Asked by Aaron
Show that the series sum(-1)^(n-1) b_n, where b_n = 1/2 if n is odd and b_n = 1/n^2 if n is even, is divergent.
Answers
Answered by
Steve
we know that ā1/n^2 converges (so ā1/(2n)^2 will as well), so this two-fold series will converge if the 1st part converges.
But that is 1/2-1/2+1/2-1/2 ... which can be either 1/2 or 0.
So, the whole shebang diverges.
But that is 1/2-1/2+1/2-1/2 ... which can be either 1/2 or 0.
So, the whole shebang diverges.
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