{"0":{"question":"<p style=\"text-align:center\"><img alt=\"\" src=\"data:image/png;base64,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\" /></p><h3 data-translate=\"{&quot;html&quot;:&quot;questions.defaultquestion&quot;}\">Quelle peut &ecirc;tre la longueur de AB ?</h3><ol><li>Moins de 5 cm</li><li>Entre 5 et 10 cm</li><li>Entre 10 et 15 cm</li><li>Plus de 15 cm</li></ol>","reponse":"C"},"1":{"question":"<p style=\"text-align:center\"><img alt=\"\" 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\" /></p><h3>Quelle est la propri&eacute;t&eacute; de Pythagore pour ce triangle rectangle ?</h3><ol><li>AC&sup2; = AB&sup2; + BC&sup2;</li><li>AB&sup2; = AC&sup2; + CB&sup2;</li><li>AC&sup2; = AB&sup2; &times; BC&sup2;</li><li>AB&sup2; = AC&sup2; &times; CB&sup2;</li></ol>","reponse":"B"},"2":{"question":"<p style=\"text-align:center\"><img alt=\"\" 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\" /></p><h3>Combien fait 5&sup2; + 10&sup2; ?</h3><ol><li>5&sup2; + 10&sup2; = <strong>10</strong> + <strong>20</strong> = <strong>30</strong></li><li>5&sup2; + 10&sup2; = <strong>25</strong> + <strong>100</strong> = <strong>125</strong></li><li>5&sup2; + 10&sup2; = <strong>15&sup2;</strong> = <strong>30</strong></li><li>5&sup2; + 10&sup2; = <strong>15&sup2;</strong> = <strong>225</strong></li></ol>","reponse":"B"},"3":{"question":"<p style=\"text-align:center\"><img alt=\"\" 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\" /></p><h3>Avec Pythagore, on obtient AB&sup2; = 125.</h3><h3>Comment calculer la longueur de AB ?</h3><ol><li>AB = 125 &divide; 2 = 62,5 cm</li><li>AB = <span class=\"math-tex\">\\sqrt{125}</span> = 11,18 cm</li><li>AB = 125 &divide; 10 = 12,5 cm</li><li>AB = 125 &divide; 50 = 2,5 cm</li></ol>","reponse":"B"},"size":{"width":"554px","height":"614px"}}