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<i><font size="4" face="times new roman,times,serif">Para captar el agua de lluvia, se fabrica una canaleta con hojas de aluminio de <span class="nolink">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»#ancho«/mi»«mo»§nbsp;«/mo»«mi»c«/mi»«mi»m«/mi»«/math»</span>, doblando los lados <span class="nolink">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»90«/mn»«mo»°«/mo»«/math»</span> hacia arriba, tal como se muestra en la figura:<br /><img width="621" vspace="0" hspace="0" height="147" border="0" align="middle" title="canaleta" alt="canaleta" 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/><br />La capacidad para el flujo de agua depende del área transversal y, a su vez, el área transversal depende de la cantidad de centímetros que se dobla a cada lado (al que llamaremos <span class="nolink">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»x«/mi»«/math»</span>).<br />Entonces, el área transversal está dada por la función:<br /></font></i> <div align="center"><i><font size="4" face="times new roman,times,serif"><span class="nolink">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mfenced»«mi»x«/mi»«/mfenced»«mo»=«/mo»«mi»#f11«/mi»«/math»</span><br /></font></i></div><i><font size="4" face="times new roman,times,serif">cuya gráfica es:<br /></font></i> <div align="center"><i><font size="4" face="times new roman,times,serif">#graf<br /><br /></font></i> <div align="left"><i><font size="4" face="times new roman,times,serif">#preg</font></i><br /><b><font color="#990000"><i><font size="4" face="times new roman,times,serif"><br /><font size="4">#obs:<br /><br /></font>#obs1<br /></font></i></font></b><br /><b><font color="#990000"><i><font size="4" face="times new roman,times,serif">#obs2</font></i></font></b></div></div>
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<font face="times new roman,times,serif"><i><font size="4"> Solución:<br /><br /><font size="4">Antes de calcular la solución, utilizaremos el gráfico para estimarla. <br /><font size="4">E</font>l dato que nos dan es #texto1. Si ubicamos este valor en el eje #eje</font></font></i></font><i><font size="4"><font face="times new roman,times,serif"> y trazamos un línea sobre este</font><font size="4"><font face="times new roman,times,serif">, vemos que intersecta a la función en #puntos</font><font size="4"><font face="times new roman,times,serif"> (tal como lo muestra </font><font size="4"><font face="times new roman,times,serif">el </font><font size="4"><font face="times new roman,times,serif">s</font><font size="4"><font face="times new roman,times,serif">iguiente gráfico). </font><font size="4" face="times new roman,times,serif">#texto2</font><br /></font></font></font></font></font></font></i> <div align="center"><font size="4"><font face="times new roman,times,serif"><i><br />#graf2</i></font></font><br /></div><font face="times new roman,times,serif"><i><font size="4"><br />#retro1</font></i></font><br /> <div align="center"><i><font size="4" face="times new roman,times,serif"><span class="nolink">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»#ec1«/mi»«/math»</span><br /></font></i> <div align="left"><i><font size="4" face="times new roman,times,serif"><br />#retro2</font></i><br /> <div align="center">#ec2<br /></div><font size="4"><i><font face="times new roman,times,serif">#retro3</font></i></font><br /><br /> <div align="center">#ec3<br /> <div align="left"><font size="4"><i><font face="times new roman,times,serif">#retro4</font></i></font>.<br /></div></div></div></div>
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Answer 1
Answer
Grade
None
100%
90%
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
<i><font size="4" face="times new roman,times,serif">Muy bien, continúa de esa manera.</font></i>
Answer 2
Answer
Grade
None
100%
90%
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
<i><font size="4" face="times new roman,times,serif">Muy bien, continúa de esa manera.</font></i>
Answer 3
Answer
Grade
None
100%
90%
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
<i><font size="4" face="times new roman,times,serif">Al parecer, los cálculos que hiciste no están bien. Revisa tu desarrollo y sigue <font size="4">adela<font size="4">nte!</font></font></font></i>
Answer 4
Answer
Grade
None
100%
90%
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
Settings for multiple tries
Penalty for each incorrect try
100%
50%
33.33333%
25%
20%
10%
0%
Hint 1
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Hint 2
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Created
by
Admin User
on
Wednesday, 15 February 2017, 3:41 PM
Last saved
by
Admin User
on
Wednesday, 15 February 2017, 3:41 PM
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