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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: 50px; top: 160px;">#a</div> <div style="display: inline; position: absolute; left: 170px; top: 150px;">#c</div> <div style="display: inline; position: absolute; left: 110px; top: 20px;">#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%
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, 9:53 AM
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Wednesday, 26 October 2016, 9:53 AM
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