tag:blogger.com,1999:blog-67395712599608228252023-11-15T12:30:04.111-05:00CALCULO LPP JTEste blog esta dirigido unica y exclusivamente para los estudiantes del grado UNDÉCIMO del LPP IED. Se proyecta como una herramienta de comunicación con el fin de generar mas interacción entre los estudiantes y su profesor, y ademas de utilizar los recursos multimedia que se encuentran en la red.Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.comBlogger46125tag:blogger.com,1999:blog-6739571259960822825.post-54845595509996239522012-06-05T10:01:00.000-05:002012-06-05T10:01:53.180-05:00PREGUNTA SEMANA 10 / II PERÍODO (Última del período)<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none;"><span style="font-family: Arial, sans-serif;">Los siguientes modelos de embaldosados, se construyen sucesivamente. Tienen baldosas negras colocadas en forma rectangular, y un borde de baldosas blancas, como se muestra en la figura. Cada modelo tiene un área distinta, y las baldosas blancas y negras que se usaron tienen forma cuadrada. </span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><img alt="" 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" /><span style="font-family: Arial, sans-serif;"> </span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><span style="font-size: small;"><span style="font-family: Arial, sans-serif; line-height: 115%;">La expresión que indica el número de baldosas negras en el n-ésimo (cualquier) modelo de embaldosado es:</span></span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><img alt="" height="274" src="data:image/png;base64,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" width="320" /><span style="font-size: small;"><span style="font-family: Arial, sans-serif; line-height: 115%;"> </span></span></div><iframe src="https://docs.google.com/spreadsheet/embeddedform?formkey=dFlHXzFvOEpiTUlkT3o0cGlNR1k5V0E6MA" width="640" height="700" frameborder="0" marginheight="0" marginwidth="0">Cargando...</iframe>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-30184557902799053902011-11-17T21:22:00.001-05:002011-11-18T09:34:31.277-05:00PROCESO DE MEJORAMIENTO<br />
<div style="text-align: justify;">
Luego de realizada la comisión de evaluación y promoción, y a su vez como lo indica el SIE de nuestro colegio, los estudiantes que tienen en definitiva (de todo el año)1 o 2 áreas en BAJO deben buscar al profesor respectivo para llevar a cabo las actividades del PLAN DE MEJORAMIENTO, para presentarlas y sustentarlas en los horarios establecidos por coordinación; los estudiantes de 3 o más áreas en BAJO, lamentablemente fueron reportados como PÉRDIDA DE AÑO.<br />
Para el caso de matemáticas los estudiantes deben presentarse con las guías desarrolladas correspondientes a los períodos que perdieron para poder realizar por escrito la sustentación respectiva.<br />
Dichos trabajos deben ser de manera "INDIVIDUAL", de encontrarse trabajos netamente iguales no hay derecho a sustentación y por ende no hay cambio en la nota definitiva<br />
Las actividades a desarrollar son las mismas que se habían asignado para la semana de pre-mejoramiento (Semana de receso) las cuales prácticamente nadie se tomo el trabajo de realizar para posiblemente tener definida ya su situación en esta área, las actividades de cada período son:</div>
<div class="MsoNormal">
<a href="https://docs.google.com/viewer?a=v&pid=explorer&chrome=true&srcid=0B0eolSxACnBTNGVmMGIxYWYtMzRiMy00ZWMwLWJjM2EtMGVkZDdiM2M4ODcx&hl=es" target="_blank">IPERÍODO</a><br />
<a href="https://docs.google.com/viewer?a=v&pid=explorer&chrome=true&srcid=0B0eolSxACnBTY2I1MGU5ZWMtZTAyNi00ZTAzLWI0NGYtZDA2YTg2ODIzYzU1&hl=es" target="_blank">IIPERÍODO</a><br />
<a href="https://docs.google.com/open?id=0B0eolSxACnBTNDkwNzhmZTUtYzc5Zi00YWFmLWE1ODAtNzE2OTFiMjFlYzk2" target="_blank">IIIPERÍODO</a><br />
<a href="https://docs.google.com/open?id=0B0eolSxACnBTMDQ0YmE0MWYtMGFkYi00NWQ3LTg5N2EtNjcwNjI5NTFhMjEz" target="_blank">IV PERÍODO</a><br />
Las sustentaciones se realizarán solo en los horarios asignados por coordinación<br />
Si no hay aprobación de la sustentación escrita, no hay cambio en la nota definitiva correspondiente al período.<br />
NOTA: Para descargar cada taller: 1)Click en "archivo" 2)Click "Descargar original"</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-18425512980429604232011-11-17T21:19:00.001-05:002011-11-17T21:20:51.147-05:00DEFINITIVAS DEL ÁREA (TODO EL AÑO)<span class="Apple-style-span" style="font-size: x-large;"><a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdGxYVElhX1gyRHl1VVJPLWlOaUlHa0E&single=true&gid=0&output=html" target="_blank"><b>1104</b></a></span><br />
<span class="Apple-style-span" style="font-size: x-large;"><a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdEtRQS1EdzQ4TlZYaFNGdHhYVEFIWXc&single=true&gid=0&output=html" target="_blank"><b>1105</b></a></span><br />
<span class="Apple-style-span" style="font-size: x-large;"><a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdFRjano0OE9DT1Y5R2g4OHl2cVRGYkE&single=true&gid=0&output=html" target="_blank"><b>1106</b></a></span><br />
<br />Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-84573739250269761432011-11-17T11:07:00.001-05:002011-11-17T11:12:11.712-05:00DEFINITIVAS IV PERÍODO<a href="https://docs.google.com/spreadsheet/pub?key=0AkeolSxACnBTdHQyWDNhaGpJbXB2M19XOHRXMmZUcGc&single=true&gid=3&output=html"target="_blank"><span style="font-size: x-large;"><b>1104</b></span></a><br />
<a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdHVLQm54MExGRkR3ZHR5R1YzbTZVSXc&single=true&gid=4&output=html"target="_blank"><span style="font-size: x-large;"><b>1105</b></span></a><br />
<a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdHVLQm54MExGRkR3ZHR5R1YzbTZVSXc&single=true&gid=5&output=html"target="_blank"><span style="font-size: x-large;"><b>1106</b></span></a>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-27313213797810056022011-10-06T13:31:00.000-05:002011-10-06T16:04:59.723-05:00ACTIVIDADES PLAN DE PRE-MEJORAMIENTO<br />
<div style="text-align: justify;">
Luego de realizada la comisión de evaluación del tercer
período, se tomo la decisión de implementar la estrategia de realizar un plan
de refuerzo anticipado a los estudiantes que requieren más de 8.0 en la
definitiva del cuarto período para aprobar cada asignatura. Por tal
motivo, las actividades a desarrollar correspondiente a cada período son:</div>
<div class="MsoNormal">
<a href="https://docs.google.com/viewer?a=v&pid=explorer&chrome=true&srcid=0B0eolSxACnBTNGVmMGIxYWYtMzRiMy00ZWMwLWJjM2EtMGVkZDdiM2M4ODcx&hl=es">IPERÍODO</a><br />
<a href="https://docs.google.com/viewer?a=v&pid=explorer&chrome=true&srcid=0B0eolSxACnBTY2I1MGU5ZWMtZTAyNi00ZTAzLWI0NGYtZDA2YTg2ODIzYzU1&hl=es">IIPERÍODO</a><br />
<a href="https://docs.google.com/viewer?a=v&pid=explorer&chrome=true&srcid=0B0eolSxACnBTNDkwNzhmZTUtYzc5Zi00YWFmLWE1ODAtNzE2OTFiMjFlYzk2&hl=es">IIIPERÍODO</a><br />
Los talleres deben ser realizados en la semana de receso estudiantil, y
sustentados la semana siguiente a la de receso. Si no hay aprobación de la
sustentación escrita, no hay cambio en la nota definitiva correspondiente al
período.<br />
NOTA: Para descargar cada taller: 1)Click en
"archivo" 2)Click "Descargar original"</div>
Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-51714739484216658972011-09-15T10:41:00.000-05:002011-09-15T11:02:39.816-05:00DEFINITIVAS III PERÍODO<a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdDhiTjBWaWdYazZqQTZhcWtDeXFXQ2c&single=true&gid=3&output=html"target="_blank"><b><span style="font-size: x-large;" >1104</span></a></b><br />
<a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdDhiTjBWaWdYazZqQTZhcWtDeXFXQ2c&single=true&gid=4&output=html"target="_blank"><b><span style="font-size: x-large;">1105</span></b></a><br />
<a href="https://docs.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdDhiTjBWaWdYazZqQTZhcWtDeXFXQ2c&single=true&gid=5&output=html"target="_blank"><b><span style="font-size: x-large;">1106</span></b></a>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-69002439557690039662011-09-05T10:43:00.001-05:002011-09-15T10:28:42.535-05:00PREGUNTA SEMANA 9/III PERIODO<div style="text-align: justify;">
En una institución escolar, de un grupo de 10 estudiantes conformado por 6 hombres y 4 mujeres, se van a elegir por votación:</div>
<div style="text-align: justify;">
- 1 personero</div>
<div style="text-align: justify;">
- 1 representante al consejo directivo<br />
- 3 representantes al consejo estudiantil (para ocupar los cargos de presidente, secretario y tesorero)</div>
<div style="text-align: justify;">
Si fueran elegidos 3 hombres para ocupar los cargos del consejo estudiantil, el número de consejos diferentes que se podrían formar es</div>
<div style="text-align: justify;">
<span style="font-size: large;"><b>A.</b></span> 4</div>
<div style="text-align: justify;">
<span style="font-size: large;"><b>B.</b></span> 6</div>
<div style="text-align: justify;">
<span style="font-size: large;"><b>C.</b></span> 15</div>
<div style="text-align: justify;">
<span style="font-size: large;"><b>D.</b></span> 20</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-16302111944680923772011-08-29T11:17:00.001-05:002011-09-05T10:36:55.260-05:00PREGUNTA SEMANA 8/III PERIODO<div style="text-align: justify;">Federico fue el ganador de $100.000 en una minilotería, él por un costo de $1.000 apostó a tres dígitos diferentes y ganó porque los dígitos que seleccionó coincidieron con los sorteados (no importaba el orden).</div><div style="text-align: justify;"><br />
</div><div style="text-align: justify;">Si la minilotería modificará las reglas y para ganar se deben acertar cuatro dígitos diferentes en el orden en que salgan en el sorteo, es correcto afirmar que la posibilidad de<br />
<b><span style="font-size: large;">A</span></b>. perder es 42 veces mayor.</div><div style="text-align: justify;"><b><span style="font-size: large;">B.</span></b> perder es 10 veces mayor.</div><div style="text-align: justify;"><span style="font-size: large;">C.</span> ganar se reduce a la cuarta parte.</div><div style="text-align: justify;"><b><span style="font-size: large;">D.</span></b> ganar es igual con cualquiera de las dos reglas.</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-57467345888543166992011-08-24T11:38:00.001-05:002011-08-24T11:38:10.521-05:00Como calcular los cuartiles (Datos agrupados)<iframe width="420" height="345" src="http://www.youtube.com/embed/oVf_tNan_Xs" frameborder="0" allowfullscreen></iframe>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-41712143914981534362011-08-23T13:13:00.002-05:002011-08-29T11:04:28.061-05:00PREGUNTA SEMANA 7/III PERIODO<div style="text-align: justify;">Federico fue el ganador de $100.000 en una minilotería, él por un costo de $1.000 apostó a tres dígitos diferentes y ganó porque los dígitos que seleccionó coincidieron con los sorteados (no importaba el orden).</div><div style="text-align: justify;">Federico desea apostar nuevamente utilizando únicamente el dinero que ganó. Si no puede apostar más de una vez a cada trío de dígitos, es correcto afirmar que si invierte los $100.000</div><div style="text-align: justify;"><span style="font-size: large;"><b>A. </b></span>incrementará sus ganancias.</div><div style="text-align: justify;"><b><span style="font-size: large;">B.</span></b> existe una posibilidad entre seis de que pierda.</div><div style="text-align: justify;"><span style="font-size: large;"><b>C.</b></span> puede apostar a todas los tríos de dígitos posibles.</div><div style="text-align: justify;"><span style="font-size: large;"><b>D.</b></span> existen cinco posibilidades entre seis de que pierda.</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-28919662209022735412011-08-15T13:59:00.003-05:002011-08-23T11:29:34.090-05:00PREGUNTA SEMANA 6/III PERIODO<div style="text-align: justify;">En el siguiente texto, se proporciona información sobre una investigación llevada a cabo, entorno a adicciones: "... en una muestra de 120 indigentes de corta edad [...] se constató que únicamente en el mes anterior a la consulta, 86% de los muchachos habían consumido tabaco, 51% alcohol, 44% marihuana, 11% cocaína y 56%inhalantes. Además 26 de ellos afirmaron haber ingerido drogas farmacéuticas".</div><div style="text-align: justify;">Profundizando en el estudio, se encontró que la cuarta parte de los jóvenes que consumieron cocaína, eran menores de 10 años mientras que la cuarta parte de los jóvenes que consumieron alcohol eran mayores de 10 años. Estos resultados pueden presentarse al público mediante el gráfico:</div><div style="text-align: justify;"><img alt="" height="199" src="data:image/png;base64,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" width="640" /> </div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-75157423638210468102011-08-08T11:49:00.002-05:002011-08-15T13:56:20.946-05:00PREGUNTA SEMANA 5/III PERIODO<div style="text-align: justify;">El propietario de dos distribuidoras de café ha obtenido la mayor utilidad por las ventas de las marcas El Cafetal y Buen Aroma, por lo cual decidió realizar entre sus clientes el sorteo de dos camionetas el 31 de diciembre, una en cada distribuidora. Por la compra de 20 kilos de cualquiera de las dos marcas de café, cada cliente recibirá una boleta para participar en el sorteo.<br />
Las siguientes gráficas representan las ventas de las dos marcas de café en las dos distribuidoras:</div><br />
<img alt="" height="148" 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" width="640" /><br />
<div style="text-align: justify;">El propietario afirma en el informe final que en las distribuidoras 1 y 2 se obtuvo un promedio mensual de ventas de café de 20 167 kilos y 19 000 kilos respectivamente. Usted justificaría estos datos diciendo que:</div><div style="text-align: justify;"><span style="font-size: large;"><b>A.</b></span> la distribuidora 1 vendió 121 000 kilos de café y la distribuidora 2 vendió 115 000 kilos, durante los seis meses</div><div style="text-align: justify;"><span style="font-size: large;"><b>B.</b></span> el promedio mensual aproximado de ventas de café Buen Aroma en las dos distribuidoras fue 18 333 kilos, mientras que el promedio aproximado de venta de café El cafetal fue 20 833 kilos</div><div style="text-align: justify;"><span style="font-size: large;"><b>C.</b></span> el promedio mensual de ventas de la distribuidora 1 fue 10 500 kilos de café Buen Aroma y 9 667 kilos de El Cafetal, mientras que el promedio de venta de la distribuidora 2 fue 7 833 kilos de café Buen Aroma y 11 167 kilos de El cafetal</div><div style="text-align: justify;"><span style="font-size: large;"><b>D. </b></span>Las dos distribuidoras alcanzaron ventas de 235 000 kilos de café de las dos marcas, durante los seis meses</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-33260041092435530482011-08-03T10:44:00.001-05:002011-08-03T10:44:10.084-05:00COMO ELABORAR UN GRAFICO EN EXCEL<iframe width="425" height="349" src="http://www.youtube.com/embed/8FnlqDxCtuM" frameborder="0" allowfullscreen></iframe>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-1233949619776388482011-08-01T11:36:00.003-05:002011-08-08T10:58:24.362-05:00PREGUNTA SEMANA 4/III PERIODO<div style="text-align: justify;">El propietario de dos distribuidoras de café ha obtenido la mayor utilidad por las ventas de las marcas El Cafetal y Buen Aroma, por lo cual decidió realizar entre sus clientes el sorteo de dos camionetas el 31 de diciembre, una en cada distribuidora. Por la compra de 20 kilos de cualquiera de las dos marcas de café, cada cliente recibirá una boleta para participar en el sorteo.<br />
Las siguientes gráficas representan las ventas de las dos marcas de café en las dos distribuidoras:</div><div style="text-align: justify;"><img alt="" height="150" src="data:image/png;base64,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" width="640" /> </div><div style="text-align: justify;">De acuerdo con las ventas de café BUEN AROMA realizadas en las dos distribuidoras, el dueño puede decir que:</div><div style="text-align: justify;"><span style="font-size: large;"><b>A.</b></span> las ventas durante los seis meses superaron los 104 000 kilos en las dos distribuidoras<span style="font-size: large;"><b> </b></span><br />
<span style="font-size: large;"><b>B.</b></span> entre agosto y octubre se vendió la misma cantidad de kilos de café en las dos distribuidoras<span style="font-size: large;"><b> </b></span><br />
<span style="font-size: large;"><b>C. </b></span>para la venta total de octubre, las ventas en la distribuidora 1 superan en un 20% a las ventas en la distribuidora 2<span style="font-size: large;"><b> </b></span><br />
<span style="font-size: large;"><b>D.</b></span> las ventas de noviembre a diciembre en la distribuidora 2 disminuyeron un 25% respecto a las ventas en la distribuidora 1 en ese mismo período</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com2tag:blogger.com,1999:blog-6739571259960822825.post-25676064532898028482011-07-27T13:35:00.003-05:002012-07-23T16:12:32.937-05:00PREGUNTA SEMANA 3/III PERIODO<div style="text-align: justify;">En un curso de bachillerato de un colegio masculino se hizo una encuesta nutricional realizando un censo de edad y midiendo el peso de cada uno de los estudiantes del curso. El peso promedio fue 52 kilos, cuando el esperado según sus edades era 58.<br />
En consecuencia, se hizo una campaña para que los estudiantes equilibraran su alimentación y subieran un poco de peso. Para medir la efectividad de la campaña, tres meses después se hizo un nuevo control, cuyos resultados se pueden apreciar en las siguientes gráficas:</div><div style="text-align: justify;"><img alt="" height="183" src="data:image/png;base64,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" 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" width="320" /> </div><div style="text-align: justify;">Teniendo en cuenta las gráficas, al hacer una comparación entre edades y pesos de los estudiantes, es correcto deducir que</div><div style="text-align: justify;"><b><span style="font-size: large;">A. </span></b>los estudiantes de 10 años pesan 45 kilos </div><div style="text-align: justify;"><b><span style="font-size: large;">B. </span></b>la cantidad de estudiantes que tienen 10 y 16 años es inversamente proporcional a la cantidad de estudiantes que pesan 45 y 60 kilos respectivamente</div><div style="text-align: justify;"><b><span style="font-size: large;">C.</span></b> los estudiantes que tienen 15 años pueden pesar entre 50 y 60 kilos</div><div style="text-align: justify;"><b><span style="font-size: large;">D.</span></b> el promedio de edad es superado por menos estudiantes que los que superan el promedio de peso</div><iframe src="https://docs.google.com/spreadsheet/embeddedform?formkey=dFFxMVBpTV91QVFRSFRmREZxOHYwbkE6MA" width="640" height="700" frameborder="0" marginheight="0" marginwidth="0">Cargando...</iframe>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-4165209088816059612011-07-18T13:42:00.003-05:002011-07-25T12:22:47.733-05:00PREGUNTA SEMANA 2/III PERIODO<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none;"><span lang="ES-CO" style="font-size: 10pt;">En un curso de bachillerato de un colegio masculino se hizo una encuesta nutricional realizando un censo de edad y midiendo el peso de cada uno de los estudiantes del curso. El peso promedio fue 52 kilos, cuando el esperado según sus edades era 58.</span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none;"><span lang="ES-CO" style="font-size: 10pt;">En consecuencia, se hizo una campaña para que los estudiantes equilibraran su alimentación y subieran un poco de peso. Para medir la efectividad de la campaña, tres meses después se hizo un nuevo control, cuyos resultados se pueden apreciar en las siguientes gráficas:</span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><img alt="" height="184" src="data:image/png;base64,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" 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" width="320" /><span lang="ES-CO" style="font-size: 10pt;"> </span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><br />
</div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"></div><div class="MsoListParagraph" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; margin-left: 18.0pt; margin-right: 0cm; margin-top: 0cm; mso-add-space: auto; mso-layout-grid-align: none; mso-list: l0 level1 lfo1; text-align: justify; text-autospace: none; text-indent: -18.0pt;"><span lang="ES-CO" style="font-size: 10pt;"><span style="font: 7pt "Times New Roman";"> </span></span><span lang="ES-CO" style="font-size: 10pt;">De acuerdo con los datos registrados debe concluirse que la campaña fue:</span></div><div class="MsoListParagraph" style="line-height: normal; margin: 0cm 0cm 0.0001pt 18pt; text-align: justify; text-indent: -18pt;"></div><div class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: 0cm; text-align: left; text-indent: -18pt;"><span lang="ES-CO" style="font-size: 10pt;">A.<span style="font: 7pt "Times New Roman";"> <span style="font-size: large;">A. </span></span></span><span lang="ES-CO" style="font-size: 10pt;">efectiva, porque 3/5 de los estudiantes del curso superó el promedio inicial de peso.</span></div><div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: 0cm; text-align: left; text-indent: -18pt;"><span lang="ES-CO" style="font-size: 10pt;">B.<span style="font: 7pt "Times New Roman";"> </span></span><span lang="ES-CO" style="font-size: 10pt;"><span style="font-size: large;">B</span>. inefectiva, porque el promedio de peso posterior a la campaña fue 50,25 kilos que es menor al inicia. </span></div><div class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: 0cm; text-align: left; text-indent: -18pt;"><span lang="ES-CO" style="font-size: 10pt;">C.<span style="font: 7pt "Times New Roman";"> </span></span><span lang="ES-CO" style="font-size: 10pt;"><span style="font-size: large;">C.</span> inefectiva, porque al poner en correspondencia los pesos con las edades, la distribución es desproporcional</span></div><div class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: 0cm; text-align: left; text-indent: -18pt;"><span style="font-size: 10pt;">D.<span style="font: 7pt "Times New Roman";"> </span></span><span lang="ES-CO" style="font-size: 10pt;"><span style="font-size: large;">D.</span> efectiva, porque el promedio posterior a la campaña fue 54 kilos que es mayor que el inicial</span><span style="font-size: 10pt;"></span></div><div class="MsoListParagraph" style="line-height: normal; margin: 0cm 0cm 0.0001pt 18pt; text-align: justify; text-indent: -18pt;"><br />
</div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><span lang="ES-CO" style="font-size: 10pt;"> </span><span style="font-size: 10pt;"></span></div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com2tag:blogger.com,1999:blog-6739571259960822825.post-41186949484032461492011-06-30T14:26:00.002-05:002011-06-30T15:03:08.486-05:00DEFINITIVAS II PERIODO<blockquote>Los Estudiantes que no diligenciaron su nota de autoevaluación desde el blog tienen 7.0 en dicha nota, y las notas reales de las evaluaciones de comprensión son 2 unidades menos de la que está publicada en la columna, a todos se les subió 2 unidades</blockquote><a href="https://spreadsheets.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdG0yRnpyWWhRUmNDVzR6eGZVWTJ6SFE&single=true&gid=3&output=html"target="_blank"><span style="font-size: x-large;"><b>1104</b></span></a><br />
<a href="https://spreadsheets.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdG0yRnpyWWhRUmNDVzR6eGZVWTJ6SFE&single=true&gid=4&output=html"target="_blank"><span style="font-size: x-large;"><b>1105</b></span></a><br />
<a href="https://spreadsheets.google.com/spreadsheet/pub?hl=es&hl=es&key=0AkeolSxACnBTdG0yRnpyWWhRUmNDVzR6eGZVWTJ6SFE&single=true&gid=5&output=html"target="_blank"><span style="font-size: x-large;"><b>1106</b></span></a>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-86490016309386996302011-06-30T11:34:00.000-05:002011-06-30T11:34:20.400-05:00RESULTADOS PREICFES II PERIODO (Preguntas del Blog)<a title="View PREICFES_11° on Scribd" href="http://es.scribd.com/doc/59063354/PREICFES-11%C2%B0" style="margin: 12px auto 6px auto; font-family: Helvetica,Arial,Sans-serif; font-style: normal; font-variant: normal; font-weight: normal; font-size: 14px; line-height: normal; font-size-adjust: none; font-stretch: normal; -x-system-font: none; display: block; text-decoration: underline;">PREICFES_11°</a><iframe class="scribd_iframe_embed" src="http://www.scribd.com/embeds/59063354/content?start_page=1&view_mode=list&access_key=key-190f77u4yjkgfel1m6xq" data-auto-height="true" data-aspect-ratio="0.772727272727273" scrolling="no" id="doc_96005" width="100%" height="600" frameborder="0"></iframe><script type="text/javascript">(function() { var scribd = document.createElement("script"); scribd.type = "text/javascript"; scribd.async = true; scribd.src = "http://www.scribd.com/javascripts/embed_code/inject.js"; var s = document.getElementsByTagName("script")[0]; s.parentNode.insertBefore(scribd, s); })();</script>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-39907894825739565262011-06-13T11:13:00.002-05:002011-06-13T11:15:06.681-05:00AUTOEVALUACION II PÉRIODOPor favor sigan el siguiente enlace: <https: spreadsheet="" spreadsheets.google.com="" viewform?formkey="dEdPSXV3TzdnYy1oSy1wWGtkemoyUHc6MA#gid=00"target="_blank""><a href="https://spreadsheets.google.com/spreadsheet/viewform?formkey=dEdPSXV3TzdnYy1oSy1wWGtkemoyUHc6MA#gid=0"target="_blank">AUTOEVALUACION II</a><br />
</https:>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com2tag:blogger.com,1999:blog-6739571259960822825.post-29303589747318418882011-06-07T22:54:00.002-05:002011-06-27T19:00:18.980-05:00PREGUNTA SEMANA 10 / II PERIODOLa siguiente secuencia de figuras fue utilizada en el desarrollo de una clase de matemáticas<br />
<img alt="" height="106" 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Un estudiante, buscando alguna regularidad en el sombreado de las figuras, obtuvo la función<img alt="" src="data:image/png;base64,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" />, de ésta se puede decir que:<br />
<div style="text-align: justify;"><span style="font-size: large;"><b>A.</b></span> cuando n representa el número de cuadrados de una figura en alguna posición, la función determina la parte sombreada de la figura correspondiente a dicha posición<br />
<span style="font-size: large;"><b>B.</b></span> cuando n representa las posiciones impares, la función determina el incremento de la fracción sombreada, respecto a la figura de la posición anterior<br />
<span style="font-size: large;"><b>C.</b></span> cuando n representa la cantidad de cuadrados inscritos en el más grande de una figura establecida, la función determina el área sombreada de dicha figura<br />
<span style="font-size: large;"><b>D.</b></span> cuando n representa las posiciones pares, la función determina la fracción de área total sombreada de la figura en la posición escogida </div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-12075909092750873922011-06-07T14:02:00.005-05:002011-06-07T22:56:56.576-05:00PROYECTO FINAL DE SINTESIS<link href="file:///C:%5CDOCUME%7E1%5CMATEMA%7E2%5CCONFIG%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_filelist.xml" rel="File-List"></link><title>ARS04LM3AAA1</title><link href="file:///C:%5CDOCUME%7E1%5CMATEMA%7E2%5CCONFIG%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_themedata.thmx" rel="themeData"></link><link href="file:///C:%5CDOCUME%7E1%5CMATEMA%7E2%5CCONFIG%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_colorschememapping.xml" rel="colorSchemeMapping"></link><style>
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<div class="MsoNoSpacing"><span style="font-family: "Arial","sans-serif"; font-size: 12pt;">Se quiere construir una caja, sin tapa, partiendo de una lámina rectangular de 32 cm de larga por 24 de ancha. Para ello se recortará un cuadradito en cada esquina y se doblará. <o:p></o:p></span></div><u1:p></u1:p> <br />
<div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">a. </span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;">¿Cuál debe ser el lado del cuadradito cortado para que el volumen de la caja resultante sea máximo?<o:p></o:p></span></div><u1:p></u1:p> <br />
<div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">b. </span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;">Realiza una tabla en la que relaciones la longitud del lado de la sección cuadrada, en relación con el volumen<o:p></o:p></span></div><u1:p></u1:p> <br />
<div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">c. </span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;">Grafica los resultados obtenidos en la tabla<o:p></o:p></span></div><u1:p></u1:p> <br />
<div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">d. Determine la expresión analítica de la función del volumen</span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;"><o:p></o:p></span></div><u1:p></u1:p> <br />
<div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">e. Qué tipo de función resulta de esta situación?</span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;"><o:p></o:p></span></div><u1:p></u1:p> <br />
<div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">f. Elabore la caja que resulta tener el mayor volumen con la lamina rectangular</span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;"><o:p></o:p></span></div><u1:p></u1:p> <br />
<div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">g. Es posible elaborar un cilindro con la misma lamina rectangular y manteniendo el mismo volumen de la caja?</span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;"><o:p></o:p></span></div><div class="MsoNoSpacing"><span lang="ES" style="font-family: "Arial","sans-serif"; font-size: 12pt;">NOTA: EL PROYECTO PUEDE SER RELIZADO Y SUSTENTADO DE MANERA INDIVIDUAL O POR PAREJAS! SE DEBE PRESENTAR LA PROXIMA CLASE QUE TENGAN DE CALCULO A PARTIR DE LA FECHA DE PUBLICACION DE ESTA ENTRADA DEL BLOG</span><span style="font-family: "Arial","sans-serif"; font-size: 12pt;"><o:p></o:p></span></div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-18548232115801768742011-06-01T22:36:00.001-05:002011-06-01T22:36:07.706-05:00QUÉ EVALÚA EL ICFES<a title="View Qué evalúa el icfes on Scribd" href="http://es.scribd.com/doc/56876951/Que-evalua-el-icfes" style="margin: 12px auto 6px auto; font-family: Helvetica,Arial,Sans-serif; font-style: normal; font-variant: normal; font-weight: normal; font-size: 14px; line-height: normal; font-size-adjust: none; font-stretch: normal; -x-system-font: none; display: block; text-decoration: underline;">Qué evalúa el icfes</a><iframe class="scribd_iframe_embed" src="http://www.scribd.com/embeds/56876951/content?start_page=1&view_mode=list&access_key=key-1up1kn2sy3m7ygw0a52g" data-auto-height="true" data-aspect-ratio="1.41503267973856" scrolling="no" id="doc_88651" width="100%" height="600" frameborder="0"></iframe><script type="text/javascript">(function() { var scribd = document.createElement("script"); scribd.type = "text/javascript"; scribd.async = true; scribd.src = "http://www.scribd.com/javascripts/embed_code/inject.js"; var s = document.getElementsByTagName("script")[0]; s.parentNode.insertBefore(scribd, s); })();</script>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-36127283811032089152011-05-30T11:35:00.003-05:002011-06-03T13:23:45.390-05:00PREGUNTA SEMANA 9 / II PERIODO<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm; mso-layout-grid-align: none; text-align: justify; text-autospace: none;"><span style="font-family: "Arial","sans-serif";">Los siguientes modelos de embaldosados, se construyen sucesivamente. Tienen baldosas negras colocadas en forma rectangular, y un borde de baldosas blancas, como se muestra en la figura. Cada modelo tiene un área distinta, y las baldosas blancas y negras que se usaron tienen forma cuadrada. </span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><img alt="" 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" /><span style="font-family: "Arial","sans-serif";"> </span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><span style="font-size: small;"><span style="font-family: "Arial","sans-serif"; line-height: 115%;">La expresión que indica el número de baldosas negras en el n-ésimo (cualquier) modelo de embaldosado es:</span></span></div><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;"><img alt="" height="274" src="data:image/png;base64,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" width="320" /><span style="font-size: small;"><span style="font-family: "Arial","sans-serif"; line-height: 115%;"> </span></span></div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com1tag:blogger.com,1999:blog-6739571259960822825.post-8853140770732033212011-05-25T23:03:00.001-05:002011-05-25T23:03:25.322-05:00DIAPOSITIVAS PRIMEROS AUXILIOS (Solo Estudiantes Comités de Prevención)<div style="text-align: justify;">Muchachos de los comites de prevención! YA pueden descargar la presentación de la charla de primeros auxilios desde <a href="http://www.4shared.com/file/dq--HpAV/Charla_Primeros_auxilios.html" target="_blank">AQUÍ</a>.</div><div style="text-align: justify;">Recuerden que la idea es que preparen la presentación para el curso de primaria y de bachillerato que les corresponda (la distribución se la damos a conocer el viernes), con carteleras donde se resuma lo contenido en las diapósitivas más lo que consulten por su cuenta.</div><div style="text-align: justify;"><br />
</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0tag:blogger.com,1999:blog-6739571259960822825.post-1220518934656419972011-05-22T20:36:00.003-05:002011-05-27T13:28:32.835-05:00PREGUNTA SEMANA 8 / II PERIODO<div style="text-align: justify;">Una empresa encargada de diseñar y vender modelos de embaldosados, lanzó al mercado su nueva línea llamada "cuadrícula", la cual se caracteriza por su distribución de baldosas cuadradas blancas y negras conformando diferentes tamaños y diseños. Las siguientes gráficas representan algunos de los modelos que dispone la empresa.</div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"></div><div style="text-align: justify;"><img alt="" height="124" 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width="400" /> </div><div style="text-align: justify;">El patio de la casa de un cliente tiene el tamaño 11, y quiere que el diseño sea también el mismo, así que debe comprar<br />
<span style="font-size: large;"><b>A.</b></span> 34 baldosas blancas y 66 negras<br />
<span style="font-size: large;"><b>B.</b></span> 36 baldosas blancas y 85 negras<br />
<span style="font-size: large;"><b>C.</b></span> 38 baldosas blancas y 83 negras<br />
<span style="font-size: large;"><b>D.</b></span> 42 baldosas blancas y 102 negras</div>Lic. NJMATTAhttp://www.blogger.com/profile/04734910457020070769noreply@blogger.com0