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" width="174" height="199" /></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>El quadrat vermell té els costats que mesuren a.</strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>El rectangle blau té un costat que mesura (a+b) i un que mesura (a-b) </strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»Si«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»i«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«/mrow»«/mstyle»«/math», </strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>a) calcula a<sup>2</sup> - b<sup>2</sup></strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>b) Calcula (a + b)(a - b)</strong></span></p> <p><span style="color: #000080;"><strong>c) És veritat que a<sup>2 </sup>- b<sup>2</sup> = (a + b)(a - b) (S per si, N per no)?</strong></span></p>
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<p><span style="color: #003300;"><strong>Si es calcula es comprova:</strong></span></p> <p><span style="color: #003300;"><strong>«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»a«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»-«/mo»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»b«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»a«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»-«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»b«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«mspace linebreak=¨newline¨/»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»(«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»b«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»)«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»(«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»-«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»b«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»)«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#8201;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#8201;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»s«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»1«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#183;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»r«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»1«/mn»«/mrow»«/mstyle»«/math»</strong></span></p>
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