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<p>Calcula les longituds dels costats que falten sabent que els angles corresponents d'aquest parell de triangles són iguals:</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: 50px; top: 40px;">#a</div> <div style="display: inline; position: absolute; left: 50px; top: 130px;">#b</div> <div style="display: inline; position: absolute; left: 140px; top: 80px;">#c</div> <div style="display: inline; position: absolute; left: 370px; top: 80px;">#C</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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