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" /></td> <td style="width: 400px;" valign="middle"> <p><span style="color: #000066;" data-mce-mark="1"><strong><span style="color: #000066;" data-mce-mark="1">En un triangle rectangle, el catet b mesura x+#b i el catet c mesura x+#c.</span></strong></span></p> <p><span style="color: #000066;"><strong><span style="color: #000066;"><br /></span><span style="color: #000066;">Si la hipotenusa a del triangle mesura #a,quin és el valor de x?<br /></span><span style="color: #000066;"><br /></span></strong></span></p> </td> </tr> <tr> <td rowspan="1" colspan="2" valign="top" width="NaNpx"> <div align="center"><strong> </strong></div> </td> </tr> </tbody> </table> <p><span style="color: #000066;" data-mce-mark="1"><strong> </strong></span></p>
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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%
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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
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Penalty for each incorrect try
100%
50%
33.33333%
25%
20%
10%
0%
Hint 1
Hint text
<p><span style="color: #006600; font-weight: bold;">Si apliques el teorema de Pitàgores, l'equació és:</span></p> <p><span style="color: #006600; font-weight: bold;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»b«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»c«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»=«/mo»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»a«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#8660;«/mo»«msup mathcolor=¨#003300¨»«mfenced mathcolor=¨#003300¨»«mrow»«mi mathvariant=¨bold¨»x«/mi»«mo mathvariant=¨bold¨»+«/mo»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»b«/mi»«/mrow»«/mfenced»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«msup mathcolor=¨#003300¨»«mfenced mathcolor=¨#003300¨»«mrow»«mi mathvariant=¨bold¨»x«/mi»«mo mathvariant=¨bold¨»+«/mo»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»c«/mi»«/mrow»«/mfenced»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»a«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#8660;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»e«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»1«/mn»«/mstyle»«/math»</span></p> <p><span style="color: #006600; font-weight: bold;">i només la solució positiva és acceptable!</span></p>
Hint 2
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Tuesday, 14 July 2015, 9:22 AM
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