How to prove: \sum_{n=0}^\infty\frac{n^2}{2^n}=6

compagnia04

compagnia04

Answered question

2022-01-17

How to prove:
n=0n22n=6

Answer & Explanation

Steve Hirano

Steve Hirano

Beginner2022-01-17Added 34 answers

First observe that the sum converges (by, say, the root test).
We already know that R=n=012n=2
Let S be the given sum. Then S=2SS=n=02n+12n
Now use the same trick to compute T=n=0n2n we have T=2TT=n=012n=R=2.
Hence S=2T+R=6
One can continue like this to compute X=n=0n32n. We have
X=2XX=n=03n2+3n+12n=3S+3T+R=26. Sums with larger powers can be computed in the same way.
Annie Gonzalez

Annie Gonzalez

Beginner2022-01-18Added 41 answers

If Calculus is allowed, using infinite geometric series formula for |r|<1
0n<rn=11r
Differentiating wrt r
0n<nrn1=1(1r)2
0n<nrn=r(1r)2=1(1r)(1r)2=1(1r)21(1r)
Differentiating wrt r
0n<n2rn1=2(1r)31(1r)2
0n<n2rn=2r(1r)3r(1r)2
Here r=12
alenahelenash

alenahelenash

Expert2022-01-24Added 556 answers

Consider 11z=n=0zn Differentiating and multiplying by z, one has z(1z)2=zn=1nzn1=n=1nzn Repeating the above process, n=1n2zn=z(1+z)(1z)3 Now plug iz z=1/2

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