How do you express 1/(x^3 +4x) in partial fractions?

1 Answer
P dilip_k
Mar 5, 2016

let
1/(x^3+4x)=1/(x(x^2+4))=a/x+(bx)/(x^2+4)=(a(x^2+4)+bx^2)/(x(x^2+4))
Now
1=(a(x^2+4)+bx^2)
putting x=0 in the above identity we have 4a=1 =>a=1/4
Again putting x=1, we have 5a+b=1
putting a=1/4 in the 2nd equation 5a+b=1
we get 5/4+b=1=>b=-1/4

Hence we can write
1/(x^3+4x)=1/4(1/x-x/(x^2+4))

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