To find:The values of
Answer to Problem 26E
The function of
Explanation of Solution
Given:
The series is
Concept used:
The mathematical expression of infinite geometric series in general is written as
The convergence test of series states that the geometric series converges if
Furthermore, the convergence test of geometric series also ensures that the convergent infinite geometric series
Calculation:
The series
The series
Now in order to converge, the magnitude of rate for the function
Therefore, the function
Now solve the absolute inequality
It can be seen that the value of
The value of
It can be observed that the series
The given function fits the formula for infinite geometric series
The initial term is
The values are obtainedas
The series
Conclusion:
Thus, the function of
Chapter 10 Solutions
Calculus 2012 Student Edition (by Finney/Demana/Waits/Kennedy)
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