Determine convergence / divergence of sum sin pi/n^2

nabakhi72

nabakhi72

Answered question

2022-08-05

Determine convergence / divergence of sin π n 2 .
Let a n = sin π n 2 .
I attempted the integral test but on the interval [ 1 , 2 ) it is increasing and decreasing on ( 2 , ). So the integral test in only applicable for the decreasing part. + the integral computation seems to lead to 3 pages of steps...
I believe the comparison test would be the most reasonable test, graphically I observed that a n behaves like b n = 1 / n when n is large.
b n = ; but, since b n > a n inconclusive for divergence/convergence.
I attempted the limit comparison, and ratio test, but inconclusive. I am uncertain if I am doing them properly.
How could I bound below a n to proceed with the comparison test? Is there a more appropriate method? How would you proceed?

Answer & Explanation

Alexia Mata

Alexia Mata

Beginner2022-08-06Added 15 answers

Step 1
It is not true that a n behaves like 1/n for large n, because
| sin ( x ) | | x |
for all x (and in fact, | sin x | | x | for values of x near zero). In particular, this means that
a n π / n 2 ..
Step 2
If you prefer, the limit comparison test can be applied with b n = π / n 2 and using the sharpness of the small angle approximation mentioned above.
Trevor Rush

Trevor Rush

Beginner2022-08-07Added 6 answers

Explanation:
Converges because sin ( π n 2 ) π n 2 and n = 1 1 n 2 = π 2 6 .

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