How do you express $(x-1)/(x^3 +x^2)$ in partial fractions?

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How do you express $(x-1)/(x^3 +x^2)$ in partial fractions?

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Answer 1 · 2016-10-29T20:16:18

The answer is $(x-1)/(x^3+x^2)=2/x-1/x^2-2/(x+1)$

Explanation:

Some factorisation to start with
$(x-1)/(x^3+x^2)=(x-1)/((x^2)(x+1))$
$=A/x+B/x^2+C/(x+1)$
$=(Ax(x+1)+B(x+1)+Cx^2)/((x^2)(x+1))$

So now we can solve for $A, B,and C$
$x-1=Ax(x+1)+B(x+1)+Cx^2$
let x=-1, $-2=C$ $=>$ $C=-2$
Coefficients of $x^2$ , $0=A+C$ $=>$ $A=2$
Coefficients of $x$ , $1=A+B$ $=>$ $B=-1$

And finally, we have
$(x-1)/(x^3+x^2)=2/x-1/x^2-2/(x+1)$

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How do you express $(x-1)/(x^3 +x^2)$ in partial fractions?

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