Eksponente (GR10) Los op Los op: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced»«mrow»«mn»2«/mn»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«mn»16«/mn»«/mrow»«/mfenced»«mfenced»«mrow»«msup»«mn»3«/mn»«mrow»«mi»x«/mi»«mo»+«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»-«/mo»«mn»9«/mn»«/mrow»«/mfenced»«mo»=«/mo»«mn»0«/mn»«/math»
]]>

]]> 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 2.0000000 0.3333333 0 0 x=3 of x=1 <question><correctAnswers><correctAnswer>x=3 of x=1</correctAnswer></correctAnswers></question>