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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: 110px; top: 10px;">#B</div> <div style="display: inline; position: absolute; left: 130px; top: 110px;">#C</div> <div style="display: inline; position: absolute; left: 250px; top: 50px;">#a</div> <div style="display: inline; position: absolute; left: 360px; top: 100px;">#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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