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Lösung 3.4:1c

Aus Online Mathematik Brückenkurs 2

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Version vom 10:50, 11. Mär. 2009

If we focus on the leading term x3, we need to complement it with ax2 in order to get a sub expression that is divisible by the denominator,

x+ax3+a3=x+ax3+ax2ax2+a3.

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 ax2+a3 in the numerator,

x+ax3+ax2ax2+a3=x+ax3+ax2+x+aax2+a3=x+ax2(x+a)+x+aax2+a3=x2+x+aax2+a3.

When we treat the new quotient, we add and take away a2x to/from ax2 in order to get something divisible by x+a,

x2+x+aax2+a3=x2+x+aax2a2x+a2x+a3=x2+x+aax2a2x+x+aa2x+a3=x2+x+aax(x+a)+x+aa2x+a3=x2ax+x+aa2x+a3.

In the last quotient, the numerator has x+a as a factor, and we obtain a perfect division,

x2ax+x+aa2x+a3=x2ax+x+aa2(x+a)=x2ax+a2.

If we have calculated correctly, we should have

x+ax3+a3=x2ax+a2

and one way to check the answer is to multiply both sides by x+a,

x3+a3=(x2ax+a2)(x+a).

Then, expand the right-hand side and we should get what is on the left-hand side,

RHS=(x2ax+a2)(x+a)=x3+ax2ax2a2x+a2x+a3=x3+a3=LHS.
Von „http://wiki.math.se/wikis/2009/bridgecourse2-TU-Berlin/index.php/L%C3%B6sung_3.4:1c