tag:blogger.com,1999:blog-25547116825011400822024-03-04T22:01:37.929-08:00matematica para todosProfesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.comBlogger19125tag:blogger.com,1999:blog-2554711682501140082.post-33446453884156507082020-08-31T06:24:00.000-07:002020-08-31T06:24:03.150-07:00Actividades finales 9<p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgPZGbGOdCn7ur2uizzfSihWdKeLnTE1xzOE3Rt92Q7RFBuNodHza4bdShwQuhDFllix_FZ_fzY1l283ZhyakOBElzXpTodI11QlQwo4yZBa8MWlWCY2KvKsToRIIgTzeJLaKvM0cV8biM6/s544/9.1sep.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="317" data-original-width="544" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgPZGbGOdCn7ur2uizzfSihWdKeLnTE1xzOE3Rt92Q7RFBuNodHza4bdShwQuhDFllix_FZ_fzY1l283ZhyakOBElzXpTodI11QlQwo4yZBa8MWlWCY2KvKsToRIIgTzeJLaKvM0cV8biM6/s0/9.1sep.PNG" /></a></div><div class="separator" style="clear: both; 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text-align: center;">Te recomiendo ver vídeos sobre los temas.</div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br /> <p></p>Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-10752484019758805322020-08-31T06:19:00.001-07:002020-08-31T06:19:23.291-07:00Actividades finales 8<p> </p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6wqSEl1G1q9JMJ1DxMGuuEE0fxAcTag8DzhQM7nnKBnipTk-Nwzyua0FUGz7z8uLz5W1NjFNJv9Xwsz6KUn2h_kT7VTvzKggSSsNc-Id7J4pRT6M8bFM3i9qxs1M_WMtycXQ9CDKCLuhk/s409/8.1sep.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="215" data-original-width="409" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj6wqSEl1G1q9JMJ1DxMGuuEE0fxAcTag8DzhQM7nnKBnipTk-Nwzyua0FUGz7z8uLz5W1NjFNJv9Xwsz6KUn2h_kT7VTvzKggSSsNc-Id7J4pRT6M8bFM3i9qxs1M_WMtycXQ9CDKCLuhk/s0/8.1sep.PNG" /></a></div><div class="separator" style="clear: both; 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text-align: center;"><br /></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br /></div>Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-38522691918358620002020-08-31T06:05:00.000-07:002020-08-31T06:05:11.137-07:00Actividades finales séptimo <p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh6XbEgs4rSwAI-BSSet7l-r-TF-vLUjuXSXMx_yWq4ggOydiq4TZTItc2PuIb2C1Mza-0JxpDgBv4vHW30Qmh94BrE9S7Ws2O44VMkl_v1MZXQGYP7h2p0HQO4YQzGNaGTJprDowSlXwRU/s568/7.1sep.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="355" data-original-width="568" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh6XbEgs4rSwAI-BSSet7l-r-TF-vLUjuXSXMx_yWq4ggOydiq4TZTItc2PuIb2C1Mza-0JxpDgBv4vHW30Qmh94BrE9S7Ws2O44VMkl_v1MZXQGYP7h2p0HQO4YQzGNaGTJprDowSlXwRU/s0/7.1sep.PNG" /></a></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br /> <p></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhAryi6v70KA-JwHOn9DeKFSYA2dffIR-0O0GEKhmsl6pmQolqQ5J36QHENPAqJYDTlEu-3lI6T8Iu7jLR_hcHRUvpyQQ7UFKqWzNL6T3pWtEchzmDXXKt3ixyLaz1yBL0ajtvUaZCZ5CiF/s431/7.2sep.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="380" data-original-width="431" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhAryi6v70KA-JwHOn9DeKFSYA2dffIR-0O0GEKhmsl6pmQolqQ5J36QHENPAqJYDTlEu-3lI6T8Iu7jLR_hcHRUvpyQQ7UFKqWzNL6T3pWtEchzmDXXKt3ixyLaz1yBL0ajtvUaZCZ5CiF/s0/7.2sep.PNG" /></a></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiJB5zUfnvyr0mQG_I_Vy_mn_YvcaI9PcMjfDnfOE95K9pMu4WNpXei7VCxQaKRqL__-JQBYSCA66k72ws4KQ5wS1wKRXnjgz5yVT71FMlPYSY7afGQi_MJ2qrv-u2W6TUO_Yiq8bOMfqnk/s408/7.4.PNG" imageanchor="1" style="margin-left: 1em; 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text-align: center;"><br /></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-12232488310000551272020-08-03T10:46:00.004-07:002020-08-03T10:46:41.059-07:00actividad estadística 9 agosto.<br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjI-C-i6YCHuXTidAsoquh53BA9eAHU9QUn1BZUCwypcvhyphenhyphenRFLgXKGXNnkJM5YhMfoC6TLwd-uatsGzGbcbie80DyHc_tya6YwcPMEeov0AZwC9vFhvoGTcIxHt5HOpQrHW60Epwih8Xolb/s627/Captura+1.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="315" data-original-width="627" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjI-C-i6YCHuXTidAsoquh53BA9eAHU9QUn1BZUCwypcvhyphenhyphenRFLgXKGXNnkJM5YhMfoC6TLwd-uatsGzGbcbie80DyHc_tya6YwcPMEeov0AZwC9vFhvoGTcIxHt5HOpQrHW60Epwih8Xolb/s0/Captura+1.PNG" /></a></div><br /><div class="separator" style="clear: both; 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text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;">Está actividad es para entregar antes del 30 de agosto. por ciudad educativa o al correo. cristobalfg@yahoo.es</div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;">Se cuidan.</div>Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-25186977607982123502020-08-03T10:34:00.005-07:002020-08-03T10:34:54.040-07:00Actividades de agosto 8 álgebra, 8-3,8-4,8-5,8-6,8-7<br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjq5gHNXPTK-9Pw8c4L1T7w-prRvglUgNOukGz_PxgUcAeu6mwOBbXsdWpbiIrmnaCkASxyL-n99LaS85hrfM5cpWU6PmLOkJZ27FccATuujVtrW312ngD0CoeWAU34UQAnZiYe3ZQfs29v/s510/Captura+1.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="198" data-original-width="510" height="248" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjq5gHNXPTK-9Pw8c4L1T7w-prRvglUgNOukGz_PxgUcAeu6mwOBbXsdWpbiIrmnaCkASxyL-n99LaS85hrfM5cpWU6PmLOkJZ27FccATuujVtrW312ngD0CoeWAU34UQAnZiYe3ZQfs29v/w638-h248/Captura+1.PNG" width="638" /></a></div><div class="separator" style="clear: both; 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text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh7XaQ7P35q5CklKArc8GdJ8mHPPFNt7edZOB3uV1Uz1wlqnCeHE3V_Y3waqUVbwoCStQoSc4waEedV1rNxaMBcWJjBFht8sJsZR8_UWU6zxnqpb-qy2VDyRFDHhpZ6NHRa7DLLCub1esLt/s630/Captura+4.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="346" data-original-width="630" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh7XaQ7P35q5CklKArc8GdJ8mHPPFNt7edZOB3uV1Uz1wlqnCeHE3V_Y3waqUVbwoCStQoSc4waEedV1rNxaMBcWJjBFht8sJsZR8_UWU6zxnqpb-qy2VDyRFDHhpZ6NHRa7DLLCub1esLt/s0/Captura+4.PNG" /></a></div><div class="separator" style="clear: both; text-align: center;">Estás actividades son para entregar antes del 30 de agosto.por ciudad educativa o al correo cristobalfg@yahoo.es</div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;">se les quiere.</div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div>Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-80133169014703392192020-08-03T10:18:00.003-07:002020-08-03T10:18:42.350-07:00Actividades de Agosto<br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br /><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhg82DG6Zs-X-k1C0DbtwQculxur_ahokfti-q1mby1rQStWV3L69sRPKebIusUMQFBdZunrCMuQn1ccvIIM_fvIEmdRQVq2ZQgO8fnAIYyXraiyOuYoWim2iy-wUNQ4fehf_bHug_IH5cU/s490/Captura+1.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="203" data-original-width="490" height="254" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhg82DG6Zs-X-k1C0DbtwQculxur_ahokfti-q1mby1rQStWV3L69sRPKebIusUMQFBdZunrCMuQn1ccvIIM_fvIEmdRQVq2ZQgO8fnAIYyXraiyOuYoWim2iy-wUNQ4fehf_bHug_IH5cU/w613-h254/Captura+1.PNG" width="613" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-rHAAwImyn4OSAShtx2-vP1gI_xUbN5eQ43UcSoW8YQ0xvjqCN9B3vsla6RG_tAKC6SRcuaFDmHy39DgzRRBy1paoWtDuYiXMI81p13Q6eDHzneiLKpEoqqcHpRr6JFUC_QSKLidBwntD/s680/a-2.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="390" data-original-width="680" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj-rHAAwImyn4OSAShtx2-vP1gI_xUbN5eQ43UcSoW8YQ0xvjqCN9B3vsla6RG_tAKC6SRcuaFDmHy39DgzRRBy1paoWtDuYiXMI81p13Q6eDHzneiLKpEoqqcHpRr6JFUC_QSKLidBwntD/s640/a-2.PNG" width="640" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhkqUyKmpbWJ1lSNVc-4A0hhSlPusmBL1F_yLY24vJlUPqlgcKTNiDd-xTWtDhtpUYViUKKFjApcVYQ9qc-5JscF6hpjVV7tSZaCWj4s8g39lgetA3EIoqzso9buKz5KkX8R2eUSiauu7oR/s510/a-3.PNG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="373" data-original-width="510" height="466" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhkqUyKmpbWJ1lSNVc-4A0hhSlPusmBL1F_yLY24vJlUPqlgcKTNiDd-xTWtDhtpUYViUKKFjApcVYQ9qc-5JscF6hpjVV7tSZaCWj4s8g39lgetA3EIoqzso9buKz5KkX8R2eUSiauu7oR/w638-h466/a-3.PNG" width="638" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><font face="arial">Está es la actividad de Agosto. para entregar antes del 31 de agosto.</font></div>La puedes subir a ciudad educativa o enviar a mi correo: cristobalfg@yahoo.es, <br /><div class="separator" style="clear: both; text-align: center;"><br /></div><br /><br /><div class="separator" style="clear: both; text-align: center;"><br /></div>Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-73006455224680446672020-07-05T15:01:00.001-07:002020-07-05T15:01:14.519-07:00noveno<br />
<img alt="" height="294" 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" 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" 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para desarrollar desde el 15 de Julio al 30 de Julio. fecha máxima de entrega el 31 de Julio.Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-54227362684584324922020-07-05T14:55:00.006-07:002020-07-05T14:55:46.878-07:00<img alt="" height="213" 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" 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" width="640" /><br />
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" width="640" /><br />
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<br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-35008906637995091422020-07-05T14:51:00.002-07:002020-07-05T14:51:26.181-07:00Actividades de refuerzo y recuperación para los estudiantes que no han presentado ninguna actividad.<br />
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" 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" 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LaASJULw1VckVVwwrJOPPZci5TkKMlRkqMkx/PXQe8GiICSnAABDJHkpUNyRkBk3oW5OFxdVRMirXDZFSsRm8Ml50pyfKseSnKU5CjJUZLj29dCYxUTASU5xQQsRKOXPMl5HCKdIRIJkViItIRIV4jceoHk7FCS43NdUZKjJEdJjpIcnz8YGrE4CCjJKQ5aoRu35EkOh6tuh8jc/P1xRJZBZJGurip2NVGSoyRHSY6SnGJ/ODSBLwgoyfEFpdCPc/7L0yjftD0kZy9k8kF7UzJuTOZP4E6tGevx1+qx6DDpCNpPfh3t+XshdJl9DBWbP3dh6fhyiDDcfSEsxZ8vf8CKm/CLdO+jKjcy63wLZOZJ/3TzpTyzTkEa94H0vBMy400z+Ux7A9JnNfr0Tw1KZWgU3QUyeiNkymEz+hKD2HGQdlmQW942I5PYTz8O6X8fpH6ieRvSVr2XQxr2hFB/X2ztT5yZJyBd59m7EpvEhrrMOmnvptxqmFncLdmn7I00I9PMyp5+DJJ0v24GGJQ3W4WWOgJKckrdBEYUOH/uK5Sv2RjSNtPeFZWNm78hJhfSegT+dFVVVG+Xg6oFQs348fjrDQMhwlVViQVCN/z2T72sNNV+kW4qrrypOaRWe3vre3/185aO2+rf0MDeOTdugv84uOZDwtCgHxo0aozly5cbDnehfJVakIiR9rb9rvn6e04MqkZBqrSxG0Z/5RRMFzse0qgX5Po65m1IW9XvDilfz7xs13LET4TU7gi5sYlZbJgHca8RD6nYPDiyq0dDbm5pVjZtWrcXUlKDQ+B9+cCpWwdfUNI4fiGgJMcv2EIu0fmvz6J83ZaQxDvsHoweSyD+hl7LIHGzUK9ZS+zP244DBcL+Pdtw6OBOvP76bo/hyJFdv0hDGfv3bEXGyEGQ2smQvvf6r5+3clE2G3f6+Omzwkw+yXdD2uSiTdtobNq0yXDYgMr1mkE6zLFdJngrny/PiUGD7pC6XSH9VpnBgPn2XgFpmw6p1MK8DWmr1qMgN7cyL9sVs773QJqlQkgYTGLDPIh7476QmvHBkc1ertqdzMpm71lEhpKckPuqq0JGEFCSYwTGUhdiDVc1iYdk7bL9NdHHkL+BfqWGrEHrhO7Gy7V4/hxI5GR72MNf/byl47BHo2RIjzsg0/7lPw6u+dAPUfIjSO47wDgmFNiwXSfIyFdth6Ku+fp7TgzozDEqEzLzLTMYUJcpr0NIEuhfikNX/urnKR1tRYJN56rU31McE/c4PNN5DqRZillsqNuM45CE6ZCWQ4Ig+00Ie7voj8yoTY9Aut+rw1VBebNVaKkjoCSn1E1gRAHjE49Tn0ZEXBcjurkKmT97BqTVOPPOHV0dG3L7e3XQqQ46XeuE67k66HT3kaUOOl0/UXoebggoyQkPiyrJcVmdoiTH9uKtXsjdG3OH6CjJccdFSU54NAJaCs8IKMnxjEtZu6skR0mOtQzbachJ9JTkuDfmDjZKctxxUZJT1j73qm9xEFCSUxy0QjeukhwlOUpyXOqAQ2g8/SrJUZITup9y1cw0AkpyTCNaOvKU5Lg0cDpcpcNVnsiNc09JjpKc0vlMa66lgYCSnNJA3XyeSnKU5GhPjksdcAiNp18lOUpyzH+CVWKoIqAkJ1QtUzy9lOS4NHDak6M9OZ7IjXNPSY6SnOJ9XjV2WUZASU5Ztt5F3ZXkKMnRnhyXOuAQGk+/SnKU5Fz8dOpZuCOgJCc8LKwkx6WB054c7cnxRG6ce0pylOSEx2dfS+ELAkpyfEEp9ONYJKdJHGTsDgiXhI7b7X+YsA8y+EW0ap9ovOB3zLsV0mYSZOob/uvnrWzTjtr+lZIWQehs1Ft8X57TQWKvh9GrT3/jmFBgw6hOkBFr7d2qfdHHWxxiEJ0NaZsB4Q6/3uL7+nzyYdtVRr2u5m1IW9GpKjdypP6+6lTceFP/Bel8K6TZALPYUA86cm0/FRIxOAiyj0LoZ4quL4za9BAkcaXueByUN1uFljoCSnJK3QRGFDj/1RcoX681JHml7dem370Qf0P/ByCdFqBe80js37/faMgYNRxSPwUy8FH/9fNWrkGrIdWibR9LqY+YySflQUj0VETHxhvFw8Y3D9UatYR0vQPS/34z+hKDxr1tj96DV5uRSdyJJ52VVm5t3oaU3W4spGpbCPX3Zmd/nw/8B6TlcNtRrElsqM+gRyHNB0LqdIIYl70a0rQfpF6iWdmpD0MixyvJMfIlViEhh4CSnJAziV8KWV7IazSEtBwJiRxt+7ehjxt/QmQapHEqbqpWCwsXLjQaOraPg1Rsa3sG90c3X9LQG/T1dSG1O9i+m3xJ4y0OnVLW7Ym69RoYxcPGdwGuv7k6pOkgSOQY/2xWUH9iULkVpFKE3aNT8Lm/19xgkH6rrq1p3ob0s1WnM+S62uZlu5aXRKpGnO2pnr1drs8CPSfu1dpBbmxsFnfqRdlVIiEVm5mVTZvW6qYOOv368mqikEdASU7Im8gnBS0HnU3bQ3Ly7PkYdLLpb5h8BDJsLdp0TPIp7+JEWrpwLqTtNMjME/7r561cs07ZvRgc+qDDRG/xfXlO55G9H0Xv/qnFKa7PcRtFd4GM2gjhcJAv+niLQwzY48KG8Za3zchknhwm6X8fpH6ieRvSVvT2Tk/b1N9bGf19TueWXefaPS4msaE+s05AOs6EtBpmFndL9ilI/CQI/wkxqff0o5Ck+7Unx+e3VSOWKQSU5JQpcxWqrE481onHv47VVZshOdvtuUsT9rr/5uxwn1DrTDQu+KsTj91xUrcOhX5X9UEYIKAkJwyMCEBJjpKcXwXJIZEZ+Twk8fYLYQEk6Q57MvSI5yDZ29wb8IIEh9dKctwxUpITHo2AlsIzAkpyPONS1u4qyVGS86sgObk7IUOftFcZcTiOwzdtRkH+/FdIt7mQcXvcG3AlOd7xUJJT1j73qm9xEFCSUxy0QjeukhwlOb8KkpPF4aodEC7pZ5h10va2flNTSNYm7cnxROq83VOSE7ofdtUscASU5ASOYShIUJKjJOfXQXJc7Dw+DzL0CcjfKtpDVrz21qDzuQ5XueOkJCcUPuGqQ7AQUJITLGRLVq6SHJfGT3c8Dv8dj7O3Q3J32UvBa8bbGwf6Mh9HSY47wSEeSnJK9mOtuZUsAkpyShbvYOWmJEdJjlsvBoke9z/h/iqTD/2yYfOlx8NTHPaW9Fpqb3bHZc2e4vh7j6ului+09+Gh/kXJoR49FkP+72rIgIfsVVZFxXd9pj057tgqyQnWZ1nlhgICSnJCwQqB66AkR0mOGykIZ5LDHpv01yBXV4c06QsZv9e90XYlNJ7OleS446UkJ/APsEoIXQSU5ISubYqjmZIcJTm/GpLDfXKGPw2JzoGMeN6eiOyJzBR2T0mOkpzifFw1btlGQElO2bafo/1FkuOsMNkKyfIzcJlu6jOIiOviiDf2u+BW7gY73p4z4q9+3tJxeIZOHrvNh0zc5z8OrvmM3w1Jug9JvfoYw+KioJ9QPzIBMuRFSC43tPPTbq7piIEzXDXlsBmZlM8hpV7L7OEqa0jJgK6O3rRV90X2cJU1xFaY7C0XVlgdhLCuWmSmsLge7nNVVoeZdi+QSWxYjskHIXGTIM1TIcZlH7LdObQcZlb2hDxIl7t0x+OLL6SehRMCSnLCw5r5JGfMBvujP3YzxN/ASZ0pTyEitjN++ukno2HeLdMhrXIh9HTur37e0vE/9Qbd7a372RXvLb4vz9mYdr8X3Xv2NoqHje/3qB/ZHjL4eXsJtC/6eItDDKLS7T1k2Kh7i+/rc3rapruMOh3N25C26n47pFYXSNZeyMj1wQlj90BipkKa9LGXoftadl/ikajFToA0TwmC7P2Q6CxIy6FmZY/bBem8VElOeDQFWoqCCCjJKYhI2bw+/83XKF+tHqRRX0jT/ra3Ynos9ic0GwCp0x3lK1XBpEmTjIaoNq0gNzSHtBjsn26+lCdiMOSa6pCqUZAWA83kw0aregdUr1HTKB42vhNxdYWbIfV6QIi9L2X0FocY0ElkhYaQiCFmZDJPetiuEQu5qrJ5G9JWVaJwbeXaaJ6cjuY9RwUn9EpDjYg4yDU1zWJDfIh7pRaQ6+sERzb3Aypf36xs9jpViUNKSnD8svnyRX3ssces98qJKzw5ffo0kpKS8OOPPzr39VcRKDYCSnKKDVlIJrB6chrFQEathWSuh2S85n8YuwnS/zE0j+mE8+fPGw1zZkyBRGRDcnf7r5+3snHXWzqQ7HKrPazhLb4vz7O3QBKXIzGpl1E8bHy/Qb3W8ZCBT0PGbjSDCzGgR/NWIyBcieRLGX2Jw/kwdKNAD++mbchN/qJnIydjFIDvAfwQpPA9tq15ElK7B2ScQWyIH3u6YnLtfzRM4m7J3gOhp3b+g2BSds42SKfF2pMTkl92VSpgBJTkBAxhSAjIH65K3wThRyt7q/+BQzMDOSenq/Gyuc3JCUTHotJac3J6QBIvzMkpKq6vzzgnp8d96JHc1zgmwM+oH9kBMvTCnBxfdSoqnjUnJxPSZow9f6OouMV5xjk5yZyT09meV1WctN7icqgnbh6yMtKCgLG7yI1rnoHU7W17ffemV3Ge58/JGWgWd+pAm3KydcvhZmVzTk5XnZPjXkP0KmwQUJITHqbMJzlpG21yU9jKEl/u8z/q1KeDMvF4/uwZkFbjIKb3WHEtFyfEWhOP5xVv/xRXGQXPOW8haVWQJh7/eGHi8Qu2h+2CeftzXVaXkMfNxdj0MUF/KTe89DSkbjJkksE9hGgnzn+Km2hPPLYmT7us+vPHjq5paNPobAgnHpuUrUvIg17fNINSREBJTimCbzBrJTkujYmSnLK747GSHPfl3UpydE6OwXbiVylKSU54mF1JjpKcsNgnR0mOkhwAOvE4PNqlkCiFkpyQMEPASijJUZKjJMf310iHq1zeFx2u8r3iaMyyh4CSnLJnM08aK8lx+WjrcJUOV3l6SVzuKclxeV+U5LjUDD0NOwSU5ISHSZXkuHy0leQoyfHyWivJcXlflOR4qS36uEwjoCSnTJsvX3klOS4fbSU5SnLy3wzPJ0pyXN4XJTmeK4neDQ8ElOSEhx2V5Lh8tJXkKMnx8loryXF5X5TkeKkt+rhMI6Akp0ybL195JTkuH20lOUpy8t8MzydKclzeFyU5niuJ3g0PBJTkhIcdz395Gtc3aQ/JyrM32puwH+JvmHQEMnQt2nRMMg7O0oXzIJFTIdNP+K+ft3LNOAlp1BvS407ItONm8pnyL0jyo+jdPzj+fRpFd4GM3ACZdNiMvsQgZhwkKgsy620zMon71GOQvqsg9RLN25C2SliCibnZxutdQYF5m9dB6veHzDCIDfGZccL2cM4N+0zibsk+aXs45y7WJmVPPQrpfp+6dShYSfQ6PBBQkhMedjx/7iuUr9kI0ibN9m8TlQHxN7QbC2k2BBWr18HSpUuNhi4dEyA3R0Ni2QAHoGNRaWPH204M63ax/QgVFdfXZ/T+XL836jdoZBQPG98lKF+5JqTFcAix91WnouIRgyqRkMqtIXETzMhkfjE59m7S19U2b0P6fKreGW3btA4Cxu71OG3EEMj1DW2P4UXhWNxnrNfVYyF0pGkSd+pBm1aLglSKMCubNq3TAympwSHwvnxh1UGnLyhpHL8QUJLjF2whl+j0mTPomBCP44f24M1DeQGGPdi5cS1iotthx44dRsOAlBTMnzMTbxrRs5ByHtyNAX2Tcc/SOwzmswcvPvVPxMfFGcWD+G7atBntotpi3/YN5vQ9uBtTJ+RgYk4m3jy4O8D64IrzHjz6wD3omdjVnK759XUP7l+xFImJicYxLliPZ8ychWGDUgxjk4c3D+7B3FnTMGbEkCDI3o0Zk8cjO320Ydl78OQ/HsTAgQNL7bumJKfUoA//jJXkhIeNP/nkE9CWpo6vv/4affr0MSUuX87MmTPx+OOP518H6yQnJwfr1683Kv7kyZNIDdJ/u7Tdd999Z1TflUr7MGYAACAASURBVCtXYtmyZUZlUlheXh5GjhxpXC4FbtmyBRkZGUGR7Sr02WefxdSpU11vGTtfvXo1Zs+ebUyeq6D77rsPCxcudL1l5PzIkSNKcowgqUJCDgElOSFnEr8U+vTTT5GUlISff/7Zr/QFE5kmTY78KVOm4JFHHnEug/bLhvKll14yKv/1119Hv379jMqkMJKb7t274+zZs0Zlcyhs0aJFRmVS2NatWzF06FDjcilw3bp1GD16dFBkuwplz8GECRNcbxk7f/DBBzF9+nRj8lwFLV++HLfddpvrLSPne/bsUZJjBEkVEnIIKMkJOZP4pZCSHHfYlOTAmteiJMe9XjhXSnIcJOxfJTnueOhVGCGgJCc8jKkkx92OSnKU5LjXCPcrJTnueCjJccdDr8IIASU54WFMJTnudlSSoyTHvUa4XynJccdDSY47HnoVRggoyQkPYyrJcbejkhwlOe41wv1KSY47Hkpy3PHQqzBCQElOeBhTSY67HZXkKMlxrxHuV0py3PFQkuOOh16FEQJKcsLDmEpy3O2oJEdJjnuNcL9SkuOOh5Icdzz0KowQUJITHsZUkuNuRyU5SnLca4T7lZIcdzyU5LjjoVdhhICSnPAwppIcdzsqyVGS414j3K+U5LjjoSTHHQ+9CiMElOSEhzFNb97HHY979+5tHJyS3PH4tddeM6q/7nhsw6k7HhddrcrijseHDx/WzQCLNqs+LasIKMkpq5Zz19v2XdUebx3Ow4nDe3HiSADh8F7s2rQOCXExtpxA5Tm6HM7DqGGDsWDOLJygns5907+H85DSNxn3LltsLp/De/HS0/9El47tzclkuQ/vxdH9OxEXHYX92zcGbjsHy8N5mDYxF5NyxxrWNw+rH7wXvbp3NSvXwiIPD6xcZu3+vHPnTgQzzJx1C4YPTg1KGebdMh1pI4YGRfbMKROQkzHarOzDeXjq0YeU5Lh/UvUqXBBQkhMelnS8kF/SJg2XRGUEFtqNxSUth0KuqhKYnIJ6xI3HJTc1wSU14nBJ7Dizsl3zouzy9XBJ3c64JCbHTD7RWbikSV/INdXMybR0zsQlkWMgV92MS1qPwCXtMs3oSwyqROKSyq1wCXF3xSeQc+LZIAmXXFfLvA0p+4IX8jvvvBPBDGOGD8Yl1zfEJbEGsSGuxL16DC65qalZ3B3Z1aJwSaUIs7JjsnGJeiEPj4ZAS/FLBJTk/BKTsnjn/JencX2T9pCsPMjEA5AJ+/0Pk45A0l6DVI+xZQQqz9Fl5ilIxBBIp9mQ6Sf818+RV9jvjJOQRr0hPe6ETDtuJp8p/4IMfhxSKwEy9ZgZmdR/4kFI7h5ItXaQzM2QSYfMyCYGMeMgUVkQ4l4YVsW9z7L3XQWpl2jehrRVwmJMzM0O+iuYt3kdpH5/yAyD2BDLGScgCTMhLYeZxd2SfRISNwnSZoxZ2VOPQrrfh5RU9UIe9IqnGZQ8AkpySh7zYOR4/sszKN84FpK2EZK9FZK1xf+QswMy4jlI1ba2jEDlObpMPgRpNgDSfopNxJz7pn8nHYQ0SIJ0mweZsNd/HFz1GrcLMuBBSI1YyPi8omUSL8aZsM8OuTsLj5+9DZKxAVKlDWT0GkjO9sLjuurj7ZwYRGVA2oyGEHdv8X19znL1Wgqp08m8DWmruLkYmz4mGK+Im8wNLz0NqZtsk0pfy+5LvEkHIHETIc1TzeLOvGnT6GybQBm16R5Il2VKctxqiF6EDQJKcsLDlEpyXEhdaZIcEprcXZDkuyFdbrPD4NUQkhlPjaSSnIu4KMm5iIWnuqIkJzw+1lqKkkVASU7J4h2s3JTkhADJyd0BGfWi3YvEnqQO0+xeq9SHleR4arQL3lOSoyTnwgdS+Hv69GkkJSXhxx9/DNZ3U+X+ChBQkhMeRlaSU9okZyuEw3yNkiHVoiHTj0JmnYTMfOvC8NZmzw2Y9uRcxEVJzkUsChJAXmtPTnh8rLUUJYuAkpySxTtYuSnJKWWSw7k0GeshNzSANEuBxE+CcNVU7HhI2lqbAHlquJTkXGzYleRcxMJTXVGSE6zPp8oNZwSU5ISHdZXkhALJeQ3y/66ENOwBSXkQ0m8VpEacPUl37CbPQ1ZKci427EpyLmKhJEeHq8KjaSr9UijJKX0bmNBASU4pkxySlcyNkAoN7dU1s05BZr8DaT8ZcnkFyJiXPffmKMm52LArybmIhZIcJTkmGgaVASjJCY9aoCSnlElO1lYIV1aR1NzYBJJ8F6TXMshNTeyl3Jyv42kpvpKciw27kpyLWCjJCW2S88MPP1gTo7/66qtCW5Bz586B/nbOnDljxfn+++/xn//8J/8eJ1bzOR0P8hnjf/755/j555+tNDwveHASNuV9++23OH/+PL744ov8idlM78ikXPrmKexgOsZlXq4HZVI+daIMTzq4xnfOf/rpJ0se5YbaoSQn1Czinz5Kckqb5GyxScz4PZDkZZC2aZDINEiPJfZeOZ4IDhsyJTkXG3YlORexUJIT2iRn3rx5uPTSS1GtWjUcP37c7atNcjBx4kRUrlwZf/vb33DDDTdgzJgxuPvuu3H11VfjiiuuwF//+lcr8PlNN92E/fv3Y9iwYbj22mvx3nvvYfz48Vba9evXu8keOnQoqlatinfffReLFi3CVVddhW3btllx6GyQcimT4eabb8aoUaN+oR/1ZT6XXXYZFi9e7CZ/4cKFKFeunKUjZTBe9+7d8eqrr7rFK3jBdH/+859x44034ujRowUfl+q1kpxShd9Y5vkkJ30TJGeb3eCyYfUnsEdi5PP2ZoBMH6g8R4cph+1Jue2n2itFnPumf7lRWoMekMT5kIn7/MOgoE7jd0NSHrI3A2RjXPC56zWfc+dia/diL3E5YZnDXNwMkENaXIbuKsvfc2IQlWnvjkvc/ZVTMB3LRhLHzQA5Ebbg80Cuaau4ecjKSDP2XhQmaOOaZyB1e0MmG8SGZZ980N6VuPlAiEncLdmHINE5kJbDzcqekAfpepduBlhYZSl4nySEjX+/fv3whz/8wSIwThz2prRt2xYigvnz5+PYsWPYt28fbr/9dhw5cgRvvvkmdu3aZRGMWrVq4eDBg9a9//3vf+jYsaOV7l//+pcVlzIGDBiQ39vCfEliOnfubN2bNGmSFf+VV16xsm/ZsqVFbnbs2GHle8899+Tn8/bbbzsqYtCgQahduzaio6MteZ999ln+s8mTJ1syH3jgAUvGmjVrUK9ePbd88iNfOGGvj0OG+Ev5oXQoyQkla/ivi0VyGsVARq2DZG6wV/pwtY8/YexmyNAn7YaX6QOV5+jABrJpP3vOyrg9/unmyCrql7vy1k+EdLnVHkIqKq6vz9jIcCJx9Wh7bo2v6bzFI8EZsxZSuZW9yzQnKHtL48tzYtB2DKTZMEjmbsjwtWbCmK2QzrdDaiRA0neakenolrYN0noW0kePtHrj2SMfrLDuucch1ZMgGQaxYTkydkLaZNs7e7O++2IrX+PQpiSuLQbbO3n7ms5bPBLtTouV5Pj6+b3lllusXhoOzWRmZloN/FtvvWUlf+655yxCMHBg4T4y/vvf/1o9MCQlrkeXLl0s0kSX8DxIei6//HKLbPB6zpw5lmySJB5TpkyxrtetW2ddR0ZGWj0prkNoDz74oBVnxYoVVhynF2f16tUW+frjH/+IW2+91XrGP9OmTbPib9++Pf8eidlvfvMbi3B52rOIeLDX6OzZs0hPT7d6gQr2buULK4UTJTmlAHoQsjz/zdcoX60epFFfSNP+NpkgofAn0PUCN7O7/MYL6QOU5+gQMRhyXW1IpQj7Q+3cN/3LfK6pDqkaBWkx0D8MCurUPAVSuyPkbxUh/C+94HO/r/tDGve1Jyc37GU3jn7LcrE3MSjfCNUbt0JUvwxE9RljJvRNR4OYRFx3c02zcqlfv3TUa9MZjRs1Av9JDWbo0T0RFao3CEIZMlC3ZQzk2joQ2sCELR0ZlHdTU0j5+mZl0wVFlTikpKQG4cvkm8jHHnvMsrcTO2Q3A+Q8Fg45derUCW+88QaWL19ukYK5c+dauq9atcq6vuOOO5yy/OKXc16uvPJKtGjRAiQ8zuGQnAMHDli3Xn755XxZjNewYUOQyDjzaDyRnAoVKlhzaRyZGzZssGTcdttt1q1x48bhd7/7HTZt2gTmc80111jDX19++aX13CE5TOcc7Onh0FV8fLz1X4dzn7/Eo2LFilavEIep2HvEHqjp06e7RivVcyU5pQq/sczzh6vGrIdkbYawR8DfwHkiw5+BVI20ZQQqz9GDfn1IwOIn2/NUnPumfyfuh9TvDuk6F8I5Mibkcxip//2QGjGQcbvNyKRenHuR/hqkSmt7t2T2GJnQlxg0GYnV9y41VsccQXt3bsPI4UOdS6O/Wza8ak0j4D+MwQyPProaUydPMKq7I2z9s49C6vWDsL6bsKUjgzZtlwWJGGpWNv2ydb5Te3IcAxb1e+edd1qNOOfCkKiQJPz+97+3GnpO9OX8GDbyJCPfffddvigORznX3kgO5+fw+Oabbyw5lSpVyidTzz//fL7MgiSnTZs21vwe196WtLQ0Sx/O7WHPE+f/cC4R9SZZ4/AX9eXwFA+H5Dg68B4ZKONMnTo1P2/nhD1EfEZZDh7sHSLx+eCDD5xopfqrJKdU4TeWeT7JMTUnZ0Sw5uTQQWdJzMmhg07Dc3IG+Dgnh0TF1+DrnByu3qJMrtJyAsmoc79gfpyT03QUHlppnuTwO875j8E4OL+RczSDfTz++OPW3NBg5LPmqUdtD+dBm5MzrPA5OU59YL3ypZ6w3nBOThedk+O1Lnz88ce4/vrrrfks7N0gaWDgpFs29DNmzLBkcMiG1xEREdYE4qysLOvcGYZi78dvf/tb1KxZ060nJyoqykqXl5eXr4vTM0R5JE4kPs5BubzPeTM8mjZtal3zBZowYQJiY2OtXhtOYibxcUgRe4gc3TkU9X//93/WBGoONzkkh+40mI7zjjihmHlzsrPrwZViJDOc38PJ1o5Mh/hQVigcSnJCwQqB65BPctQLuT0htjS9kHtaGVPYPV9XVzkEZ9RLkOHPQsa8YvdSZRfitZyTgpuOwoMr7gy8chWQsHXr1qCRHE4vGD16dIEczV/yn1O2A8E4XnryHzbJMekpnPXHlx2PWU84dydtnd0bS19q7Kkh4SmsDrK3U72Qe68Kr7/+OlJSUuDMgXFSkLRwFRPHV52DRIJxOcTTo0cPcA6M05NDosIeFs5l4dJx51iyZAmGDBni1gNC4pGbmwuunKJM1+Opp57C4MGDrYnLvM/0ffv2RUJCAtq3b2/NF+IkZB4c4iLJmTlzpluefPbQQw9Z6f79739bq6j69+9vTW6m7jx/+umnreXqliCXP5x306dPH494kOhxEjOXlpf2oSSntC1gJn8lOSGwhLywRqSo+z6RHPbibIN0XwRp3BsSMcT2j9U23R4OsXp0XMrvNIhKcgp9ucKS5Di9eezBJMlvOQxSuxOkxSCb9BRGiJXkFFpP9EEYIKAkJwyMCEBJjksjz/94w6on58I8nUGr7fk7XPbcZyXkt3+A9FhsL5MvSKS0J6fIFzssSQ5XLA5cDfl/V9j7M81+1+7x+8s1kA7T7blkBesJr5XkFFlX9GEZR0BJThk34AX1leSEM8m5UDbuX8ReG05AHfh3yF+ug/ReYc+pKNh4Kckp8sUOS5LDISluR9CwJ6RmvO0/rW2GvZ3CiOcgnKdTsJ4oySmynujDMEBASU4YGFF7ctw/3mHXk+NC4DjfYuxGe6NGrlRjw6XDVcV+icOS5JCwTNgHSXkY8pdrIZf+FfJ/V0PiJ9r7RXE4S0lOseuKJijjCCjJKeMGvKC+9uS4EIFwJTnswRn+NKRKpD0cx52o2bvjqeHSnpwiX+ywJDnc2qDvPfZeVIm3Q7ipJwnP9XXt+Tl8ztVXBeuLDlcVWVf0YRlHQElOGTfgBfWV5IQzyeHS8e2QXkvtBqvVCLux4v4p3DG5YKPFayU5Rb7YYUly2MvXbR7k/11lkxtesy7c3NImxUpyiqwTHh9y2Tg3zqPrhBdffBGvvfaa22Z7THTy5EkrDpdyMw4DVyo5B107OGm5zNr14KqnnTt3WnK5f47r8f7771tyuaqK6blSiluAOwfz3bhxo7WEnM93796d76zTicNfblrI5wx0MeFsJshnXAbO8rGcrseHH35o3efKMU8HNw/k3jvU3XWFGM+pB3FifsTE2Q3ak5ySuKckpyRQDn4eSnLCmORwVQzJTM32kIrN7d2iuUstd8JNWmQPVxUcilCSU+RLF5Ykh8OWJMNx4+3dubkzN+fncANBztXxNKxJEqQ9OYXXFWfzP26aR+eT3CeHuwrTASc3+OPBZd/cr4Yb4jEOwyOPPGItu+ZeNoxPtwfly5e39p2hfyvn4HJ0pmUYO3asc9v65a7BvM/dhimTjjO54R+XsvPgHjau+TJeXFwcTp06ZT2nv6rk5GTL7YSjF8tBn1XOZn+O2wfu9eN6cDk6ZT/88MOut/PPc3JyrOeM47q0naSJmyNecsklls70ZXXddddZy8ldyVC+oBI4UZJTAiCXQBZKcsKY5Dg9NZxYav037uxovdne3dp57vqrJKfIty4sSQ7tTyLDzf34y54+3uOqK90np8j6UOhDeulmQ84Kw4O9LSQjvOe4cuDOmLymA03X49ChQ9Z9+qhyek/od8px5cA9ZOifihvtcd8cbrrn2uvhbMznEJKVK1da8pz9eOgdnB7N33nnHStbum6gHiQu7PGJiYmxrrnPjXM8++yzFglp1qyZFYflYho6EHU96DGd97mHTsGDOnLnZG40xQ0Iqf8PP/xgRSPJYTru6+McjRs3tu659m45z0riV0lOSaAc/DzOf3ka5Zu2h+TQA/ZByMQD/ocpR2zHgtVjbBmBynN0ueVtSMshkM6zITNP+q+fI6+w31mn7P1ket4JmXHcTD7T/gUZ8jikdgfI9GNmZFJ/eipnI1Stnd0gcZfcwspFNwG0hVsoxM7EoMVYPPXIKuOV78jhQ0gL0q7Eu3ftBP/5DfbBnvRZM+0Nak3ntW3tc5BGgyGs74XZ0p/7tGn7yZDWYyAzT0HG7y88TDgAcUJR8fhsyhuQxPvUrYOniuD0aDzxxBP5j0lS6tatiwYNGoCuHBzXCfS+zYZ/1qxZVi/O559/jq5du1rOLbn7MYmDay8Oh4lIUuiJnC4Q6IzTtTeHOyg7hIEuFbiDcf369fN7YUgk/vSnP4HOQEmI6P28devWFunhEBl3MmaaggdJF72ns0eIpId5FOzJcUiOp54cbirIniEe9957r5WeZeFBkkPZVatWtXq7uJEh3VIMHz7cbajNilxCf5TklBDQQc7m/LmvUL5GQ0irUZDIMZA2o/0PkWn2BmJXVrZlBCrP0SU6G3JjIwjJE7vQnfumf5kPJ1vSoWa7sWbyicqANOoNubqq7QnalM7EtvVIyJWVIC2HQoi9CdnEoEIEeiR2xdwFCzF3we2GwkKMGDUaTZo2MyyX+i3E4CHDwG/wokWLghoGDBiAyLZRQSlDav8+kOsbQWgDE7Z0ZFBelUj89uYW+H1cDn4flWYmxIzF7+p2R0qqOuj8xWfaITlOTw4jcJiKZKNWrVqgx2/HjUOrVq2s3YZ79erlRma4MzHJDglJnTp1LFJDOampqZZ7B/aikFTQHxaHvJz5MQ7JIUGqV6+eRSbo5sE5uLsxh4Y4hFW9enVLvuPiYc+ePbjssstA9wwFD+pJJ51HjhyB4zXdV5LDeUL0e9WkSRPQfYMzbOXkQ/cOLCeHqTgsxt4pkkESvtI6lOSUFvJm8z3/1RcoX681pNcKSL977VUWXGnhT6Ajyu4LIRUa2ekDlefoMOhRuyekxWBI6j/8082RVdTvwEftnpG2aZDUh83kM+ABe0O1is3sSZ1F5V+cZ/1WQXovh1RoYG/g1v8+M/oSgya9ITUTIb0etnwT0T9RwKH7fZBWYyE3toT0eChwea46Jd0PqTsCfZN7Yu/evUENK5csgNwYDelpEBuWpedDkHr9IXU6QVjfi1MXvMWlTWv1wpzJWXj32EG8e+ywoXAIzz3xD6tDwOxXyXdp5BDOKAxThYwXcme4il1/zuEQHyrMYahhw4ZZBKTgxGFO3iUpcA4yd/aaUCZ7bkgGSE44nEMP486wzpw5c6wkzpwcDnvxINn5y1/+ghMnTljXJBach8NhMhIvki72sNCvFnWhXynOweHEY+fYvn275aCzefPm1hCTM1x11113OVGs32XLllm6Pvnkk273qftvfvMba5iK5IXDXpUrV7b0oJ50WeH0PjEh5+twfg7dT5TWoSSntJA3m681J6dJPGTsDnsiIedu+Bu418aYl22iQBmcmOivLNd0049DWgyEdJwJmXrUjExX+c75tGOQRr3sSbkcenPuB/LLoSI2Mpz8yx2HA5HlmpYrYDixuGpbe4hwwl4zsokB//PnZnDE3TXPQM6t3ZZXQOp1NW9D2iphIXKzMs2+HB6kbX/tRUj9vpBpBrEhrtOOQhKmQiIGm8Xdkn0M0iIL99+92EOJArvF9omjHqV1hCzJcZxvcg4KuxjZg8MJwPTp5JAanrNhp6NKxmGgB9i1a9da91q0aAH2nlSpUsWaGExSQp9P7IXhsJJz0LeV482bJMiZk+P4ymIvDfOhbyrO5+nQoYNFILhiigcnO/O54z2XvTSc8EwiRJ1IkiifBMdxFupMPOZ9R3emu//++y1ZnDTt3Kd8lp2ORF0PrrBivuwe/fTTT61zDpM5fqvYi8XnXKFWGoeSnNJA3XyeOvH4VzDx2HVisbdzztvhEBuHOkw6iiQp41J29lRwXok3PYrznAQvbi7GpgffC/mGl56G1E2250QVR0dvcUmG4yZCuPrNJO7MlzZtlo4VSxYY/4BwdENJjgdYSUI4lLRgwQLceuutlhNMhyA40dk7wjiciMw4DGz4eWzbtg3z58+37pE8OBN0OezE+TAFD8paunQp2AtE5km5nOfiHH//+9+tFU+UwyXcnDPjLEtnbw6fP/DAA050cAk47zl6kSi5rnLiZGAOO5HMOXEOHDhgeRx3LTefbdiwAZz8zCXirgd1YXk4wZnDUvfcc4+1hNyZbM2l7uwp4qTr0jiU5JQG6ubzVJKjJMeNcCjJKfIlU5LjDo+SHHc89CqMEFCSEx7GVJKjJEdJju/vspIcd6yU5LjjoVdhhICSnPAwppIcJTlKcnx/l5XkuGOlJMcdD70KIwSU5ISHMZXkKMlRkuP7u6wkxx0rJTnueOhVGCGgJCc8jKkkR0mOkhzf32UlOe5YKclxx0OvwggBJTnhYUwlOUpylOT4/i4ryXHHSkmOOx56FUYIKMkJD2MqyVGSoyTH93dZSY47Vkpy3PHQqzBCQElOeBhTSY6SHCU5vr/LSnLcsVKS446HXoURAkpywsOYloNO7nictQvCTdW4aZu/gZu8pa2FVI+2ZQQqz9Fj5luQiEGQjrPs3WCd+6Z/Z7wJaZQM6XEHhI41Tcjnxm6DVkNqtYdMed2MTOrF3aVzdkKqRUEyN0Am0uliALZz0hKDmBzbzxZxd+4H+suy0/1AvW7mbUhbJSzCuOyxQX8pd65fA6nfDzLDIDbElg5hE6bbjmhN4m7JfhMSkY0HViwxjg/dGOlmgMZhVYGhgICSnFCwQuA6nP/6LMrXbQlJvANC79s9lvgfei2zPYXfUN+WEag8Rxf6aaoRB2naH9L3Xv/1c+QV9kvZVdpAWg2H9FlhJp/kuyFxEyA3Nob0NiST+vdcCum+CFK+LqTrXHs34cLKVZz7xKBBd0jdrhDiXpy0RcVl2dumQyq1MG9D2qrxMPRI7AY6NQ5mWHTbLMjNUZC+BrEhbsS9cV9IzXizuDuyayQiK22EcWyWL19u+YsM/Evkn4SQdevgX3E0VSghoCQnlKzhvy6WF/KajSFtM22fRfTy7W+IyYW0HmF73KYM+kDyV5ZruvaTIXRwyd6Q+ElmZLrKd84p+4YGdm8DiYlzP5Df2HGQZgMg19SAxI43I5P6ENuoTMhVVWwXDOx9CURPJy0xqBplkz3i7twP9Jdlp1+w6+uYtyFtVaMr2rWNBBvdYIbM0cNtT+HxBrEhtsS9RjykYnOISdwd2RXbok/PROPYjB8/XkmO/59fTRnKCCjJCWXr+K6bNVzVtD0kZy9k8kEIfej4G+goMWM9pEaMLSNQeY4et7xtd+N3ng2ZedJ//Rx5hf3OOgVp3Mfu0eKwTWHxinN/2huQIU/YXtTp8LI4aYuKy2GwcXm2M1T6J5py2IxsYkBixsaRuBelQ3Gesez0lF4/0bwNaauOSzAxN9v3iu9nzLzN6yANBkBmGcSGOM46aTugbTXMLO6W7FOQlrl4+N5lfpa68GR00aTDVYXjo0/KMAJKcsqw8VxU14nHOvFYJx67vBBeTnXisTtAOvHYHQ+9CiMElOSEhzGV5CjJUZLj+7usJMcdKyU57njoVRghoCQnPIypJEdJjpIc399lJTnuWCnJccdDr8IIASU54WFMJTlKcpTk+P4uK8lxx0pJjjseehVGCCjJCQ9jKslRkqMkx/d3WUmOO1ZKctzx0KswQkBJTngYU0mOkhwlOb6/y0py3LFSkuOOh16FEQJKcsLDmEpylOQoyfH9XVaS446Vkhx3PPQqjBBQkhMexlSSoyRHSY7v77KSHHeslOS446FXYYSAkpzwMKaSHCU5SnJ8f5eV5LhjpSTHHQ+9CiMElOSEhzHzSU76ZkjOdkj2Nv9D7i7IyBdstwCUE6g8RxfupNwsBZIwFTLpkP/6OfIK+518GNKgByRxvu3wsrB4xbk/fg8k5SHb9xadahYnbVFxc3ZAMjdBqkRCxrwCyd1pRjYxaJcJiRwDIe5F6VCcZyx78jJInc7mbUjnpPHzyd0JXAAAIABJREFUkJWRFvSXctPLz0Lq9oZMNogNceQO1nTt0GKgWdwt2YchzTKw8s7bjeOzd+9e3fHYOKoqMCQQUJITEmYIWAmL5DSKhoxYA0lfZ3sRpydxfwJdOgx+DFK5tZ0+UHmODuN2QZr0sd0NsHF37pv+JVGo1xXS6RZI9lYz+YzdCOmz8qL7BVM6p78KGbUGcnNLyLCnIRmvmdGXGLQZBWk5DELcTelL1xPdb4fUSoCYtiFtFT0LY0YOx7lz54Ia1jz1KKR2EoSE3hQ2lJO7AxKdA2nazyzuluydkCYjsWTBrcax2bx5s5KcgL/CKiAkEVCSE5JmKbZS57/5GuWr1YM06mN/YJv0g/gb6CW8QRLk8gq2DH6w/ZXlmq7FYMh1tSGVIiDNB5mR6SrfOW8xCHJ1NUjVtpDmqWbyoXPO2h0hf6toTib1Jbb0s3X5DZCGPW0P7U45AvklBvSYfkNDCHEPRJZrWuJZIxZyVWXzNqTsipFo0qghJk6cGNTQp0ci5KoaZrEhTsSdzjnpwNQk7o7s6xohPibKODYpKSnqoLPYX11NUCYQUJJTJszkVcn84aq0TfbQRNZWiL8hZydkxPM2SaAMdpX7K8s1HYdQSBbaT4FMPGhGpqt855xDYSRp3eZDOLzi3A/kd9xuyAAOV8VCxu81I5P6ZG+HZGy0vYWPftnuHQlETyctMYjKsD2bE3fnfqC/LHsvDld1Mm9D2ipuHsamj/Fa3wONsHHNM5C6yZBJBrEhtpMOQuIm2kTYJO6W7EOQZulBGa7Ky8vTnpxAK5WmD00ElOSEpl2Kq5WSHBdSl09y5inJaTMaYrKxtUjO0iCSnLlKcgojoqzXJDlLFhT38+A1vpIcrxBphLKKgJKcsmo5d70vkpyN9jwUzp3wN3CuxYjnLvTkbAlcnqMHJ2Xm9+Qc8F8/R15hv/xv2urJIclhr0sAWDhpOa9lwIMXenLyzMikbPaSZWy40JOzxp7k7eQZyC8xyO/JOWRO3/F5kF4OyTFsQ9oqrmRIjq6ucv9+6Ooqdzz0KowQUJITHsZUkuNCZJTk2MMmSnIKfbmV5LhDoyTHHQ+9CiMElOSEhzGV5CjJceux0p6cIl9sJTnu8CjJccdDr8IIASU54WFMJTlKcpTk+P4uK8lxx0pJjjseehVGCCjJCQ9jKslRkqMkx/d3WUmOO1ZKctzx0KswQkBJTngYU0mOkhwlOb6/y0py3LFSkuOOh16FEQJKcsLDmEpylOQoyfH9XVaS446Vkhx3PPQqjBBQkhMexlSSoyRHSY7v77KSHHeslOS446FXYYSAkpzwMKaSHCU5SnJ8f5eV5LhjpSTHHQ+9CiMElOSEhzHPf3ka5Zu2h+TkQSYdsL1v06uzP4E75Ka/BqkeY6cPVJ6jwy2nIC2HQDrcApn2FmTcvuCE6ScgjXpDkpZAph4zkwe9VQ98zHZMOeWoGZks//gDkOzdtsf3jE2QCQfNyCYG0bmQtmMhM06akUl9WfY+90LqdTNvQ9qq/R2YkJsd9Jdyz6a1kAb9IbNO+feOOHW64O+sE5AOM23HqKzvBZ8Hcj3rJCQiFw/ds8w4PkePHlW3DsZRVYEhgYCSnJAwQ8BKnD/3FcrXaAiJGA5pPRLSeoT/ga4AmqVArrz5gowA5Tm6tMuEVGiIP9aKwaVxY3Fpu9HBCXFZ+N0NdfHHeh1xaWymmTxi0vGnZsn47TVVcWlshhmZLH/0GPy57Uj89qpK+HObIda1EVzisvD7qq3x+yoRuDQ+y5y+sRn4Y8Nu+N31Nc3bMDYTf6zZAa1aRmD+/PlBDcMGDYBcWw8Slen/e+LUa9dfbsBYNQpSoRGE9d31WaDn1LVCSyR27mAcm7S0NHXQGfBXWAWEJAJKckLSLMVW6vxXX6B8/daQ3qsgAx6A9A8gpDwM6bHE9mJNOYHKc3QZ8gSkagJWr1iEj06+gY9OHQ1OOPkGhqT2xyOrVhjNZ+PLz6N7105GZRKDd48fRof4WBw/uMccHiffwOzpkzFj8niz+p58A8/+8xH07dXDrFzWhZNvYPXDq9CrVzIOHz4c1HDvskWQqvEQ1kmnfpr4HfKY7X28bhfIUNOyH4fU6YMp47OMY/OPf/xDe3KK/dXVBGUCASU5ZcJMXpW05uQ0iYNkboeM3w2hryV/A30I0SN2tXa2jEDlOXpMOwZpMAAbX3raa3kCjZCdnY1XX301UDFu6d966y2kpKS43TN1wffw/PnzpsRZclasWIGlS5calUlhu3fvxogRI4zLpcBNmzYhPT09KLJdhW579UVIvb4Q1kmnfpr4nfYGpP1USMRgyHTTso9CWmThvrvvcC2KkfNDhw4pyTGCpAoJOQSU5IScSfxSqFQmHtORJwnRuN0QOm5kyKY3cJdJwK7n9KJcry/WPvOYX2UsTqKMjAy89NJLxUniNe7rr7+Ofv36eY1X3AjfffcdunfvjrNnzxY3aZHxSXAWLVpUZBx/Hm7duhVDhw71J6nXNOvWrcPo0aO9xgs0gk48dkdQJx6746FXYYSAkpzwMGaJkxwSnEGrIY2SIS0GQRr3hnSbD+F9V2Ljeq4kx2NlU5JzERYlOYX8g8D3iP7ImqVjxZIFFwEzdKYkxxCQKib0EFCSE3o28UejEic52dsgfVZCku+CjHkZ0ncl5K/lIZ1n2ytKXMmNc64kx6NpleRchEVJjpIc1gbhn9OnTyMpKQk//vjjxRqiZ4pAMRFQklNMwEI0eomTHBKX3J2QsZshmZsgPZdCbmgA6b3cHrZyiI3rr5Icj7VHSc5FWJTkKMlhbVCSc/Gd0LMAEVCSEyCAIZK8xElOznZI+qv2EtzmAyGVIyFN+tr3ChuyUpLjsbYoybkIi5IcJTmsDUpyLr4TehYgAkpyAgQwRJKXOMlxenJIdtijk7kRUi0K0iDJnpfD4SzXXhyeK8nxWFuU5FyERUmOkhzWBiU5F98JPQsQASU5AQIYIslLheQMedwmONwhefIhezdg7pJMgqMkx+eaoSTnIlRKcpTksDYoybn4TuhZgAgoyQkQwBBJXuIkhz04kWPs1VX85VBVzQubq3G/kYK9ONqTU2hNUZJzERolOUpyWBuU5Fx8J/QsQASU5AQIYIgkL3GSY+2HsxnC3ZG5Uyx/eY975mRtVpJTjHqhJOciWEpylOSwNijJufhO6FmACCjJCRDAEEluOehsEg/J2g2ZuM/epI8b9fkTuB9H2jpI9Wg7fWHy6GzQGqricNVhe+l4UfnNOAFpkIotrzwfdNRyc3OxYcMGo/m8/fbbQdsVtlevXvjhhx+M6nvvPffgrrvuMiqTwvbt24dRo0YZl0uB27ZtRWZmZlBkuwrdteFlSP1+ENbJoupscZ/NOA5JmA5pORQy07TstyAROXhwxZ2uRTFyzo0uBw4caESWP0Iee+wxTJo0KT+pkpx8KPQkUASU5ASKYGikP//1WZSvEwHpsgCStAjSfaH/IWkxpONMSPl6toxA5Tm69F4BqRSFZbdNw77tG7Bv+8YghQ3o3aM7liy4zWg+jz9yPxLiYozKJAa7N7+KdpGtsXntCwbx2IBxY9ORlTYK+7aZxHoDVt29BN06dzCOA+vEXYsXoHPnzmCPTjDD7bOnQ8q3hnRZBomfay50WQqp3QNSORrSNQiyK3ZC5qihxrHh7tipqaml9jFTklNq0Id/xkpywsPG5899ifI1m0CiciCx4yAxAYS4CRB6Ir+6mi0nUHmOLh2mQyo1h9RIgMROsXWlvqZD3FRI+YaQuomQ2Elm5EdPgDRJhVxTAxJjSKZV7lxIZBbkqiqQ1mmQduPM6EsMqrazl/bHTzUjk/qy7A2SIdfVNW9D2qp6N8S0i8KqVauCGoYNG4aOHRLw8AP3GQ9DBw9C1y6djculrqkD+iMxMdE4NuxFUZITHm2BlqIAAkpyCgBSRi+t4aqm7SE5eyGTD0ImHfA/TDkCyVgPqRFjywhUnqPLLW9DWg6BdJoNmXESMvFAcMLMU7abiZ53QqYfN5PH1H9BBj9uryCjU0dTunNZfe4e2xnq2C0Xhv0M4EIMSE7bZUFmvW1OX5a9332Q+onmbUhbdViCibnZQX8LX3zxRcycOSMo+Tz55BOYN3duUGQ//PDDWLx4sXHZx44d0+Eq46iqwJBAQElOSJghYCVKfOKxp9VT3u5xmXmzAZD2U+xG11t8f59zThH36+k2z55v4a8c13RcMTbgQUiN2MJ3dHaN7+s5l9pnbIBUaQMZvQbCVWu+pi0qHjGIyrB75Ih7UXGL84xOWHsthdTp5KMNN9vbDJDocj+lovLi/Je4uRibPibg98GbAA6PTJgwwVs0v54/+OCDmD59ul9pvSVavnw5brvtNm/Riv1cfVcVGzJNUFYQUJJTVixVtJ5KclxWpSjJsZ05hgLJITkc/rTt02zok573T3KIj5Kcol9yAEpyvEKkERQBdwSU5LjjUVavlOQoyXHrJQmFnhz23HCVXu0OkN/9wXYBQtJjbT/gYi8lOT5/dpTk+AyVRlQEbASU5IRHTVCS49Joak9O6ffkcBiOeyY16m0PmZHocDK7kpyAPjhKcgKCTxP/GhFQkhMeVleSoyQnZHpy2FMzYZ89J6hGPGTcHrs3hztjj9+jPTkBfHKU5AQAnib9dSKgJCc87K4kR0lOaJCcrZDc3ZCut0GurwNJfcQmNVWjIBFDIGM3FT4vR+fkeP0YKcnxCpFGUATcEVCS445HWb1SkqMkJyRIDntxsrdDYsdDanWwiQ1X1P2tIqRCQ0jHGRdcf7jYS+fk+PzZUZLjM1QaURGwEVCSEx41QUmOS6Opc3JKf05O7i57aIqTjzlEVbkNpOUwyIQ8Ha4K4JOjJCcA8DTprxMBJTnhYXclOUpyQqInx+mVcX6tnp1tkOS7IKkPQ3K2Fb5Xjg5Xef0YKcnxCpFGUATcEVCS445HWb3KJznpm+0N5bi6xd/A/8JHvgDhPArK4AZ1/spyTcedlJunQBKmQrjTr+szk+d0FtqwByRxge001IRs9kbQ03qNOHtSrQmZlJGzA5K5CVIlEjLmFXvDPBOyiUG7TAgn+xJ3EzIpgxOKSVjqdi6eDenMlRsJFqUH48TPR1ZGWtBfwyeeeAITJ04MSj7clXjGjODsprxy5UrMmzfPuN579+7VHY+No6oCQwIBJTkhYYaAlTj/5eco37AdZNgLkDEv27vncgddfwL3Nhn0KKRyKzt9oPIcHdjANU6GROdA6MLAuW/6N2srpG4Xe/5H5kYz+WS8Ckm+2yZ+mRvMyGS5SWxGPA+5OQIy5AlI2lozsolB6xH2nBjibgpjlj1xPqRmvHkb0lbtpmPU8KE4e/ZsUMN999+PieOygW+/Br47Zy58+zUeWrUSM6ZMDIrsFUsXY+7smWZlf3sOeTs2K8kJ+CusAkISASU5IWmWYit1/puvUb5afUjjfrbrhKYDIP6GZqmQhj0hV9xoy+DEUX9luaZrOdRecXNzS7vxdX1m8pyreK6pDqkWBWkxyIzuzVNtVwacQGtKJsvcLAXSpB/k8gqQRsn2tQksiMFNTSAVGkGIuwmZlMGy14yzHYoyD1NyHdmVotC0SWNMmTIlqCG5R3f8rVI91OqWhlpdRpgL3cbg+gZtcVW1RqiVaF72tXVb4+oaTc3K7jYKlSK6IUW9kBf7u6sJygACSnLKgJF8UNEeroqDZGyB5O6wh5g4zORP4L4mo160SQLTByrP0YFOLkkWEqZBJh/xTzdHVlG/U16/OFzFSchFxfX1GeeLcDk0G3g65/Q1nbd4HBocuxlSNdLuxeEGet7S+PKcGLQbC4lMgxB3X9L4Eodl7323PVxl2oa0Vfx8ZGem+1DjA4uyZe1zkNrJkHFHIOlbzYVxByHREyFNUyHjTcs+DGmbDWkxzKzs7DxIh2VISR0YGKgBpKYvMXpCdw7hyenTp5GUlIQff/zRua+/ikCxEVCSU2zIQjJB/pyctI2Fr15xJoN6++U8kRHPQaq2tSeJFrYNvzc5BZ+rg85fTrrlUFJYO+h0mRBesD4UvC7BiccbXnoaUjfZnldUUI9ArumING6iTeZNOkalTiSB0dn2KjWTsjnfrIuSnJD8sKtSgSOgJCdwDENBgpIcl8ZUl5CX/hJyf4iCkpxfkmBXHJXkhMKnVnUoawgoySlrFvOsr5IcJTkhuYTctZH2dq4kR0nOhc+bDld5/s7rXT8QUJLjB2ghmERJjpIcJTm+v5g6XOXyvuhwle8VR2OWPQSU5JQ9m3nSWEmOy0dbh6t0uMrTS+JyT0mOy/uiJMelZuhp2CGgJCc8TKokx+WjrSRHSY6X11pJjsv7oiTHS23Rx2UaASU5Zdp8+coryXH5aCvJUZKT/2Z4PlGS4/K+KMnxXEn0bnggoCQnPOyoJMflo60kR0mOl9daSY7L+6Ikx0tt0cdlGgElOWXafPnKK8lx+WgryVGSk/9meD5RkuPyvijJ8VxJ9G54IKAkJzzsqCTH5aOtJEdJjpfXWkmOy/uiJMdLbdHHZRoBJTll2nz5yp8/expX1Y+GZO6CjNsHyd3rfxh/EDJqLeTmSFtGoPIcXaafgDRJgbSfAZn6pv/6OfIK+532FqReEqTbIsjkN8zkM/EwJGU1pGoMZNK/zMik/uP2Q7J2Qiq1hnC36vEHzMgmBm2zIK3TIMS9MKyKe59lT14JqdnJvA1pq9iFyBkbfLcOO9evgdTqDZlmEBtiOe1NSOxUSNOBZnG3ZL8FaTcOEjHCrOxJr0O63IO+/frnf09K+kTdOpQ04r+i/JTkhIex6aCzZpPWKBc1AuViRqFczEj/Q+xolIsciHIV61yQEaA8R5f2mShXIwLlGrRHufgM//Vz5BX2G5+JclWbolyTLigXl24mn9gxKBfRB+Vuro9ycWlmZFr6j0K5dsNRrmJtlGs7BOWIfWHlKs59YlC3HcrVbotyxL04aYuKy7I3S0K5Ko3M25C2qt8F0e2iMGfOnKCG4YNTUa5Kc5QjTkWVt7jPWK/rx6NczZZmcace1LVeDMrVamNWNm3aOAkjR44qtY+hkpxSgz78M1aSEx42/hnAF2c+w5kPTgUe3qeMt3Hm0/8ELstVn/dP4sx/PsSZj9/HGZ67PjN5TtmffIQzH71nLh9i8uE7OPPpx+ZkupbZwvptnLGwN2FDYv2BHUxiTVkfvYsznwQBB8r++D188MEHOH78eFDDqbf/bdcRk9jQnlYZ3rfreVBk06Yfmq2D1POjd3Hu3LlS+xgqySk16MM/YyU54W9jLaEioAgoAqGMgJKcULZOGddNSU4ZN6CqrwgoAopAGUdASU4ZN2Aoq1/aJOftt9/Grl27kJeXh//973+hDJXqpggoAoqAIhAEBJTkBAFUFWkjUJok5/Dhw5g1axaWLFmCcePGoWPHjjh48KCaRhFQBBQBReBXhICSnF+RsUu6qKVJcr788kv8+OOP+UVu3LgxRowYkX+tJ4qAIqAIKALhj4CSnPC3camVsDRJjmuhv/vuO7Ro0QIrV650va3nioAioAgoAmGOgJKcMDdwaRYvFEjODz/8gNGjR2PQoEE6L6c0K4PmrQgoAopAKSCgJKcUQP+1ZFnaJOfMmTMWuRk1ahS+/fbbXwvsWk5FQBFQBBSBCwgoydGqEDQESpPkbN++HU2aNMGAAQNw8uRJ/Pvf/7Y2Avv555/x4YcfYujQoXj99deDVnYVrAgoAoqAIlD6CCjJKX0bhK0GpUlyHn30UYwZMwYLFizAbbfdhtmzZ+Pvf/87fvrpJ3z88ccYPHiwkpywrXlaMEVAEVAEbAQ8kpzPPvsMvXr1UowUgYAQ6Nu3Lz7//POAZGhiRUARUAQUAUXAXwSef/55TJw4MT+58Ozs2bOIiYnBiy++gDVrXsLLa9ZoUAx8rgOsMwytWrXC/fffjxdffFGDYqB1QOuA1gGtAyVeB7hP2rRp09xJztdff42IiFa4Ze4i3Hb7EsyZv1iDYuB7HViwGHNvvxP16jfE4sWL8fDDD2tQDLQOaB3QOqB1oMTrAFfX/oLkfH7mDDp36YZ3Pv4SH33+X3zw2TkNioHPdeDDM9/g4y/Oo1tiD3z91Vf5DFpPFAFFQBFQBBSBkkSAIwm/GK764vPP0aFjZxx58z0c//fHOHrqQw2Kgc914NjbH+HNdz5Bx05d8cH775dkfTaeFycqMxR1cMUWd1fmr6eD9wt75im+c8/fdE76UP4NpbLRvo59QkkvT/Zz1dXTc73njgDt6e39dU9R9JVpeczNpH5Fa28/LYn8XOspv40lkWdhZfc48VhJjpK6QIitPySHH4+XXnrJ6sp88MEHwfDKK6+AuxWX5pGbm4vMzMwiVeBS9LZt2+LIkSMe43GF16JFizw+K+rm8uXLccsttxQVpcw+u/fee0FsS/vgB3jYsGHgh5AHd8XOysoqbbU85n/69Glr64OdO3d6fK43f4nAq6++itTUVGMbgf7zn/+0Vm3+Mif/7nBri4EDB+L48eOFCtiwYQM82ZzfzBdeeMH6VvJ76cuWGIyTnJyM//znP4XmV9gD6rBv377CHrvd79+/P4g9D65knTdvntvzkrxQkqM9ND730PhKfPwhOfQSXrlyZcycOdN6cfny8qX6/vvvC30fHn/8cWt5eKERivngm2++ATcOfOONN/JTnjp1CvRmXtRx7tw50CHof//7X4/RJkyY4FeDzqXvI0eO9CizrN8k8QuFFZzcETs2NhYklDxIKpOSkkIS3q+++gpxcXH5jUdIKhliSvEfp9atW4Pvtolj1apV6NSpkwlRlgySmzZt2nh0Hnz06FGLINSoUQPdunVzy/Pdd9+17k2dOjX/e8n9wLwdJDn04/fee+95i/qL53RynJKS8ov7nm7QjQ6/zzzefPNNa48yT/FK4p6SHCU5IUFySBQiIiI8/jfC/zpuv/12a/LYnDlz8Mknn2Dr1q3W6i0SI77oGzdutD5k/K9nypQpVkhLSwMddXo6+F8GexKYdunSpXj//fcxefJklCtXDlz6fvfdd1vy1q1bZ+2vw92T2aPDeM7B/+rmz58P/od911135ZOhL774AiQ2jmzKmz59upWMunO/Hj7jPj48dxyJcsI/4/EZvafzP6DCehW42SFXDTAuva1/8MEHlnx+zO+44w5LDvcGeuuttxx1839ZJvZYPPLII/l6OP9JUgeOYc+YMcMaxybpZHl4bNmyxcKKE8mZ7zvvvIOPPvoI99xzj3VNgshnnrqmSWLZm8V0/K9uyJAh1m7UjlIktU55Fi5cmJ8n7UddOHGQdYB1gXgdOnTIKjfl8T91p5yMz7j8sDmEmXmQhNJBK+PT7mvXrrWGqCiLjRZ7lnjMnTvXsj/PP/30Uzz99NNWGtqBDZzTs8hlqby+8847LWJE3FwPlpfPJ02aZOVHfZy0zzzzjIUj71EfklkHY1cZPM/Ly7P0ZplYJ6KiorBp0yYrGvMklszDkcO6yIO/JJJMx2esd64HewEOHjyIsWPHWs9Xr16dvys4sXXqL9+lEydOWEnZMPJdYb2hXPaA8b0jlswjOzsbe/futeJyh/H9+/db7wefUR7rCw82xqyjbAT5jO8V7cOD/9SwR9SpKzk5OTh27Jj17Pz58/l1jXqxwWY5XA/WPZZl/PjxVv3lb0JCQn5PDv9h4XvOfDlP48CBA1Zy2ovvPMvF4ORJmy1btsyKz28PJ7GyJ8Q5+B1x6i3rDrdf8XRQHsvi4EQCw4P1lsTVKb9rWtrhtddes/TinmOuZeX74+s/QC+//LKVN+sJvwkkVXxvedAWzjeHuHjSw9GJ5eY7zoPfAqZz/rHjP4PE03kPWE/57vDgL98XHvyngt8I1hViQRm+kDMrsZ9/lOQoyQkJksOPYt26da2GnS8ig/MB4svDLl1+iPhR4AeC52z82BvADzpfNv6S/LDh4svUoUMH62Uq+G7wo0xCxa5XpuFHgN3G/Ajzvxw2uNxGgR9M5s2XmzLj4+OtF5Py+DK3b9/e6ipmw9uyZUvs3r3biscPEnWjbJKRBg0aWKSL6ag7Gw3KZiPQqFEj7Nmzx1KRpIaNDtOxceN/QyRCBQ+Wkc/YGFAOPxqdO3e2GimSF/ZM8L9+Eh+HvLjKIIm49NJLreFB5rVixQrrw8c9jdgYkgTxg0qMu3btmq/7Aw88gN///vdYs2aNpSMbJH6IWSbqwXJUqlTJKpdrfjzPyMiwPpDMjx9SfgRJTniQLPKajSjlsLFw/mNkw8Bz6kLcGIcNDzFwtRFtQ51JFn77299aONIuJM+7du1CZGSkNfzJ/Klz8+bN8z/ChZEcNkwOxsSFdeOpp56ydOZHumLFilZZSYCpt3NQj/T0dKvxo97Uif+Jk3TwIPmqVq2ahQP1IVkg8XJtxBiP+VNPNiiMR4JRoUIFqzzMj0MCw4cPt4gfn7PudO/e3aqDJE4k1yS9/K+f/027HtSLskkIKIuEh3WatmTdYp68T8LLRphYsiG79tprLfuwzNwe4vrrr7fIF/Nn/WCvCeUwkPAwH8ph+dgw82A9ufLKK616x3QPPfSQ9f5QJt9j1n3ajenYs+b0+D355JPWO0giweDUO9dykRzx/WM9IaEhBtHR0Ra21J/vxvr16y3Z/K1fv761OSjrIHsqnHfAITkkBqyn1JP58Z13evqIDbfJYCNNXWkf6lqw14h68HvD7w7jkRhRD+rIf5oKIzlOudjL2KNHj/z6QYwoj8Tx1v/f3l2A+1EdfwOHtn+kJUggeHF3CVpci0Np0UJxLUWKFGiBIsW1eIDi7m5pILgTgrsHCQleqvM+n7N3bja/3oSbkhtC3j3P87t7d4/NmT278905c2YOOaS8K80t/GtNgKS+0M4JqudpvvnmK2XNC3lJl3u+yCKLRP/+/VubKefeg0Ce5KNAO55ByTM2yyyzFD459zwD85I6gKCwlykqAAAgAElEQVQElJuj3uN4ag6Zb2jrqtSAnAbkjBYgx4MrDIOvRMLML7Uwffr0KULK15uXUSbCOgVlXvPS8MVLs0Lwezm0JiEdCKHW5CXhgQNMMtGSAFiSl8Dyyy9fXsSErJcpMOWriJD1cvBCIwzRn4lQ85WUyUvO16EX8nTTTVe+crwsjB/wyWT7PXDQmnxp6sOLRjsEmna8tAhlLy71gJ+OYnbRPghYmgmfjRtdkpe2vn3ZegEDX5J70/pF6bqXJDrcD4L/6quvLuXzD40Ievv27ZuXSvm8d46EB4CmHS/vOeecswhrgghAwT8vzQQCBAkNkvK+LhdccMEyVvfQ//UvUvl5D5MAfZgHEiDXkSZHnntOeAGCs846aztQMRfzxZ1t5tF4CU/aH/OQkPJiz/ES3PWvcGWMsfVe0VylQNW2ZwRYAqaBcn3U5xkhPvfcc5drgIJx0WQAH60JH9FhrugHyJHwc/bZZy9aKP+bo4ArwGJ+AQyOEiDgvuaXOCDl+SBQJcAQ37QDkAEE+kUbgJXjVd/8zbkPFNKCqQcAup/ut7FutNFGBdjhKSBVT55F8zXvpTzzxzX9XnDBBeUeJk3aN8+8X3wMACgEsnkFSANoiy66aAF62Y82EnR5h7hvOQ89lwQ9QFhPBLn7kv16ttw7Wmc8+jqQ4zmsgxz8cY/cWzwBGABIz2ZqC7N/HwiAWib3CBAFMAB29CZd+AF8+8jrKBk3bajEBkg7+Y72Qer9lUCrDnIAXO9Raa655iofV+WkTbPjAxGA7arUgJwG5IwWIMeXG0Gb2pvWCe/h9SL2UHo5S75ixKbK5EFhAEyFDnB4wDsCOV5Om2yySVYrR19YhBOtS6rcZQAoKSDRABxcdtllhQYvN4kGCMgBMLy0vJRTaMj3csgXjbZ8fRMEgBJQQHgTYL6i0J7JC74uDPO6rzZCQn/a8fOSzhecsbArMnYCnhaqnoAcL8RMgJmXLmBAraxtSyLa33DDDduFM5BDWFk2kPQHANE2oUEdL9/8gsv2aZW0SQOUiSYktTXqE8jumXYIz/w6Vl5/7okXJwGhDOFiqc//lhEIW0LJS9b/df67h602De6Dr1pprbXWaheMtEg5N9Qj1Gl+tOfLVb5EoBEyHSXjJRx9taLPz/1J4eeFnwBLfWMyb1PoZ5uEIxCSyX1CA5BgrtJ8+oLOxIZtnnnmaQch7ju6aQtbaU2w6Avah4N5D2R4hggi/9dpd6/NKfM8tYPZtnkiySewATB5aCFI3VeA0POdIAd/UkCqB0jpD1AzRtod9TzrzgnlTAS7595zVbfZM+/No9SYKQ8suYfSNddcE+xb8Elf5hmh79nL5JzGAmhwP4A2wCaTe5fA0zPNaa5ls2wP4EBHPVmuAXLcqzpPzVfz/OtAjnngOczkvpovrmcClM2H+ljkebZyicm5DxnvGc+JjxP88FFXp6u1jewDSM9NGDSAnul8t3j23e/0cN8KcjxLEmDUq1evbLLQ4d0DjHZVGuNAzqvvfBRvffjZUD/b4F94/b2hrinz+nsftwv4F994v5wXn0AffhZvvv9puMaI9o33PonXBwwuZZ9+6a3atY/L/wxyXX9eH/zpfPhZvPzWwPa26wa7yskbisYPKlpeevOD9j46Gscrbw8s/dTbGx3//yaGx5Z5CFo/D44Xoa8GalcPgqUFX9YSo0ICzUvay0kZL0RfSP73ZUEF3ZoAKS9ZX7D6AZa81L0wfSl6KQAbXuy+2OuAwEsbiLGunapawsfXSAocWgcvQm37qvQC9zUjAQl+xuLLadJJJ21/iRKgxqeeMXsBpYq/PgagygvHC1w7vry8sHzt+t+Xu+sAknXv1peuL0NgkRDWF5U+IeSFhW9eoHiIv16c8iUvJ0LEy1kiBPAGjfojXKaaaqoOv8rYYAAm+vPS0W7yFe/14cWpHSAJAPSyBWTcX9fdG3whVNWXZ9yEnS9QdBGGNC51oIpfhIT7rH/j1h+BSugar3shmX/rrrtu+T8Fmr4BvGmnnbYd5LifbL6GldAJEKvrh9bcmWIJNHmqPnrM41aQI5Cs+Ysm9xUom3jiiQtv1DNfgDdjwjNjpA2TPCNo1jehba7XU2o82Xzgu3kH5NKOANeAsLrmgPbNLaDDMglQIhmPeQTQSO6LfM8DIAY4eV70gafGaC4CGTQoNBJZz3OgfcBDPbR7Bj0rQBe6jNHcRRdhS4DT3tQTLSJQY0zABZBIGCunDRpOdnTasEytPWMzx/DOddocINzcMOc923jg48YYaB0lwAAgTj4DUernx0bSpX2gNvvFU3T6sAPY8Kyjjzt5+gXIvdf8j0cSXtBU46/nyfvIHGtNeA2o0daoj96ZZpqpgGTPFx6aR8kPgK5uV+R+oU1/AF1qey2F08wZk12wxmcJMoErPnmXSPpIrad2vEPcH/R413rH1sFq6xi+6fkYA3LSn8+BhxwRK6+6eiy2xE+i5yKLxSKLLh597ns0rrvlr7HKT9eIpZZZLnouunj5/XzDjYsfoFffHRSPPPVC/PGwo9rzN9p087i1z33x0BPPxWa/2jp+veue0f/FNwMQebT/i/GrrbaL7XfeNR57+qXiE8b1ex7qF6uvuU4sv+Iqcd7FV8bLb334X0Dn9QEfx4mn9iq0LLnUMoVG5Q869Mi4/7GnCwB6bcDgOPjwo0uZxZdcKnouWo3D2N784NP/anN0Azr/C8jxQvGwCKzppeHnxe7F76Gz9OKa5YN68hXiei5PABrOtePlm4KlXsf/XvLZpjb0LxGSHnQPIA0C8FRvwwvMWryXRyYvC0sx+RXjuhcZOrzsqfe9vCX1PeDygDjtpPpfPoEg79577y02NflSK5Vrf9DmJa6sY/ZNi+Bl6zqg0lGiOfDi1LdyyteT8bpuDMBCjh+dxpNfb+oYuxdt9ic/jaDrbfrfeJUDYHztZ7vyfFkSNPJpfLQr0Vh4Wbqu7Uzui5e669px3wky/DXuBKBZnkDJ8l562b77jtfokWgp0kbKOfskfRC4eAEYSQR9ajDKhQ7+uOfq+pljCTYJR8AuE2FmXmd+XncEBMxTtKPRfKAtzISu7COfAXmemRwvfrcm46aByLoAVSZ0mOPy8D41UASYeZ7LRHiM1ynYzL16Plq1YX54FvFPv+YqulOwqefZz3uGH2gHKghY90NZ7wLvBG0q3xG/jMG48MwYjCvnRo7P/Mpxew9IgEg+NwR5vg/kmR/Ko5kdTX0eoj3nJ9qSN9lX/Zi0m+dp+Gte4lnysF4+74/3RfZRf2bq88ucGlYC8vFDG/r13Of8VyfnOJ4bX33seJzvWO+meqK1whd8w2d8SqBuPuec8pwkMFYfrfnu9U7o6jTGgJznXxsQT73wRiy3wkox1lhjxca//FXssfd+8evd9ox+z78ex5x4Srm+6OJLxm57/i522X2vABpoVe7s+1DMO98CMd5448X6G2xS8tZc52cl/467HojJJusRM88yW9GivPXBpwWMTDTxxDHLbLPFA489U9qgedntt7+LCSboVowzF1ho4Uq789qAoUDJe4O/il9uvlWhBehCyy823CTGG2/8mHHmWeKG2+6KgZ//K1ZYaZVSZr2fbxi771WN46zzLolX3vloqPZGN4CDnv8F5HT1RG/aH8IBy2ypdh5ytfmv4UDDgYYDYx4HxjiQs+pqq0e3bhPGX+99NAZ+/u+yfARYHHXcnwtoOOCQI+L9j/9eLRd98GkAJ+utv0HJO+TwY+KDT/4RAwZ/VbQwgNMddz8Y088wY8wz3wLx2NMvx0tvvh93PfB4TD3NtAHIPPj4s0Hz4jjFFFPGdjvtEn/809Ex9vfGjhNOPvO/NC8DBv0tttx6u9LfeZdeFR9/FYWeU848t4CjtddbP977+O+x2hprlzLX3tI7Pvz0X2UcaLXcNToCmzpNDcgZvV8UvrZyyWn0prShruFAw4GGA9+MA2McyFljrXVj7LHHju6TThqTTzFl0dA8+tSL8efTzymggabF9cknnyLOOu/iAmbmm2+B6DbhhHHX/U+0LzFZ/gJeaHlmnW32AkB6TD5FqUuzY5vqIostEQ8+8WwMGPy3ojXqPulkcWffh4vmaMKJJopllluhaDXYAyUIKCBnm+0LLaf0OjfY2bz89sB4pP+LMcdcc8ck3ScNsZ/W/dkvSplJJule+lxgwYXLshs7oWxrdD02IOebPZRN7YYDDQcaDjQcGDkcGONAzk9XXyvGH/+HceiRx8WFl19bfq++/VEce9JpBTRstsU2ccV1t8QlV91QNDPsZtjo/OAHP4hLrryhaFFoTACcdwZ+XkDOjDPNXJaSzjz3orjo8muLTc1kPXrEggsvEo8//XI8+dxrMdfc85b2Z551tphl1tnK/3yKnH/JVfFGzcC5DnJ6nX9JvDvoy3j/k3/EDbf1iYknniQWW/wnoQywZtnt4D8dHVddf1tcfePtRYsDQIyu4CbpakDOyHk4m1YaDjQcaDjQcOCbcWCMAzkrrrRKjDPOuAWcfPjZvwpYARqOOObEAhq223GXuOv+x+KOvg/FbX3uL8tVRx53csmjsTnngsviptvvjmNOODX+dNTxcUvve2LaaX8cc80zX9G4DPzsX/H4s6/EFFNOGfPMO3/0f/GNOOzI40v9nXbZI44+4ZQ45oRTYp/9DyzXgK5n7Lxqs82xdLb5ltuUvH3/cHDc+tf74vSzLyjACNDq9ZeLyjLbSqusVsqccMqZ0ffBJwutlsnSwDoBxeh47CzIYezXauj2zabzN6vN4I7RLGPCUZEY8OqvbgTYFf0yVM0dE4xI8bxJoxcHGBinMeqooIyBfc6JrurP821+e64YyjNUdWxSw4FRyYExCuTY/fTzDTaOGWeapYCCV96ujHRt6z71rPNi4kkmGeq34EI946kXXi9LRsefcmbZidWtW7eYpHv3opk56dSzou+DT4RydkAxbNYm+xvLRyuutGrc92j/WHvd9WOuueeLJ559NT749J/FxsYS1Frrrh+TTjpZ3Hxn37IrCyB5Z+AXsefvft9Oh+WoqaaaOoAhWp+X3vywLFfZvdVK79bb7xRvvP9J+7b10RHgoKmzIMcuBr4zWrdcjsoHoN4XWxUu4O1+aE12KKQnZlvEORCrJztH+IJQxrbUjnZL1Mv7n6CxRdj2zRFNdkTYQj6sHSb19mwlt21ZsuUzHXrVy4xJ/xOqw9vlMjqO1Y43DgNbE9spPmPMKz5jbAVuBQp2+/D9VN+x1dpO67k5nHOiNW9450Ayp4+dAcqeb/MbiLcTyFbm3GU4vD6avIYDI5MDYwzISYFvS/cj/V4YykCX0AVQ2M/YDQWY+AErDHlpRywp+f/+R58ueU88+0rZNaXdh/u9ULaKZx+O7HxsJQestPvks6/Gs6++276UpM1+z79WdmKVvLZlJrRY3lLHlnF0PPzk8/HiGx8UXzzyn3nl7QKYSpk2epTTX8kfzR0YovH5196L1ddYO96qxXpqnbh8nPC1YHuorcIdaTR84cprBULOXfe1WE+0MK7bmjm8BBwol9tWlSU8ODuzZbM12eqIXj5AbJXkK8fWbcnWSuPwUufci6M4viByO2VrW/rUN5DDEV3r1kx56Tm0tW6ec0TGv4tt04Q6rZBjpvo554Pppwe/WgGY81ZeZDt5TDCFR8q2+idx7npuZW+tR1jTHOT2c/dH+a8DI3mf0qdKtptjdb/xMZO5ZFszHyK2LbfW01+9/LDa117OPWPWTx1coL3ejvJJU/Iox5q05dG9Vb+e+BFqdVgonyaEryXzzo8DRdv/9YV23r35G+rRo0e7Q8N6u/X/0aNf9AHkrQ4CO6KrXt//tjXz+5Q+odDgl6l+Doj7aMBH88PcqM+bpKerNUpJW3P8/5MDYxzI4ZAvnfjVQQnQAUjUfy+0GPFaUsr8urGwcvVz7b7wenWNQJfXmq9MttcKTJ6r9VP19/5/LUNl3aTHMZe86uMaHf/vLMjhd4JTN07kAAOOqvhmkQhBoIGjKnkcnaWPHD5SOJHyoubsLr8OtedceXGrfPV2lAg/DqqUc+SMjRAmIIelyam3w+8DkJP08PqrrUwECedd6GlN/EMYi/KEDG+0qRXiP4JjPWPwZc55XasgzfZ82QNIhJ3xc7THv4gEtBCYPPVKNDnCGEj8WnB0JgFhnODJRw+6OBKsC6JSMKJop8RGEkJCWY7u0p8Mum1Ldx2gAsASPBovR2G0EMaDNuPlpVh5ThM5YasLyuyTQKV1Ug6NnPMBacasTWOiNbMd3v/a5vdEHWECOOvjzE15PDVu/brfEkHNc26OR6gA8wAt/gcm5HEqyXkfevjJ4SjPdf1ynJfLTOabc4735LcCLCACD9xb9Aj7kN6Dh6XJSV44eiYAGk4BjcnPEhCaOUpMR4D1Ovm/e4Q2dLkXvOz6X3Kv8IQTPNfcW2PtKGnHnE2tkfmazjmVNy89sxKwSZMDWAIyeJjj9dGQ/AXA3V/a0iY1HBjZHBjjQM7oKPT/f6OpsyDHS1AU8XRWxnkX1+BsSHxtpvAw6b04CXUJOKAp8SUImKQwSbCjjK9IIQbqjtNcd87DaIIpQpNbcY6wJOCoo+Uqgo/wIsCVIVRpnvTPhXndVbmXOi+rdXfw2ub0i4BI52o8rvLOSzNkLASC5aRMAACh0VFKkCMPaJtiiinaBZMvZnxMh4V1kGOpIZdFCGveWxOQ4A3385yWtSaClTv4pN0SCg+oNBzuk6OEH+nO3zk6tUkjkcl9Ml4JT3i/bRVwgKL2M6YNzZ37lHGJ8ByYcV+0ZRzGIwF37lE96J+5Y7kktYVo5vU6tXEABKCoP07sgG+gScrgov5HVzqQc65N8Z0kwEWYDmU6SniYccDki8AMVEtoz/vSWhcgMO+AI+NO8Fovx6NwhhmpX/e/cdTz3WdegdEjWboCToGmPMf7jsBuK8hRzrgzAUrpgylBDt5yDOfDQH1AEX9pRjMBPABnzou83hwbDnxTDjQgZzRf+vkuAqTOghxAxDJPJt48fYEnWPFyB2i8RL2k2e8QooQMtT2B4eWfwsx14IObcBoawjPbyj58veuDPYJyXObTegA2XvLDAjnqy/cSBgp87dIMOAdofPln8lIHCHgYrSdfy0IQZKJJEV+KR1EaG2AA3cZLANJs+fLvKLnOFb8E5NT5BrgR4AI5SnWQY3lDuxIQRTNTT3iaLtjr1wl6vM5Ea8TdPnAC4ACA+ElLIFJ2Clz8pXWpJ0CJFkN5gltIBmOoJ4Kcm3j3v36fMtiksScAUs9YCFiJhgl4qHuSNq66poMWTkiCnC/oBDKAXVoHITVoodha0XDleIBvQEs9mkQaOxomCaDriHfyzFtzCzjXlzGhl3CXaNSGBXLkm2dAhzllbtVtYgC9OogpDdb+0J4AFQBGJvc976dlzzpd5iCtj3nUmjxPwAq+SJZ360CcVibBUx3kAJUZ8oEH5Ppzrx0fOOZsfrC09tucNxz4XznwrYOcIhBff6/EfbLUZEmmdQfRs6+8OyS/rawyKUz/uzybkKHbqcoOqNppyQMklO9oOaij60mzYx2EoKMaw3vtY8iyrTSWsq+1jfu1AUPb2hSblorWeh/ZVv1avX//D6FhaE/Lpe5rQ+hqrTcyz7Ovr7PJAXK8sNN2JQEIsOILf/LJJy+u8wkIQl88FAIViJBcJ9x8OfpSpBVJLYwvdMKzFeQQysBE3diX0PWFT1tAjd+RTU5qMPJBI6SBIwLG/+jIRENDi8SGop7EbQGI1JFocMR6onHRt+B1BHF+UdPIDMtmBZjIPvUjHk2GgCCAaMhyOclXegpfth9iGUmEXLbh3LIHASYkRmtS31JJfmnjs3uHb4Cb5RJ0A5z6TtDnvtWDqNIiAEepkaE1AjZaY/eYA+53atzQ4x649/qhubH0lommBmCSGOISovV7tvnmm7drepRJbYIlUUmbgCYeWKohkPHNsqglsUyW7GgvlHN/AIRc9gF2gMGOkvYBLdon81bCu9T60AYBGq3JfM/nQ54Pgamnnrpda5flgeU6P/K6I9BGA5ThO/SPf7lsaZyAjTko4XGdd/W2hJbw/OSyk9hSNEGSdoGtnGueMf1oLzVnlpqFn/CsZogMdYEjcxENyZd8Tur9N/83HBhRDnzrIMf2amEX+j33WjHI9b84UIJnAjeEL4Ng1xns5o8hcV5rBSfOGQTb7aQ+vzevvjOoGB8/+dyrpR7/OK+9O6gdpGhPnVZh39H1pMdRecACvfpFn7GwC2LLo010tpZlw5NjVoZfnhLrqq3NHJ82EtRkv6005nkCKf25VufL0y+/VXaSdTTGrD+yjp0FOWmwmy9xQtnLzxe4FyAQYZmKkCGYfZ17YWYUcLYAbALEoqGSp7EAOKj+aQ8sm7BZaE0AkK9o5fx8WQM/vpRpCDwU9URAAQe+vh1pWmhyMlaQFzgB5utevhd/CpR6OwQWQObrXTnCwfJV2vYAfdpln4EuX/et9NNuqUuo4UMmAhbQkEfIAExpN0GA5Vc7nmVwSNoAWh156tGOpcDOdvNozEANmxZltUGI4Q1g5hzNwBfthuUsyTneZMIDwhUYUJ6ApTXpKA6U+woUKJdtJz+AmjoYww/3XqJpc24+pDZNPyI11xMwS2OhbTwHvNxLcXaAJLyiwaGpMM8IfjHNzEV5lv6AwrRBwZsEDvV+8n8C3r1QXp+WJt1PyXkGLM3yju6hceG5H7CWS6tAgLkKIFnKQxe7IGNoTQA2TZE29Msw272RgGTaF3MIHTRUNCv1BJzSArJzAiYTqNFCWmZFA/7S7AC2Eps09ylBjjmZtj40f+hFjzlHW5bAydKvOfF1xvd1+pr/Gw4MiwPfGsghCIGP03qdF9NM++OYcsqpokePyWOqqaeJ1dZYK878y0UFKNj1dNgRx5UyU7SVUW6HnXeLS6+6IaabYYbYatsd2wDLO/Hau4PjwsuujZlnmTX4oeFs76Y7+pZ4UdP+eLrgtVg76/xsg7js6htLPYJ/1dXXCsEw+9z3WNnGbXfQ48+8UrwW2z5uJxTw5Xf8yWcUevjEGTDoywJyTjrt7FjiJ0sFJ4FTTjV1rLn2etHn/kfj/EuuLmWTFuCm17kXx/Irrly8LhvLTDPPEjv8erfo+2C/Er7hlt73xkI9Fy1hIsTXAoB4QT7syIoPl11zU/uW9AQmAI5t61ttu0PhI5oFF0Uvo+Wbe99TwlOIm2WbegLIrD8yj50FOb6GvZAJSgnY8QWfX5TU5b5cgQkgJl96yntZ+mL38s3kurKu+8r2ZZ5tZZk8EljK+aVNivqud6SmB4AsoSiPJuf1RMNBIMn/ut0i2Y7x+mr1y0Rdn3R11E4GyWy1YVGfcFZXu8ZgaUXCB/yQgIzUHpQLbctd6hHCw0rABgGnX2Vb2wBKXWd7g58Em+T/jsYB1ChvvNpKoNvaf0f3SRn3PfvI85wfzvHUElhq8vDA2FuT+YcOv8wn5IGkTO4XWxuaN4nWUHlaDeNL3vq/TkPWrx/NsZwnaSgu3/xu5WnW00/SmEEP5WnLEpQ8984zYcx1vmQbjkl3+q7RZyaAybzWVgLJzHM0n2gItZ/avMxPHtLied6SB55v90nb6mR+1ss5gx91rQ0+ymvtJ+s1x4YDI8KBbxXk0KTwTMyz76abbxkXX3F9nHT62TH/AguVa4T6ex9/Fbv+dp9yvvte+8bVN94RhPxtdz0Qjz/zcsw448wlJMPdDzxe/N1o8xcbbVrK39L7vgJwACdg4sjj/hwXX3l9HHnsn0vYB35orrrhtgIE5p5nvugxWY8AMPjCsXvqsf4vxfQzzhTTzzBD3HV/1T5ty4GHHlna//2Bh8aHn/4zfrvP/uV82eVWLABGIM2dd/1tAVGnn3Nhydtym+3joy/+HeJjGe9yK6xcHP9dcOnVsdMuu5drQBawcd0tvaPH5JMHHzoTTjRxXHvTnfHpPyJ+s/tepdzZ51/aHn4iwclrAz4uYxGeIoOUiqrOR5AgpNfe3LvUXXb5FQvoSa1P1h+Zx86CnBGZqE3Zb5cDtGmtmpBvl6Ku653QpuWgaaPlskRlWasV2HYdBU3LDQcaDowsDnzrIOfwNk/EBdAM/ioGfPxV3P9o/5h22ulK3Kn+L7zR7j34gIP/FL3veaQ4+qN9efP9T0ukcKBh7/0OLCCCB2HamvU32Dje+ejL2HDjXxbhTmMk+OYb731SHPYdc+Kp5fqGm2xWlpqEaODZWP06yJltjjljttnniLsfeKKKM/XWh3FwG1A59Ihjgz8dwEKUcv5ueFemfaJ9eX3A4ALa0LfjLrsXTQuN1bTTTRf3PvJUCSHx9oefx6vvDooNNtms0HPRFdfFTXfcXbQ/e+y1X4mPtfQyy8V7g/8We+97QCnzlwsvHwrkPPfqgHK+yWZbxuxzzBX3PNyvaIJ4ZOYziAPB6275a3z/+z+IlVddrQE5I+vpadoZozlAu1DXMIzRg20G13BgDOXAaANyDjj48CKoX3rrw6LNWHrZ5WPiSboX53z7H3hoEe4TTDBBCWApQOaV199awAmHfpP1mDwWXLhnqacdoOLSq28sSzzCI4w91tiV1+G3B5Yy7HMuverGUm75lVYpy2ILL7JYhyBnltlmjznmnCvueahfATkCav7p6BNKXSDnvoefKv/ztMwGJv3l0JTQKv35jCowKG0NDQfa9Nnv+TdKv8pZttutTVslkOiNt99VlqoOPuKYuP7Wv5ao6ied2it+f1DFh1aQQ7tEAzXuuOPF1tvtFE+/9Eb8etfflr5OOfMvxctyA3LG0Ce4GVbDgYYDDQcaDgyTA6MNyBFb6qPP/x3vf/qPssT0ox/9KJb4ydLx3Gvvxt77VRqMk884p9jcABK0LUCDYy4X0QrNNvucsezyK5U8diw/33CTIuzFgBJy4d1BfytHoRUAjl332KeApQUW6hnTTTd9Ac3MOukAACAASURBVFWDvoiikeGpePY55ypaFSBn0Jf/KdqXrHvsiafFo/1figm6dSsAyZKZPoRuYPfC+DhBzo6/3q0sG9EyTT31NCWiuDhYgnNaKipLTGOPFTfcdlfR5Ew+xRSxz/4HlRARluvmmXe+2HKbHeJ73/teia9VjJTbQijQGm2/865lPN26TViW4hyNb8mfLF2W4268/e743ve+H6uvuXZ88Om/SuR09UbmMlW21SxXDfN5azIaDjQcaDjQcGAUcuBbBTmWcw454tgijFdadbUScZtAn2aaaYs9imCZbHJ22a2yRQFYDjvq+Pjjn46KM865ICzT0JZYYurefdIYZ5xxSlsnn/GXspT1yjsfFY3P1NNMUyJ87/ybPUofW2y9fYw99vdi0cWWjIeefL4YDs89z/wharhlJbYsjIrZ5Oyx936lTdqXgw49stjajD/++DHHXHPHvQ8/VZalLJUBFJaHGBjTPIlbdeIpvYqNjrxfbbVtWU4TVRxQmX/BhWK/PxwcBxxyeKy48k/LNX1bThN1/Ic/+lHsvtd+Zcnr6ZfeLHGygCltMcpOkEPzdWvve2O88caLxRZfMnrf83DcfOc9AXBlJPNTe51XlvjUnX6GGcsS3x/++KdgOwSQ+CVAGRnH0Q3k3Hzzze1Go6Pw2RqlXbHdvuqqiDb3JSOlb/bQdli/++6INWeH/J13RtTtmNnsnnVWxE03RbTtVB6xRru4NDtytNV8FnZxj1Xzd90lVMLwu3rppYgLLmD8O/xyrbnszvPXmve/nL/9dsTZZ0fwmzlwoK3mESKguK8vvzziLT70UDVn23bUj3gDTY2GA53gwLcKciz9nHfxlUU4zzv/gjH7HHPG/AssXIAE4MJWxVKOpRoCHIhQht2JSN4Z6oBm53e/PygWWniR2PiXvyoxo3L7tB1Hd9z9YOz4692DcbG6iy6+ZFjWAmIAIVuzRRBfZNHFY8655yl92P0k6jdtDMCz9LIrlOtosPT013sfKRoS/fj1Ou+SWHX1NUv7c887f2y93Y5x3yP9i5E02o845qR4+8PPSnvnX3p1rL3ez0tZ9Ky+5joFDPGxA/gBLQJ2nnjqWaU8HgjyyWh4yaWWiVv73FeuAyR2k5121vlF63XuRVeUJTraLdqkq2+8vdj07LH3/mV3mB1keKRPv2133KUAvJFthDyiIMdOG1t2c0trJ+btCBWxtduW3zE5ATnbbx9xzjnDH2X//pWAGn6pKlfYsXnmqYR/Z8pnGSBm0UUjjjyyutKvX8Qcc0TYmc/nX8vGtKz2rR7RPOOMEVdcMerIcM9WWCGiLeLGMDsGGPmQ/OCDYRZpzwBqrr2WV/CIQw+N4KfQ7ze/ibj55vZiI/wPB9WrrRax664R99xjJ2TV5uqrR4hVO2DACDcZZ54ZscMOFRAb8dpNjYYDnePAtwZyUmMAoBDU1W9QOb4+4ONi/6IMAAJoDF1mULsmQxlCFWBSBiBoFdqADvDQ2od2kw5lhuQPKuCnEtYDAj1D8iqD4tSkoK+yvxlctDo0S8rqz9gqbdPgePHND8pYqrKDamXz/8GlnWyP3VA9ttYQHgwayv8N+rUJENourn4r39BhLNocMg7lK/un5MHIOo4IyLENlu8YfjsAnbon1+FNYTtgbBPmRI6vjtz2bZtr/VwbtsrWt8vW29W/rcFCS7RuneUx2HVbiDMpr2/bY/n1sUXZVm3biNGgvO2vmWxpd62j7dm248rT//AMXH1B3323EAgRn35atUzj8OWXEQCEL2LCbfBgY82eIx57rKr3+uvVNdqU+eYbIqiUz3T//VXZRx/NK5VWY+mlhcio+iDc6nWUfO65qh4a8oscYFhppQhuacTO5PVfv7QWbTvZi5BEj3HVBST6eQXIMdMY6FM9bSlfc9xbiLUzHG/86pqYQYOqOtpUryONifHKw6NFFomoR7RAh7wU6jozNkDN9UceiXjyySEaFoJfWXS4L9pOftHGqMMJtXslATnrrMOXUAU8W3xHFr68+mrVZ0aKwA/t6EPfppp2JPRus40QKBWvgQ/hzGjiBLpfddWIxPrq4Dve0f7lfae9yzEkPeaZkHKzzhohHJw2PRLzzhvBNRFXVBmjE//R51d316MftKNFnvuJD8blaB7hXyZ0uJZzSh/qmWeZAC9j9ky4nk6ztZc04PvwEv4qe999Q5dyvQ4qzUd9DSvhRyt9ypqrrrtfNU8Rw2qmud4FHPjWQQ7BSijWfx0J23p+/l8vl9cc69eH/D/8Pur18/8hdYem8ZmXO+4j61U0DClTnb89FF31ssPKr/fv/6zTej3zhnU928/69WNHdb7pNe13Jgq5+UzA88bKtwavp36dSRyLcSZ25plnFud8AJIQADQ2nJFxJJjhHjI0RGu7fLRwVMcRmu3RnLnx04MWzu04YXOdAzeO5YAYYITHW95pOUeztZgfE9c4jHONt2aeitUH4DjL45wwvQDzCaMv5bUvxATPutppTQCGr+XjjhM2oFoasGxBawOAEJAc/xIim29efb1rQwxKZc44I0JkCE3TpMw5Z8RGG0WcfnoFCFwXdWG77SpQwm/fzjtXYIkgWnjhStugvHiOvuZzSQwgQNdpp0VsvHHEFltU9QgfIIejYIJSmwQkzQ5BBABsthmPy1XdFVesli3QTQvx4x9XmgggCX38Cs4/f4QQUa6JZqFtgpqQdw19wn7hye23V1zM8eKFMhwKt8XmLEste+5Z0SYP7VNPXQE6tfnCW2+9ChTgu3HTghFUfDDmmCeaqBLcYktyreN+0KBMNVXFU0Lfkt+xx1Z19LPhhkMEKJCDbgJ9hhkq4KR/gpuWB2ABQBdfvBKy+IFe46d52morIR+q8Wr7pJP4SxLmoirj3s42W0UjkCmKCr4BJe7RKqtU9wWv3nijAjGAzPHHRyy2WAVuADVhwfRnbhj/5ZdX2jk8smQFWFx4YcS661ZzwnjdJ0uo0tVXV3TQBKEfqFR+2WUrMLTMMkPujfK0T+4lPhiT8eA5EIcG4AjgdE+XXz7i6KMrmmgf8UaUFeXnmquaUxUVQ/7iwbnnRgiHpxy6zFP8lcz7Nl+J5dz8VqY1acdY0WFcXl80b/hr3qDbdc8gfuez09pOc951HBgtQM43FapN/aEB1LfNjxEBOcADIS9xCibuUUdaj9ZHQByr9DQrT5wqYCYTt/wZ24gH4HQ9n/mOlsdokDLR0tDKAD0AVCYOzkSiTg+7XPnzAJwJMKoH+XSdx1/ecDlgA2p4tjU2zvR4rBU+Ip31Kc+TbSvAI1wId3YQmdhBEGoEGgHlJZuJ8CRgpZVXjthpp0pIWB7Kcl7qhEsmywU1v3dFqCy0UNUnAUMDc9RRWboCROnA2Fe2r28/Wo0pphjype2FnloDti7OMwmd5UfDoi7wNMss1biU7d690hZkeUICHWkbJCTY3HNXgg4vCDs/4I+QxRuJ8CXg0+k1sKEffL3yyogFF6z4o6wvbnlApXHpj6CnxcAHQpigqycgJAPd9+oVscACQ3KBogMPrM7rfAJm8KktmkTR5GR4Mu0T4BJHyAAJ8Ark0DLVg3RbegJ8UttC+7LUUhVPgOLs2/IbgS3RxihjLvhpsy0gfcknmN0P88W4hdVqi4lbeAt0tIVDK+WBmBw/jcnMMw+9tIknljvdG+AViKtr4SytAlISENSzZzVegGnJJSuwChRPN12lCUEbHgBbuSxrPJbiMhkX2s0L5X/5ywpspaYpyz37bMTss1fzQDmA3pJqWxiy8AzUQY4Pg3o/2Q5AbVx1DaJ7BgTONFN1P7Ks5waoxY8mjToONCCnCdA5lIZpZACkzoIcS1MEvxALXLnTgnTr1q1oOb7uERBFWaA/CVgAaurO6riTz2CObHLqoCTbFgYhXdDnNUfABy31xANuBmIUXqIetgFwEXzR8lMmAEqMJoEQ9aEujRCvtsAYLU490ey0xi7yVUoj8OCD9ZLV/17ebUGk2zMBhwxabinCl6drm25avYS9XC1ZJGjy4ieo27zwt7dDsNFyWB4i3Otfn178CVgITe2rTyvTo0e1TKKhOsjx5b/cchWo0SfBBKBpS90DDqi0GQTTNddUwhuwyAQsAW1py0MgpgDBI8IHL4yd4E4wwlgXUMi2eveuBKZlFFohGoAEf/oiZAXGNm5AZNttK9rQZ3xtgeqLADVu2q9MwNGUU1ZCn60JngN+2vdljyZj9ZtssiHaBUIvBasljQQqcL9+JRoYYCCXHVNAW47KRGMHlBibZSQ8J3hheKAPoHTcb7+qBl4CYjkmVy3JwO40gKlJyXttPi2xxBAtGeDmHrYFYC+aLyCBNiiTeYsnhD6Qoy2AIhNNijZdA0zMNSAXAExwZT7QsCXv0OVeA3VoEMS9dQzK0Pg40hQpk3Mn+7733ojJJ6/mubaBQt9I+pcAYFq0THjbkSaHFoj9GVrqSdxbc76e3CMfLTkf63nN/13HgS4FOe22KjWbG3YjhGCrMGU3wq6EzUixR3l9iL1MllWP995S5t1B7T5phrbrqWxv0j4lbVnY7NT7ZYPjx2g4+63sVdJ2Z3B7MM/W62mPg652G5p32QlVfniGvvbfdi/q19tkR1SnraK5zov3huIXw+J6fe1V9d8qR8bU8ut0Jg+TH3js/uR1x+Qt3tWvj+j/aPm65Sou22lMxL3p06dP3HLLLSGWFXAh9tFLX7OYTpOTMXzYx9CkiCWUyfLRWbZ9BLuB3YbS8mQZMXxoaDLysT65vBeHZ/nll28PjsmuRrmMMbXMMsu0a3W0ZZlp6aWXLoE2s21BOpdccsl2F/eus+UxbgDJ8loG8BS6ALASd6ievAx9UabSCEix9k9j4cuyLmTVoxonGNVjjyOxS7H842UsEeyp7XHu5e5l7EtWIpi8iNlwaMdXqpc7cKJfQtOSD3sFoIaqXlJ+/PErDYRz4CIFII0KIZ19AFDoz69r7eZOrNTSZFlt6cOXvS98SZlpp63oExsSjRJBSdtAmyNZ5qJdybYAEYINEAAcaIPSTsdU6dZtiHEuAV6bTgUw0CQBLXgMjNQFtiVDmhX3xE976AUuaCLyHrId+eEPhyzjAJ114GEZj3YNqEueAEmpycJ3mpnkezXSSjtHmEs0dQCa+wzoMWwmwGnkUsCaSwBAzgv1lMcfdCcIch8lY8dLIFAi1PE6l/8AQ0tDlook9dnr0Pa4zzQb5gDAkwmPtJnXTH9axVyaUg6gow0CADMBezSa7rcx1B8bYwCK0IcGWi3gCYB2Lyyxmg8AIIAFDGaiJfK8SGhoC2pf7oNl3gQ5eGE5U/9seQDithBkxc7Jcqz5Nf30Q5Yf2SO5p5az0EKjBXQ3Wp3kftcduwzkEKCPPf1yXHdz77jqhtvj8mtvLtu573/06WLI++IblZEsgchzsWCa19x4R1x+zc1x7c13lrhRjHflAw0ENjDA47G2tPnIUy8Wg94Hn3i29HPl9beV+vLv7PtQATB2OKHB1uo0wCW0b7/rgVLmoSefiyuuu7W0qX9lr7j2lnKO1keferEag7avvbn8ON7TRiXMB5QYUbZ997n/sZo34XeKIz9l0a9sjuXOex4uYRayPaEqBPYEDPCC7x3t4QUnfoJ1Mn4Wb8p2cjvPrrnpjkILWu+6/7HCG/WV1adx3P3gE/H86wPimTZQafy8MgsTwW8Ob81oMhZhLO6856FyD2yNz91pIwpwhvDlvRheFHLLOIJhWqJqTTQsAiMOL7GlASQky0ECTV7gjd6WaE0EU5QEARTssjUxXKZpoVWxnOVHuwQ0HX744cUOxzVLatkXmxzBHoGyTMYitlM9yKRyAoEKCSCwJ22OrexolefB0472BewUQbqjsAGWWnyVEqy+7i++uHp5W+JgD1NPyviq9eIk0GhKgBi/fHkjmx0FYeDLnY0JgWlpS3lfrMCARCDSkljSIMzymF+tNEKEqXoE6c9/XtmDqCsguCUhicaB4E5QoE/aGUIwtTkpxBzZFtVf/trJZRztKUMIoYOwwh/80BaQkF/glhLYpGRbFG1sJ9KI13KKJQT12JwYS2qttAtA+cqXj1/sNQhXIEo/vtblWYKyfEKgmpL6dS/0RbgR8GhUlkYI7amdAz5Ss5ZjA+i0nQkQQyeABUzSVtFSaC93sLm/bJvqwCzr03a1ajLkubepuXBOeNPi4KUlRGMESCXjxsuasjIEXGfLk4nmKueRcRpbGu8S+uYAAZ/JPNNmXnM/AQFzMMGYsvo0n4wXX4GjzDeGG2/MFqsxoAH/AAp8yzH4bgJWgBAJiMx2tW1OAmuS586KNT6bG8qx85HMZ8ArxwbwKKsN5XIOmQc0fnkd6M9nR5s+GAClJnUtB7oM5NAm8MzLNwsfLt0nnbR4MJ5u+hmKV977H3um7GCybZojQNuuxZKadLLJYsIJJ4o555o7jjr+5KJNAW7+et+jscFGmxbvxmI6ie202JJLRe97HykxqfTDt4x+Juk+aXGcJzjntjv+utDAOd7FV1wX73z0RTzxzCslZMRc88wbf7noihIUVJs/+MEPStmJJ56ktMPPzUmnnlWu/fCHP2xve421141nXn6rAAHgS1yr6WeYKaaedtrin2bA4K9CwE40bb/jLmV3GNBnh9XD/V6IJZZapupnku7Fvw+vykIx0NDwXzPHXPPERBNXvOAbZ/4FFy7bxEU6f7T/izH5FFPG97///Zike/fCKwFOf73bnoWePvc9Gj+ebvrSvkChABGNFQ1O/xffKNvc0dVtgm5x9vmXFj9DNDeCedqeL+8nSy9XQCZ6uwrkEPRsYIaVRmVwPgbFdl+19inQoesdgY9h0d16HajRRu7+qudbZpMHVHWUCFWGtb76qNfZZngxO2dc6scYNn95Ll85dXxp2g3jXDkvetogeY6u64PQdY1A8UWrLcKVAJevb/YY6rsm33WCTT3n2Yd+nPu1/u88+9SeunAu2xJ5fujP/x3rbeV1ZdBnbP7XDuGS51mvta2s56jPpF89Y8v2jc04tevnujIEpH5pyjJPG5Y3bPMGKAAkgo1mi6DTT5bXDgGa/bSOTZ/J9yzjmOPQv3P3Q//ur/I0HoSt5S8aFrQAnQAVIABk1Nvzf2vfxqcd7ZoP6HSe9ZKGPG+tb766lnS18lRe1s3+623mvJJX79d8NO7ktzw/426lQZ9538wv5/U+6jSgV1/ZrnI5h9XLPH2bD87z19qO50Y75qB5JJ/GKe87fpoHaKu3oZ8mdS0HuhTkcFpHaIoSTlNz7yP9Y7uddinXxJainfjz6RUYWHaFleL2ux+sNDo33VlCKagr0jiAIHil898fdFiJx0TbcOxJpxV/NYccfnTJO/r4k0tASgK93/Ovxzsf/a34zQEIZp1tjphvgQXj6RffjKeefyPmmnuemHLKKYuWhWfjvg89GT9ZetnSzi133hNPPPdaAQYZwuGgQ49q00BVbdPOJAAwjpNPr8I3bPzLLUrgUECDt+QHHnumfdkIaHjgiedigYUWjnHHGy+efO7VdqBn+Wi/Aw4u/a+17s+i74NPFE2L8U866WTBAzTti3GJQdVz0cXjqedfL/QvstgSpd5Nt99dtDrdJ52shIUAhjba9FcFPAFIp/Q6N/5vnHGKrxxlTjy1V4mz9dYHnxY/QwDiltvuUNpyXyx55RhH5FhpuIavyenaaT1mtG6ZhwbF7htf7H7OaSpc8/N//urX6nXq5dRvbat+rd5H9t2ZtrJMR/RlO5mHXv8nHa191s87GmvWzfbq7aAjx9tabljn2Z962Wb2m223tpnXHeX54rcklfeCJoM2hEYt+82yjtmPutl2nS8dXWulKWnQlh/NnuUiGrdcNnOkqUNH0pZHfSQd9WvZbp025ep0Jy2tdDqv18921W/tr6M2s24rXXm9Ixpay7bSkDR21F9r2Tq92acy+ZPf2k6eZ/mkZ1jXk3fK0yY2qWs50KUgp9e5FxeBydMw/zG8+fLQC0yIN3XTHX2LdgYIueamO0soBQBFaISjTzi51N1r3z/ERZdfV0ISiENlOYf2xHKXwJOWtP7wx8NK2XXX36BE+RbIE2j58LN/hACcYl7RWkw6WY/QHtA073wLlPAKlnAE1HzqxTdj+ZVWLe1YptK26xlAlPdgnpCrIKHV0lcKfu2x+QFwaIzE3aKB4ZxPO1kOyHnwieei52JLFLDBgaGI5sJDWGYCXIAfy09vvv9JWUJ67+O/x/4HHFLo4g0afyaYoFvxXLzfAYcUzc/Ms8waSyy5VNG+cFKob/QCl9q7tc/9hb555pu/OBTc/6BDg7bqpNPOKmEuLPdxDrj19juV5SsODxdcqGcIgvq/LFs1IKdrH9qm9YYDDQcaDjQc6BwHRgnIEbeJcLYsAgysvva68aMJJig2JWuuvW6M/8MflrADtA0AwXuD/x5iTdHc/GaPvUsYA///asttC1BKOxJgB3iyxCN/6mmmjbnmnreEXGCz8/FX/y4gB4h65KkX4qDDjizLXJdddWP0XGSxAnIIce08/swrsdyKK5d2aFEq54CD4ohjTyrXLP3Q/gjncP4lV1dGxjUDauUfePyZsARW6N59rwLAklbjSpBjmU1oBxHO55xrnhIZ/OF+z8fCiywaE044YTz85HPtjv1EKT/sqONKm9vssHNx4GdZ70c/miBmnW32smwF5ABGYnWxNZK3+lrrlP/HHnvs2Gq7HYtH5f/7v3FKVPSjjvtz4T9tjdhZztG802/2KICSh2bn511yVTECT5DW2WMDcjr38DWlGg40HGg40HCgazkwSkDOHnvtGwM//3ewVbn4yuuL7YvQCv2eey22a7OZOeiQI0rQyA8/+2cxEF5v/Q2KoBW/6o67HigakimmnKoYC9P0EOjsWB5/5uU46NAjSlnLY/+MiE/+HvHmB5/GO4P+1g5yGOECM8uvuEoJ4Cm8wVTTTFM0FcMDOanJOf7kM8LuR22z62kV+MASELfZFtsUWoAsNjb1cglyFuq5aAF2z77ydrw18POyDKbuyquuXuoK5yBmFwBiWWyxJaqluouvuL5oV8YZZ9xYvC3w5mlnnVeWr9bfYJMCSO7s+3ABOSusvGq8P/ir+OlqaxZbJ5qz+eZfsIBM/AIyTznz3Hj5zQ+L1obN0QwzzlyCkc4w40yFDvSgi6aqPo6v+78BOV370DatNxxoONBwoOFA5zjQZSDHtuzTz76gCEtRt1dbY+2iKWEsy8D1sqtvjLc+/KxocMSMGnfc8WKppZcrGoj5F1ioBNvcdodfl+UTbR14yBEF6IjiLa7TKj9dI2abfY646Irr4rAjKk2HJRfLNKuutmbss/+BBTSt87OfFxp693249GeJbMYZZy7Xpv3xdAVQJcjpudji5brgljROlsIOOfyYco22RARvbW+3028K+KgLfyDH0td6629YygNzHYGcBx5/NmadfY5Sxi4qwAco0N/VN90Rc8w5d0zQbcICxMS0ojkaf/zxY/c99y1b3R/p90KpK8YWA2pLagmOzvjLRcUImhYGiBz0ZcQlV11fyrt23EmnFeC0T1tA0VN7nVuCiMrbe98/FHsm40CTOFmuC4SaGravAzeZ3xUgx/bP3M3Quan99aVsXbVrZESTnR25uyPrMjZkuDgMG+Is1uVHttx22nzbdHT5QJsOGg40HGg40AkOdBnIsTwlMCZAsPmW28YvNto0Ntlsy7IMJTAmQ9vcGm779LEnnR6bbr5l/GLDTWOHnXcN26rFVspt3wDDDbfdVZavtPXLX21VQBSgQWuin00336rUl89+Rh3BK9kE2TptizUwce5FV8Y22+8cx598ZtHkEOxsYo487s8l+KYdTPqlxbCFW9u//NXWZQzaFvAS7XWQUwn2AYUm5fvc91hpIwW/o34YG4tE/tu99y9GxPU20Gv3ld1mG26yeRkLO5wbbutTtojjKSPpnXf9bfzpqONLfUDshlv7xHY77lL6tm3/N7vvHceccGqJj2VcBx12VOy25z7x+NMvF0NnW9MtA1raEqFcH/c98lTRdD1Xlu8Glm38eHT2+Ze2+/+pj2V4/3cFyOHojc+NjrbC5jznjyO3o+a14R0ZZdoFM6LJ1tTclqo/u1fsZGHgWY/DNLx2bS227VgdW0v9bI3NLazDqzu8PD5n+F5Jj7DDK9vkNRxoONBwYEznQJeBHCCA75UBg/7W/rOlm+bB9bqQLMa/738S8pUXQdsW9DoASG2HPGXe/ejLIsSfffmdYsxc78f/+kGDHULa1ZZz/bLjqcpURsF5nZHwu4P+Fs+2lXUd0Glt+60PPhuK/vpYsm1jynbr+cZRltIGftHuo6aeLygn4+rs07IcYKae9hyNR5m8RhOlPJ6V/I/w+ZOytMW3Do3ZOx99GQCMNjj9c64v2/PL/zV6S5m3B1Ztvj2ww3HUaW79Hw1f5wyw/mDxYzKs4HWuAy9c8QuQV991nnna4n/CrgW+O1xPfxTy1Gm95jqvwXzIZH6dpvxfvfSzktc4CeOLA118zXBGl276swyHaum8Di3KSkCRMAX8afBpw3Orbaa0QAAPx2WuDS8lD5LuOrCjYeLADchBd/qmaW3PdWMbVupo3B2VTRo6ytPG8EBpR3Waaw0HGg40HBiZHOgykNMq+Jrz0Su+VFfej86CHEsqNBicsNlyC6RYluJbxDVOyVznX4IPEP8DC1zHcw5niy6HY6Ixc3LHvbp4NMqlB1KO5DgEc82RQy/aDklkBe7j9Suf633+LSR9os11Gh+O69KhHoDCtTzQdcABledfgIkvQstftoYCW368vKKRrw/JNl/u9flT0a8x6IN2yLg4juP+HjhQX5lM/IIIF8Bjr/+TP7wHA0jADp7yAsuRm22vABkac3nNEh0nd/inXzzgYC4TPutDnrqcqiW/skweATv+WJQVN4ufEMlYOQc0NmPI61mvOTYcaDjQcGBUcaABOU3sB2R+7QAADidJREFUqmFqpf5XINQZkEMDwIssD6dpawOs0Nhwxy+6c92TKcCRcXQsFYm5REOifMb0IVR5y80ktBVX81zpSzy6ctoGEEjAgRAGCUDUF+IAUHGNYzAJMBACIJ0mJ4CRZ3mJ91PO1iRamoxlA5BxwY92iUMxrv+BGSAJMDAGzp2nmabyxMubb8+eFQ0AGtAGEEncyvOsSkND85PhCjiG447fNXzVB9BlHHiLBvGUJKCGx2NgUhICQBwoPDQGQRbTCbW6wgkAOtqtJ0AUnQkKgUp1OTcDrnjtBbhocziVa1LDgYYDDQe+DQ40IKcBOd8KyKGpsDRDG9GaBLKjjagnAIPWhbaCYBVcEKBRP4U9Z2xcwmeSTytRTzQMhLxEowJoZeIhFahgREyoW07i1p89kAjV/pfqIIdtTR3kJDABPHg5FR9HQEmJpoddEY2QmD15naaH5kXiVK4eFRyYo3nRD8CR4Q+AFGBNeYBJ0EfaLPzBV7GUMgFu2pAEUaStyeQ+AHpi+OBfvW9l2Cyp37rs5DoX+RyeoYG2CLAxbgCRp133AiDNMArZZ3NsONBwoOHAqOLAdwbksBNh58J+pP038Itil8Ogl9ahsjf5cEh+W1m7s+paibpdSntbbHzeHVy18XZls8J2hlZCeUfnrw0YXNEx8Iv/6kdbjIfZuthmnm2nXU1F45vFxibz8qhd/SjDfoitjHolf+AXZWcV+5och7KMjuXb/YS+zPu2j53R5NByAC1iu2Si1WArQusgAGI9iSsj1kvdzoPwFK+H1kICYOqgBgCiVUl7GGWAI0tPkrKATiaCXkBMGgzLZQAGTQ3NC1CSQRYtV/lJ8mmLMiI0LZQ2LPWI1VMPAMiwmIEyAEUro3/LUZaqgB+AATDjIj6T2ECiSot9pK6x0CzRSFkmsgxFqyLaszhEQA7eZeivPE+QQ8tTj4vExTxNDoCnDsBTT8CK+EL6rdv4iLcEdNFOoQHosoxWL8MmCS0ModXP+9uqFar31/zfcKDhQMOBkcmB7wzIAWTueejJOPSIY4vzv733OyB4/OUNmVBndPv8qwOKF2Vl9j/wkFBm7/0OjL9ceEUBAQkEgBA7tapyh7aX46HZDqbrbukdhxxxTNl5BHDk7it+ZS649Oq464HHY98//LHUO+jQI8s28zzny8YWdLufhKDgYdluKkEzGTEz+hWAVN/oTxrPOPuCtvzKm/PVN94eBx5yeMnXziVXVj5ycgyMjS+8/No48NAjitM+1zPvuwByTGJf/ZargAfaG5oS8WQYzdKA1FMGtLMEoyw39eeeW9mEZBRi0ZotK4msDCiwmSGkgRp1ABPLPbk8BuAIdkjoy0eLmJ6EMMAh4CLQoi8RhRkpS4yO/SQgh3YkQQ6aCHZLVMcfX4EdYIsmxLINrU8aKQMF6ku0H5aJgLh6AgxonsYaa4hBMhsZ4BD4wCs2QyKN0+QAEzQqGV06z3M3mCVAEbbRZ8z4Y3xSgjtLWvLwzZJeLgcKFwBoAk6AlujZbHvQIJwAeyfLh4KIuqeui6WUgQ1dU1/dJjUcaDjQcGBUcOA7A3JoY84858Liu6XbhBPGvPMvUEIRTDjRRLHYEj+J62/tE28P/KJs7+bfZcqppop5518w5p53vtjzd1Uoh9yt9eYHn8X2O+9a2uJgkJO8ueeZr2yrps3hn0cbflXogy9LOIbJevQoIRtELedMUPgDHoWVm3GmmUt/hx5xXLsH4e7dJ40FF+5ZaBEr6piTTouPvvh3bLH19qXOVFNPU8ahb9vm7ey6+/7H46drrFWCgZZ4W/MvWIKVTj/DjCXEhF1jgBivyPwE6RsPgCjan28b4Ogf2Ors7ipCEUAAUFKYWs6xZFRPlmsAIIm2xw4kdVrLCdxXb0t5QQxda921xEZHXwLwyWdsXE+WxVx3RFtuDwdO/CQggu0OcEL4i1CdgEI+0NOjRwW4nFuiSmBB83LDDRGXXlpFosaLjpKlLEtGrSnHpX92OwkeaFdyCU8d58aaCZjp3bsaW0f2MnffXeUxGK5rXfAnbXCyraSBPU/65lHHOd4xkM6Eh+rX28y85thwoOFAw4Gu4MB3BuTQ1GQsrF332Ltsb35twMclyCRBv8xyKxZNDu2I8wsuu7p4P/70H1G2jOdSECFs+zWQA6CIQv6viBj8tyhxpmhtttpup5hhpplC4MtZZp2thIQQsFPQzWWXXyn49QFILCetsNIqAfzc1uf+EnPrnYGft4eZOPK4k8s9u+yamwtNq6+1bnFQKKYUGi+75qb4R0R8/FUUmp547tXgDXnccceNo084pSxDff6vKO2KxdX7nkeKVsmWcME8RU4/+PBjSvT1bbbfqfJzM4LeibsCFHUG5DAytoRCO2LJxo9th2vsO2g//J8/19jGOGcgTPuijms0ClmOjY3r2m0tq466WVZ/fvrKtjKP1iHb0odf0pf1lNW3ctkubRBtRbZjeYxmJ8+VZUNjqWfGGauf5SLLUVmmfgSY2CfZ+VW/rj80J93oowlTxnjwK8s7T9pd83+9bp1/xp15+JVtqscOp35f1Mv7UOdtvQ3jTTr0m7QlIOuKl1rTZsOBhgMNB5ID30mQIxZWLv1wKrjammsXb8g333lPcQIIQPCazDMyb8C3/vW+oRzaATkc6ilHi0Nz8rNfbFyioNOGbLntjsUr8xXX3hw8HW+93U7FWaBwB8utsHKJc2XZiUaFZ+BJJ5ssrru5d7HX4Sfnj4cdWQAUD8zrrPfzApYEBLWUJbwFJ3v6XmChnrHq6mvGuj/7RVmKu+rG28t1dANdl1x1Q6y4yk9jrXXXj6223SGuvenOAsQeevK5oqESQoJXYxHdhWWwjIYvXQFcRqTNzoAcyzdsOca0H80OjU6Oy/9Snju2LknJZ79SL5P/W56TxiR+GVOjzanua/O34UDDga7lwHcS5Oy0y+5FawGQCIy59HIrlPhMt931QDvIWWqZ5WKzLbYukcF73/Nw8Z6cghrIEYwS0BARHViwRMVLcYIcgOahJ56NM865sGhMeAYWUDNBTnpjTpADgFhSq4McYSKEZtDPFttsXyKnf/jpPwtocm2Z5VcsnpRpdh547Jniudl1ISs++uI/JTL75ltuE/MvuHBpg33RoC/+U8IzKLfkUssUsGZJzjkvym+8/+l3AuR07bRuWm840HCg4UDDgYYDEd8pkCMAJ2EuTIPdSGxsGN66ttY6PytajH3/cHA5/8uFl8cX/46iOQFIWperhF4Ye6yxotd5F8eXESWmk51RlqtocqafYYboc/9jZZfUhptuXmx2Zpl19hJ/S+iEBDnLLLdCsZ+pg5wDDj680HDYUceH5TJgC43HnHhqCfC5xdbblfMLr7g2Pv9nxAef/KOEuRCyoeeii8cPvv+DYqz84hsfxJf/ifbYXPvsf1DZAUZLNcVUU5U4WkDWGmuvGxNP0j1mnGmWuO/R/t+6Nqczmpzm4Ws40HCg4UDDgYYDXc2B7wzIoSVJmxwBKxniTjPtj6NHj8mr5Z6H+5Ut3nv97g8FQEw8ySSlzHTTzxBbbbNDMYZtNzyuaXImmnjimH7GmeLH080QW26zQ9EQbbblNjHFlFOWiOfsbu59pH/MPc+8pd2VVl29LF1ZFrKlffEllypLRdfceEfR4gBfdnYBNb/7/R/jo8//HXf0fagsaQkuCkRtv/NvSr5gpcah74023byEX7DktOba64Wo4QKb0iihkZHymede1M6DvfY9oAAm4Rxofezi0uee+/y+hHQANFJzNaqPDcjp6se2ab/hQMOBhgMNBzrDge8MyAEOHnj8mRJw86RTzyoBKE845cyyq0hsJ1uqgRhLU4JynnDymaUM7cklV95QBH4Kfm3d2fehqtwpyp1StCy2aWvjptvvjvMvuSqeePaVcv7SWx9G73sfCVvIbT1XRlt+V1x3S5xzwWXxyFMvFgCjbTRY5upz36MlTpedRtfcdEeg+/FnXok7+j5Y+j7+5DPaabzgsmtKfbY+fvoxPrSJ5q5/oEoU9bPOuyQeeuK5soMJgEGPwJ6W1Gw9T/pGNbjJ/hqQ05lHrynTcKDhQMOBhgNdzYHvDMix3AQs2FnU/vvgs/bglQSsMjQs7fltZRknpwDuTDl2PgJccr6Xy1xAlHYtadXbYoPz5vufFGChbDsNH3xWbHCyvnICewIAlrpaaZSfZZWxm0x55dgQAT76NT5OCVsDgDqv6KvK1Wkc1f83IKerH9um/YYDDQcaDjQc6AwHvjMgZ1QL6qa//z2gaANyOvPoNWUaDjQcaDjQcKCrOdCAnCZ21VCaqZEB7hqQ09WPbdN+w4GGAw0HGg50hgMNyGlATgNyOvOkNGUaDjQcaDjQcOA7x4EG5DQgpwE537nHtiG44UDDgYYDDQc6w4EG5DQgpwE5nXlSmjINBxoONBxoOPCd40ADchqQ04Cc79xj2xDccKDhQMOBhgOd4UCHIOejgQNjjTXXjlffGVyCUNqy3PwaHnR2DtjK/s5HX8ba6/wsPvn4487Mw6ZMw4GGAw0HGg40HBjpHLjuuutin332aW93LP8RTAssuFAcfsyf45gTT4ujjj+l+TU86PQcOPqEU+OYk04PAUpPPvnkuPTSS5tfw4NmDjRzoJkDzRwY5XNgxx13/G+Q85///Cd69+4dV1xxeVxxefNrePC/zYHrr78+Lr/88lE+qRtQ1YDKZg40c6CZA80cMAeuuuqquOOOO+LBBx+Mfv36RdHktOt1mn8aDjQcaDjQcKDhQMOBhgPfYQ70798/Xn311fjnP//ZgJzv8H1sSG840HCg4UDDgYYDDQdaOPD444/H22+/Xa7+P5XInDXOQ3ETAAAAAElFTkSuQmCC" 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<br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com1tag:blogger.com,1999:blog-2554711682501140082.post-86069154478155062372020-07-03T09:20:00.002-07:002020-07-03T09:20:17.769-07:00para grado 8-4 <a href="https://meet.google.com/gyw-tyfp-kmy">https://meet.google.com/gyw-tyfp-kmy</a><br />
viernes a las 11: 20.Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-44697857319026902522020-07-03T08:50:00.002-07:002020-07-03T08:50:22.531-07:00para grado 8.6 la reunión es de 10:20 a 11:10<br />
<a class="DbQRg" href="https://meet.google.com/linkredirect?authuser=1&dest=https%3A%2F%2Fmeet.google.com%2Fpoi-seiz-qfm%3Fauthuser%3D1" rel="nofollow noopener noreferrer" style="-webkit-tap-highlight-color: transparent; background-color: white; color: #3367d6; font-family: Roboto, arial, sans-serif; font-size: 13px; white-space: pre-wrap;" target="_blank">https://meet.google.com/poi-seiz-qfm</a>.<br />
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<br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-33404226062416206052020-06-17T18:36:00.001-07:002020-07-02T08:01:09.471-07:00<table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0cm 5.4pt 0cm 5.4pt; mso-yfti-tbllook: 1184;">
<tbody>
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<td colspan="3" style="background: #D9E2F3; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 321.9pt;" valign="top" width="537"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;">NOMBRE DEL DOCENTE: Cristóbal
Fernández Gálviz<o:p></o:p></b></div>
</td>
<td style="background: #D9E2F3; border-left: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 119.5pt;" valign="top" width="199"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;">GRADO:7<o:p></o:p></b></div>
</td>
</tr>
<tr style="mso-yfti-irow: 1;">
<td colspan="3" style="background: #D9E2F3; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 321.9pt;" valign="top" width="537"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;">ASIGNATURA: Estadística</b><o:p></o:p></div>
</td>
<td style="background: #D9E2F3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 119.5pt;" valign="top" width="199"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;">No. GUÍA:1</b><o:p></o:p></div>
</td>
</tr>
<tr style="height: 16.4pt; mso-yfti-irow: 2;">
<td style="background: #D9E2F3; border-top: none; border: solid windowtext 1.0pt; height: 16.4pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" valign="top" width="189"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;">PERIODO: I<o:p></o:p></b></div>
</td>
<td style="background: #D9E2F3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 16.4pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 147.8pt;" valign="top" width="246"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;">SEMANA DEL PERIODO:<span style="mso-spacerun: yes;"> </span>No.<span style="mso-spacerun: yes;">
</span>15<span style="mso-spacerun: yes;">
</span><o:p></o:p></b></div>
</td>
<td colspan="2" style="background: #D9E2F3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 16.4pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 180.1pt;" valign="top" width="300"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;">FECHA:<span style="mso-spacerun: yes;"> </span>DEL<span style="mso-spacerun: yes;">
</span>5<span style="mso-spacerun: yes;"> </span>DE Junio<span style="mso-spacerun: yes;"> </span>AL 6<span style="mso-spacerun: yes;"> </span>DE Julio<o:p></o:p></b></div>
</td>
</tr>
<tr style="height: 27.3pt; mso-yfti-irow: 3;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b style="mso-bidi-font-weight: normal;">DBA
<o:p></o:p></b></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: justify;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Arial;">Usa el principio multiplicativo en situaciones<span style="mso-spacerun: yes;"> </span>aleatorias sencillas y lo representa con
tablas,<span style="mso-spacerun: yes;"> </span>diagramas de árbol.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
</td>
</tr>
<tr style="height: 27.3pt; mso-yfti-irow: 4;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b style="mso-bidi-font-weight: normal;">COMPETENCIAS
Y EVIDENCIAS<o:p></o:p></b></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: -.35pt; margin-right: 0cm; margin-top: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Arial;">Usa el principio
multiplicativo para calcular el número de resultados posibles.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
</td>
</tr>
<tr style="mso-yfti-irow: 5;">
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b style="mso-bidi-font-weight: normal;">TEMA<o:p></o:p></b></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<br /></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 8.55pt; margin-right: 0cm; margin-top: 0cm; text-align: justify;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Arial;">Experimentos Aleatorios<span style="mso-spacerun: yes;"> </span>Espacio Muestral<span style="mso-spacerun: yes;"> </span>Sucesos Aleatorios<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 8.55pt; margin-right: 0cm; margin-top: 0cm; text-align: justify;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Arial;">Experimentos con sucesos<span style="mso-spacerun: yes;"> </span>PROBABILIDAD<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
</td>
</tr>
<tr style="height: 60.05pt; mso-yfti-irow: 6;">
<td style="background: #D9E2F3; border-top: none; border: solid windowtext 1.0pt; height: 60.05pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b style="mso-bidi-font-weight: normal;"><span style="background: #D9E2F3; mso-shading-themecolor: accent5; mso-shading-themetint: 51;">EXPLICACION DEL TEMA</span><o:p></o:p></b></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<br /></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 60.05pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Experimento aleatorio:</span><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 10.5pt;"> </span><span style="background: white; color: #5f6368; font-size: 9.0pt;">experimentos cuyo resultado es incierto</span><span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Suceso: Realizar el experimento, desarrollar la acción<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Evento: Resultado del Suceso.( uno de los posibles resultados)<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Espacio Muestral: Es el conjunto de todos los posibles eventos.(
resultados)<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Probabilidad: <span style="background: white;">es una medida del
grado de certidumbre de que dicho evento pueda ocurrir</span></span><span style="background: white; font-family: "arial" , sans-serif; font-size: 10.5pt;">.</span><span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">se Calcula multiplicando por 100 el cociente entre los
eventos favorables sobre el total de eventos.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Ejemplo:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Cual es la probabilidad de sacar en la suma de
dos dados 7, al lanzar los?<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">La suma de los dados son: {
2,3,4,5,6,7,8,9,10,11,12}, <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Pero la forma en que salga cada resultado se hace
por medio de pares ordenados así <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Espacio muestral:
{(1,1),(1,2),(1,3),(1,4)(1,5),(<b style="mso-bidi-font-weight: normal;">1,6</b>),(2,2),(2,3),(2,4),(<b style="mso-bidi-font-weight: normal;">2,5</b>),(2,6),(3,3),(<b style="mso-bidi-font-weight: normal;">3,4</b>)(3,5),(3,6),(4,4),(4,5),(4,6),
(5,5), (5,6), (6,6) }.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">De este espacio muestral hay que mirar cuantos
suman 7, esos son los eventos favorables.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">P = 100 (3 / 21),<span style="mso-spacerun: yes;"> </span>P = 14,28,<span style="mso-spacerun: yes;"> </span>es decir que la probabilidad de sacar 7 al
lanzar dos dados es del 14,28 %. <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
</td>
</tr>
<tr style="height: 97.75pt; mso-yfti-irow: 7;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 97.75pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<br /></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b style="mso-bidi-font-weight: normal;">ACTIVIDAD
A DESARROLLAR<o:p></o:p></b></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<br /></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 97.75pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-add-space: auto; mso-list: l0 level1 lfo1; text-indent: -18.0pt;">
<!--[if !supportLists]--><span style="mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><span style="mso-list: Ignore;">1.<span style="font: 7.0pt "Times New Roman";"> </span></span></span><!--[endif]-->De
cuantas formas diferentes se puede vestir Susana, si tiene tres faldas de
diferente color, 5 blusas de diferente color y cuatro pares de zapatos
diferentes.<o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-add-space: auto; mso-list: l0 level1 lfo1; text-indent: -18.0pt;">
<!--[if !supportLists]--><span style="mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><span style="mso-list: Ignore;">2.<span style="font: 7.0pt "Times New Roman";"> </span></span></span><!--[endif]-->Para
ir a Búga, desde Palmira. hay tres rutas de Palmira a El Cerrito dos rutas de
El Cerrito a Guacarí y una de Guacarí a Búga. De cuantas formas se puede
llegar de Palmira a Buga? <o:p></o:p></div>
<div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-add-space: auto; mso-list: l0 level1 lfo1; text-indent: -18.0pt;">
<!--[if !supportLists]--><span style="mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><span style="mso-list: Ignore;">3.<span style="font: 7.0pt "Times New Roman";"> </span></span></span><!--[endif]-->Que
probabilidad que al lanzar, dos dados salga 10.<o:p></o:p></div>
<div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-add-space: auto; mso-list: l0 level1 lfo1; text-indent: -18.0pt;">
<!--[if !supportLists]--><span style="mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><span style="mso-list: Ignore;">4.<span style="font: 7.0pt "Times New Roman";"> </span></span></span><!--[endif]-->Si
dentro de una bolsa oscura, se introducen tres bolas Rojas, Dos bolas Azules
y tres Verdes, que probabilidad hay que al sacar dos bolas la segunda sea
Azul. <o:p></o:p></div>
</td>
</tr>
<tr style="height: 64.7pt; mso-yfti-irow: 8; mso-yfti-lastrow: yes;">
<td style="background: #D5DCE4; border-top: none; border: solid windowtext 1.0pt; height: 64.7pt; mso-background-themecolor: text2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b style="mso-bidi-font-weight: normal;">FECHA
DE DEVOLUCIÓN AL DOCENTE Y FORMA DE ENTREGA<o:p></o:p></b></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 64.7pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="mso-spacerun: yes;"> </span>Esta actividad es para
desarrollar en dos semanas desde el 16 de junio hasta el 30 de Junio para
entregar el Lunes 6 de Julio.<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
A<span style="mso-spacerun: yes;"> </span>mi correo <a href="mailto:cristobalfernandezgalviz@rafforivera.eu.co">cristobalfernandezgalviz@rafforivera.eu.co</a><span class="MsoHyperlink">.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span class="MsoHyperlink">cristobalfg@yahoo.es.</span><o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
</td>
</tr>
<!--[if !supportMisalignedColumns]-->
<tr height="0">
<td style="border: none;" width="139"></td>
<td style="border: none;" width="274"></td>
<td style="border: none;" width="82"></td>
<td style="border: none;" width="233"></td>
</tr>
<!--[endif]-->
</tbody></table>
<br />
<table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0cm 5.4pt 0cm 5.4pt; mso-yfti-tbllook: 1184;">
<tbody>
<tr>
<td colspan="3" style="background: #D9E2F3; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 321.9pt;" valign="top" width="537"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>NOMBRE DEL DOCENTE: Cristóbal
Fernández Gálviz<o:p></o:p></b></div>
</td>
<td style="background: #D9E2F3; border-left: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 119.5pt;" valign="top" width="199"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>GRADO:8<o:p></o:p></b></div>
</td>
</tr>
<tr>
<td colspan="3" style="background: #D9E2F3; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 321.9pt;" valign="top" width="537"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>ASIGNATURA: álgebra</b><o:p></o:p></div>
</td>
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<b>No. GUÍA: 1</b><o:p></o:p></div>
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<b>PERIODO: I<o:p></o:p></b></div>
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<b>SEMANA DEL PERIODO: No.
15 , 16 , 17 , 18
<o:p></o:p></b></div>
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<b>FECHA: DEL 1
DE junio AL 30 DE Junio<o:p></o:p></b></div>
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<b>DBA
<o:p></o:p></b></div>
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Reconoce los diferentes usos y significados de las operaciones
(convencionales y no convencionales) y del signo igual (relación de
equivalencia e igualdad condicionada) y los utiliza para argumentar equivalencias
entre expresiones algebraicas<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><o:p></o:p></span></div>
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<b>COMPETENCIAS
Y EVIDENCIAS<o:p></o:p></b></div>
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Reconoce el uso del signo igual como relación de equivalencia de
expresiones algebraicas en los números reales. </div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
Propone y ejecuta
procedimientos para resolver una ecuación lineal y sistemas de ecuaciones
lineales y argumenta la validez o no de un procedimiento.</div>
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Usa el conjunto
solución de una relación (de equivalencia y de orden) para argumentar la
validez o no de un procedimiento.<o:p></o:p></div>
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<b><span style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial;">EXPLICACION DEL TEMA</span><o:p></o:p></b></div>
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<br /></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> </span>En clase
de matemáticas el profesor pidió a los estudiantes analizar tres expresiones
y hablar acerca de sus posibles relaciones. Las tres expresiones fueron:
a) x - 1 b )
4x+1 c) 5<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Carlos dijo: yo creo
que 4x +1 es mayor que X – 1. Porqué cuatro veces u número aumentado en uno
es mayor que ese mismo número disminuido en 1.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">José Dijo: Yo digo que cualquier expresión puede ser mayor o
menor que cualquiera de las demás, todo depende del número real que asuma
la variable.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">También puedo decir que 4x +1 = 5 y que x – 1 = 5 , lo que no estoy seguro es si puedo
aplicar la propiedad transitiva de la igualdad para concluir que como 5 = 5 entonces 4x +1
= x -1 .<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Propiedad transitiva:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Si una variable es igual a otra y está es también igual a otra
la primera y la tercera son iguales, así
X = V y V = J
entonces como V = x y V = J y V
= V, X debe ser igual a J.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Ejemplo X +3 = 5 y
3+2 = 5 como 5 = 5 entonces X+3 = 3 +2 <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Otro ejemplo.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">La mitad de un numero es 8
, pero 8 es la mitad de 16
así X / 2 = 8 y
8 = 16 / 2.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Como 8 = 8
entonces X / 2 = 16 / 2 <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Resolver una ecuación de grado uno,( cuando la variable no tiene
exponente). Es hallar el valor de la variable que hace que la igualdad se
cumpla.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Por ejemplo. De lo que dijo josé X -1 = 5
para resolverlo se aplica la propiedad uniforme de la igualdad que
dice que si se suman dos igualdades termino a termino da otra igualdad. Así:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">X-1 = 5<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> 1 = 1<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">____________<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">X - 1+ 1 = 5 + 1 sumando -1 con 1 de cero quedando <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> X =
6 <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Y con la otra ecuación 4X+1 = 5,
para resolverla primero sumo - 1 así<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">4X +1 = 5<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> -1 = -1<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">_____________<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">4X+1 -1 = 5 -1
se cancelan los 1 y -1 y
se resta 5 -1 <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> 4X = 4 ahora pregunto que número por 4 da
4 y es el 1 así x = 1 ó<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">
Divido por 4 ambos miembros de la igualdad. Quedando así:<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">4X / 4 = 4 / 4
al dividir 4 entre 4 da 1
entonces queda que X = 1.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> X =
1<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">La propiedad uniforme de la igualdad dice que se puede sumar,
restar, dividir y multiplicar ambos miembros de una igualdad por un mismo
número y la igualdad continua.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> Por ejemplo:<o:p></o:p></span></div>
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<br /></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">4X = 12 si divido ambos miembros de la igualdad por 4 queda así:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">4X/ 4 = 12 / 4
entonces hago las divisiones 4 /
4 = 1 12 / 4 = 3<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 18.0pt; margin-right: 0cm; margin-top: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">1X
= 3 como 1 por cualquier numero queda
el mismo número entonces escribo X = 3 .<o:p></o:p></span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Otro ejemplo:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> X/ 3 = 5 si multiplico ambos miembros
de la igualdad por 3 queda:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">3 X / 3 = 3 .( 5 )
divido 3 / 3 es 1 y 3 por 5
es 15<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> 1.X = 15 luego<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> X = 15 porqué 1 .X es X.<o:p></o:p></span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> </span><o:p></o:p></div>
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<br /></div>
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<br /></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b>ACTIVIDAD
A DESARROLLAR<o:p></o:p></b></div>
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<br /></div>
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1.Analiza los escritos de Carlos y José y presenta argumentos que
confirmen o refuten lo que ellos han hecho. Determina si José tiene razón al
dudar si aplica o no la propiedad transitiva. ¿De qué depende que la pueda
aplicar o no?<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
2.Intenta resolver estas ecuaciones: <o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
3x – 5 = 13 X / 5 = 4 -2X + 7 = 4 / 3.<o:p></o:p></div>
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<td style="background: #D5DCE4; border-top: none; border: solid windowtext 1.0pt; height: 64.7pt; mso-background-themecolor: text2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b>FECHA
DE DEVOLUCION AL DOCENTE Y FORMA DE ENTREGA<o:p></o:p></b></div>
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Esta actividad es para
desarrollar en dos semanas desde el 1 de junio hasta el 30 de Junio para
entregar el 6 de Julio.<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
A mi correo <a href="mailto:cristobalfernandezgalviz@rafforivera.eu.co">cristobalfernandezgalviz@rafforivera.eu.co</a><span class="MsoHyperlink">.</span><o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<o:p> cristobalfg@yahoo.es</o:p></div>
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<td style="border: none;" width="192"></td>
</tr>
<!--[endif]-->
</tbody></table>
<table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0cm 5.4pt 0cm 5.4pt; mso-yfti-tbllook: 1184;">
<tbody>
<tr>
<td colspan="3" style="background: #D9E2F3; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 321.9pt;" valign="top" width="537"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>NOMBRE DEL DOCENTE: Cristóbal
Fernández Gálviz<o:p></o:p></b></div>
</td>
<td style="background: #D9E2F3; border-left: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 119.5pt;" valign="top" width="199"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>GRADO:9<o:p></o:p></b></div>
</td>
</tr>
<tr>
<td colspan="3" style="background: #D9E2F3; border-top: none; border: solid windowtext 1.0pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 321.9pt;" valign="top" width="537"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>ASIGNATURA: Estadística</b><o:p></o:p></div>
</td>
<td style="background: #D9E2F3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 119.5pt;" valign="top" width="199"><div class="MsoNormal" style="line-height: 150%; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>No. GUÍA: </b><o:p></o:p></div>
</td>
</tr>
<tr style="height: 16.4pt; mso-yfti-irow: 2;">
<td style="background: #D9E2F3; border-top: none; border: solid windowtext 1.0pt; height: 16.4pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" valign="top" width="189"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>PERIODO: I<o:p></o:p></b></div>
</td>
<td style="background: #D9E2F3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 16.4pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 147.8pt;" valign="top" width="246"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>SEMANA DEL PERIODO: No.
15 y 16
<o:p></o:p></b></div>
</td>
<td colspan="2" style="background: #D9E2F3; border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 16.4pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 180.1pt;" valign="top" width="300"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b>FECHA: DEL 1
DE junio AL 15 DE Junio<o:p></o:p></b></div>
</td>
</tr>
<tr style="height: 27.3pt; mso-yfti-irow: 3;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b>DBA
<o:p></o:p></b></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: justify;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Propone un diseño estadístico
adecuado para resolver una pregunta que indaga<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: justify;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">por la comparación sobre las
distribuciones de dos grupos de datos, para lo cual usa<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: justify;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">comprensiva-mente diagramas de caja, medidas
de tendencia central, de variación<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">y de localización.<o:p></o:p></span></div>
</td>
</tr>
<tr style="height: 27.3pt; mso-yfti-irow: 4;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b>COMPETENCIAS
Y EVIDENCIAS<o:p></o:p></b></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 27.3pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span lang="ES" style="font-size: 9.0pt; mso-ansi-language: ES; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Resuelvo y formulo
problemas seleccionando información relevante en conjuntos de datos
provenientes de fuentes diversas.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span lang="ES" style="font-size: 9.0pt; mso-ansi-language: ES; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Reconozco tendencias
que se presentan en conjuntos de variables relacionadas.</span><o:p></o:p></div>
</td>
</tr>
<tr>
<td style="border-top: none; border: solid windowtext 1.0pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b>TEMA<o:p></o:p></b></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<br /></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-font-size: 10.0pt; mso-bidi-theme-font: minor-latin;">Definición y cálculo de las medidas de tendencia central para datos
agrupados.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-font-size: 10.0pt; mso-bidi-theme-font: minor-latin;">Tabla de distribución de frecuencia
para datos agrupados.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-font-size: 10.0pt; mso-bidi-theme-font: minor-latin;">Cálculo de mediadas de variación, localización y su
interpretación.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
</td>
</tr>
<tr style="height: 60.05pt; mso-yfti-irow: 6;">
<td style="background: #D9E2F3; border-top: none; border: solid windowtext 1.0pt; height: 60.05pt; mso-background-themecolor: accent5; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b><span style="background-attachment: initial; background-clip: initial; background-image: initial; background-origin: initial; background-position: initial; background-repeat: initial; background-size: initial;">EXPLICACIÓN DEL TEMA</span><o:p></o:p></b></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<br /></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 60.05pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Clase Modal: Es la clase que presenta mayor frecuencia</span><span style="font-family: "arial" , sans-serif; font-size: 10.0pt;">.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Marca de clase: El promedio de los limites de cada clase.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Clases: Cada uno de los intervalos.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Regla de Sturges: K = 1 + 3.32 log n. Permite calcular el total
de intervalos ( K ).<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Rango ( R ): La diferencia entre los datos mayor menos el menor.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Amplitud (A): es el ancho del intervalo. A = R / k<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Media ( ẍ): se calcula sumando los productos entre las marcas de
clase y sus frecuencias y dividiendo por el total de datos (n).<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Mediana (Me) = Mediana se
calcula mediante la formula:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> </span>Me= Li + ((n/2) - fi-1) / fi . A</div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> Li: limite inferior del intervalo de la
mediana.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Fi-1: es la frecuencia anterior a la frecuencia del intervalo de
la medina.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Fi: es la frecuencia del intervalo donde está la mediana.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Ai : es el ancho del intervalo.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Moda: se calcula mediante la formula:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> Mo= Li + (fi- fi-1) / ((fi-fi-1) +( fi-fi+1) . A </span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">, Fi+1 es la frecuencia siguiente a la
frecuencia del intervalo que tiene mayor frecuencia.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Ejemplo:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
para hacer una valuación de desempeño y dar ajuste de cuotas , se inspeccionó la venta de 40 vendedores, los datos fueron:</div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
7,8,5,10,9,5,12,8,6,10,11,6,5,10,11,10,5,9,13,8,12,8,8,10,15,7,6,8,8,5,6,9,7,14,8,7,5,5,14,10 </div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Para hacer la tabla de distribución de frecuencia con datos
agrupados sigo el siguiente orden:<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">1.Hallo el rango: R = 15
– 5 = 10, ( resto el dato mayor 15
menos el dato menor 5 )<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">2. determino el numero de intervalos: K = 1 + 3.32 log 40 = 1 +
3.32(1.602) <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> = 1 + 5,3186 =
6,31, <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> Como 3 está menor
5 se redondea a 6, es decir hago 6 clases
o intervalos.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">3.Calculo el ancho del intervalo dividiendo R entre K A= 10 / 6 = 1,666,<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> lo puedo redondear a 2 o trabajar con 1,67.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">4, el limite inferior de la primera clase es el dato menor.
Comienzo hacer la tabla.a ese limite le
sumo el ancho de la clase, es decir si quiero 2 o 1,67<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Así 5 + 1,67= 6.67, luego el otro intervalo lo inicio con el
limite superior del intervalo anterior, así la case dos comienza con 6.67, le
sumo 1,67 y hallo el limite superior, los limites superiores están con ] los
inferiores con ( , y se separan con ; <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Para hacer la marca de clase se hala el promedio de los limites
del intervalo así (5+6.67) / 2 = 5.835
, para las demás, solo voy sumando 1,67 que es el ancho del intervalo.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">La frecuencia se llena contando los datos que estén en cada
intervalo. <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Para la frecuencia acumulada, primero divido cada frecuencia en
el total de datos,<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">11/40= 0,275, y lo
multiplico por 100 para que quede en %
0,275 x 100= 27,5<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">12/40 = 0,3 0,3x
100= 30, y los voy sumando comienza por
12.5 luego 27,5 + 30 = 57.5, así sucesivamente.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
<table border="1" cellpadding="0" cellspacing="0" class="MsoTableGrid" style="border-collapse: collapse; border: none; mso-border-alt: solid windowtext .5pt; mso-padding-alt: 0cm 5.4pt 0cm 5.4pt; mso-yfti-tbllook: 1184;">
<tbody>
<tr style="height: 21.85pt; mso-yfti-firstrow: yes; mso-yfti-irow: 0;">
<td style="border: solid windowtext 1.0pt; height: 21.85pt; mso-border-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 114.25pt;" valign="top" width="190"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Clases<o:p></o:p></span></div>
</td>
<td style="border-left: none; border: solid windowtext 1.0pt; height: 21.85pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 56.6pt;" valign="top" width="94"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Marca de clase<o:p></o:p></span></div>
</td>
<td style="border-left: none; border: solid windowtext 1.0pt; height: 21.85pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 57.6pt;" valign="top" width="96"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Frecuencia absoluta<o:p></o:p></span></div>
</td>
<td style="border-left: none; border: solid windowtext 1.0pt; height: 21.85pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 71.8pt;" valign="top" width="120"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Frecuencia acumulada %<o:p></o:p></span></div>
</td>
</tr>
<tr style="height: 11.5pt; mso-yfti-irow: 1;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 11.5pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 114.25pt;" valign="top" width="190"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">(5; 6.67] (<span style="color: red;">5;7</span>]<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 11.5pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 56.6pt;" valign="top" width="94"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">5.835 <span style="color: red;">6</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 11.5pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 57.6pt;" valign="top" width="96"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">11 <span style="color: red;">66<o:p></o:p></span></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 11.5pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 71.8pt;" valign="top" width="120"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">27.5<o:p></o:p></span></div>
</td>
</tr>
<tr style="height: 10.9pt; mso-yfti-irow: 2;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 114.25pt;" valign="top" width="190"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">(6.67; 8.34<sup> </sup>] (<span style="color: red;">7;9</span>]<sup> <o:p></o:p></sup></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 56.6pt;" valign="top" width="94"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">7.505 <span style="color: red;">8</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 57.6pt;" valign="top" width="96"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">12 <span style="color: red;">96</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 71.8pt;" valign="top" width="120"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">57.5<o:p></o:p></span></div>
</td>
</tr>
<tr style="height: 10.9pt; mso-yfti-irow: 3;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 114.25pt;" valign="top" width="190"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">(8.34; 10.01] (<span style="color: red;">9;11</span>]<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 56.6pt;" valign="top" width="94"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">9.175
<span style="color: red;">10</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 57.6pt;" valign="top" width="96"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">9 <span style="color: red;">90</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 71.8pt;" valign="top" width="120"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">80<o:p></o:p></span></div>
</td>
</tr>
<tr style="height: 10.9pt; mso-yfti-irow: 4;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 114.25pt;" valign="top" width="190"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">(10.01; 11.68] (<span style="color: red;">11;13</span>]<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 56.6pt;" valign="top" width="94"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">10.845
<span style="color: red;">12</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 57.6pt;" valign="top" width="96"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">4 <span style="color: red;">48<o:p></o:p></span></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 71.8pt;" valign="top" width="120"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">90<o:p></o:p></span></div>
</td>
</tr>
<tr style="height: 10.9pt; mso-yfti-irow: 5;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 114.25pt;" valign="top" width="190"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">(11.68; 13.35] (<span style="color: red;">13;15</span>]<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 56.6pt;" valign="top" width="94"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">12.515
<span style="color: red;">14</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 57.6pt;" valign="top" width="96"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">3 <span style="color: red;">42</span>
<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 71.8pt;" valign="top" width="120"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">97.5<o:p></o:p></span></div>
</td>
</tr>
<tr style="height: 10.9pt; mso-yfti-irow: 6; mso-yfti-lastrow: yes;">
<td style="border-top: none; border: solid windowtext 1.0pt; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 114.25pt;" valign="top" width="190"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">(13,35; 15.02] (<span style="color: red;">15;17</span>]<o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 56.6pt;" valign="top" width="94"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">14.185
<span style="color: red;">16</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 57.6pt;" valign="top" width="96"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">1 <span style="color: red;">16</span><o:p></o:p></span></div>
</td>
<td style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 10.9pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 71.8pt;" valign="top" width="120"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">100<o:p></o:p></span></div>
</td>
</tr>
</tbody></table>
<div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: right;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Los datos en rojo son si se usa 2 como ancho del intervalo.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">La media es sumar los datos en rojo de la marca de case que
resultaron de multiplicar la frecuencia por la marca de clase) y dividirla
por el total de datos así <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> ẍ = 358 / 40 = 8,95<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Para saber la clase de la mediana, divido el total de datos en
2, <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">40 / 2 es 20, sumando
las frecuencias hasta que e 20 o se pase, hasta la clase 2 hay 14 datos, y en
la clase 3 llega a24, es decir que el 20 está en la clase 3, así la clase de
la mediana es la clase 3. Entonces Fi es 9, Fi -1 es12 y fi +1 es 4, <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Me= Li + ((n/2) - fi-1) / fi . A</span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> Li = 9<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> Me = 9 + ((20 -12) / 9 )
x 2<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Me = 9 + 16/9 Me = 9 +
1.778 Me = 10.778<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Como este valor está entré
9 y 11 la respuesta esta bien.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">La moda: Mo: <o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> Mo = Li + (fi - fi -1 ) / (fi- fi-1)+( fi-f-+1) . A </span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"><br /></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;"> primero veo la mayor frecuencia, 12 está
en el intervalo 2 es decir la clase
modal es la Clase modal 2, Li = 7<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Fi=12, Fi+1 = 9, Fi-1 = 11.<o:p></o:p></span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Mo = 7 + (( 12 – 11) / ((12 – 11)+(12-9))x 2 Mo= 7+ (1/1+3)x2<o:p></o:p></span></div>
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<span style="font-size: 9.0pt; mso-bidi-font-family: Calibri; mso-bidi-theme-font: minor-latin;">Mo= 7 + 1/4, Mo=
7,25, como la moda está entré 7 y 9
está bien. <o:p></o:p></span></div>
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<br /></div>
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<td style="border-top: none; border: solid windowtext 1.0pt; height: 97.75pt; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<br /></div>
<div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b>ACTIVIDAD
A DESARROLLAR<o:p></o:p></b></div>
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<br /></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 97.75pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
Copia la guía en el cuaderno y resuelve. apóyate en los vídeos.<o:p></o:p></div>
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<a href="https://www.youtube.com/watch?v=5z-jDh0H-Ik">https://www.youtube.com/watch?v=5z-jDh0H-Ik</a>,
vídeos de tabla de frecuencia para datos agrupados. <o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<a href="https://www.youtube.com/watch?v=eX_-LMIKFlY">https://www.youtube.com/watch?v=eX_-LMIKFlY</a><o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<a href="https://www.youtube.com/watch?v=CuKr7GzohbI">https://www.youtube.com/watch?v=CuKr7GzohbI</a>.<o:p></o:p></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<a href="https://www.youtube.com/watch?v=oH3hTV53TdU">https://www.youtube.com/watch?v=oH3hTV53TdU</a>,
Moda, mediana y media de datos agrupados.<o:p></o:p></div>
22,19,,16,13,18,15,|5,16,20,3,15,18,20,14,15,16,15,13,18,15<br />
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
Realizar la
tabla de distribución de frecuencia para datos agrupados con los datos
anteriores, y calcular, la clase modal y la moda, la mediana y a media.<o:p></o:p></div>
</td>
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<tr style="height: 64.7pt; mso-yfti-irow: 8; mso-yfti-lastrow: yes;">
<td style="background: #D5DCE4; border-top: none; border: solid windowtext 1.0pt; height: 64.7pt; mso-background-themecolor: text2; mso-background-themetint: 51; mso-border-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 113.5pt;" width="189"><div align="center" class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; text-align: center;">
<b>FECHA
DE DEVOLUCIÓN AL DOCENTE Y FORMA DE ENTREGA<o:p></o:p></b></div>
</td>
<td colspan="3" style="border-bottom: solid windowtext 1.0pt; border-left: none; border-right: solid windowtext 1.0pt; border-top: none; height: 64.7pt; mso-border-alt: solid windowtext .5pt; mso-border-left-alt: solid windowtext .5pt; mso-border-top-alt: solid windowtext .5pt; padding: 0cm 5.4pt 0cm 5.4pt; width: 327.9pt;" valign="top" width="547"><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
Esta actividad es para
desarrollar en dos semanas desde el 16 de junio para
entregar el Lunes 6 de Julio.<o:p></o:p></div>
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A mi correo <a href="mailto:cristobalfernandezgalviz@rafforivera.eu.co">cristobalfernandezgalviz@rafforivera.eu.co</a><span class="MsoHyperlink">.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span class="MsoHyperlink">cristobalfg@yahoo.es.</span><o:p></o:p></div>
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</td>
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<br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com1tag:blogger.com,1999:blog-2554711682501140082.post-58619677403328592832020-05-25T20:59:00.000-07:002020-06-01T09:43:43.116-07:00<div class="separator" style="clear: both; text-align: center;">
</div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">Link Para todos los grupos desde el martes hasta el viernes, para cada 15 días, con el mismo link según horario.</span></b></div>
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<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">9-3, 9-4, 9-5 <o:p></o:p></span></b></div>
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<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;"> <o:p></o:p></span></b></div>
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<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">meet.google.com/gmr-wnir-ajf · </span></b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 9.0pt; letter-spacing: 0.25pt;"><o:p></o:p></span></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #3c4043; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.15pt;">7:30 – 9:30am Martes 26 de mayo <o:p></o:p></span></b></div>
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<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">9-6<o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/xbv-zusn-fif <o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #3c4043; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.15pt;">11:00 – 11:45amMartes 26 de mayo</span></b><b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;"><o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">7-1<o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">meet.google.com/pdm-zhzd-zgo ·
<o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">7 - 7:45 Miercoles 27 de mayo<o:p></o:p></span></b></div>
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<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">8-7<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/vvi-kewf-kdx<o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 13.5pt; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; color: #3c4043; font-family: "arial" , sans-serif; font-size: 10.5pt; letter-spacing: 0.15pt;">8:00 – 9:00am Miércoles,
27 mayo<o:p></o:p></span></div>
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<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;">7-3<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/ieu-vfxx-dfm</span></b><b><span style="color: #70757a; font-family: "arial" , sans-serif; font-size: 14.0pt;"><o:p></o:p></span></b></div>
<div class="MsoNormal" style="line-height: 13.5pt; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="background: white; color: #3c4043; font-family: "arial" , sans-serif; font-size: 10.5pt; letter-spacing: 0.15pt;">27 mayo</span><span class="amqckf"><b><span style="background: white; color: #3c4043; font-family: "cambria math" , serif; font-size: 10.5pt; letter-spacing: 0.15pt;">⋅</span></b></span><span style="background: white; color: #3c4043; font-family: "arial" , sans-serif; font-size: 10.5pt; letter-spacing: 0.15pt;">9:30 –
10:15am.<o:p></o:p></span></div>
<div class="MsoNormal" style="line-height: 13.5pt; margin-bottom: .0001pt; margin-bottom: 0cm;">
<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #3c4043; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.15pt;">7-4<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/toa-dprp-rpw<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">27 Mayo de 11-12am<o:p></o:p></span></b></div>
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<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">8-3<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/zqn-poqg-syu<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">jueves 28 Mayo 8-9 am</span></b><b><span style="color: #70757a; font-family: "helvetica" , sans-serif; font-size: 14.0pt;"><o:p></o:p></span></b></div>
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<br /></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">9-7<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/ivd-fgrt-yhs<o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">Viernes 29 de 7-8am<o:p></o:p></span></b></div>
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<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt; tab-stops: 367.8pt;">
<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">7-2 <o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/qko-qaki-yvy<o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">Viernes 29 8:30 a 9:30am<o:p></o:p></span></b></div>
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<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">7-5<o:p></o:p></span></b></div>
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<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">meet.google.com/cjg-wwfa-eup<o:p></o:p></span></b></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
<b><span style="background: white; color: #5f6368; font-family: "arial" , sans-serif; font-size: 14.0pt; letter-spacing: 0.25pt;">Viernes 29 de 10 -11<o:p></o:p></span></b></div>
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<br /></div>
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<br /></div>
<div class="MsoNormal" style="margin-bottom: .0001pt; margin-bottom: 0cm; mso-line-height-alt: 13.5pt;">
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<br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-51170307982729149012020-03-24T20:22:00.001-07:002020-05-01T17:19:06.702-07:00Estadística grado novenoCordial saludo. la idea es repasar los temas vistos y hacer un pequeña actividad.<br />
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Reforzar los temas vistos, sobre caja y bigotes, y valores atípicos, puede ver los siguientes vídeos:<br />
<a href="https://www.youtube.com/watch?v=9Gk1uFYe--o">https://www.youtube.com/watch?v=9Gk1uFYe--o</a>. vídeo de Jorge ferreire.<br />
<br />
<a href="https://www.youtube.com/watch?v=9Gk1uFYe--o">https://www.youtube.com/watch?v=9Gk1uFYe--o</a>. Vídeo de valores atípicos.<br />
<br />
<a href="https://www.youtube.com/watch?v=lM9q0LCl5yY">https://www.youtube.com/watch?v=lM9q0LCl5yY</a> interpretación de caja y bigotes.<br />
<br />
Para los siguientes datos realiza el diagrama de caja y bigotes.<br />
<span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;">1, 3, 3, 4, </span><span style="background-position: 0px 0px; border: 0px; color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px; font-weight: bold; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">5</span><span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;">, 7, 7, 7, 9.</span><br />
<span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;"><br /></span>
<span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;">1, 2, ,2, 3, 3 .5, 6, 7, 9</span><br />
<span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;"><br /></span>
<span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;">Compara los dos diagramas y escribe una conclusión. </span><br />
<span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;">Encuentra valores atípicos, si los tiene.</span><br />
<span style="color: #4a4848; font-family: "open sans" , sans-serif; font-size: 19px;"><br /></span>
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<br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com7tag:blogger.com,1999:blog-2554711682501140082.post-55202382084291637572020-03-24T20:01:00.000-07:002020-05-01T17:14:00.414-07:00Algebra grado octavoPara grado 8°<br />
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Repasa la ubicación de los números irracionales, observa el siguiente video:<br />
<a href="https://www.youtube.com/watch?v=alzItrqvPhI&t=441s">https://www.youtube.com/watch?v=alzItrqvPhI&t=441s</a>.<br />
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Representa:<br />
Raíz cuadrada de 7, 28, 54, 96 y 234<br />
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ubica en una misma recta numérica los siguientes números Reales:<br />
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2 : 3, 3 : 4, 5 : 6 8 : 5, 5 : 4, 4 : 3<br />
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0.25, 0,35, 0.43, 1 : 6 , 2 : 5, 3 : 7.<br />
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- 3, - 2, - 5 : 2, 5 : 3 , 3 : 4 , 0,<br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">Álgebra: Parte de la matemática que trata de generalizar los casos particulares, utilizando letras ( denominadas Variables) para representar cantidades conocidas o desconocidas. </span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">Para familiarizar con el lenguaje algebraico, puedes ver el vídeo:</span><br />
<a href="https://www.youtube.com/watch?v=DV3C_RawfBg">https://www.youtube.com/watch?v=DV3C_RawfBg</a>.<br />
<span style="font-size: large;"><br /></span>
<a href="https://www.youtube.com/watch?v=KMxn6817nJA">https://www.youtube.com/watch?v=KMxn6817nJA</a>.<br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">Escribe en lenguaje algebraico los siguientes enunciados:</span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">a) Si n es un número Natural, escribe el siguiente de un número natural.</span><br />
<span style="font-size: large;">b) José tiene el doble de la edad de su hijo aumentado en cinco años.</span><br />
<span style="font-size: large;">c) El costo de una cantidad de docenas de uvas es 12.000</span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">Termino Algebraico.</span><br />
<a href="https://www.youtube.com/watch?v=92hxqyzQRv4">https://www.youtube.com/watch?v=92hxqyzQRv4</a>.<br />
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<span style="font-size: large;"><br /></span>
<span style="font-size: large;">Puede ser representado por un número, una letra, o la combinación de números y letras separados por operaciones de Multiplicación , división,y puede tener exponente las variables.</span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">Las partes de un termino algebraico son:</span><br />
<span style="font-size: large;">a) El signo, Positivo (+) o negativo (-) , al ser positivo no se le coloca signo.</span><br />
<span style="font-size: large;">b) El coeficiente: Es la parte numérica, o la letra que representa a los números que llegan a ser constantes, representadas por las primeras letras del alfabeto, (a,b,c,d)</span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">c) La variable: llamada también Literal, es la letra generalmente las ultimas del alfabeto (x,y,z) </span><br />
<span style="font-size: large;"> El Exponente: es el número que esta de super indice (sobre) las variables , indican el grado del termino algebraico.</span><br />
<span style="font-size: large;">completa la tabla:</span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">termino signo Coeficiente literal grado.</span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">- ax </span><br />
<span style="font-size: large;"> + 3 y 5</span><br />
<span style="font-size: large;"> - 4 z 3</span><br />
<span style="font-size: large;"><br /></span>
<span style="font-size: large;">Terminos algebraicos.</span><br />
<a href="https://www.youtube.com/watch?v=92hxqyzQRv4">https://www.youtube.com/watch?v=92hxqyzQRv4</a>.<br />
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Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com8tag:blogger.com,1999:blog-2554711682501140082.post-90765186411567192502020-03-24T18:51:00.002-07:002020-05-01T16:40:27.919-07:00Cordial saludo.<br />
Para grado séptimo estadística:<br />
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Repasa las definiciones y aplicaciones de las medidas de tendencia central, moda, mediana y media,<br />
puedes observar el siguiente vídeo:<br />
<a href="https://www.youtube.com/watch?v=JwsfkIy6B_o">https://www.youtube.com/watch?v=JwsfkIy6B_o</a>.<br />
<br />
Determina la moda la mediana y la media para los datos,<br />
La nota de estadística para algunos estudiantes de 7° fueron:<br />
3, 3.5, 4, 2, 2.5, 3, 3.5, 4, 3, 4.5, 5, 4.5, 3, 2, 3, 4.<br />
<br />
Refuerza tu conocimiento en cuanto a las Tablas de distribución de frecuencia, viendo el siguiente video:<br />
<a href="https://www.youtube.com/watch?v=cyXenZEbGz4&t=22s">https://www.youtube.com/watch?v=cyXenZEbGz4&t=22s</a>.<br />
<br />
Realiza la tabla de distribución de frecuencia para la siguiente situación.<br />
Se preguntó a los estudiantes de 7° sobre el número de hermanos y las respuestas son:<br />
1, 1, 2, 3, 3, 2, 4, 1, 1, 2, 4, 5, 3, 2, 4, 5, 2, 1, 2, 1, 0, 0, 1, 2, 2, 0, 2, 3, 3, 1, 1, 1.<br />
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Revisa los conceptos de moda mediana y media para datos agrupados.observa el siguiente vídeo:<br />
<a href="https://www.youtube.com/watch?v=kek-jrOSuHU">https://www.youtube.com/watch?v=kek-jrOSuHU</a>.<br />
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ahora te dejo unos retos matemáticos para que te diviertas.<br />
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<a href="https://www.youtube.com/watch?v=aY8VK9A7ar0">https://www.youtube.com/watch?v=aY8VK9A7ar0</a>.<br />
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<br />Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com2tag:blogger.com,1999:blog-2554711682501140082.post-33865279012147439862014-02-16T08:56:00.002-08:002014-02-16T08:56:36.589-08:00operaciones con fraccionessi consultas estos enlaces podras aprender a resolver situaciones con fracciones.<br />
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<br style="background-color: white; font-family: HelveticaNeue, 'Helvetica Neue', Helvetica, Arial, 'Lucida Grande', sans-serif; font-size: 16px;" /><a href="http://prezi.com/xqsbplrjmvfn/el-maravilloso-mundo-de-las-fracciones/" id="yui_3_13_0_ym1_1_1392569638299_3534" rel="nofollow" style="background-color: white; color: #196ad4; font-family: HelveticaNeue, 'Helvetica Neue', Helvetica, Arial, 'Lucida Grande', sans-serif; font-size: 16px; margin: 0px; outline: none; padding: 0px;" target="_blank">http://prezi.com/xqsbplrjmvfn/el-maravilloso-mundo-de-las-fracciones/</a><br style="background-color: white; font-family: HelveticaNeue, 'Helvetica Neue', Helvetica, Arial, 'Lucida Grande', sans-serif; font-size: 16px;" /><br style="background-color: white; font-family: HelveticaNeue, 'Helvetica Neue', Helvetica, Arial, 'Lucida Grande', sans-serif; font-size: 16px;" /><a href="http://magictic.blogspot.com/2009/11/operaciones-con-fracciones.html" id="yui_3_13_0_ym1_1_1392569638299_3533" rel="nofollow" style="background-color: white; color: #196ad4; font-family: HelveticaNeue, 'Helvetica Neue', Helvetica, Arial, 'Lucida Grande', sans-serif; font-size: 16px; margin: 0px; outline: none; padding: 0px;" target="_blank">http://magictic.blogspot.com/2009/11/operaciones-con-fracciones.html</a>Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-61218103860307946282014-02-16T08:52:00.000-08:002014-02-16T08:52:02.085-08:00cambios en el examen icfes 2014 -2<h2 style="background-color: white; border: 0px; color: #89b748; font-family: 'Droid Sans'; font-size: 20px; line-height: 18px; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">
¿Qué pasará con el examen SABER 11° en 2014?</h2>
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<li class="print-icon" style="border: 0px; display: inline; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline; width: 50px;"><a href="http://www.icfes.gov.co/examenes/saber-11o/segundo-semestre-2014?tmpl=component&print=1&page=" rel="nofollow" style="border: 0px; color: #4f2d7f; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; text-decoration: none; vertical-align: baseline;" title="Imprimir"><img alt="Imprimir" src="http://www.icfes.gov.co/examenes/media/system/images/printButton.png" style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;" /></a> </li>
<li class="email-icon" style="border: 0px; display: inline; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline; width: 50px;"><a href="http://www.icfes.gov.co/examenes/component/mailto/?tmpl=component&template=gd_icfestexamenes&link=ca189640507911ea06d41ba949ec27d19b3b3597" style="border: 0px; color: #4f2d7f; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; text-decoration: none; vertical-align: baseline;" title="Correo electrónico"><img alt="Correo electrónico" src="http://www.icfes.gov.co/examenes/media/system/images/emailButton.png" style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;" /></a></li>
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A partir de la aplicación del segundo semestre de 2014 (3 de agosto), SABER 11° cambiará para alinearse con todas las evaluaciones nacionales que aplica el ICFES. Estas se basan en los estándares de competencias definidos por el Ministerio de Educación Nacional. Consulte el <a href="http://www.icfes.gov.co/examenes/saber-11o/segundo-semestre-2014/fechas-y-tarifas" style="border: 0px; color: #4f2d7f; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; text-decoration: none; vertical-align: baseline;">cronograma</a> para esta aplicación.</div>
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<span style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;"><strong>* Si usted va a participar de la aplicación SABER 11° primer semestre de 2014, consulte la información correspondiente <a href="http://www.icfes.gov.co/examenes/saber-11o/primer-semestre-2014" style="border: 0px; color: #4f2d7f; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; text-decoration: none; vertical-align: baseline;">aquí</a>.</strong></span></div>
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Las principales novedades que verán los estudiantes e interesados en presentar el examen son:</div>
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<tr style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;"><th style="background-color: #a0ce67; border: 0px; color: white; font-family: Verdana, Arial, Helvetica, sans-serif; font-size: 12px; font-style: inherit; font-weight: 400; line-height: 15px; margin: 0px; outline: 0px; padding: 3px; text-align: center; vertical-align: baseline;">Tema</th><th style="background-color: #a0ce67; border: 0px; color: white; font-family: Verdana, Arial, Helvetica, sans-serif; font-size: 12px; font-style: inherit; font-weight: 400; line-height: 15px; margin: 0px; outline: 0px; padding: 3px; text-align: center; vertical-align: baseline;">Hasta el primer semestre de 2014</th><th style="background-color: #a0ce67; border: 0px; color: white; font-family: Verdana, Arial, Helvetica, sans-serif; font-size: 12px; font-style: inherit; font-weight: 400; line-height: 15px; margin: 0px; outline: 0px; padding: 3px; text-align: center; vertical-align: baseline;">A partir del segundo semestre de 2014</th></tr>
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Estructura del examen</div>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; text-align: justify; vertical-align: baseline;">Un <strong>Núcleo Común</strong>, con ocho pruebas, que todas las personas deben presentar.</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; text-align: justify; vertical-align: baseline;">Un <strong>Componente Flexible</strong>, en el que cada persona selecciona o una prueba de profundización o una prueba interdisciplinar, de acuerdo con sus intereses.</li>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Conformado por cinco pruebas, que todas las personas deben presentar.</li>
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Pruebas</div>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;"><strong>Núcleo Común</strong>:</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Lenguaje</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Matemáticas</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Biología</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Física</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Química</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Ciencias Sociales</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Filosofía</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Inglés</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;"><strong>Componente Flexible:</strong><ul style="border: 0px; font-style: inherit; font-weight: inherit; list-style: disc; margin: 0px; outline: 0px; padding: 0px 0px 0px 13px; vertical-align: baseline;">
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;"><span style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Profundización</span> en alguna de las siguientes áreas: Biología, Ciencias Sociales, Lenguaje o Matemáticas, o</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;"><span style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Interdisciplinar</span> en alguno de los siguientes temas: Violencia y Sociedad o Medio Ambiente</li>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Lectura Crítica</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Matemáticas</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Ciencias Naturales</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Sociales y Ciudadanas</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Inglés</li>
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Tipos de preguntas</div>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Únicamente preguntas de selección múltiple</li>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Preguntas de selección múltiple</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Preguntas abiertas</li>
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Duración del examen</div>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Un día, dividido en dos sesiones de cuatro horas y media cada una.</li>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Un día, dividido en dos sesiones de cuatro horas y media cada una.</li>
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Tipos de resultados individuales</div>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntajes en cada una de las ocho pruebas del Núcleo Común</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntaje en la prueba del componente flexible</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntaje y nivel de desempeño en cada una de las competencias evaluadas en cada prueba</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntaje y nivel de desempeño en cada uno de los componentes evaluados</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Nivel de desempeño en la prueba de Inglés</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puesto</li>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntajes en cada una de las cinco pruebas</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntajes en las sub-pruebas de Razonamiento Cuantitativo (que forma parte de la prueba de Matemáticas) y de Competencias Ciudadanas (que forma parte de la prueba de Sociales y Ciudadanas)</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Ubicación en deciles para cada una de las cinco pruebas</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntaje global en el examen</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Nivel de desempeño. En 2014 únicamente para la prueba de inglés. A partir del segundo semestre de 2015, para las demás pruebas.</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puesto</li>
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Tipos de resultados por colegio</div>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntaje promedio en cada prueba</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Porcentajes de estudiantes según niveles de desempeño en las competencias y componentes evaluados en las pruebas</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Nivel de desempeño en inglés</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Clasificación según categoría de rendimiento</li>
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<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Puntaje promedio en cada prueba</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Niveles de desempeño. En 2014 únicamente para la prueba de Inglés. A partir del segundo semestre de 2015, para las demás pruebas.</li>
<li style="border: 0px; font-style: inherit; font-weight: inherit; margin: 0px; outline: 0px; padding: 0px; vertical-align: baseline;">Clasificación según categoría de rendimiento.</li>
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• La prueba de Lectura Crítica integrará competencias ya evaluadas en las pruebas de Lenguaje y Filosofía.</div>
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• La prueba de Matemáticas evaluará de manera explícita aspectos de razonamiento cuantitativo además de conocimientos específicos de las Matemáticas de la educación media.</div>
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• La prueba de Ciencias Naturales integrará las pruebas de Biología, Física Química e incluirá el componente de Ciencia, Tecnología y Sociedad, bajo las mismas competencias de pensamiento científico.</div>
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• La prueba de Sociales y Ciudadanas evaluará competencias propias de las Ciencias Sociales y de Competencias Ciudadanas.</div>
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• La prueba de Inglés no tendrá modificaciones.</div>
Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com0tag:blogger.com,1999:blog-2554711682501140082.post-89998745281340803002014-02-16T08:39:00.000-08:002014-02-16T08:39:56.166-08:00Saludo de Bienvenida<h2 style="text-align: center;">
<span style="background-color: blue;">Bienvenidos a tu blog.</span></h2>
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En este blog encontraras una gran variedad de ejemplos de diferentes temas matemáticos, sitios de enlace de interés general.<br />
espero les sea de mucha utilidad. Profesor Cristóbal Fernández Galvizhttp://www.blogger.com/profile/18200468553182037749noreply@blogger.com2