To find: Whether the geometric series converges or diverges. Find the sum if the series converges.
Answer to Problem 48RE
The infinite series converges and its sum is
Explanation of Solution
Given:
The given series is
Calculation:
Consider the formula for the geometric series is,
Consider given series is,
The above series is convergent when
Then, the sum is,
Thus, the infinite series converges and its sum is
Chapter 12 Solutions
Precalculus
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