Chapter 10: Q. 16 (page 777)

Perform the following steps for the power series in $x - x_{0}$ in $\sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k}$

Short Answer

Expert verified

The power series in $x - x_{0}$ for $F (x) = \int_{x}^{x_{0}} f (t) d t$ is $F (x) = \sum_{k = 2}^{\infty} {(- 1)}^{k - 1} \frac{(k - 1)!}{(2 k - 1)!} {(x - 7)}^{2 k - 1}$

Step by step solution

To find the interval of convergence of the power series, use the ratio test for absolute convergence

Let $b_{k} = {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k}$

So, $b_{k + 1} = {(- 1)}^{k + 1} \frac{(k + 1)!}{(2 k + 2)!} {(x - 7)}^{2 k + 2}$

Therefore, $\lim_{k \to \infty} |\frac{b_{k + 1}}{b_{k}}| = \lim_{k \to \infty} \frac{- (k + 1)}{(2 k + 2) (2 k + 1)} {|x - 7|}^{2}$

Now, by the ratio test for absolute convergence, the series will converge only when ${|x - 7|}^{2} < 1$

Therefore $x \in (6, 8)$

When $x = 6$

localid="1668615860499" $\sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k} = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(6 - 7)}^{2 k} = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(- 1)}^{2 k} = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!}$

This series will converge.

When 8

localid="1668615898689" $\sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k} = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(8 - 7)}^{2 k} = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(1)}^{2 k} = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!}$

This series will converge.

Therefore, the interval of convergence of power series islocalid="1668615922143" $[6, 8]$

Let us take the derivative of the function f(x)

Therefore,

$f^{'} (x) = \frac{d}{d x} [\sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k}] f^{'} (x) = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} \frac{d}{d x} {(x - 7)}^{2 k} f^{'} (x) = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} 2 k {(x - 7)}^{2 k - 1} f^{'} (x) = \sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k - 1)!} {(x - 7)}^{2 k - 1}$

Now we change the index in the final step

So, the power series in $x - x_{0}$ for $f^{'}$ is

localid="1668616020573" $f^{'} (x) = \sum_{k = 0}^{\infty} {(- 1)}^{k + 1} \frac{(k + 1)!}{(2 k + 1)!} {(x - 7)}^{2 k + 1}$

To find the power series in x-x0 for F, let us integrate the function f(x) from x0 to x

Therefore,

$F (x) = \int_{x_{0}}^{x} [\sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(t - 7)}^{2 k}] d t F (x) = \sum_{k = 1}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} \int_{x_{0}}^{x} {(t - 7)}^{2 k} d t$

Thus,

$F (x) = \sum_{k = 1}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k + 1}$

So, change the index in the final step :-

$F (x) = \sum_{k = 2}^{\infty} {(- 1)}^{k - 1} \frac{(k - 1)!}{(2 k - 1)!} {(x - 7)}^{2 k - 1}$

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Perform the following steps for the power series in $x - x_{0}$ in $\sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k}$

Short Answer

Step by step solution

To find the interval of convergence of the power series, use the ratio test for absolute convergence

Let us take the derivative of the function f(x)

To find the power series in x-x0 for F, let us integrate the function f(x) from x0 to x

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Perform the following steps for the power series in x-x0in ∑k=0∞(-1)kk!(2k)!(x-7)2k

Short Answer

Step by step solution

To find the interval of convergence of the power series, use the ratio test for absolute convergence

Let us take the derivative of the function f(x)

To find the power series in x-x0 for F, let us integrate the function f(x) from x0 to x

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Statistics

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Study anywhere. Anytime. Across all devices.

Perform the following steps for the power series in $x - x_{0}$ in $\sum_{k = 0}^{\infty} {(- 1)}^{k} \frac{k!}{(2 k)!} {(x - 7)}^{2 k}$