How do you test the alternating series Sigma ((-1)^(n+1)2^n)/(n!) from n is [0,oo) for convergence?

1 Answer
Scott F.
Apr 24, 2018

Converges absolutely

Explanation:

Use the ratio test. This test works for alternating series.

If there is a series sum_(n=0)^infty a_n then consider lim_(n rarr infty)abs(a_(n+1)/a_n)=L.
If L<1 then the series absolutely converges.
If L>1 then the series diverges.
If L=1 then the test is inconclusive.

For our series, we have:
lim_(n rarr infty)abs(((-1)^((n+1)+1)2^(n+1))/((n+1)!)div((-1)^(n+1)2^n)/(n!))
lim_(n rarr infty)abs(((-1)^(n+2)2^(n+1)n!)/((-1)^(n+1)2^n(n+1)!)
lim_(n rarr infty)abs((-2)/(n+1))
0

0<1 so the series converges absolutely.

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