKyKjgfUKlpKQU/4CTTJ42i4OHvCh4/oLm5neWjaamJhaoqmNgbEZLS4tM2eLiEtTUtT8oVCQSCTcSEjkTGo6T8xa+mzSdL78dz2FPb3p6emXy9vb28uDhI0zNrdm8ZYeMNQWgsqqKyVPlWW5rNyhWpb+/n+bmZi5ejuX4iSCam5tpbm4RPgXPX9De/nHulJqaGnT1TZg2cw45ee8G9nv3H/D1mImsXG0vuMUGUl9fj9XylUybocjtO+9iUkpKSxk/eTrqmnq8HvDuSl++Ql1Dd0RCpaOjg6joC6xYuYYNjpu4HBtHTW3toPcSFX2Bv301jh273GWklLPLNr4ZO0nGQiQiIvLbQhQqIqOCD7l+4q7dYNoMxSFdP1nZ95CbMRtLa9tBu9kWF49MqACC9aSrq4vUtAwWLdHh2++mkJqWIZMvJyePDY6bmDB5Ol99O4GjPv7CqiCQropRU9dCTV2bwsJimbKZWfcwt7Jhl+seTgaFoKVjiJ7BUvQNTdE1MEFLx5B79x7IlOnv7+f169e0tbXT3j7409beTkdHB6UvX6Kjb8IcZVUhrgTgydNnTJZTYNnyVdTV1Q967traWswsljN3vhqPn7yzVDU3tzBpqjwqahoyrpcPCZXe3j6am5u5fj2BFSvXsm7DRi5fiaNpgLj8PuHnovjq2wkc9vKRSd/tvo+x46cSGXVh2LIiIiK/bkShIjIq+JBQuXTlKnIzFAkNOzfoWlh4BOMnTcNm5ZpB14qLRy5Uvs+tpBS+GTcZtz0eMkKkt7eXjo4OLl+5ynR5JeRnz+Pps3eujPqGBjS1DVCYrUxySqrMPZ/l5FJTW0tXVxd9fX2DLCotLa0ydQFUV9dwKuQs+z0OcejwkUGfAwc98fE9RkpqGiamVkyTn0NVVbVQPj3jDn/4019ZvWb9sBYVy2W2zFZawP0HD4X07HsP+G7CNDS0DX6QUHn8+Cl6BktR19Dj0qXYEa2Aioq+wOdfjB206mvFqrX89atxxMbGD1NSRETk144oVERGBT9GqERExjBh8gxWr1k/6Fpx8ccLlYaGRoxMzHFw3ERn59B7sHgd8eWrMRPJGOAyqW9oQENLn1lz5pOWnjFkuR9CY2MT12/cJCIimujoC4M+UdHniY65QH5+Aavt1vPnv3xFUfE7S05aegb/8q9/wNVtL8PFqGzeuoOvx0wk8VaykJ6alsGkqfLY2TvIHGXwIaGSm5uHg5MLlta2nDgZTEHB8w8+Y2ZmFn/88xes27BRJt3McjlffTOex4+fjOBNiYiI/BoRhYrIqOBDQuVybNywQuVmYhJTpilgvWL1oNn7Dwmm/T4NjY1YLrPlZOCpYfNcvhKHgqIy2QPcNQ2NjSzR0mOxhq7MhnAgjRcJDjlLYFAIQafOyH6CTxMUfHpQoPAP4ai3H1+PmcitpBQh7cLFS3z+xVjCz0UNW+5cRDT/+/nXREW/c7HEXr3GFDkF/PxPyOQdaTBtVvY9NrpsxcZ2DUe9/XmWkzts3traOpSUVTGzWC58T69fv0bfyBS1xdpU19R88NlFRER+nYhCRWRU0NraxiaXbezdf2jI61euxjNt5hyiYwbHKpRXVDBLcT7aesaDrr1dnuy40UVIy8t/zukz4Tx89FhIa25uJvFWEi8Ki4S0iMho1jtsoqysHJBaNgoLi+ntk7pm+vr62Om6B7u1DjQ2NAjl6urrUVCcj4Gx+aC4jJs3b7HLdQ/bd+xmxy53mc/2nW5s3+lGalrGR28YV1DwHNVFmmzf6QaABAl2ax3Q0TOmsrKKxoZGYs5fIi7+Bv397+qoqKhkoZoG6zZsFOre5LKdReo6g3aoLSwsQkVNA/v1TvSO4ITr1LQMNm3ezopVazns6S1skDeQnp4evH39mTVngRCjk3HnLrOVVPDzPy7uoyIi8htGFCoio4KmpmZsbNew03XPoGs5uXmsXrOBP/75C6xtVpOTkztoa3Vrm9XIz1amuvrdzLuyspI9ez344pvxqKhqkJKaTmdXFzt2ufPPv/tvlppZUVYuFSGFhYXMVVZlwUJ19uw9gI/vMfbsPUD2gP0+QsMiUFPXxs5+A/7HTuC2Zz87drnz7JnsUtvHj5/y3cRpHPb0/pSvaMRERMWwRFOPM6HhBJwIxNR8GfHXbgBw6XIsn385lrET5GRW+ABcu56A2mIt/PyPExp+DjOL5UTFXJSJmamqqmafxyG+/GYCygsWcz3h5ohElQRISU1j6/Zd2K3dMKQrp6amllV261ltt57zFy6zwdEZZ5etVFWL1hQRkd8yolARGRXU1taxUE0Dh42bB12rqKgkJTWduPgbJN5KpqKictCS4GvXElBSVpXZEbapqZnMzGxuJCSSeCuZ5y8K6entJfvefZyct2BgZEr6bemZQK9fd5CUnMpu9/3s8zhM3LXrgiXlLQXPX3As4CQ7Xffg6x9AXPx1maDVt5w5E4bqYq0RxWb8FPT29nL3bhanQs4SciaMnNw8+t5YJAoKXuB37ASLluhwMvCUjMiQSCRk33tAWHgkx08G8+DRY3q+F9jb3NxCZtY96TtNTCIvv+AHWX+6u7u5m5lFRcXQm+FVVFRy8VIsJ04GEx9/g5r37KYrIiLy20AUKiKjgpqaWuYqq7LOwfmjynd1dbPbfR9r1zmOaOBMvJWM48bNwhb8b+nr6xu0xPn79PT0DFqZ85aWllYsl9ly/GTQL36ycE9Pz5AHPDY1N2O7yp6EhMQhy/X394/oAMefEvEwQhERkbeIQkVkVFBXV4+Glj5Ozls++h5VVdVs3LSVkNNhww60/f39ZNy+w2Evb7Ky73/S2IfXr19z1OcY23e6jVpLQEnpS04EniIiMkYUAyIiIn8XiEJFZFTwNpjW46DXj7pPfX0DJ4NCiL92Y0irR3d3Ny8KCz/5KpK+vj6iz18g/FzkJz1R+FNTUvqSsrLyD1qNREREREYLolARGRU0NTezY6cb4RHDL6EdKd09PZSVlctss/9T09beTunLl/R0D3a1iIiIiIh8PKJQERkVvHpVhraeEXFvVqeIiIiIiIiAKFRERgmnTodiaGxBXe3gs2hERERERH67iEJF5Bejp7eXwsIiQsPOscllG/fuP/xwIRERERGR3xSiUBH5xSgrr8Bp0xZW2a2TObVXRERERETkLaJQEfnFaO/o4NHjJ5wKOYur216evyj8pZskIiIiIjLKEIWKyC9OS0srXkd9sV29job6hg8XEBERERH5zSAKFZFRQXFxCZo6hiQlp3woq4iIiIjIbwhRqIiMChoaG3Fy3kJEZPQv3RQRERERkVGEKFRERgUtLS1s3LQFryO+H8xbUVFJTc3wW9RLJBKamgZv9vZTnL0jkUiEbfibfsYN5kRERER+K4hCRWRUID3rx+C9Z/1U19QQEXUe/2MnWLPWgTOh52hpaZXJ09bWRlT0eTIy7ghlEm7eIv7aDTo7P3zQnkQiISv7HhFR54mKkW6Jn5mZPeThfi0trfj6HSclNR2A3Lw8zkVEU14+9MnAn4L+/n6SU9KIiorh2vUESl++HHHZu3eziDl/gfMXLlFUVDzo+v37D/E66ktg0CkSbyXT3dM9xF1+HLV1dVyJjefCxcvEX08QzxsSERH5IKJQERkVfOj05K6ubrZs3Ynjxs08fvKUdRuc+HbsJJJT0oQ8LS0tHPH2w9vHn8rKSnJy89iz14NxE+RYY+/A69edH2xHaekr5iqr8dcvx/HF19/x1y/HcsjzKF1dsoO2RCIhNCyCf/+vzzjk5f2mjV34+h/HZct2SkpHLiBGSk93D8EhZzFZaklU9Hnc93pgu8qewsLBomMgfX19REbFYGRiQWhYBIc8vVm2fBVPn+UIeVLTMrC0XonFshVMnTaLr8ZMJDD41Cc9E6iispJNm7djv96JmPOXsFlhx979B4c9iVpEREQERKEiMkqorq5Bad7CYYXKgwePmD5zDqFhEQDU1NRwJTaOly9fAVJLg49fAGvsHWlrkx4KWFDwHB/fY0yWU8DByYXOzvcLlb6+PgKDQtixy4209AySU1JJS8+gtq5uUN6HDx+hukiL//nfL/D1Py5zjx2u7tit3UBra9tHvYvhuJWUwsSpMzl5MhiQWqEWLdFhg+Mm2t9jmbj/8BHTZs7Bbc9+QPqudPSMMV5qCUBjYyM+fse4fuMmr193kpl9j1lKC5g4ZSbl5eWfpO2dnV3s3X+QOcqq3Lv/AID4awlMnzmHi5djP0kdIiIiv05EoSIyKmhqasZmhR07XPcMef1KbBxTp88e9tDCBw8foayiTkRkjEz68+cvWKC6hHUbNn5QqBQWFqGuqUtk1PsDeusbGnB13YOD4yYmTpnJUR9/mev5Bc9RnLuQkDOh773PD6Gvrw9H582MmyBHVvZ9APr7+nDfe4ApcgqkpmUMWa67u5t9HocYN2EaNxIShfSj3n5MmDKD5JRUOl6/pqKyUqac1fKVKM5VoaZWNhaosbGJ4yeDiY//YWcyvXpVxvSZc7BctkI4XbqtrZ3FS3RYtERnkMVKRERE5C2iUBEZFbS1teOyeTt79x8adO34ySDMLJczbuI0DAxN2e9xiIePnsjk2b7TDUUlFV6VyVoASktfsmiJDvbrnT4oVI76+PHtd5NRmD0PLR1DQs6EDopN6enpwf/YCbyO+HIzMYnxk6YPEiodHa+xsFqBvqHpe4N+3wbhjoRXr8rQ1jVihsJciopLAKn76fiJIP78l685GXhqyHK1tXUYLbVkttICsrLvCelnQ8OZLKfAnn0HB5VpaWnB3NKGkNOhgwKQu7q6uHTlKhZWK1i7zonUtIwRuYcSE5P4zz/+BQcnF5l0HX0Tvh03mRcvij54DxERkd8molARGRW0trax0XnLkANnRWUlJ4NCmDJtFkeO+vLy5Sva2t65VRoaG1FWWYyhiTktrbLBtcXFJaipa39QqEgkEpKSU4mKucC2HbuZMm0Wf/1yLHv3HaSr+91sP/FWMsttVlNZWcn9Bw8ZO37KIKHS09PD3v0HmS4/h1tJg/eFaWtrIy8vn0OeR0lNS6e6uoaamlqqa2qoqq4mNy9/UNzGgwcPUV6wGF19ExkrR9y16/zrf/wJ1917h3yuly9fMXe+GpraBrwofCcGEm4mMVlOgVVr1gtp/f39VFfXsG3HbnT0TXj46PGw76q8ooLTZ8OwsFrBesdNZNy+S0fH62Hfb8iZUD7/ciweB71k0u3XOzFughzXr98ctqyIiMhvG1GoiIwK3idUAK7GX0duhuKQ+6zcuZvJ1OmzsLS2HWSlKC4emVCBd8uXe3t7yczKRlvXiK/HThI2oXv56hUOTi6kpErdLI8fP2Xs+Cn4B5wcdJ/A4NP85YsxHDseKHOtv7+fA4eOYLPCjrDwCJxdtqGjZ4KhsTkGRmboGpiwY5fboLbev/+AucpqWC1fSWNjo5CennGHf/m3P7Jtx+4hn6m09CWzlRZgaGJBRUXlgHK3mTJNAWub1UJaU3MzAccDWbBwCV+PmYimtgFVVdXvfV919fUEnzqDuaUN23bs5v6DRzQ3Nw+yxASdOs0X33xHwIkgmfRNm7cxftJ0rsTGD1uPiIjIbxtRqIiMCj4kVC5duYrcDEVCw84NuhYado7xk6Zhs3LNoGvFxSMXKt8nNf02Y8dPxc19P21t7ex234fjxs3k5uVTUPCc6JgLjB0/ha07XCkqKqb7jeVFIpEQcjqUf/vPP7Fl2y6Ze/b19fH0Wa6wLLe3t5fOzi46u958OruGXAr98OEjlBcsxsTMiroBwb2nQs7yH3/4DFf3fUM+w6tXZcydr4auvgmlA1YiRURGM37SdNbYOwppEomE3t5eSkpKWbZ8FV99M2GQ0BqOrq5Otu/YzcQpM/E45DXIunLmbBj/+/nXHPU5JpNuYmrF12MmkZiYPKJ6REREfnuIQkVkVPBjhEpk1HkmTJ7J6gFujLcUF3+8UGlsbMJ4qSXOLtvJycnF2MQSbT1jrKxtWb5iFdp6Roz5bipKyqo4OG0S9k+RSCQEnzrDH/78N3YOExz8Q6moqERX34TZSgtk6jkWcJIvvh5PYPDpIcvV19ez1HwZyvMX8WiAK+fM2TAmyylw8PCRIcs9evwURSUVdrq6j6htly7HssHBmTXrHLkSGzdIqKSmpvMff/hskHDT0TNm/KTpFBS8+GA9IiIiv01EoSIyKviQULkcGzesUElMSpa6MVasGuRy+CHBtN+nvqEBy2W2hJw+S2trG9nZ90lOSSMlJY30jNucOBnMmO+m4OyyjTt3M2l9Ex8jkUgIDjnLF19/N0hA9PX1EXI6lCPefvj6BQz6HPXx50Rg8KC29vf3s3nrDsaOn0p+wXNAGguzZ+8B5GbMJv3NBnffp6enh8Ne3oyfNJ3k1Hd7znj7+CM3fTbx14ZevdPa2soC1SUc9vQe9v3U1NQSERnDug0bWWW3nvMXLg+7TLq8vJJZivOxsbUTNt5rbW1jsYYu+oamNIq7+oqIiAyDKFRERgUfFCpXpEIlKvr8oGtV1dXMnrMATR3DQdfy8vJRVlmMg5OLIGKePMnB/9hJMjOzhXyNjY1cjYsnJzdPSDsbGo7jxs1UVlYN2aaHjx4z5rvJ+B07LpPe29vLYS9vJk6eyaXv7RHS19eH/7GT7Nl3AI8DnoM+e/cf5Ii375Cb0925m8WUabMIOiUVP60trahr6GG/YSNtbe28Kivj2PGTJCWn0D9AsD159ozp8kp4HPQEpKLH0NgcM4vlNDe30NXdTV5+AbW171xKl2Pj0DM05e6Ad/SW+vp6zpwNZ90GJ+zsHbh46cqQRxYMpLu7G88jPsyZq8Kjx08BuH7jJrPmLOBsaPh7y4qIiPy2EYWKyKjgfULl6bMcVq5ex58++wor65U8ffpM2IvjLbar1iI/W1lGVJSXV+Dmvo+vxkxERVWDW0kpdHZ1sWOXO//8+//GyMRC2DCusLCQufPVmDtfje073fD08mGfxyEefW8Z9EBu37nLX/72LQc9j8qkt7e3s3L1OrR1jXhVVvZjXosMfX39HAs4iaa2AefOReFx0BPbVfbCUu2A44H84+/+C/lZ8ygsLh5Qro9zEVFo6RgRfOoMXkd9sVq+kozbUitMUXExOnomaGobsP/AYY54++HkvIVrN24O2ka/sbEJzyPerFxlz8VLV4bcDG84qqprWLl6HWvsHYiIjGGNvQOuu/fS2Nj0Cd6OiIjIrxVRqIiMCt4KlaH2UamuqSEr+z6pqencuZtJdXWNELj6lpuJScydr8bVuGtCWktLK48ePyHj9h3u3M2kpPQlvb29PHnyjK07XDE0NhdcJp2dndzNzObQ4aMc8fbjVnLKe1e8ADS3tHD7zl1evZIVI9XVNahr6nHs+MlhSn48nZ2dZGZlExYeSURkjIwwe/T4CcePByE/ex7XExJkyvX19ZGZlc25iCjCzkXKnPXT2tZGXPx1PA544nnEh7j467woLByy/tevO8nJyR3WyvQhqqqqiYu/wamQs6SkptMsunxEREQ+gChUREYFra1tOG3cPKzr50P09PSw3+MQq9esH9HZMQkJiWzctHXQmTz9A05D/hj6+/sJORPKcls7Xr169dH3+RDd3d1Dngadn/+cNfYO3Lt/f8hyvX19w27QJpFIBgnAn4ofGi8kIiLy20UUKiKjgp6eXjwOerJy9bqPvkddXT1bt+/iZGAI7e1DB3X29/eTln4bzyM+PHz0ZMjB/mPp6e0lKSWNFSvXknH77ie770jJzcvH66gPSUkp4kF/IiIivxpEoSIyakhJTUdLx4i09NsffY/m5hZCzoQRF399yP1Iuru7KS4poWHApmmfimc5eQScCOLZs9xPfu+R8KqsnMoPuKtERERE/t4QhYrIqKGrqwtf/wBWrFxDws1bvHpVRt9HuGH6+vuprKyipaXlJ2jl8Lx6VUZnV9fPWqeIiIjIrx1RqIiMKvr7+7mVlIL/sRPcvpM5pFVEREREROS3gyhUREREREREREYtolARERERERERGbWIQkVERERERERk1CIKFREREREREZFRiyhUREREREREREYtolARERERERERGbWIQkVERERERERk1CIKFRGRAfT09JKbly/sXPuqrJys7Ht0/4r3cyl4/oLwiChiLlwiNS2Drp/pvJ/RjEQi4cnTZz/odOjfOsUlpRQOOOzyQxQ8f0FU9AUio8+TmpY+7LEXQ9Hd3c2tpBQSEhJ/1HERHR2vSUhIJCw8kqtx1ygoeP7R9xL56fjJhMrNxCQ8vbw5G3qO4FNn8PULkPkEHA+kvLzip6p+WPr6+si4fYeg4NM/6Ef190hfXx8pqemEnD5LSUnpL92cUUldfT2RkTFcuhxLV1cXLwqL2LV7L1XV1VRUVLJwkRYWVitobWv7pZv6k1BXV8f2nbtZ77gJLV1DPv9yDH7HTtDe3j6i8teuJRAYfPqDJ03/PdHZ2cmJk0Hs2XeAouISIb209CVR0efJzc0f0X2am1u4dDmWs6HnCA07x6XLsbQN+D969iwXr6O++PoF8OjRk0/8FO94+fIVwafO8Pz50Cdif5/GpiYuX7nKmbPhnD4TxqXLscOKiFtJKTzLkR4ZkZV9HwcnF1LTMj5YR3V1DYcOH2HdBmeMl1ryp8++ZP+BwyPeTTolJQ37dY6YmFmRfe/BiMoMRezVeNY7OGO/fiNjvpvCInXtIY/AaG5uJvxcFBGRMT/q0NIfS3VNLaHhEVyJjftF2/Fz85MJlavx13FwcuHbcZNZpK7N/gOH8TjgKXzkZihyLiL6p6p+WCqrqtDSNmTtesdfvXquq6tjzjxVnF22UVhY9Es3Z1QSciaU+SqLOXX6LF1dXdy5m8n5C5doa2vDyMSS//zDZ8Scv/Sr7RSevyjE08sbkIo246WWyM9WHpGwffnyFXIzFNnncYjy8sqfuKU/Dz09PQQGncJu7QaZdxByOpR58xfxl7+NIeD4yRHdKzLqPL//9z/yf//h9/yf//tP6BqY0PjGUldYWMS2Hbtx3+uBobEZSsqqZGbd+6TP8vp1J2dCz6GmrsM//f6/CTl9dkTlQk6f5d//+3/5P//vn/k//++f0NIxpK1tsHB98PAR8rOVOertJ6Ql3LyFvqEp6Rl33ltHUnIK0TEXAejq7MLc0oaJU2eSl/dhEdjV1cWZs2E8efqUJ0+e4ut/nNbWj5tI+PofJz9fOg5ciY1jzLgp7Nl7YFC+mJiLKCmrcex44C/aFwScCER1kSZh4RG/2j5pKH5S18/rjtcsWqIjdIQDCQuLICkp5aesfkju3X/A3v0Hf7bj7H8p+vv7SbyVjK//cXp6xJN0h6KrqwtfvwDi4q8JaSWlpTi7bEVLx5DJcvJEREbT0fH6F2zlT0tdXQN+/sd5+jQHgNKXr7iVlDIii0rQqdNEn7/4UzfxZyU1LZ1ly1dRVlYuk37tegLOm7cjN3PT5N0yAAAgAElEQVQOwafOfPA+lRWVbNm2i6Dg08Rejef8hUvk5uUjkUhoaWnl2PFAnjx5CkBjQyML1TRw3rSVrk94VlRXVzc3EhLZscuNb8ZOIiw88oNlyisq2LbdlcDg01y+Esely7GCxWQgHR3tLDWz4usxEwkKDpG5FhERjdXylZS9x2JeW1uHt6+/8A6qqqpJuHmLltbWD7axp6eHyspKOjo66O/vx9VtL5WVVR8sNxQJN29x5kwYnZ2dgNRSk5dfMCifp5cPScmpH1XHp2SfxyHS0j7+0Na/V35SoVJRUYnqYi327j+IRCKRudba2srr1x8eAL5fTiKRDEobKRJJP4UvioRZzcfytvYPteNj2/kxDFVXRUUlvb19P7jcD6nz53zGH8NQ7WxqaqK4uERmZiKRSPAPOIHd2g3k5Ob9pPV/KP/AMsOVH+47GGl9/f395Obm4+jkwsWLV35QG4tHYHX5/jMM90zva++P/R8bafnXr1/j5LwZP//jQ16/f/8hCorzCQwKGfL6wPrCI6L4bqIcu1z3yLh7ANra2snMypZJc9myHQcnl58kPujx46d8O3YyoWERH8x7KuQMU6bNwsl5y3vznT4Tytr1jsxQUOJkYLDMtd6+PsytbPD08n5v/EhJaSlbtu4i/FzUiJ5jODy9fATB80Pp6HjN2dBwNrlsp7Gpadh8j588/SST2/f9Hj5EY2MjL14UvdeS8vfSH/9Qfhah4nHQUyY9PeO2YObs6+sjMjIGE1MrdPRNMDQ2x8DYDF2DpegZLMXVbR9tbe309fXh638cA2MztHQNWWPvIOO6uXM3CyvrlaSmpQPQ3t6Bq9s+nJy3UFdXD0hNoT4+/piYWmFkYsG8+YuIOX+RV6/KWbZ8FT6+x+jrk/4T1NbWsd7BGVf3fXR1ddHX18fBQ17oG5kSHhFFf38/AcdPMmeeKpHR52X/QSSQl1eA9fJVaGjpY7XMlpyc9w96PT29HPbyZv5CdfYfOIxEIuFFYREWViu4fecuIB1Yt253RVPbAD2DpRiZWKBnaIq+oSmLNXS4cjUOgJzcPKysV2JgZMbJoFM0NDTguNEFTy9voZ1dXV14HDiMgbEZCxdpsmnzdmEWfS4iGtXFWpw+Eyq0L+jUGZYtX0lhYRHdXV24bNkhbYfhUgyMzUlOSaWzq4vwc1Fo6xnx7FnOkM/Z0fEatz0e7NjpRuub2dPtO3cxt1hOXPw1+vv7qampZcu2XWzavJ2Ghgah7OUrV9HUMcDE1JLU1DTy8gowt7Th5s2kYd9rQ0ODtK06BmhoG3Dw8BH6+/vp7+8n+959rJevJOjUGfr6pIKusrIKP//jQ1pREm8lYbTUAiMTCy5fiaP05StMza25eHn4Ab6pqZn9HofQ1DZAQ0uf3W77aHuPtaK3t5d9HgcxMDLD0NgcXX0TjJdaomdgyn6Pw8Rfu47d2g3o6Bmjo2eMobE5egZLuXzlKgAvXhRiZ++Alo4RugYmHDnqIzzbcHR395CcnIqFlQ179h0Q4hHa29vx8Qtgua2dTDxXZmY2y2xWYbzUktCwc9TU1mK3dgMBxwOFPJcux2Jqbo2+kRl6Bkulz2Nizuo160nPuMMRb180dQzQ1TdB39AUXQMTHJ234HfsBKqLtNjtvo/6+npCToeio2+MmYW14Iqpr2/A2WUrh728hUMrr16Nx8JqBXfe/FYAioqKWbfeSfje6+sb2LHTnZ273Id8D0nJKSxQXUJmZvaQ15NT0pCfrfxBodLa2sY6B2e++nYiX307ganTZ5Fw85ZMnoH9xYsXhXgd8ebhw0fvve/HkpFxZ0RCpampGfv1jnz+xVj+8rcxqKlrERd/fVC+ouISdrvvJz7+OgvVNIZ0hR087IWegYnQ9w7HvfsPsbZZjcvm7YKoOX/hEsoLFrPRZStlZeVcvHQFfUNTzC1tuP/g4aB7uO7ey5Wr8YPS+/v7OXDQi4WLNLBcZktdXT0XL13BxtaO589fCPkqq6rw9PJhqfkywWX1orCINfYOKC9YTGpaBjU1tay0W4e6ph7evseGFAu9vb2UlZVjZGLBsYCTMu3wO3YcbV0jDE3M0Xnzm9bVX8qu3Xu4mZiEja0ddms3CO/r5ctXGJtasnOXGyvt7NHUNiQtXRr74+sXgOvuPXR1SYWTRCLh7t0srFesRs9gKVo6RqxcbU97ewc1NTVsctnGtu2uNDf/vKfJf0p+FqGyafN2iktKKSl9SWFhEbvd93LxkrRzf/zkKWfOhpOefhsHp03cyczEz/84WtqG3L2bRVVVNT09Pbju3ouN7RpKSkp5+PAxFlY2LNbQFQLbrl1PQG76bOG+LS2tmFvasERTj+rqGgC8jvqyREuf7Oz7PH9RiN1aB0zNlrHC1o5vxk1moZomjY1SVV1VVc0SLX02OG6it7eXXa57kZuhSFb2Perq6qmvr6e6uobQsAhmKCgRcCJQ6Hxu3rzF6jXrycsr4OKlKyirLCLhPYMpSAPRrsbFs3rNeuRmKNLY2EhXVxdeR3xQUV1CfsFzLl2+Qvy1G8RejWfz1p1kZmazYqUdW7fvoqiomOaWFmprazE0NmfPXg+ePHnKsWMn2LvvILMUlfH1CwCkEfMrV9lz+kwoJSWleHr58OfPv2brtl00NjZit2YDf/tqHEs09enoeE1VdTXzVdTZ6bqH9vZ2NjhuwsLKhmc5ueQXFKCpbcjWba5ERMYwaao84yZM5U5m1pDP2drahpX1SoyXWgqWrbj460ycMpPwc5E0NDSweetOPv/bGExMLamukX53aekZqKgu4dKVWNLTb3PkqC/Om7YiP2se9+8P7rwA8vLyWbnKnvjrNygqLsFxowtjx08l4EQgz5+/wNDEnP/53y9w33cAiURCb28vgUGnyBjCv/7w0WMWLdHh9Nkwsu8/4Ki3H27u+5k8VYH4a4M7c5B2NhscnAkLj5B27m57GTt+Ktt3utEzxEyzu7sHJ+etLNHUIz+/gNzcPHa77yPgeCDFxSXk5eXjf+wE2ffucyLwFCpqGhSXlFJcUkpLSyu5uXnoGSzlxMkgiotLuHQplgmTpuPqtm9Y919VVTVr1zmxcpU9gUEhmJpb4+S8hY6ODvz8jvPdxGnMnDWXp2+EZ2FhEVo6hnge8aGwqJgDhzzxDzjJhMnTORVyFolEQlT0eeSmzyb2ajwlJaWcPhOGs8s28gueU15RwbmIaGLOX6SwqBjVxVoc9fGnuKSU9IzbRMdc5OTJU0ycMhNDIzPCwiN48uQZMxSU2LFzNyANxNTSMWDtOidhlnsq5AxT5N59F42NTSxfsRrHjZspeP6CYwEn8fM/zqw5C9i1e8+Q7+KwlzeL1LWFAeD7jFSovH7dSX5+ATW1dRw6fIQ/f/4102bO4cGDR4Pypaamo29oyomTwZ/U7TOQkQqV+vp6SkpKqK6pwX2vB9+MnYSC4nyyst/FzvT19bHf4xC3klJ49aqMufPVhhQqcXHXUFBUHjIwFaTWKwfHTegZLOVcRDR6BktZt2EjhYVFXImNw9cvgKkzZrPUfBnBp86Qde8+yiqLWbvOQUbk5eblM2/+Ivbs9ZARD9KJZCBaOobcvptJ/LUbbN3uKgz6jQ2N9Pf3c+HiZYyWWrDbfR+HPb1ZtESHuPjrZGZmc/pMGMZLLVFZqI79eieysu9xyOsoinNVuHM3c9AzPcvJwcTUij999qXwv9rb24vHgcPMna9KanoGJSWl7Pc4zBFvPwqLiqmqriYo+DTfTZBj3AQ5Em4mArDLdQ+KSgsIDT9HwIlAZiup4Oa+H5BQWVmFtq4hO13dhdVp8+ar4eMXQHFJKWdCw9HQ0iciMgpHJxf+8rdvMTVfRv2ASd/fGz+pUKmqqkJtsRbTFZQwXmopnRkaLkVFdQk3Em4Cb9wTPb3U1dWxefMO+vp6CT8XhZGJuRAB/uDhY+arqJOW/s43l5V9j+nySuxy3UNvby9JyakoKqkQ+0ZZt7a2YWO7Bn1DU2prpUsMV69Zh6XVCpk2dnR00NrWxq2kFGYpzhfKt7S0sHf/QW4kJJKecRv52fOEWWtOTi6a2gbCLNPP/ziKc1V4lpNLW3s7+z0OyVgCOjs7P7iE7u1A4nfsBNPllah5M0C/fFXGvAVqHDjoRUtLC12dXdxKSiYo+DS1tXWsXecoo97PnA1nyrRZvHghjfCvrq7B2mY1C9U0hWj8Cxcvo7pIU/DD9/X1ceCgJwqzlfH08ub4iSCKiorxOOjJ3cwsfPwCUFHVoKiomPr6BhYu0uDgIS+Z9nd2dtLZ1cWxgEC+mygn07kNpK2tnZWr12FlbUvTG1Pr9Rs3kZ81TwgQq6mpxXKZLUYmFsIMY429Izp6xsJ9Mm7fQU1dGwurFVS9EaLf56i3H4bGZsL339HRwRp7B1TUNCgqLuHRoyfMm6+G+5vgucbGRlx37xVm6QNxdduHiuoSQcgWl5SyRFOPJZp6wwYqR8dcREV1iWAJkEgkbN+5m+kz5/Do8eBVHldirzJdfg43E9/Nvp8+y2GVnT2ZWffo6uwUZkWnz4SxfIWdTPn9BzyxsrYV/vckEgmeXt5MmTaLW7eSB9XX2dnFRuetOG7cQmtrG/39/UTHXGDMd1O4lZRCR0cHrm57mbdgkWARDDgeyCzF+YIfv7m5GWNTS5SUVcnPL6C8ogJ1DV12uu4RBpT29g527HQn4EQQILVWtra20dDQiIa2gUysmkQiISUljW/HTX5j4ZRag8wtl2NuaQNATU0tRibmODlvEYTK2dBwZinOF/qVa9dvMHXaLG69uXd3dzfOLtuQm6nI1bh3MUkD63XZsgNTc2uGs56PVKh8/74pqenIz1Zm0+ZtMu7ux0+eoqGlzwx5JT776zfs3X9QiJX4lIxUqAwUAP39/aSmZTBdXgnnTVuF9ISbiXgd9aWlpYXi4hKUlFWHFCp372YyZ+5Cws4Njovp7u5ml+se1to7UlZWgUQi4WZiEhMmz+DU6bOCtVNBUZndu/cK3/G69RvRMzChqblZuJeP33Emyymw3GaVjBgvLi5BTV1L+G0D+B87wYKF6oJFLT3jDpraBtxKSqazs5OOjg4MjaWWzLY26e/B0ckF+VlzhTid27fvMl1+DlHRFwY9V29vL6WlL5k+c44ghm/fyWSynIJMLFdNTQ02tnbcSpL+Jg97HuXa9QQSbyUTfOo0z57loDBbmcDAECQSCeUVFejoGbNl2y7h9xB06jRK81R58aKQxMRkps9Ukln91N3dTVdXF2Vl5ZiaL8Pc0oaGhh8X8vBL8rPFqPT39wuzVl+/Y4OC8PLzC7C0WkFPTw/+ASexsl4pmKC9ffyZt2CRzADS3t6O1fKVmCy1pKmpiZTU9GGFyluLSnr6bVzd9hIbd42Ll64IAYRvMTQ2Z8dON0Bqjj0WcJLOzi4OHj6CsspiYQlmbGwcsxTnc/uNqs7Kvof8bGVCw86RlJxC/BDm0pHi4xfAzFnzqK2tBaCltYUVK9ewbPlKwWUQGHSKk4HBvCorY/Wa9ZwNPSeU3+W6B7XFWoIloru7my3bdqKuqScMmHv3HWDO3IUyS0qfPHnKvPlqODq5kPsmNiM9/TZu7vtQXrCIffsPCXmjYy6w03UPFy/HcjXuGqWlL4VrFy5eYbr8HO4OY1F5n1AJDXv3HI4bN2NgZEZ9fQMSiQQtHUM2Dugwy8vL0dQxxHHjZl4P0bl39/Rgt9YBAyMz4V0CJKekMkNBidTUdOrq6tHUMcBtz376+/t59Ogxhz29h3SVWFitwMJqheASqm9owMjEAmub1UMu3ezu6WHHLjfUNfVk3k/2vQfMmbeQiMjBK968jvowZ+5CyiveraDp7e3DceNmVq/dQE/3O1Ovp5c3q+zWC/lqamvRNzRjt/s+mZnls5xcxnw3ZVDAI0jFlvyseUQMWH1XWFSMmro2O3e509fXS1DwaearqJOXJxUmjhs3o6NnTHW19H+np6cH21Vr0dI1ore3l8ysbCZMnjFIDMTFX2f+QnWZQMWnz3JRXaw1aHZ6IyGRaTMUuXXrrcjowczCGk1tA+FZPyRUTgQGM11eSWg3wP4Dh5mrrEbuECtL+vv7sV21FjPz5cPGAHyMUHmLj28ApubWQl80kJSUNGYqzEV+1jwKiz796ryRCpWh8PTyRlffBJCuIvT28RMmQRUVFcxbsEjGRfyWO3czUZqnytkBv+m35OXnM2/BIoKCTwtpdXX1KKssZr2Ds1BeQVGZyMgYQOqqdnRyQUNLn9KXrwCpNVBDSx+XzdvZtXuPzNLmO3czmThlJpevxL1Lu5PJlGmzOHM2HAC3PfvR0NKX6R/8A04wZ66K4GKyX+eI8ZsxBqTvcuq0WZwc5n+gra2NReo6glA5FxHN9JlzZFxWEomE/R6HMLdaQVNTM8kpqdTW1vL69Wv27DuAueVydPSMqXuzh095eQXaukZs27FbmPDevn2XGQpKXLocS2NjE0e9/fA/doKLl65w7XoC3d3SsfJ1ZycbHJwxNbcWhcpwvBUq+zwOyaQ/fZYjmJJB+sVFRkZjuUxq7XBz38/yFXbCoHDYyxvFuSpUDIjslvT3s3adI+aWNrS2to5IqNx/8JCwc5GsXeeEtc0qwr+n9g95HkVDy4CamhpSU9OJv5YAwF6PQyxQXUJZudQCkZycivKCReS8UdmZWdkoKqlw+kwYZ0PDf9Qyw7dCpaFeakloaW1lxco1rLC1o7Ozk/7+ftbYbyD8XBTlZeWYWVjLdEA7d7mjtliLqjcDSVtbG3ZrN2C1fKUQ1Ld5y05mKijLCJWC58/R0DIgMipGSKurq0dl4RLmzFtIcXEJAJ2vO7lzJ5PDnt6sXefI2nWOJKekCWWiYy7+aKEikUjY4LhJRqhoahvg7LJtQHtfMH+hOr7+x4ccWJqam1m2fBWGxuaCdQqkvmeF2fPIyLhDdXUNGtr6uO3xeLPnTBpHvf2HbLeZhQ2Wy2wFUVJZVYWmtgE7drkNmb+jowOHNx3rwGWuRUXFzFdZzPkLlwaV8fUPYKbCXCq/tyeJxwFPFmvo8PKlVPD09fXhceAwW7buEPJUVFairWuEy+btMsItP79A+r95NmxQfRm376AwW1lYJgpSa4WeoSmbt+ykq6uLwMAQGaGywdEFXX0TQah0dXWx1MyaVXbrAKlonzp9NtExsjPOZzl5TJZTkBEw9+4/YOEiDV6+KpPJ+1aovI096u7uwdR8GVo6htI2jkCoHD8ZxHR5JcE1LJFI2LptF9q6xkP66iUSCWvXOaJnYDro2lt+jFC5lZTCRuctMn3YQN66yx4//rig0PfxY4RKcnIqS82WAdJ3qqVjxKmQswSfOsN+j8NMm6nIsuUrOX/hsoyl425mFkrzVAkZQsS8tZa8FQwg3btF12Apa+wdgHdC5dybQNuuri4cHDfJCJXzFy4hP2suqanpXL5ylfv3H8jUMWHyDK7Evotdib92A8W5KqSkSuMYHRw3oW9oKtM/nIuMQXHeQu6+Ec9vhUr9m/44Pf02U6fNInCAyBpIU1Mzaou1BaESc/4SctNnk519XyZfcMhZFixUFyaFb9m7/wBffTOekDPvfq9lZeVo6xqxfaebMIm6ezcT+dnziIu7RmNjE5cux7LLdQ/WNqvY4OAsWOba2ttZt95JFCrv432rfkD6z/R25m9qbo2jk4vQoSxbvgqAgoIXnDgZzHT5OTLR4b29vVhZr8Rlyw56e3u5lZTCnLkLuX5D2lF1dnaxes0G9A2X0tDQSHt7O6qLNFm9Zp1wj87OTuKvXefVGxfI/QcPmTN3IQcOenEq5KzwwzvsKfVLvl1uV1RUjP16R+GZMm7fQW6GIpevXCUoKAQf32Mf/c6OePsxXX4OpW8GpfqGBswsrPE4cFh4Z7PmLOBGQiIVFZVoaOkTGRVDV1eX4K5RHWBRqaisYtIUeVzd9gl1bN3myizFBYIbA6Qdi9piLRmBUVFRxUI1TTwOvAuGvn37DtNmKMr8UOvq6oiOuUBfXx/nz19ihoLSoFUNb2lra8d21TpsbO2EGVByShoKbyxSb1nv4IyhsTlNTdLvwMJqBfbrNwrXr8TG89lfvyX1TafzfZpbWli2fBWm5tYyq7xiY+NRXaxFTW0t5eXlaGjpC+bhpJRUVq62p6lp8EBmv34j5pbLhQ4gI+MO4ydNl7FmDeStUNHVN6FiwDLN1LR0Fqppkj/EHj43E5OYIjdLENsA/RIJW7buRFPbgPIK6X36+vpw2bIDp42bAXj+4gWNjU3Yr9+IwmxlamrezRDz8p8zW0mFm7eSBtWXl5/PpKkzORl4SkgrLi5BecFigoJP09fXx/ETQcxXUaegQBp8uHffQTS1DQWRW1DwAoXZyhz2PApI3Wea2oasXeco4+5MSk5l6rRZXE9IFNJSUtKYN38RRcXFtLW2CfEMIxUqb3/7AFFRMcxSnC/4+COjzzNbaYEQ1N3Y2Iiauhar124Y9B7estN1D/MXqtM8YMAdyI8RKqFh5zhzNpyOjqE3TktLz8Dc0oaCAUGen4ofI1Ti46/j6eUDQEpaOjt2ubPT1Z0du9xZt2EjU6YpoKVriI9fALUDAmdTUlJRmK1M4hAux8dPnqI4V0Wmn6xvaERNXRv3PR7A+4VKeYV0afKqNesxNDanpbmFkpKXwm+xubmZ8xcuMWeeKuci3o0ZW7buRHnBYkEsurrtY85cFaqq3olHb99jqKhpUFEhdUl9rFBxddsLwNNnz5g5ax4nTgTL5DvkeZQFqkso+t6moxs3bX1jTXn3Ll++fIWmtgGbt+4QvAqxV+NRUV1CZWUlfv4nmCynILOAIfvefe7czaKtrZ11GzZiam790XvNjAZ+UqHS0tyCmrr2oHgGkAYn2q934kVhIfHXEhg3YSq+/gH09UlN3ZOnyuO8aRtbtu3iwcNHmFpYo6FlIMy+Mm7fRUNTn5Q3s/nEW8lMnT4b/2MnAHjy5BmT5RSwsLKhvLyC5JQUvvj6O9ascxTacOHiZSbLyQtR/r19fRibWrJAVYObiUlCvrT028xSnM/5C5cBqZ/WxnY1j588A+DQ4aNMnT6bwhdF5OXlM0NBiS3bduHqto+t23cRERlNb28PKalp7HbfR/Y9WXU9kPCIKCZNmSnMSCOiYtDRM6b05Suam1tYudqeCZNnUFZWTmVlNXIzFNEzMsXGdg0RkdHcu/8AJWVVrr5xP4WcPstfvxxHYFAIlZVVFJeUsHadE99NmMbly7GAVHVvcHDG1W2vjA/9qLcfk6bKc2PA4HI1Lp4x4yYTcvrdTGm32z5mKc6nr6+P6JiLjBk3hQcPHnLv/gMhPuQtbW3trF6zgQWq6sJMZtPm7UyYPIOo6POUlZXzorAQBydpp1RUXExW1j0OHjoiFWDVNfT29GK7ai1T5BRIS8ugrKyc588LZVw2LS0t2K5ax9jxUwXxVV4u9fWeCpFufFVUXMKiN26O/ILnXImNZ9rMOVivWI2r2z5c3faxeetOsrLuERV9HuUFi4UlyxudtzD2uyncSEjk1asyXhQW0jdgKXhHRwebt+7ky2/Gc+261DLX2NiEmcVyfHyGFrJt7e1s2bqTBQvVefwmhiU94w6T5eTx9vaj983z9ff34+yyDaV5qqyyW8f2Hbvp6urm2vUExoybzMFDR4R7HvLyxsbWjqbGwUsvOzpeY2Bkiqa2AS/fzFIPex5lsYYulW86bx9fqds1OSWVnNw8wsIjmTN3oRD7ceCQF99NmEZQ8Glp3EJJCVdi45ghryQM6JJ+CYs1dDExtZIRx8kpacyaMx9TC2vWb3AmLk76P5twMxG56bPfK1SMl1pgbGpJe3sHvb29rFxtz7SZc7iRcJPiklISbt5CbbGmMKBEx1zgq28ncOCQJ7W1teTk5A0SDZcuxzJ3vhpPnz4b8vvJzMpGfrYyZwdYAgCysrJx3b1XsCzm5OQSMGBjsJzcPA4c8hL2+igsLMbVbS9JydJ32N7ejuPGzQSfOkNn59ABtY8eP8HVbS83Em5+cBXX93nw4CHfjJkkYzmTPs893Nz3CyL24cPHhJ+LpPNNUO+LwiI8j/hQUTH0Zn6VlZXMna82pOsn5vxF1NS1B+1HA9Da0spqu/XIz5rHizfCLOR0KKqLNCkpkU7Q7tyRWgzC3+z9MlCoNDY1k5V1j2kz5whCpLm5hZ273GlsaiIpOZVbt5JYv8EZy2Ur6O/vp6y8gjnzVLG2WU1ebj7Nzc14HPBk6vTZ+PlLFxnU1NSyeIkOR476AtIJwVp7B4xMLH6QUJkzV5Wdu9yprqkhMysbb19/FBSVhe87JzcPJWVVtg6IOQGp9VNhtjJOGzfLxEm1trZiZmHNQjVNYaWkmfm7yeuWrTv5boKcYJ1pa29nsYYuu933097ewRr7DSw1W8ajR0948uTp3+W+UD+ZUDkVchZdfRPGTZRDSVmVFavWYjvgM0NhLgcOetHT04Ozy1amTp/Fw4ePkEgkxMbGM3bCVH73b/8juCLy8vKxXGbL4iU6WFjZYLvKnrj4a8IXnZKazuw5C5g2U5GlZsvw9vFn776DzFRQwszCmgcPHnHtegKLl+iwfMVqLJfZYmq2jFOnzwrLciUSCYFBIdjY2skM2D09vQQGh6CipomF1QoOHT5CUnIK23fuZqn5Mhap6xAZFfMuINb/OL//j//hd//2R/759//NX/42hruZWex238c//NO/Y2axfNizYxoaGtjvcYj5CxdjbGrJipVruP9mtUBJSSlKyqosNVtGT08P3d3dbN6yg3/4p/9Aca4KBc8LkSDdB0R1sRbGppYsVNPk8uWrRJ+/gPL8RSQmJrFjlzuTpyrg7LKV1WvWY2phjZv7PsF6AfDqVRnqmrosNbXiVMi7Da6am1s4dfos6pq6mFsuZ9nylegbmgri68mTpyxYuAQVVQ2OevsP2hK7tbWNbdtd+U1HkAgAACAASURBVPLr8ejqm7DG3oHwc1Fo6Rgwd74aXkd9qampJexcJHIzFFmsoUN6xh3KKyoEH7WOvjGGxhY8ePiIXbv3oKtvQk5unowLqLmlBdtVa1FWWfTG1bcaIxNzfP0DhFUdHR0dbN3uyuSpCtjY2lFSUkpc/A3+64+f87t/+yP/+h9/4v/7x3/DcpktxcUluLnvR0PbAAMjM5Zo6pFwMxFvX3+0dY3IyLgjU39HRwebNm9nrrIajhtdMLe0QVvPmAOHvN67mVpdXR07Xd1RXayJ5bIV6Ogac+Cgl4zZVvobiePPf/mKP3/2FZHR5wFpZy6dSS7ExMwKG1s7XLbulImRGYhEIp3xGRqbobpYCzNLG1autufegFVUDx89Rn7WPFTUNAg+dYaq6moOHPJisYYuFlY2zFuwiBsJiQScCMLUfBlX4669WflzgQWqSzC1sMZymS3Llq8cZEVqaGhA38iMf/rdf2GxzFZwTV67nsCESdO5cUMqkL8vVKprarBbu4Gx46diYGSGo5MLYeERKCmroaauzcmgU9TV1RMado7FS3Qwt1zO3PmLCAwK4dLlK2jrGnEiMHjQvhg1NTWYmFoJQfMDCQwOQUNLn6/HTGLOvIXs239IEDqHDh/lH/7531m8RIf29g7y8vKZOHkGS82tsVi2AseNLjJLj4tLSpk2YzZy02ezbPlK1qx1IDjkrOAKHYrjJ4L4x3/5T+b+/+2dZ1SU2brnv8yauGZmzYd7Z+6dcE6fc/rcPp2Toc2KIhIkZxAFBMUIiqBiBgMq5pwjBsxtVrLknJNEiQoUoaiiqKrffCh8tQTU7taW7t6/tVhL37hrv2/V/u9nP2GSyVsnN1MqlZw4cRorG0f++vfPmWQ0le0790hLX1u2bue//Y//hZWtI62trTx6lIjBJGNs7F2Y6T0H/4DlZL8mP0lhYREjxxhIA/3LLFuxBl+/JQOG4ldUVmFp48jkKea4e87G1c1T+p2DXl+Q4WM402sleS5UrO2cycsvwG9xIIZGU6nunbjqkjcexNzSji1bd6BSqSgsLMbc0h5rO2esbBxZFrSaxMRkXN08CF4fSmlpGceOn2LMOEOcXd1xmebBzt17kfX+ZqnVanzmLMDGzkXyF3mTUHn+m/ztkBEs8l9KTk4ecrmcTaFhmJhZMd3DG0sbR4LXb+rzHFesXMvEyab4LQ7sE3mWmZWNmbkNFlb2+MxdwJawHdJvQnl5BX6LAjEysWCm9xwcXWYQuGwlFRWVqNVqzl2I4Ovvf8Dazon7DyJ/k8lO35tQKSouITIqhoyMLJJT0oiJjdf7i3+UKHV0Tc0T8gsKJTOuSqWiqKiYrOwcPQfaxsZGHiUkEhkV3cchLiY2nlVrgklITObBwyhqap6g0WhIz8gkMSlFmu0+flxOdEwskVExen4yz2lvb++3bolKpSIjM4vomFhphlFeUcGDh1F9cqSo1Wqyc3LJzMomOzuXVauDuXL1Og2NjaSkpLFi1bp+U1I/p6uri9S0dB48jNKLKFEqlRQWFfPkSa207NTaKiM1NV1vnb+7u5v0jEwio2LI6bX6tLS0Eh0TR1tbO2vWrsfM3Ibc3Dxi4x7xKCGpT0bIHbv2MHmKObFx8WzctAXQhXwnp6Tx9NkzcvPyiYqOISo6VnKuA9Bo1FRUVBIdE9dvP7a0tLI1bCfHjp8mLu6RFMlVXV1D/KNEKYmYXC4nJzePuPhH0nvR3NxC/KMEoqJjpXXqktIy3fN9ZZYpa2vDfeZs5i1YRFpaBtHRsSQlp/SJvmpubiYxKUXqJ0B6dlnZOWRl57B6TQiZmdl0dHSSlJRCZFSMVDelsrKKxKTkPrMUuVyO3+JAZnjMIiMji4eR0cTFJ0iz1dchl3eRnJKq+/5kZvXrg6NSqcjKyqGoqLhPlFJBQSGRUTHExT3qY9Hqj9raOuIfJfAwMprqmpo++/PyC0hMSpaWlORy3fsZGRUtDWQNDY0kJCbpid38/N52xCcMmGSxqqqazMxsGl9qp0wmIzc3TxpQXxUq1TU1hG4O40LEZWJi4yWRXFJSSkJikrRE1tPTQ05OHpFRMaT1RkS0t7cT/yhR8rHRR8u+/Yfwnj2/z57ComLi4hPIzMzi0aNEMjKzpHepsbGJrOwcglaupa6+Hq1WS25ePjFx8URGxfQRaFp0g0tScgpR0bGkpqW/0Ury9OkzsnNyWbk6+K3LYajVaoqKS4iPTyArK4dHCUnk5ORJA1VjYyPx8Qls3baT4uJSuru7KSgoJCYmjuiY2D7+E6/S1aUgP79QWmZ+TtnjcmztXXjYz3LjyzQ06O7/6m8I6Hzr8vLyJUvG83BmS2sHiktKKSgopOxxuV6/tbbKiI2Nl6yDoBOFkVExJCQkSe9TWlqGZBntUenekajoGBKTkvXSBmi1WioqKikpLZOe9ZuECuh+4xKTksnOyZW+uyqVioyMLCKjYnQRfK/8DmRl5TDeYAr7Dxxh89btkl9b2eNyySJcWVVNVFQMcfGP+vyOyOVyHiUkEh0TS3x8gp4fllKpJC09g9TU9AGXHgc7v5vqyQcPHdULoxtM3L5zl/sPIlEqu0nPyOD6jZsfVNUuD1qNpbWdZEZ8lYrKSkzMrAjbtpOmpqf4BywnLy+fqOhYQrds49mznx+PX1JSykzvOXoOuO+D50Jl9pwFdHf/svwUV6/dGDCB3UA891FxdJ7+m14bHgz09KiZO38RVr3h6enpmcz0nvva2f7Ppba2jnkLFnHqdHi/Yer90d3dTV5+AZevXJNm4+8alUpFYVExly5f1Ut98Evo7u6mtLSM02fPDZg75qeiVCpZuTqYzVu2/+QlqtfR3d3N2uANTLW063c56deivLyCocPH6EUsvQtWrl6HyVRrnjyp5eTpsxw9doLKyip279nHg1eSBf4R+d0IldlzFjBq7MS3/nF53yiVSoqKS8jOySX8/EWysnM4euwkC/38pVnCh2Khrz9GJub9tkOhVLJ+YygjRxtQWVmFVqvlwMEjfPLZN3z08WccOHikX8fotyUhIZm/fPz5O/+iv0pzSwv2TtPw9PIZUJANhFarpbGxidxcnTi7GHG537DS19HR0YHX7HnY2Dnr+WUIfjo9PWop/41GreHO3fv85W+fca3Xx+pdU1RUgrunt25Z+C1moOHhF/Dynis5wL8Prly9gbvnLIqLS95ZmvSTp84yZ56vngXil9DaKmPHrr0ErVz7zsV5T08P60I2MsHQ5IMWWK158oSvvhn2iwImXiUqOpbvh47iUG8pgry8fH4YNYGP/vYZbu7efaIA/4j8boTKwcPHmL9w8aApwFdTU4v3rHmYmltz6bIuFLWnp2dQCKlNm8NYtSakXzNgVbUum+qWrTukCJfa2jocnafjtzjgF89mSksf4+45mx9v9k269S55+vQZy4JWse/A4Z/c52q1mvMXIrC0dsBr1ryfbE0BnS/OuuANbNoc9sZkf4LXo9FoOH7iNH6LA+mSd5Gbl4e752ziehMYvg/q6us5e/b8W9V76unpGdDn7F3R06N+51bYnp4eKd/GuyA6Jo7TZ869t6q+V67eYL6v/wcVKs3NLcxbsFgvQvGXoWX/gcNMm+4ppYBQqVRs3rodB2c3yRH/j87vRqgIBAKBQCD4/SGEikAgEAgEgkGLECoCgUAgEAgGLUKoCAQCgUAgGLQIoSIQCAQCgWDQIoSKQCAQCASCQcuvIlTUajVNT5++dVY8rVZLW1sbDY2NNDY2Ud/QoJc8qKuri8flFVRV1/xmM+31R3NzCzJZ21vnSWhra6exsYnGpiYaG5v00v6/jEKhoLVV9s7yLwgEAoFA8Gvx3oVKSUkp60I28sOo8W+d5Cs/v4BJk035018+4aOPP2PEaAOamnTpu7u6uti+YzcWVvaMnziFBQv937r2xWCloaGRo8dOMGa8IUsCl0s1T16Hriy6Mx99/Bl/+ssn/DBqPLFxfSsJq9Vqlq9Yg8+cBX3SNgsEAoFAMNh570IlbNsujM2s+OLroRw4eOSNxyuVSk6fDsfCyh4PLx9c3TzZsWsvCoUCuVzOlas3OHr8FFqtlqTkVMaMM2TDxi0/K6mWoktBQmLSr5IpNj4+YUBBdefufUzNbfji66Es9FvyVkLl0uWrTJs+Ew+vOTg4uxEcsqlPzQ3QVZn+vx/9G16z5v4mi1EJBAKB4I/Nr7L0k5WVw9AfxrL/LYRKXn4Bdg6uUon4l6mtq+fqtRt62/wDljPLZ/5rK9L2uU5tHXv3HWTL1h2sXL2O4pKSN5/0M+jslHPs+Cl27t7L/AWLSc/IHPDY1tZW7Bxc8Znn+0ah8vTZM1xc3dm+c4+UPbY/Gpua8PKey3fDRvXWvBFCRSAQCAS/LX4VoZKSkvZWQkWlUrFn737+3X/87/y/j/4N/4DlFBS8qJKsVqv1fFLUajWr14RwMeIyPW9RACsqOpaQDaGsXhPC4iXLOHHyzBvTq9+6fY91wRvZsXMPUdExb7wH6MTWupBNBIdsImBpEDt27UX2UlXZ/qivb8DGzpk5byFUzpw9z//+08f807/8iRke3lIF4lc5dyGC1WvWM2eeLzO959Itln4EAoFA8BvjVxEqycmpbyVUOjo6uH7jJqfPhDPLZwH/+b/+E0bGFn1KgINuiWjjpq2cDb/wxvvv23+IhX5LJMERHRP7xnPa2to5dfos60I2EbZ9F1NMLfluyEguX7k24DkXLl7Gb3EgK1cHE7Z9108qmlZXV//WQuX+/UjOnD1P0Mo1/Jf/9k98P2y0VAr8OWVljwneEEpp6WO8Zs1lpvccIVQEAoFA8JtjUAmVnp4e6I1Mefr0Gfv2H+KLr4eybMVqPUfQ7OxcXKZ58JePP8PK1pFbt+/2W1L8SW0twSGb2LVnf28F3LevQhkfn4CRiQU5OXkA1NQ8wc7BlXEGRlRX1+gdq1QqCd28jfUbNnMx4gpFRcVvfZ/n/BSholHrin4pFArOnb/IkOFj8PCcredrs3rtetIzs+jqUuDp5SOEikAgEAh+kwwqodIfoVu2Y2xmJUX9ADx71kxcfAKhm8P4898+ZeJkUxoa+jqSdnZ28ighicClK/H08uHevQcoFMp+Rc3LaDQawrbvwtjUUq90+917D/hh1Pg+lhK1Wk1mVjZr1q5npvdcTp0OR6FQ/CQH358iVF7l3LmLTJhkTHJKKgAPI6PYvfcAAN3d3Xh6+eA9ay7a91TVVCAQCASC98WgFyqZWdk4OLlR86S2zz6VSkXo5jD+8fm3/S4PPaequoac3DzWb9yChbU9GzZtob6+AZmsrd/ju7q6WBIYxFQLWx6Xl0vbyx6XYzDZlPBz/S83NTY2kZdfwKHDxzAzt2VJYBDl5RU0Nze/8XP+EqFSUVGJz9yFRMfE0dbWhq/fEuLiE2hsaqK0rAxXNw/cZsykproGhUJYVQQCgUDw2+E3IVQCAoNoevq03/2pqWkYGJpQXPzmyJ1OuZz6+gYuX7nGFBNLFi0OJDEpuU/EkFwuxz9gOZbWDlRVV0vb8wsKmWho2m++kpdRqVTU1dcTF/cIW3sXZnrP4dbtu7S19S+M4JcJlZKSUlavDaG4uISsrBycXWZgbeuEg5MbNvbODBsxlqHDx2Br78KjhKSfdG2BQCAQCD4kv4pQycsrYNiIcRw/eUZv+7NnzeTk5tHYqFvW6ejspLikVNrf09PDiZOnefAwkp6eHuTyLpJT0nj69IUvxt79h1gbvIGWlpaf1CaFQkFqajrLglaRl5+vt08ul7N0+SpGjjYgKztb2r4uZCNz5voOmAG2P5RKJY/Ly/FdFEBiUvKAx3V0dGLvOI2Ffkv0tnd2dpKZlU11jc4vpru7m4LCIr1lpYsRVzh3PgLQLVup1WqUSiUKpZLGxkZmeHjjMXM27W1tqNVqVCoVhUXFVFZVi2y1AoFAIBjUvHehkpqaTsj6UD7626dMd/cmMjJaGuh37z3AP//Ln3GbMRONRkNRcQmTjMzYsHEz585fZPee/Zw6HU57r4Xh8eNy/vLx51jZOHHufARHj51kod8SPXHzLpDL5axYtY5/fP4tK1ev48zZ82wM3Yq75yyKin+6o+ybqKioZN+BwwwZPpqJhqacOXtOcoyNiY3nP/yX/4GZuS11dfW0tbVhOMWcwGUrCT93gQMHj7B77wGeDbC81N7ejr3jNBxdpqNW6cRNXV0dQ4aPwd5xmsitIhAIBIJBzXsXKhcuXiZw2UrWrtvAkoDl7N13UPINiY6JZfXaEGwdXGjv6KCrq4tjx0/hH7AMv8WB7Nq9j7a2dulaXXI5Z8MvsCxoFYv8lxIcslHPyfZd8Xzpx91zFidPnWX+Qn/8A4MoK3v8zu8FOjHnH7Cc1WtDWLFqLUEr1lBZqXPiLS0tY/mKNXjPnse9+w8BXZ/6BwThuyiAjaFbeVLb13/nOV1dXZw+c44z4eclK0x7ezu79xzg6LGTPyujr0AgEAgEvxaDonry4SPHB3Rs/RDI5XL8lyzD0WU68s7BUfTwx5u3yM7O/dDNEAgEAoHgV+WDCpWbt+6w0HcJySmpg2pmL5fLWey/FHunaTQ19e/E+2uRnZOLx0wfbvx4C1X367PoCgQCgUDwe+ODCpXiklKio2NRD7L8HjKZDE8vH2Z4eNMl/7AWlfqGBu7dfzioLE4CgUAgEPxaDIqln8GGWq2mqqqaJ/3kbhEIBAKBQPDrIYSKQCAQCASCQYsQKgKBQCAQCAYtQqgIBAKBQCAYtAihIhAIBAKBYNAihIpAIBAIBIJBixAqgg/Kjzdv4x+wnEX+S9m5ey/1DQ0fukkCgUAgGES8d6ESvH4Tc+b50tLSQnFxKetCNlJfLwajd0VjYxOBy1awYdOW91JO4H2Sn1/Atu27OHP2PCtWreWf//XPLPIPHLBu0S9hXcgm5s73G7Qh562tMjaFhrHA11+q8/R7o6ioBCfXGdy6ffetjm96+pTg9aHMnDUXr9nzCFq5Vq+auUAg+GPwXoVKckoaxqaWXP/xJkqlktAt2/jLx59y89bt93nbPxQXIy5jOMWMhISkn1TVeTDwMCqaq9duSP8PXL4SYzMrqVL0uyI5JRVjEyuuXr9BZ2fnO732u+LuvQfYO7pyMeIyCoXiQzfnndLd3c3hI8cxnDKVf/+f/jtbwna81Xnh5y/w+VdD+Jf/81f+579+hK2dCx29BUoFAsEfh/cqVE6eDic9PROA6uonGJta8fmX37N8xWrUavX7vPUfgo6ODi5fuUZWds6HbsrPoqtLwa7d+3gYGY1Wo0WtVlNXX//OyylcjLhMTk7eO73mu+ba9ZvExj360M14L2g0Gurq6rlx8zZffD2UHTv3vPGc2to6/BYHcPHSFerq6qmtrePZs3dvaRMIBIOf9ypUunpnhlotnL9wiaCVawgIDGKcwRQKi4oHPK++oYG8vHxKSsuQyWR99tfV1ZOTm0djo26po7m5hbq6ejT9pOLXaDTU1zfw9NkztFotoBvgq2tqkMu7XjpOzePyCvLzCygsKqbpaf81fjRqNUXFJZSUlFJSWkZRUTHlFZUUFZdQUFCIsrtbOram5gl5+QWUlJbR0c9MvqbmCfn5BRQUFvX7OTs7OyksLCa/oJDSsseUlJaR33s9jUaDRqMhOTmVwsIiCouKqal5glarpaOzk6LiEppfWkJpb2+nrOwxra2tVFVV8/hxubSvp0dNRWUlDY2NL/qzvuEVMamlqEjXlpLSMkpLy8gvKKS4uJSWlhYKC4ulKs6qnh6KS0opLXus1x/9oVL1EBy8kW3bd9HW1rdMQNPTp+Tl5ZNfUEhVdQ3dvddTKBRUVVWjVL64flPTU6qqqmlt1fWlRqPhcXkFqWnpkrWprq6e5pYWAGrr6sjLL6Cisori4hLdvysqpeu1tLSS23vvurp6abtCoaCgsIi6uheiqqqq+o1lDrRaLeUVleT1vmPP31+A3Nx8SktfVOeura2jvf2F9UClUlFXV8/Tpy/e44aGRnJz86mpeQLoSj88fweeX+NtBvcntbW696qkVO+eL6NSqaisrCIvv4CCgsI+f8/f887XFPEsLXvMN9/9wPYdu9/YphMnT/PXjz/juyEjyczKlj6TQCD44/GrONM2NTUREBhEcXEx9+8/5P/++d84G36hz3FqtYac3DyWB63Gxt6ZIcPH4OQyg8flLwbV5ORUHF2mY2FlzwJffx4/Lmeh3xJmuHsh76cuT5usDTsHV/wDltHdW9Tv3LmLfD9sNPcfRAIgl3dx8tQZzC3tcHByY9TYSUwyMqOivFLvWmq1htt37uHq5onhlKkYmVhga+/CiFETMDW3xWWaB7V1dWi1WpKTU/FdFIC9kxtffD0MTy8fPd+cxMRknF1n4Og8HYNJxnh6z6G8vELaX1dXz7Kg1ZhMtcHZ1Z2xEyZjZmGL63RP5vv609beTlZ2DvaO03BymYGpuQ3fDx3F7dt3OXLsBLb2LixdvhK5vAutVkvolm18N2QkGzZuZqGfPxZWDhQWFQGQmZnNl18PJWjlapJTUrG0dsDJ1V3yFZHLuzh2/CQjx0zE2dUdA0MTjE2tmO7uhYeXD6GhYVhY2WNgaMKly1e5eu0G7p6zGTJ8NDt376OnZ2DrWUlpGbfv3MPTy4dp02dKgy5AdU0Nrm6eTLWwxc7BlW+HjGDn7n2UV1SyeMkyvh82SqoonZuXzwJff/7fR//Gtu270Gg1nDodjpWtI/ZO09i8dTslJWVMMbFk5+59VFRU4h+wDCtbR74fNgozC1vsndxYu24DAOXlFSzyX4qVrSO2Dq5MMbUkNi4etVrN9es/YmRiwbgJRsTFJ6DRaPAPWM5C3yXUNzT2+zkVCgXh5y5iYW2PvdM0xk4wYqKhCXn5BSQlpTDV0paZ3nOpqqrmwsVL/OOLbwnZEPqin0rKMJlqLVkjKyurcXHzwMLagVmz51NQWMTG0K1YWNlTVlZOfHwCQ4aPJmjl2gH7HiA9PZPFS5bh4OTGV98Nx9XNk5qavn48z549I2TDZuwcXHGZ5tHnz97RlQW+/uTnFw54r7z8Ar7+dvgbhYpSoSBs+y7MLGwZ+sNY/vy3T1m1Jrjf77dAIPj9896Filar5e69+wQEBgG6maexqSWeXnOkme9zcnLycHZ1JzIqFtCZw7/5fgSu0z11loKODswt7Vi1OhiAiEtXCFkfyiQjUzZs2tLvclKbrA1rWyf8FgdIQuXs2fN89e1w7t57AMCtO3cZO34yDx9GA5CWnsECX3+SklL0rqVUKjl89DgymYwz4ef58cfbOgdBl+kkJCZJx6WlZWBl40hRsc5qdObsOf76989ZvGQZSmU3ZWWPMTSaKjkVPn5cjoWVPeZW9jx71kx3dzdz5i7EyWUGtU/qADh3PoLNm8Mky0BrqwwjY3NpYK2vr2f12hA2b9nG3n0Hqa2tY8uW7cTGxdPa2orLNA+CVq5l7/6DpKVlkJKaxpat21Equzl2/BQTDU2Ii4tn+47dfP7V97i4edDaKkOj0bBn7wHGTphMckoqAAmJyYRs3Ex1dQ1qtZr7DyKpqKxikpEZo8ZM5OSpMygUStYGb2DEqAk0N7f0+24UF5di5+DC7DkLSExKYYaHN7b2LjS3tKBSqZju4Y3HTB9UKhVajYYNm7awOWw7V67eYNTYSQwZPprSXqvWilXruBhxmQW+/tx78JCs7ByGjRgn9XHYtl2sXrueMeMMibh0hcjIaDIys2hqeoq5lT3JKWlSu5qbW5ju7s3qNbr3rKenhwV+/gwbMY7Y2HhiYuPJzcvn62+Hs//AYQDq6huwtnVm6fKVqNV9LXuRUdGMHT+Zmzfv6N713DyWLA0i4tIVNoWG8flX3+PtM5/klDSWBa1m7PjJmJnbSt+R+vp6LG0cOXDwCF1dCmZ6z2H+wsUAxMTG4bc4AEdnN5avWE1efgGLlyzj40++JGjFmn77HiAvLx8rG0dycnXLYpeuXOPjT75k3vxFA1pWfglvK1Ta2tokURIZHYPLNA8+/uRLDh0+9s7bJBAIBj/vXahoNBrWBW8gMTFZ2rZn30E+/3IImVnZesftP3AYU3Mbal8ysx84eIQvvh5KXl4B8Y8SGPrDWMkSotVqCd0cxieffUNMbFy/92+TtWFr78LiJUsloRIefoFvh4zk3v2HAPx46zYjRo2ntLTstZ9Fq9XS1SWnrU3Gnj37iYmJIy09EyfXGaSmpUvHrFm7Hhs7Z71zQzeH8f2wURQVlbB9x26mTffU23/t+k3++vcvuPHjLRISkxg52oAfb75wOm6VyZjts4BDh46iVquRydownDKVAwcP613n2bNmSkrL6OnpITs7lxMnT5Odk8ukyWY8eBhJVXW1tOSwNngDT57U4rsogCW9QhJg7nw/rO2c6ejoRCaTMc7AiE2bw/Tus2bdBvwWB0qOn3X1DZiYWbHAd4lkQTl4+BjDRoylpKS0T1+2tLTiOs2DzVu2SdsSE5P48pthHD12EoVCgZOr+4AWgVNnwhk+chxXrl7nyNETeks2AJtCw5hkZEZlZRUAMlkbTi7TmTjZjIqKSknwpaalY2XjpPcu3r59D2MzKz3rQFV1NeMmTsFvcQCgW8YYO2EyBw4ekY7ZtXsfYydMprKyb2TKgwdRDB85npyc3D77enp6mOUzH5dp7tISYEpqGuMmGHHztk7YND97xrrgjRQUFJKVlcOoMQZEXLoCgEat4eixk/z9H18REaHbptVqmTjZlKXLV/XbfwChW7ZhZmGrt23nrr18+c0wsl/xe+ro6ODa9R/ZuXsfe/cf6vO3a/c+Tp4++9qoqrcVKq/S3t6OvaMr1rZOwqoiEPwBee9CpaCgiNHjDJk7fxGr1oSweu16XNw8+Od/+RM7du6RBjqFQkFA4ArMreyprn4R9ZGZlY3hlKmEn4/g6PGTTDIyIzMzS9q//8AhcUqOpAAADqxJREFUhgwbrXfOy7yNUFEqldy9e59Va4IJWLqCbTt2vzafR2NTE0uXrSAlJY3YuEe4unlKs1KVSsUMj1lY2TrpnRMVHcOwEWNJSkrBe9Y8ApYG6e3Py89n8hRztm3fzanTZzGYZELKS7N80Ik2Gztn6up0VpaMzCzCtu9iWdAqglauJSMjS+/4hsZGgkM2cfzkaby859L+UsSEUqkkbPsuYmLjsLJxJD0jU9qnW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/></span></b></p><div class="separator" style="clear: both; text-align: left;"><i>(Σχολικό βιβλίο άλγεβρας Β Λυκείου, εκτός ύλης)</i></div><div class="separator" style="clear: both; text-align: left;"><i> </i></div>
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<w:LsdException Locked="false" Priority="9" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="heading 5"/>
<w:LsdException Locked="false" Priority="9" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="heading 6"/>
<w:LsdException Locked="false" Priority="9" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="heading 7"/>
<w:LsdException Locked="false" Priority="9" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="heading 8"/>
<w:LsdException Locked="false" Priority="9" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="heading 9"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="index 9"/>
<w:LsdException Locked="false" Priority="39" SemiHidden="true"
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<w:LsdException Locked="false" Priority="39" SemiHidden="true"
UnhideWhenUsed="true" Name="toc 2"/>
<w:LsdException Locked="false" Priority="39" SemiHidden="true"
UnhideWhenUsed="true" Name="toc 3"/>
<w:LsdException Locked="false" Priority="39" SemiHidden="true"
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<w:LsdException Locked="false" Priority="39" SemiHidden="true"
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<w:LsdException Locked="false" Priority="39" SemiHidden="true"
UnhideWhenUsed="true" Name="toc 6"/>
<w:LsdException Locked="false" Priority="39" SemiHidden="true"
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<w:LsdException Locked="false" Priority="39" SemiHidden="true"
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<w:LsdException Locked="false" Priority="39" SemiHidden="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" Priority="35" SemiHidden="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" Priority="10" QFormat="true" Name="Title"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" Priority="1" SemiHidden="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" Priority="11" QFormat="true" Name="Subtitle"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" Priority="22" QFormat="true" Name="Strong"/>
<w:LsdException Locked="false" Priority="20" QFormat="true" Name="Emphasis"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" Priority="39" Name="Table Grid"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
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<w:LsdException Locked="false" Priority="60" Name="Light Shading"/>
<w:LsdException Locked="false" Priority="61" Name="Light List"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1"/>
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<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 1"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 1"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 1"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 1"/>
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<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 1"/>
<w:LsdException Locked="false" SemiHidden="true" Name="Revision"/>
<w:LsdException Locked="false" Priority="34" QFormat="true"
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<w:LsdException Locked="false" Priority="29" QFormat="true" Name="Quote"/>
<w:LsdException Locked="false" Priority="30" QFormat="true"
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<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 1"/>
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<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 1"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 1"/>
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<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 1"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 1"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 2"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 2"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 2"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 2"/>
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<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 2"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 2"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 3"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 3"/>
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<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 4"/>
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<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 4"/>
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<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 4"/>
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<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 5"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 5"/>
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<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 5"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 5"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 6"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 6"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 6"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 6"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 6"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 6"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 6"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 6"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 6"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 6"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 6"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 6"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 6"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 6"/>
<w:LsdException Locked="false" Priority="19" QFormat="true"
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<w:LsdException Locked="false" Priority="21" QFormat="true"
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<w:LsdException Locked="false" Priority="31" QFormat="true"
Name="Subtle Reference"/>
<w:LsdException Locked="false" Priority="32" QFormat="true"
Name="Intense Reference"/>
<w:LsdException Locked="false" Priority="33" QFormat="true" Name="Book Title"/>
<w:LsdException Locked="false" Priority="37" SemiHidden="true"
UnhideWhenUsed="true" Name="Bibliography"/>
<w:LsdException Locked="false" Priority="39" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="TOC Heading"/>
<w:LsdException Locked="false" Priority="41" Name="Plain Table 1"/>
<w:LsdException Locked="false" Priority="42" Name="Plain Table 2"/>
<w:LsdException Locked="false" Priority="43" Name="Plain Table 3"/>
<w:LsdException Locked="false" Priority="44" Name="Plain Table 4"/>
<w:LsdException Locked="false" Priority="45" Name="Plain Table 5"/>
<w:LsdException Locked="false" Priority="40" Name="Grid Table Light"/>
<w:LsdException Locked="false" Priority="46" Name="Grid Table 1 Light"/>
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</p><p class="MsoNormal" style="text-align: justify;"><i>(Σχολικό βιβλίο μαθηματικών Γ Λυκείου, εντός εξεταστέας ύλης)</i><span style="font-size: 13pt; line-height: 107%;"><i><br /></i></span></p><p class="MsoNormal" style="text-align: left;">Τέλος, σημαντική ήταν και η επιρροή που άσκησε με τις ιδέες και τις εργασίες του για την Λογική και την Επιχειρηματολογία σε φιλοσόφους του 20ου αιώνα. Το έργο του "Παράδοξα του απείρου", αν και δημοσιεύτηκε το 1851, τρία χρόνια μετά τον θάνατό του, αποτέλεσε την αφετηρία προς την παραδοχή της ύπαρξης υπερσυνόλων.</p><p class="MsoNormal" style="text-align: justify;"><br /></p><p class="MsoNormal" style="text-align: left;"><span style="font-size: 13pt; line-height: 107%;"><i>Μια συλλογή ασκήσεων πάνω στο <b>Θεώρημα Bolzano</b> για μαθητές της <b>Γ Λυκείου</b> ελεύθερο για χρήση.</i><b><br /></b></span></p><p class="MsoNormal" style="text-align: left;"><!--[if gte mso 9]><xml>
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="footnote reference"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="annotation reference"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="line number"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="page number"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="endnote reference"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="endnote text"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="table of authorities"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="macro"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="toa heading"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Bullet"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Number"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Bullet 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Bullet 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Bullet 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Bullet 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Number 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Number 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Number 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Number 5"/>
<w:LsdException Locked="false" Priority="10" QFormat="true" Name="Title"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Closing"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Signature"/>
<w:LsdException Locked="false" Priority="1" SemiHidden="true"
UnhideWhenUsed="true" Name="Default Paragraph Font"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text Indent"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Continue"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Continue 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Continue 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Continue 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="List Continue 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Message Header"/>
<w:LsdException Locked="false" Priority="11" QFormat="true" Name="Subtitle"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Salutation"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Date"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text First Indent"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text First Indent 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Note Heading"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text Indent 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text Indent 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Block Text"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Hyperlink"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="FollowedHyperlink"/>
<w:LsdException Locked="false" Priority="22" QFormat="true" Name="Strong"/>
<w:LsdException Locked="false" Priority="20" QFormat="true" Name="Emphasis"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Document Map"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Plain Text"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="E-mail Signature"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Top of Form"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Bottom of Form"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Normal (Web)"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Acronym"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Address"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Cite"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Code"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Definition"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Keyboard"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Preformatted"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Sample"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Typewriter"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Variable"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Normal Table"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="annotation subject"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="No List"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Outline List 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Outline List 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Outline List 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Simple 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Simple 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Simple 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Colorful 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Colorful 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Colorful 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 6"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 7"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 8"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 6"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 7"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 8"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table 3D effects 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table 3D effects 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table 3D effects 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Contemporary"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Elegant"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Professional"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Subtle 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Subtle 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Web 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Web 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Web 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Balloon Text"/>
<w:LsdException Locked="false" Priority="39" Name="Table Grid"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Theme"/>
<w:LsdException Locked="false" SemiHidden="true" Name="Placeholder Text"/>
<w:LsdException Locked="false" Priority="1" QFormat="true" Name="No Spacing"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading"/>
<w:LsdException Locked="false" Priority="61" Name="Light List"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 1"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 1"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 1"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 1"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 1"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 1"/>
<w:LsdException Locked="false" SemiHidden="true" Name="Revision"/>
<w:LsdException Locked="false" Priority="34" QFormat="true"
Name="List Paragraph"/>
<w:LsdException Locked="false" Priority="29" QFormat="true" Name="Quote"/>
<w:LsdException Locked="false" Priority="30" QFormat="true"
Name="Intense Quote"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 1"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 1"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 1"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 1"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 1"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 1"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 1"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 1"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 2"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 2"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 2"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 2"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 2"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 2"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 2"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 2"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 2"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 2"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 2"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 2"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 2"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 2"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 3"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 3"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 3"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 3"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 3"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 3"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 3"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 3"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 3"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 3"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 3"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 3"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 3"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 3"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 4"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 4"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 4"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 4"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 4"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 4"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 4"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 4"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 4"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 4"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 4"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 4"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 4"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 4"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 5"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 5"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 5"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 5"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 5"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 5"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 5"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 5"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 5"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 5"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 5"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 5"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 5"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 5"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 6"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 6"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 6"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 6"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 6"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 6"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 6"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 6"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 6"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 6"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 6"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 6"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 6"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 6"/>
<w:LsdException Locked="false" Priority="19" QFormat="true"
Name="Subtle Emphasis"/>
<w:LsdException Locked="false" Priority="21" QFormat="true"
Name="Intense Emphasis"/>
<w:LsdException Locked="false" Priority="31" QFormat="true"
Name="Subtle Reference"/>
<w:LsdException Locked="false" Priority="32" QFormat="true"
Name="Intense Reference"/>
<w:LsdException Locked="false" Priority="33" QFormat="true" Name="Book Title"/>
<w:LsdException Locked="false" Priority="37" SemiHidden="true"
UnhideWhenUsed="true" Name="Bibliography"/>
<w:LsdException Locked="false" Priority="39" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="TOC Heading"/>
<w:LsdException Locked="false" Priority="41" Name="Plain Table 1"/>
<w:LsdException Locked="false" Priority="42" Name="Plain Table 2"/>
<w:LsdException Locked="false" Priority="43" Name="Plain Table 3"/>
<w:LsdException Locked="false" Priority="44" Name="Plain Table 4"/>
<w:LsdException Locked="false" Priority="45" Name="Plain Table 5"/>
<w:LsdException Locked="false" Priority="40" Name="Grid Table Light"/>
<w:LsdException Locked="false" Priority="46" Name="Grid Table 1 Light"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark"/>
<w:LsdException Locked="false" Priority="51" Name="Grid Table 6 Colorful"/>
<w:LsdException Locked="false" Priority="52" Name="Grid Table 7 Colorful"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 1"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 1"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 1"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 1"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 1"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 1"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 1"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 2"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 2"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 2"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 2"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 2"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 2"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 2"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 3"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 3"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 3"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 3"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 3"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 3"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 3"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 4"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 4"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 4"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 4"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 4"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 4"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 4"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 5"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 5"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 5"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 5"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 5"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 5"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 5"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 6"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 6"/>
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<iframe allow="autoplay" height="480" src="https://drive.google.com/file/d/1iEy0RtpwZVvx4dBw5CSudzNWPkaJxj7p/preview" width="640"></iframe>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.comtag:blogger.com,1999:blog-8921318926489377428.post-80114562436500988552021-08-19T12:12:00.001+03:002021-08-19T12:12:07.087+03:00Μαθηματικά μοντέλα για τη φυσική αναγέννηση στα καμένα δάση<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://1.bp.blogspot.com/-8of9Tybc5iY/YR4dMV8XZnI/AAAAAAAAC_Q/vYjNx6IT2J8bpjR3nPaV87dInSTprnX0gCLcBGAsYHQ/s850/Screenshot_2.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="499" data-original-width="850" height="235" src="https://1.bp.blogspot.com/-8of9Tybc5iY/YR4dMV8XZnI/AAAAAAAAC_Q/vYjNx6IT2J8bpjR3nPaV87dInSTprnX0gCLcBGAsYHQ/w400-h235/Screenshot_2.png" width="400" /></a></div><br /><p></p><div class="" data-block="true" data-editor="ceiqi" data-offset-key="dcv1k-0-0"><div class="_1mf _1mj" data-offset-key="dcv1k-0-0"><span data-offset-key="dcv1k-0-0"><span data-text="true">Οι δασικές πυρκαγιές αποτελούν ένα φυσικό φαινόμενο με σημαντικό ρόλο για την ισορροπία και την αναγέννηση των Μεσογειακών οικοσυστημάτων. Τα οικοσυστήματα αυτά είναι σε μεγάλο βαθμό προσαρμοσμένα στη φωτιά , με αποτέλεσμα να έχουν συνήθως τη δυνατότητα να αναγεννηθούν άμεσα και αποτελεσματικά μετά από αυτή. </span></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="6a399-0-0"><div class="_1mf _1mj" data-offset-key="6a399-0-0"><span data-offset-key="6a399-0-0"><br data-text="true" /></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="7qpgc-0-0"><div class="_1mf _1mj" data-offset-key="7qpgc-0-0"><span data-offset-key="7qpgc-0-0"><span data-text="true">Κατά μέσο όρο σε ένα Μεσογειακού τύπου δάσος εμφανίζεται μία πυρκαγιά από φυσικά αίτια κάθε 100‐150 χρόνια. Όμως τα φυσικά αίτια ευθύνονται μόνο για το 5% των πυρκαγιών που ξεσπούν στην Ελλάδα. Το υπόλοιπο 95% οφείλεται στην ανθρώπινη δραστηριότητα και έχει σαν συνέπεια τη διατάραξη του φυσικού ρόλου των πυρκαγιών ή την εξάντληση της φυσικής ικανότητας των οικοσυστημάτων να ανταποκρίνονται στις προκλήσεις της μεταπυρικής αναγέννησης. </span></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="1v16n-0-0"><div class="_1mf _1mj" data-offset-key="1v16n-0-0"><span data-offset-key="1v16n-0-0"><br data-text="true" /></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="b24io-0-0"><div class="_1mf _1mj" data-offset-key="f7pid-0-0"><b><span data-offset-key="f7pid-0-0"><span data-text="true">Το αποτέλεσμα είναι πως οι πυρκαγιές αποτελούν πλέον την πιο σοβαρή απειλή των Ελληνικών Μεσογειακών δασών.</span></span></b></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="dvfkb-0-0"><div class="_1mf _1mj" data-offset-key="dvfkb-0-0"><span data-offset-key="dvfkb-0-0"><br data-text="true" /></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="8t1iv-0-0"><div class="_1mf _1mj" data-offset-key="8t1iv-0-0"><span data-offset-key="8t1iv-0-0"><span data-text="true">Μετά τις καταστροφικές πυρκαγιές του 2007, το WWF Ελλάς ξεκίνησε το πρόγραμμα<b> «Το Μέλλον των Δασών»</b>, με σκοπό την καταπολέμηση των βασικών αιτίων υποβάθμισης των ελληνικών δασών, τη συνεισφορά στην αποτελεσματικότερη καταπολέμηση των δασικών πυρκαγιών και τη συνεχή παρουσία στις πυρόπληκτες περιοχές της Πελοποννήσου. </span></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="5g01f-0-0"><div class="_1mf _1mj" data-offset-key="5g01f-0-0"><span data-offset-key="5g01f-0-0"><br data-text="true" /></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="d99a2-0-0"><div class="_1mf _1mj" data-offset-key="3cusd-0-0"><span data-offset-key="3cusd-0-0"><span data-text="true">Μέσα στο πλαίσιο του παραπάνω προγράμματος και μετά από την εμπειρία και τη γνώση που αποκομίστηκε από σχετικές δράσεις στην ευρύτερη περιοχή της Πελοποννήσου, κρίθηκε αναγκαία η δημιουργία ενός μαθηματικού μοντέλου πρόβλεψης της πορείας της φυσικής αναγέννησης στα καμένα δάση χαλεπίου πεύκης στο νομό Ηλείας, το οποίο θα προσφέρει μία μακροσκοπική απεικόνιση των περιοχών που αντιμετωπίζουν –ή θα αντιμετωπίσουν‐ προβλήματα αναγέννησης και στις οποίες θα πρέπει να δοθεί ιδιαίτερη διαχειριστική προτεραιότητα. </span></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="4kto3-0-0"><div class="_1mf _1mj" data-offset-key="4kto3-0-0"><span data-offset-key="4kto3-0-0"><br data-text="true" /></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="au5nr-0-0"><div class="_1mf _1mj" data-offset-key="cu70e-0-0"><span data-offset-key="cu70e-0-0"><span data-text="true">Η προσέγγιση αυτή είναι εξαιρετικά σημαντική, καθώς θα αποτελέσει σημαντικό εργαλείο για την λήψη έγκαιρων αποφάσεων από τους σχετικούς φορείς, με σκοπό πάντα την ταχεία αποκατάσταση των πληγέντων οικοσυστημάτων αλλά και ευρύτερα τη διαφύλαξη του δασικού μας πλούτου.</span></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="8nrh8-0-0"><div class="_1mf _1mj" data-offset-key="8nrh8-0-0"><span data-offset-key="8nrh8-0-0"><br data-text="true" /></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="8kr3p-0-0"><div class="_1mf _1mj" data-offset-key="8kr3p-0-0"><span data-offset-key="8kr3p-0-0"><span data-text="true">Όπως αναφέρεται στη μεθοδολογία της παρακάτω εργασίας, το πολυκριτηριακό μοντέλο διαμορφώθηκε σε τρία στάδια. Αρχικά με τη δημιουργία δύο διακριτών μοντέλων, <b>του μοντέλου Α</b> το οποίο περιλαμβάνει τους παράγοντες που επηρεάζουν πρωτογενώς την παραγωγή και διασπορά των σπερμάτων της πεύκης και <b>του μοντέλου Β</b> που περιλαμβάνονται παράγοντες που επιδρούν δευτερογενώς στην επιτυχία φύτρωσης των σπερμάτων και επιβίωσης των παραγομένων αρτιβλάστων. </span></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="4vrnl-0-0"><div class="_1mf _1mj" data-offset-key="4vrnl-0-0"><span data-offset-key="4vrnl-0-0"><br data-text="true" /></span></div></div><div class="" data-block="true" data-editor="ceiqi" data-offset-key="2ami0-0-0"><div class="_1mf _1mj" data-offset-key="c5201-0-0"><span data-offset-key="c5201-0-0"><span data-text="true">Στη συνέχεια στη δεύτερη φάση , τα δύο αυτά μοντέλα συνδυάστηκαν με ισοβαρή αναλογία και στο τέλος το τελικό μοντέλο δημιουργήθηκε με τη διόρθωση του συνδυαστικού με το αντίστοιχο που είχε προέλθει από τη χωρική παρεμβολή 84 σημείων.</span></span></div><div class="_1mf _1mj" data-offset-key="c5201-0-0"><span data-offset-key="c5201-0-0"><span data-text="true"> </span></span></div><div class="_1mf _1mj" data-offset-key="c5201-0-0"><span data-offset-key="c5201-0-0"><span data-text="true"> <img alt="" 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" /></span></span></div><div class="_1mf _1mj" data-offset-key="c5201-0-0"><span data-offset-key="c5201-0-0"><span data-text="true"> </span></span></div><div class="_1mf _1mj" data-offset-key="c5201-0-0"><span data-offset-key="c5201-0-0"><span data-text="true"></span><span data-text="true">Πηγή: <a href="https://contentarchive.wwf.gr/images/pdfs/montelo-provlepsis-anagenisis.pdf">https://contentarchive.wwf.gr/images/pdfs/montelo-provlepsis-anagenisis.pdf</a><br /> </span></span></div></div>Thanasis Kopadishttp://www.blogger.com/profile/08819276139088708638noreply@blogger.com