How do you integrate int 1/(n(n+2)) using partial fractions?
1 Answer
int 1/(n(n+2)) dn = 1/2 ln abs(n) - 1/2 ln abs(n+2) + C
Explanation:
Since we have already been given a factorisation of the denominator into distinct linear factors, we are looking for a partical fraction decomposition of the form:
1/(n(n+2)) = A/n + B/(n+2)
=(A(n+2)+Bn)/(n(n+2))
=((A+B)n+2A)/(n(n+2))
Equating coefficients we find:
{(A+B=0), (2A=1) :}
Hence:
{(A=1/2),(B=-1/2):}
So:
int 1/(n(n+2)) dn = int (1/(2n) - 1/(2(n+2))) dn = 1/2 ln abs(n) - 1/2 ln abs(n+2) + C
