Unidad 2: Factores y Productos
Table of Contents
- Factorización
- Factorización de Expresiones Algebraicas
- Factorización de Productos Notables
- Interpretación geométrica
- Interpretación Geométrica de Productos Notables
Factorización de Expresiones Algebraicas
[justify][b][u]Unidad de trabajo[/u][/b][/justify][justify]Unidad 2: Factores y Productos[/justify][br][justify][b][u]Objetivos de aprendizaje[/u][/b][/justify][justify]Cada estudiante: Multiplica y factoriza expresiones algebraicas[/justify][br][justify][b][u]¿Qué es una expresión algebraica?[/u][/b][/justify][justify]Es un conjunto de números y letras que se combinan con los signos de las operaciones aritméticas. Una expresión algebraica se define como aquella que está constituida por coeficientes, exponentes y bases.[/justify][br][justify][u][b]¿Qué es una factorización?[/b][/u][/justify][justify]Factorizar una expresión algebraica, es un proceso que consiste en expresar una suma o diferencia de términos como el producto de dos o más factores.[/justify][br][justify][u][b]Tipos de factorización[/b][/u][/justify][b][list][*]Factor común[/*][/list][/b][justify][math]\rightarrow[/math]Este método consiste en obtener un factor común de cada uno de los términos que conforman la expresión algebraica.[/justify][justify][math]\rightarrow[/math]El factor común está conformado por el máximo común divisor de los coeficientes numéricos y las variables de menor potencia que aparecen en todos los términos de la expresión.[/justify][justify][math]\rightarrow[/math]Para completar la factorización, se divide cada término del polinomio entre el máximo factor común y el resultado se escribe dentro de un paréntesis.[/justify][justify][b]Ejemplo [/b][/justify][justify]Factorizar la siguiente expresión: [math]12a^3x^2z-42z^2x^4a^2+30x^3a^4z^3[/math][/justify][justify][b]Paso 1[/b][/justify][justify]Identificar si la expresión algebraica posee términos en común.[/justify][justify][b]Paso 2[/b][/justify][justify]Obtener el máximo común divisor (M.C.D.) de los coeficientes numéricos.[br][/justify][table][tr][td]12[/td][td]42[/td][td]30[/td][td][/td][td]2[/td][/tr][tr][td]6[/td][td]21[/td][td]15[/td][td][/td][td]3[/td][/tr][tr][td]2[/td][td]7[/td][td]5[/td][td][/td][td]2[math]\cdot[/math]3=6[/td][/tr][/table][br][justify][b]Paso 3[/b][/justify][justify]Determinar las variables en común, de menor potencia, que conforma la expresión.[/justify][center][math]a^2x^2z[/math][/center][justify][b]Paso 4[/b][/justify][justify]Determinar el factor común.[/justify][center][math]6a^2x^2z[/math][/center][justify][b]Paso 5[/b][/justify][justify]Dividir cada término de la expresión entre el factor común.[/justify][center][math]\dfrac{12a^3x^2z}{6a^3x^2z}=2a[/math][/center][center][math]\dfrac{-42z^2x^4a^2}{6a^2x^2z}=-7zx^2[/math][/center][center][math]\dfrac{30x^3a^4z^3}{6a^2x^2z}=5xa^2z^2[/math][/center][justify][b]Paso 6[/b][/justify][justify]Dar la respuesta[/justify][center][math]6a^2x^2z(2a-7zx^2+5xa^2z^2)[/math][/center][br][list][*][b]Diferencia de cuadrados[/b][/*][/list][justify][math]\rightarrow[/math]Para este método, se hace uso de la fórmula notable:[/justify][center][math]a^2-b^2=(a+b)(a-b)[/math][/center][justify][math]\rightarrow[/math]La factorización por medio de diferencia de cuadrados corresponde al producto de dos binomios conjugados, conformados por las raíces cuadradas de cada uno de los términos.[/justify][justify][b]Ejemplo[/b][/justify][justify]Factorizar la siguiente expresión:[/justify][center][math]25x^2-49[/math][/center][justify][b]Paso 1[/b][/justify][justify]Identificar si a la expresión algebraica se le puede aplicar diferencia de cuadrados.[/justify][justify][b]Paso 2[/b][/justify][justify]Obtener la raíz cuadrada de cada uno de los términos.[/justify][center][math]\sqrt{25x^2}=5x[/math][/center][center][math]\sqrt{49}=7[/math][/center][justify][b]Paso 3[/b][/justify][justify]Formar los binomios conjugados[/justify][center][math]=(5x-7)(5x+7)[/math][/center][justify][b]Paso 4[/b][/justify][justify]Dar la factorización de la expresión:[/justify][center][math]25x^2-49=(5x-7)(5x+7)[/math][/center][br][list][*][b]Suma y resta de cubos[/b][/*][/list][justify][math]\rightarrow[/math]La factorización de suma y diferencia de cubos está conformado por un producto de un binomio y un trinomio.[/justify][justify][math]\rightarrow[/math]El binomio está conformado por la suma o resta de las raíces cúbicas de cada uno de los términos.[/justify][justify][math]\rightarrow[/math]Además, se hace uso de las siguientes fórmulas:[/justify][center][math]a^3+b^3=(a+b)(a^2-ab+b^2)[/math][/center][center][math]a^3-b^3=(a-b)(a^2+ab+b^2)[/math][/center][justify][b]Ejemplo[/b][/justify][justify]Factorizar las siguientes expresiones:[/justify][center][math]125x^3-343n^3[/math][/center][justify][b]Paso 1[/b][/justify][justify]Identificar si a la expresión algebraica se le puede aplicar diferencia o suma de cubos.[/justify][justify][b]Paso 2[/b][/justify][justify]Obtener la raíz cúbica de cada uno de los términos.[/justify][center][math]\sqrt[3]{125x^3}=5x[/math][/center][center][math]\sqrt[3]{343n^3}=7n[/math][/center][justify][b]Paso 3[/b][/justify][justify]Formar el primer binomio, para ello se debe mantener el orden de las expresiones.[/justify][center][math](5x-7n)[/math][/center][justify][b]Paso 4[/b][/justify][justify]Formar el segundo el factor, haciendo uso de la fórmula [math]a^2+ab+b^2[/math].[/justify][center][math](5x)^2+(5x)(7n)+(7n)^2[/math][/center][center][math]=25x^2+35xn+49n^2[/math][/center][justify][b]Paso 5[/b][/justify][justify]Formar la factorización[/justify][center][math]=(5x-7n)(25x^2+35xn+49n^2)[/math][/center][justify][b]Paso 6[/b][/justify][justify]Dar la respuesta[/justify][center][math]125x^3-343n^3=(5x-7n)(25x^2+35xn+49n^2)[/math][/center]
[justify]¿Cuál es el factor común de la siguiente expresión [math]2a+6a^2[/math]?[/justify]
[math]2pq^2-3p^2q[/math]
[justify]María Francisca quiere colocar alfombra en el piso de su dormitorio, si el ancho mide [math](x-4)m[/math] y el largo mide [math](x+12)m[/math]. ¿Cuántos metros de alfombra debe comprar?[/justify]
[justify]Desarrollar la suma de cubos [math]8x^3+27y^3[/math][/justify]
¿Cuál de las siguientes expresiones corresponde a la suma de cubos?[br]
[justify]Factorizar la expresión [math]xz+xw+yz+yw[/math][/justify]
Explicación Ejercicios
Interpretación Geométrica de Productos Notables
[justify][b][u]Unidad de trabajo[/u][/b][/justify][justify]Unidad 2: Factores y Productos[/justify][br][justify][b][u]Objetivos de aprendizaje[/u][/b][/justify][justify]Cada estudiante: Interpreta geométricamente los productos notables.[/justify][br][justify][b][u]Productos interpretados geométricamente[/u][/b][/justify][justify]Los productos notables se pueden deducir geométricamente los productos notables que se construyen y se visualizan en el espacio tridimensional, los cuales generan un volumen por integración o suma de diversas áreas de figuras geométricas planas, formando un sólido en el espacio. Esto se realiza partiendo de conceptos y proposiciones de la geometría plana, en donde se parten de figuras geométricas básicas como son algunos polígonos regulares o irregulares.[/justify][justify]A continuación se presentarán algunas interpretaciones de productos notables geométricamente:[/justify][br][justify][b][u]Cuadrado del Binomio[/u][/b][/justify][list][*][math](a+b)^2=a^2+2ab+b^2[/math][/*][/list][br][center][img]https://productonotable.files.wordpress.com/2015/07/productos-notables-geometricamente-3-638.jpg[/img][/center][br][list][*][math](a-b)^2=a^2-2ab+b^2[/math][/*][/list][br][center][img]https://productonotable.files.wordpress.com/2015/07/productos-notables-geometricamente-4-638.jpg[/img][/center][br][justify][b][u]Diferencia de cuadrados[/u][/b][/justify][list][*][math]a^2-b^2=(a+b)(a-b)[/math][/*][/list][br][center][img]https://productonotable.files.wordpress.com/2015/07/productos-notables-geometricamente-5-638.jpg[/img][/center][br][justify][b][u]Multiplicación de un binomio con un término común[/u][/b][/justify][list][*][math](x+a)(x+b)=x^2+(a+b)x+ab[/math][/*][/list][br][center][img]https://productonotable.files.wordpress.com/2015/07/productos-notables-geometricamente-6-638.jpg[/img][/center][br][justify][b][u]Cubo de un binomio[/u][/b][/justify][list][*][math](a+b)^3=a^3+3a^2b+3ab^2+b^3[/math][/*][/list][br][center][img]https://image.slidesharecdn.com/productosnotables-geometricamente-140529160004-phpapp02/95/productos-notables-geometricamente-8-638.jpg?cb=1401379253[/img][/center][br][list][*][math](a-b)^3=a^3-3a^2b+3ab^2-b^3[/math][/*][/list][br][center][img]https://image.slidesharecdn.com/productosnotables-geometricamente-140529160004-phpapp02/95/productos-notables-geometricamente-9-638.jpg?cb=1401379253[/img][/center]
[justify]Encuentre el área de la figura que se compone de los siguientes cuadrados y rectángulos. Expresa el resultado utilizando las expresiones algebraicas de los productos notables.[/justify][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOUAAADPCAYAAAAK/hZGAAAM+0lEQVR4Ae3de2yVhRnH8RO5tNDE2kYUabcFKAQlQsQN3WKgOIvOasgwOq2jKFBggxqPG5dGtGbtrOIYy3BcNAbdHyZlZLOQZoSs1W1s7EK8sNg6IwgIQ7wAqdbS9NTfchrqo+Uc6OUc3odzvk3e+HAuPc/5vu+HFkQMiQ8KUMBVgZCrbViGAhQQKLkIKOCsACidnRDWoQAouQYo4KwAKJ2dENahgD+Up45o94tPKHzfnZp1c6FuuHG2lq5t0OEOThYF0qOAM5SdenfNNGXkzlDV3z5QRKd08KWFunJolqZWvSZcpsdFme7v0h3KjxvWqmLza2rvPjPt/9CKqwYro/g5nei+jX9SIIULOEMZo/TxWt19WaYmP/JvvlLGyMNNqVfANcq2gw16ctaVuvKOddrzSerF5x1RIFYBnyhbd+rhwokaOWyQsibcqce3vaVPY23PbRRIwQI+UZ4O3dl6QA2rb9fXhuRqxi//w7evKXgB8pbOLOAaZde6nYf06xszNXjCMu3+4nd/znwj3EKBVCngDuWp40d17JPIl/q26nd3X6Ih4x7UX0D5pS6MqVrAGcpTerl8rC69dZMOdLtsadCScRkau+RP/LoyVa9C3tdXCjhDGVHTs3P0za+PVMG0uzS/bI5uvXaivjNvo/a0fGVvfkCBlC3gDGV35061fXxI+/cd0sdtnd038k8KpEUBpyjToj1vkgIxC4AyZhZupEBwBUAZXHtemQIxC4AyZhZupEBwBVyifPvtt3Xy5MngqvDKFAiwgEuUoVBIixcvDjALL02B4AqAMrj2vDIFYhZwi3LRokUxF+ZGCqR6AbcoFyxYkOrteX8UiFnAHcrOzk5Ff005f/78mAtzIwVSvYA7lPv37+9COXPmzFRvz/ujQMwC7lBu375do0ePVl5eXsyFuZECqV4goSg//PBDrVmzRjU1Nf0+pk6dqqefflpXX321ysvL+/15ojvU1tam+vnj/aVggYSiXL58uaZPn64VK1b0+6iqqlJLS4t2796tlStX9vvzRHfIzs7Wvn37UvC08ZZSuUBCURYUFGjv3r1uei1ZskRPPfWUm31YhAK9KZAwlO3t7crMzFRHh5+/x3zjxo3iX6305jLgMZ4KJAxlU1OTxo8f7+m9qbGxsevbaVdLsQwFzlEgYSjr6upUXFx8jpc7v3cfPnxYo0aNOr8vyqtRYIAFEoZy8+bNmjt37gDXSezT29raur6lTuxn5bNRILkFEoZy06ZNKisrS+62ffzs0T8ddNFFF/XxWTycAsEWSBjKdevWKfq7nd4+Bg0a5Oo3n7z1YR9/BRKG8vjx4zp69Ki7d9jc3KzPP//c3V4sRIF4BRKGMt4LcDsFKNC3AqDsWy8eTYGkFwBl0hPzAhToWwFQ9q0Xj6ZA0guAMumJeQEK9K0AKPvWi0dTIOkFEo7y1aYj8npEIvzPgpJ+RfECAy6QcJSTZ6+Vx+PSsdM08+Zbuv58bvTP6HL4a/D8888P+IJOhU+QFJR3zX9UD5T/1M1xb9kqZWaP6vq7f0pLS8Xhr0H0L0uL/ofpfEhJQVm68GEtD4fdHPMWV2jYJfl6MPwTzrnTAlOmTAHl6XMDSqcXabqtBUo746C0FkwBFgClxQeltWAKsAAoLT4orQVTgAVAafFBaS2YAiwASosPSmvBFGABUFp8UFoLpgALgNLig9JaMAVYAJQWH5TWginAAqC0+KC0FkwBFgClxQeltWAKsAAoLT4orQVTgAVAafFBaS2YAiwASosPSmvBFGABUFp8UFoLpgALgNLig9JaMAVYAJQWH5TWginAAqC0+KC0FkwBFgClxQeltWAKsAAoLT4orQVTgAVAafFBaS2YAiwASosPSmvBFGABUFp8UFoLpgALgNLig9JaMAVYAJQWH5TWginAAqC0+KC0FkwBFgClxQeltWAKsAAoLT4orQVTgAVAafFBaS2YAiwASosPSmvBFGABUFp8UFoLpgALgNLig9JaMAVYAJQWH5TWginAAqC0+KC0FkwBFgClxU8Kyht+8KRm31/p5ph+T42GZedp0eIf67PPPuNw2GDixIn879VPu0w4ypGjr9Hlo69R9J9ejug+mRdfobHTlnI4bjBrXrV9uegxRSIRvffeezp27JhOnDih6I9T9SPhKEOhkHJzc1VSUuLmyMnJUXSvybPX6ra5P+Nw2CB6bu5d9tu4zg4cOKC8vDyNGDFC2dnZysjI0Lhx41RcXKyHHnpIu3btivvcC+2OpKDcsmWLqw61tbVdKGeU1Gh5OMzhsEFxaZUWPra119dNe3u7mpubVVdXp+rqauXn52v9+vW9fr7nB4LS4QWajj9x9BVlT1SVlZWKHqnwAUpQuvjOAZT20wkoQQlK8+BiAiUoQemCoi0BSlCC0jy4mEAJSlC6oGhLgBKUoDQPLiZQghKULijaEqAEJSjNg4sJlKAEpQuKtgQoQQlK8+BiAiUoQemCoi0BSlCC0jy4mEAJSlC6oGhLgBKUoDQPLiZQghKULijaEqAEJSjNg4sJlKAEpQuKtgQoQQlK8+BiAiUoQemCoi0BSlCC0jy4mEAJSlC6oGhLgBKUoDQPLiZQghKULijaEqAEJSjNg4sJlKAEpQuKtgQoQQlK8+BiAiUoQemCoi0BSlCC0jy4mEAJSlC6oGhLgBKUoDQPLiZQghKULijaEqAEJSjNg4sJlKAEpQuKtgQoQQlK8+BiAiUoQemCoi0BSlCC0jy4mEAJSlC6oGhLgBKUoDQPLiZQghKULijaEqAEJSjNQx+nNn2w/y29ufcNNR35tI/Pjf9wUIISlPF9nP2eyCG9XHO78gdn6XvPvK/Osz+61/eCEpSg7DWXMx/Y8eoqTRp2nX7eHDnzzn7eAkpQgrKfeKJP++i523Tx+LD+2j6AT9LjqaAEJSh7oOj9D0/pj2X5GjnnDzpx+M/a9Ei5lj7ygvac6P1niPVIUIISlLFk9Oa2jjf06JRLVFTxC/3ohw/oyV8t042XDdGYpQ1q683z4zwGlKAEZRwc57q58/1NuiUrS/m31OhfXb/52qqtJbka+q1qvTmAX2KCEpSgPJe+OPe3bb9fI4depWV/7/662Kbf35urod9+Qv8FZZxqp2+ura1VKBTSjJIaFxfgcn4iOOM8FJdWaeFjW89+Is9yb2VlpSoqKs7yiETf1aE9qyYpc9Iq7ek4/bkjzXr8ugxdMW87376eKzcow2cg8PYTw0BR1tfXKycnR0VFRQqHw9qwYYN27typV1555Yujra37K9q5rphe3N/5P/2maLguv2/bFwAjTTW6fvg3tHDHwP4gAd++8lXLBdiBoowy2rFjhwoKCrq+K4p+Z9Tz2LVrVy+09fIhrS+pdMQQjV7SqFPRp0Te1Qt35Cvv+5v17gC+dY1+KlCCMiVQrl+/Xvn5+aqurlZdXZ2am5vV3p7Af3nYw2r7P1fq2jHX6vrrvqs5D5Rrzk1TNWPBs3q1pccD+/FDUIIyJVBGf00ZPc7bR8cnammNvlq7Th49oo/aEvWH7PhK6eKC9PbruyD2Gei3r+cdZRL185WSr5QufmICpSkHJShBaR5cTKAEJShdULQlQAlKUJoHFxMoQQlKFxRtCVCCEpTmwcUESlCC0gVFWwKUoASleXAxgRKUoHRB0ZYAJShBaR5cTKAEJShdULQlQAlKUJoHFxMoQQlKFxRtCVCCEpTmwcUESlCC0gVFWwKUoASleXAxgRKUoHRB0ZYAJShBaR5cTKAEJShdULQlQAlKUJoHFxMoQQlKFxRtCVCCEpTmwcUESlCC0gVFWwKUoASleXAxgRKUoHRB0ZYAJShBaR5cTKAEJShdULQlQAlKUJoHFxMoQQlKFxRtCVCCEpTmwcUESlCC0gVFWwKUoASleXAxgRKUoHRB0ZYAJShBaR5cTKAEJShdULQlQAlKUJoHFxMoQQlKFxRtCVCCEpTmwcUESlCC0gVFWwKUoASleXAxgRKUoHRB0ZYAJShBaR5cTKAEJShdULQlQAlKUJoHFxMoQQlKFxRtCVCCEpTmwcUESlCmBMqKigpVVla6QDXQJZKCMisrS7NmzXJzDB8+XKFQSJNnr1XhPTUcDhtEz83Cx7bGvZ47Ojr0zjvvqKmpSa+//roaGxu1YcMGhcNhFRUVKScnR/X19XGffyHdkXCUJSUl8ngU3lSsx59p4HDc4MX61+LaOXjwoMaMGaMJEyZo0qRJKiwsVFlZmVavXq1t27aptbU17nMvtDsSjvJCC8C+FPBWAJTezgj7pH0BUKb9JUAAbwVA6e2MsE/aFwBl2l8CBPBWAJTezgj7pH0BUKb9JUAAbwVA6e2MsE/aFwBl2l8CBPBWAJTezgj7pH0BUKb9JUAAbwVA6e2MsE/aFwBl2l8CBPBWAJTezgj7pH0BUKb9JUAAbwVA6e2MsE/aF/g/0v1oxPWy5dgAAAAASUVORK5CYII=[/img][br][br]
[justify]Encontrar el área de la pantalla de un computador cuyas dimensiones son [math](7x+2)[/math] y [math](7x-3)[/math], ¿cuál es la expresión que representa la superficie del computador?[/justify][img]data:image/png;base64,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[/img]
[justify]¿Cuál es el área del rectángulo [math]EFGH[/math]?[/justify][img]data:image/png;base64,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[/img]
[justify]¿Cuál de las siguientes representaciones corresponde a una multiplicación de binomios con término en común?[/justify]
¿Cuál es la representación geométrica que nos permite calcular volumen?
[justify]Se desea ampliar una cocina que tiene forma cuadrada de 3 metros por lado, en una determinada cantidad de metros (x), tal como lo muestra el siguiente dibujo:[/justify][img]data:image/png;base64,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[/img][br]¿Qué expresión algebraica representa la nueva área de la cocina?