How do you express (x^2 + 5x - 7 )/( x^2 (x+ 1)^2) in partial fractions?

1 Answer
Narad T.
Nov 4, 2016

The answer is =-7/x^2+19/x-11/(x+1)^2-19/(x+1)

Explanation:

(x^2+5x-7)/(x^2(x+1)^2)=A/x^2+B/x+C/(x+1)^2+D/(x+1)
(A(x+1)^2+Bx(x+1)^2+Cx^2+Dx^2(x+1))/(x^2(x+1)^2)

x^2+5x-7=A(x+1)^2+Bx(x+1)^2+Cx^2+Dx^2(x+1)
let x=0 =>-7=A
x=-1=>-11=C
coefficentsof x^2 =>1=A+2B+C+D
coefficients of x=>5=2A+B=>B=19
:.D=-19
So, (x^2+5x-7)/(x^2(x+1)^2)=-7/x^2+19/x-11/(x+1)^2-19/(x+1)

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