Eksponente (GR10)
Vind die antwoord..
Vind die antwoord «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mn»2«/mn»«mi»t«/mi»«/msup»«mo»-«/mo»«msup»«mn»2«/mn»«mrow»«mi»t«/mi»«mo»-«/mo»«mn»2«/mn»«/mrow»«/msup»«/mrow»«mrow»«mn»3«/mn»«mo»§#215;«/mo»«msup»«mn»2«/mn»«mi»t«/mi»«/msup»«mo»-«/mo»«msup»«mn»2«/mn»«mi»t«/mi»«/msup»«/mrow»«/mfrac»«/math»
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
2.0000000
0.3333333
0
0
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<question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>3</mn><mn>8</mn></mfrac></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>