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<p>Calcula el volum d’aquesta piràmide regular:</p> <p> </p> <div style="display: inline-block; position: relative;"><img 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" alt="" /> <div style="display: inline; position: absolute; left: 20px; top: 50px;">#c</div> <div style="display: inline; position: absolute; left: 80px; top: 170px;">#b</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%
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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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100%
50%
33.33333%
25%
20%
10%
0%
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Hint 2
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Wednesday, 26 October 2016, 9:53 AM
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