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<p> <span style="font-family: arial, helvetica, sans-serif; font-size: medium;">La construcción de un pozo ha costado en total «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»$«/mo»«mo»#«/mo»«mi»S«/mi»«/math». Si por el primer metro se ha pagado $#e1 y por cada uno de los restantes$#d más que por el anterior. </span></p> <p> </p> <p style="text-align: center;"> <img 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" alt="" height="193" width="230" /></p> <p style="text-align: left;"> </p> <p style="text-align: left;"><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">a. Cuál será la profundidad del pozo en metros.#c</span></p> <p style="text-align: left;"><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">b. Determina la expresión algebraica que representa, el valor pagado, por el último metro construido del pozo.#f</span></p> <p> <span style="font-family: arial,helvetica,sans-serif; font-size: medium; color: #ff0000;">Obs.: ingresa el valor sin unidad de medida.</span></p>
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<p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">Para determinar la solución de este problema, lo primero que debemos considerar es que, la suma de los «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»n«/mtext»«/math»primeros valores de una sucesión finita viene dada por la fórmula:</span></p> <dl><dd><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"><img class="mwe-math-fallback-image-inline" alt="{\displaystyle \sum _{i=1}^{n}a_{i}={n(a_{1}+a_{n}) \over 2}\,}" src="https://wikimedia.org/api/rest_v1/media/math/render/svg/de1b286378fa4c721a877b4171e887bbb07010ff" /> </span></dd></dl> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"> donde <img class="mwe-math-fallback-image-inline" alt="a_1" src="https://wikimedia.org/api/rest_v1/media/math/render/svg/bbf42ecda092975c9c69dae84e16182ba5fe2e07" /> es el primer término, <img class="mwe-math-fallback-image-inline" alt="a_{n}" src="https://wikimedia.org/api/rest_v1/media/math/render/svg/790f9209748c2dca7ed7b81932c37c02af1dbc31" /> es el último y <img class="mwe-math-fallback-image-inline" alt="\Sigma" src="https://wikimedia.org/api/rest_v1/media/math/render/svg/9e1f558f53cda207614abdf90162266c70bc5c1e" /> es la notación de <a title="Sumatorio" href="https://es.wikipedia.org/wiki/Sumatorio">sumatorio</a>.</span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"> <span data-mce-mark="1">En la situación planteada, se tiene:</span></span></p> <ul> <li><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">por el primer metro se ha pagado $«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»#e1«/mtext»«/math», es decir, «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mtext»a«/mtext»«mn»1«/mn»«/msub»«mo»=«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»e«/mi»«mn»1«/mn»«/math»<br /></span></li> <li><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">la diferencia entre el precio de un metro y otro es igual a «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»#d«/mtext»«/math», es decir, «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»d=#d«/mtext»«/math»</span></span></li> <li><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">el precio total de pozo es igual a «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»#S«/mtext»«/math», «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»S=#S«/mtext»«/math».</span></li> </ul> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">Para calcular la profundidad del pozo, lo que debemos determinar es la cantidad total de metros,es decir, la cantidad de términos por la cual esta compuesta la progresión geométrica en estudio. «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»n=?«/mtext»«/math» . </span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"> «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mtext»a«/mtext»«mi mathvariant=¨normal¨»n«/mi»«/msub»«mo»=«/mo»«msub»«mi mathvariant=¨normal¨»a«/mi»«mn»1«/mn»«/msub»«mo»+«/mo»«mo»(«/mo»«mi mathvariant=¨normal¨»n«/mi»«mo»-«/mo»«mn»1«/mn»«mo»)«/mo»«mo»§#183;«/mo»«mi mathvariant=¨normal¨»d«/mi»«/math»</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">desarrollando y reemplazando en «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mtext»S=(a«/mtext»«mn»1«/mn»«/msub»«mo»+«/mo»«msub»«mi mathvariant=¨normal¨»a«/mi»«mi mathvariant=¨normal¨»n«/mi»«/msub»«mo»)«/mo»«mo»§#183;«/mo»«mfrac»«mi mathvariant=¨normal¨»n«/mi»«mn»2«/mn»«/mfrac»«/math»</span></p> <p class="b"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"> nos queda la expresión algebraica,</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"> «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi mathvariant=¨normal¨»S«/mi»«mo»=«/mo»«mo»(«/mo»«mo»(«/mo»«msub»«mi mathvariant=¨normal¨»a«/mi»«mn»1«/mn»«/msub»«mo»+«/mo»«mo»(«/mo»«msub»«mi mathvariant=¨normal¨»a«/mi»«mn»1«/mn»«/msub»«mo»-«/mo»«mi mathvariant=¨normal¨»d«/mi»«mo»)«/mo»«mo»+«/mo»«mi mathvariant=¨normal¨»n«/mi»«mo»§#183;«/mo»«mi mathvariant=¨normal¨»d«/mi»«mo»)«/mo»«mo»§#183;«/mo»«mfrac»«mi mathvariant=¨normal¨»n«/mi»«mn»2«/mn»«/mfrac»«/math»</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">reemplazando los valores, se tiene</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi mathvariant=¨normal¨»S«/mi»«mo»=«/mo»«mo»#«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mfrac»«msup»«mi»n«/mi»«mn»2«/mn»«/msup»«mn»2«/mn»«/mfrac»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi»f«/mi»«mn»1«/mn»«mo»-«/mo»«mo»#«/mo»«mi»d«/mi»«mo»)«/mo»«mo»§#183;«/mo»«mfrac»«mi»n«/mi»«mn»2«/mn»«/mfrac»«mo»+«/mo»«mo»#«/mo»«mi»e«/mi»«mn»1«/mn»«/math»</span></p> <p class="b" style="text-align: center;"> </p> <p class="b"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">igualando a cero, obtenemos la ecuación cuadrática</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi mathvariant=¨normal¨»d«/mi»«mo»§#183;«/mo»«mfrac»«msup»«mi mathvariant=¨normal¨»n«/mi»«mn»2«/mn»«/msup»«mn»2«/mn»«/mfrac»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»f«/mi»«mn»1«/mn»«mo»-«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»d«/mi»«mo»)«/mo»«mo»§#183;«/mo»«mfrac»«mi mathvariant=¨normal¨»n«/mi»«mn»2«/mn»«/mfrac»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»e«/mi»«mn»1«/mn»«mo»-«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»S«/mi»«mo»)«/mo»«mo»=«/mo»«mn»0«/mn»«/math»</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">resolviendo la ecuación cuadrática y considerando sólo la solución positiva, se obtiene que la profundidad del pozo es igual a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi mathvariant=¨normal¨»c«/mi»«mo»§#160;«/mo»«mi»mts«/mi»«mo».«/mo»«/math» </span></p> <p class="b"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> Por último para determinar la expresión algebraica que determina el precio del último metro construido del pozo, calculamos el valor del último término de la progresión aritmética</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi mathvariant=¨normal¨»a«/mi»«mi mathvariant=¨normal¨»n«/mi»«/msub»«mo»=«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»a«/mi»«mo»§#183;«/mo»«mn»2«/mn»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»c«/mi»«mo»-«/mo»«mn»1«/mn»«mo»)«/mo»«mo»§#183;«/mo»«mo»#«/mo»«mi mathvariant=¨normal¨»b«/mi»«/math»</span></p> <p class="b" style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi mathvariant=¨normal¨»a«/mi»«mi mathvariant=¨normal¨»n«/mi»«/msub»«mo»=«/mo»«mo»#«/mo»«mi»f«/mi»«/math»</span></p>
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Answer 1
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<p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">¡ Muy Bien !</span></p>
Answer 2
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14.28571%
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70%
66.66667%
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33.33333%
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16.66667%
14.28571%
12.5%
11.11111%
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