Calculate sum of an infinite series \(\displaystyle{\sum_{{{n}={1}}}^{\infty}}{\left(-{1}\right)}^{{{n}-{1}}}{n}^{{2}}{x}^{{n}}\)

Neveah Stewart

Neveah Stewart

Answered question

2022-03-19

Calculate sum of an infinite series
n=1(1)n1n2xn

Answer & Explanation

zonadeenfoqueun6

zonadeenfoqueun6

Beginner2022-03-20Added 3 answers

Note that n2=n(n1)+n and hence the given series n1n2xn=:f(n;x) can be written as
f(n;x)=n1n(n1)xn+n1nxn=f1(n;x) respectively. Let us determine these f1(n;x) and f2(n;x) separtely.
Now f1(n;x)=x2n1n(n1)xn2=x22(1+x)3=2x2(1+x)3 by using the fact (1+x)1=n1xn and two times successive differentiation.
On the other hand f2(n;x)=x1(1+x)2=x(1+x)2
Therefore f(n;x)=2x2(1+x)3x(1+x)2

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