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<p>Troba la longitud del segment «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mi»B«/mi»«/math»:</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: 110px;">#X</div> <div style="display: inline; position: absolute; left: 100px; top: 130px;">#Y</div> <div style="display: inline; position: absolute; left: 140px; top: 10px;">#y</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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