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<p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">Un trabajador tiene que regar «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»c«/mi»«/math» árboles yendo y viniendo de un pozo. El pozo dista del primer árbol «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»#a§#160;mts«/mtext»«/math». Los árboles distan entre si, «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»#b§#160;mts«/mtext»«/math» y al final deja el cubo al lado del pozo. </span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1">Si el término «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»#c«/mtext»«/math» de la progresión aritmética que representa el desplazamiento del trabajador es igual a «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»#t§#160;mts«/mtext»«/math»</span></p> <p><span style="font-size: small;"> <img src="data:image/png;base64,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" alt="" height="158" width="684" /></span></p> <p style="text-align: center;"><span style="font-size: small;"> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtable rowalign=¨baseline¨ columnlines=¨solid solid solid solid none¨»«mtr»«mtd»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«/mtd»«mtd»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«/mtd»«mtd»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«/mtd»«mtd»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«/mtd»«/mtr»«/mtable»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«/math»</span></p> <p style="text-align: center;"><span style="font-size: small;"> </span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium; color: #000000;">1. Determina el término general, «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mtext»a«/mtext»«mi mathvariant=¨normal¨»n«/mi»«/msub»«/math» de la progresión.#f</span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium; color: #000000;" data-mce-mark="1"><span style="font-family: arial, helvetica, sans-serif;" data-mce-mark="1">2. Determina la distancia total(«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»DT«/mtext»«/math»), que camina el trabajador para regar los «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»c«/mi»«/math». árboles.#sol</span></span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium; color: #ff0000;" data-mce-mark="1">Obs.: ingresa el valor sin unidad de medida y aproximado a la milésima.<br /></span></p>
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General feedback
<p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">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><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><span style="font-size: medium; font-family: arial, helvetica, sans-serif;"> 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</span><span style="font-size: medium; color: #000000;"><span style="font-family: arial, helvetica, sans-serif;"> </span><a title="Sumatorio" href="https://es.wikipedia.org/wiki/Sumatorio"><span style="color: #000000;"><span style="font-family: arial, helvetica, sans-serif;">sumatori</span>o</span></a>.</span></span></p> <p><span> <span style="font-family: arial, helvetica, sans-serif; font-size: medium;" 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">se tienen que regar «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»c«/mi»«/math» árboles, por tanto la progresión tiene «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi mathvariant=¨normal¨»c«/mi»«/math» términos.</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">el pozo dista del primer árbol «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi mathvariant=¨normal¨»a«/mi»«mo»§#160;«/mo»«mi»mts«/mi»«/math», por tanto el primer término de la progresión «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»a«/mi»«mo»§#183;«/mo»«mn»2«/mn»«/math»</span></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">los árboles distan entre si, «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi mathvariant=¨normal¨»b«/mi»«/math»</span><span style="font-family: arial, helvetica, sans-serif; font-size: medium;" data-mce-mark="1"> es decir, </span>«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»d=#d«/mtext»«/math»</span></li> </ul> <p><span style="font-size: medium; font-family: arial, helvetica, sans-serif;">Para calcular la distancia recorrida por el trabajador en total, lo primero que debemos determinar cuánto recorre para regar el último árbol, es decir, el último término de la progresión,</span></p> <p style="text-align: center;"><span style="font-size: medium; font-family: arial, helvetica, sans-serif;">«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mtext»a«/mtext»«mi»n«/mi»«/msub»«mo»=«/mo»«msub»«mi»a«/mi»«mn»1«/mn»«/msub»«mo»+«/mo»«mo»(«/mo»«mi»n«/mi»«mo»-«/mo»«mn»1«/mn»«mo»)«/mo»«mo»§#183;«/mo»«mi»d«/mi»«/math»</span></p> <p style="text-align: center;"><span style="font-size: medium; font-family: arial, helvetica, sans-serif;">«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 style="text-align: center;">«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¨»f«/mi»«/math»</p> <p style="text-align: center;"> </p> <p style="text-align: center;">por último,se calcula la distancia total recorrida por el trabajador, calculando la suma total de los términos de la progresión</p> <p style="text-align: center;"><span style="font-size: medium; font-family: arial, helvetica, sans-serif;" 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»«msub»«mi mathvariant=¨normal¨»a«/mi»«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», reemplazando los valores</span></p> <p style="text-align: center;"><span style="font-size: medium; font-family: arial, helvetica, sans-serif;" data-mce-mark="1"> «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext»S=(#a§#183;2+#an)§#183;«/mtext»«mfrac»«mrow»«mo»#«/mo»«mi mathvariant=¨normal¨»c«/mi»«/mrow»«mn»2«/mn»«/mfrac»«/math»</span></p> <p style="text-align: center;">«math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi mathvariant=¨normal¨»S«/mi»«mo»=«/mo»«mo»#«/mo»«mi»sol«/mi»«/math»</p> <p style="text-align: center;"> </p> <p style="text-align: center;"> </p> <p> </p>
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Answer 1
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66.66667%
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33.33333%
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16.66667%
14.28571%
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11.11111%
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<p><span>¡Muy bien!</span></p>
Answer 2
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83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
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Answer 3
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None
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83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
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33.33333%
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