Lösung 3.4:1c
Aus Online Mathematik Brückenkurs 2
K (Lösning 3.4:1c moved to Solution 3.4:1c: Robot: moved page) |
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| - | {{ | + | If we focus on the leading term |
| - | < | + | <math>x^{3}</math>, we need to complement it with in order to get an expression that is divisible by the denominator , |
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| + | <math>\frac{x^{3}+a^{3}}{x+a}=\frac{x^{3}+ax^{2}-ax^{2}+a^{3}}{x+a}</math> | ||
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| + | With this form on the right-hand side, we can separate away the first two terms in the numerator and have left a polynomial quotient with | ||
| + | <math>-ax^{2}+a^{3}</math> | ||
| + | in the numerator: | ||
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| + | <math>\begin{align} | ||
| + | & \frac{x^{3}+ax^{2}-ax^{2}+a^{3}}{x+a}=\frac{x^{3}+ax^{2}}{x+a}+\frac{-ax^{2}+a^{3}}{x+a} \\ | ||
| + | & =\frac{x^{2}\left( x+a \right)}{x+a}+\frac{-ax^{2}+a^{3}}{x+a} \\ | ||
| + | & =x^{2}+\frac{-ax^{2}+a^{3}}{x+a} \\ | ||
| + | \end{align}</math> | ||
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| + | When we treat the new quotient, we add and take away | ||
| + | <math>-a^{2}x</math> | ||
| + | to/from | ||
| + | <math>-ax^{2}</math> | ||
| + | in order to get something divisible by | ||
| + | <math>x+a</math> | ||
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| + | <math>\begin{align} | ||
| + | & x^{2}+\frac{-ax^{2}+a^{3}}{x+a}=x^{2}+\frac{-ax^{2}-a^{2}x+a^{2}x+a^{3}}{x+a} \\ | ||
| + | & =x^{2}+\frac{-ax^{2}-a^{2}x}{x+a}+\frac{a^{2}x+a^{3}}{x+a} \\ | ||
| + | & =x^{2}+\frac{-ax\left( x+a \right)}{x+a}+\frac{a^{2}x+a^{3}}{x+a} \\ | ||
| + | & =x^{2}-ax+\frac{a^{2}x+a^{3}}{x+a} \\ | ||
| + | \end{align}</math> | ||
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| + | In the last quotient, the numerator has | ||
| + | <math>x+a</math> | ||
| + | as a factor, and we obtain a perfect division: | ||
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| + | <math>x^{2}-ax+\frac{a^{2}x+a^{3}}{x+a}=x^{2}-ax+\frac{a^{2}\left( x+a \right)}{x+a}=x^{2}-ax+a^{2}</math> | ||
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| + | If we have calculated correctly, we should have | ||
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| + | <math>\frac{x^{3}+a^{3}}{x+a}=x^{2}-ax+a^{2}</math> | ||
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| + | and one way to check the answer is to multiply both sides by | ||
| + | <math>x+a</math>, | ||
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| + | <math>x^{3}+a^{3}=\left( x^{2}-ax+a^{2} \right)\left( x+a \right)</math> | ||
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| + | Then, expand the right-hand side and then we should get what is on the left-hand side: | ||
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| + | <math>\begin{align} | ||
| + | & \text{RHS}=\left( x^{2}-ax+a^{2} \right)\left( x+a \right)=x^{3}+ax^{2}-ax^{2}-a^{2}x+a^{2}x+a^{3} \\ | ||
| + | & =x^{3}+a^{3}=~~\text{LHS} \\ | ||
| + | \end{align}</math> | ||
Version vom 13:04, 26. Okt. 2008
If we focus on the leading term
With this form on the right-hand side, we can separate away the first two terms in the numerator and have left a polynomial quotient with
x+a
+x+a−ax2+a3=x2+x+a−ax2+a3
When we treat the new quotient, we add and take away
x+a+x+aa2x+a3=x2−ax+x+aa2x+a3
In the last quotient, the numerator has
x+a=x2−ax+a2
If we have calculated correctly, we should have
and one way to check the answer is to multiply both sides by
x2−ax+a2
x+a
Then, expand the right-hand side and then we should get what is on the left-hand side:
x2−ax+a2x+a=x3+ax2−ax2−a2x+a2x+a3=x3+a3= LHS
