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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: 200px; top: 50px;">#c</div> <div style="display: inline; position: absolute; left: 100px; 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%
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
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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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