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<p>Calcula el volum d’aquest prisma:</p> <p> </p> <div style="display: inline-block; position: relative;"><img src="data:image/png;base64,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" alt="" /> <div style="display: inline; position: absolute; left: 120px; top: 30px;">#a</div> <div style="display: inline; position: absolute; left: 160px; top: 110px;">#c</div> <div style="display: inline; position: absolute; left: 90px; top: 190px;">#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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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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