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<p>Calcula l’àrea 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: 190px; top: 30px;">#c</div> <div style="display: inline; position: absolute; left: 30px; top: 100px;">#a</div> <div style="display: inline; position: absolute; left: 170px; top: 180px;">#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, 9:52 AM
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Wednesday, 26 October 2016, 9:52 AM
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