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To find: The values of
Answer to Problem 61E
The values of
Explanation of Solution
Given information:
Calculation:
By applying the Ratio Test and looking at the interval’s endpoints, now identifying the convergence interval.
Taking the absolute value of the terms in the series and looking at the following limit, only using the Ratio Test for series with non-negative terms.
The series converges if
To test the convergence at the endpoints,
At left endpoints
To determine whether the given series converges or not by using Alternating Series Test,
The series satisfies the conditions of the test since
At right endpoints
To determine whether the given series converges or not by using Direct comparison Test,
Since
Obtaining a divergent lower bound for the given series, the Direct Comparison Test indicates that the series diverges at
From the above steps, it is known that the series diverges if
Therefore, the values of
Chapter 9 Solutions
CALCULUS:GRAPHICAL,...,AP ED.-W/ACCESS
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