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<p>Calcula l’apotema 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: 30px; top: 60px;">#a</div> <div style="display: inline; position: absolute; left: 160px; top: 60px;">#h</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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100%
50%
33.33333%
25%
20%
10%
0%
Hint 1
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Hint 2
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