Eksponente (GR10) Gee die oplossing... Gee die oplossing van: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»16«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«msup»«mn»144«/mn»«mi»b«/mi»«/msup»«/mrow»«mrow»«msup»«mn»4«/mn»«mi»x«/mi»«/msup»«mo»-«/mo»«msup»«mn»12«/mn»«mi»b«/mi»«/msup»«/mrow»«/mfrac»«/math»
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 2.0000000 0.3333333 0 0 4x+12b]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>4</mn><mi>x</mi></msup><mo>+</mo><msup><mn>12</mn><mi>b</mi></msup></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>