Find all the values of a such that the given series would converge. (-1)"6"x¹ (√n + 5) n=1 The series is convergent from x to x = . left end included (enter Y or N): , right end included (enter Y or N):

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Find all the values of a such that the given series would converge.
(-1)"6"x¹
(√n + 5)
n=1
The series is convergent
from a
to x =
. left end included (enter Y or N):
, right end included (enter Y or N):
Transcribed Image Text:Find all the values of a such that the given series would converge. (-1)"6"x¹ (√n + 5) n=1 The series is convergent from a to x = . left end included (enter Y or N): , right end included (enter Y or N):
Expert Solution
Step 1: Solution

Given series: sum from n equals 1 to infinity of fraction numerator left parenthesis negative 1 right parenthesis to the power of n 6 to the power of n x to the power of n over denominator square root of n plus 5 end fraction

We have to find all the values of x such that the given series converges.

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