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<p>Calcula les longituds «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»x«/mi»«/math» i «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«/math» en la figura:</p> <p> </p> <div style="display: inline-block; position: relative;"><img src="data:image/png;base64,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" alt="" /> <div style="display: inline; position: absolute; left: 110px; top: 10px;">#z</div> <div style="display: inline; position: absolute; left: 240px; top: 160px;">#X</div> <div style="display: inline; position: absolute; left: 320px; top: 140px;">#Y</div> <div style="display: inline; position: absolute; left: 110px; top: 200px;">#Z</div> </div> <p> </p> <p><em>Recorda que el resultat s'ha d'expressar amb la unitat de mesura corresponent.</em></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%
Feedback
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
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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Wednesday, 26 October 2016, 9:52 AM
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