How do you express 1/(s+1)^21(s+1)2 in partial fractions?

1 Answer
Shwetank Mauria
May 7, 2016

1/(s+1)^21(s+1)2 is already in its partial fractions form.

Explanation:

Partial fractions of 1/(s+1)^21(s+1)2 will be of type

1/(s+1)^2=A/(s+1)+B/(s+1)^21(s+1)2=As+1+B(s+1)2

= (A(s+1)+B)/(s+a)^2A(s+1)+B(s+a)2

or 1/(s+1)^2=(As+A+B)/(s+a)^21(s+1)2=As+A+B(s+a)2

Equating coefficients of numerator, we have A=0A=0 and A+B=1A+B=1 or B=1B=1.

Hence 1/(s+1)^2=0/(s+1)+1/(s+1)^21(s+1)2=0s+1+1(s+1)2

or 1/(s+1)^2=1/(s+1)^21(s+1)2=1(s+1)2

It is apparent that 1/(s+1)^21(s+1)2 is already in its partial fractions form.

Related questions
See all questions in Partial Fraction Decomposition (Irreducible Quadratic Denominators)
Impact of this question
34211 views around the world
You can reuse this answer
Creative Commons License