Chapter 10, Problem 16RE

(a)

To determine

The radius of convergence of the series ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$

Answer to Problem 16RE

The radius of convergence for is $\sqrt{3}$ . $R=\sqrt{3}$

Explanation of Solution

Given information:

The given series is,

  ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$

Formula used:

Ratio test is used.

Calculation:

If the sequence of partial sum has a limit as $n\to \infty$ , we say the series converges otherwise the sequence is divergent. For series to be convergent, the term should approach to zero. That is common ratio should be less than 1. That is, |r |< 1, where r is the common ratio.

Now,

It is a geometric series with common ratio $\left(\frac{x^2-1}{2}\right)$

Therefore,

  $\left|\left(\frac{x^2-1}{2}\right)\right|<1\left|x\right|<\sqrt{3}$

That gives,

  $-\sqrt{3}<x<\sqrt{3}$

Since,

  $\left|x\right|<\sqrt{3}\text{if}\left|x\right|<\sqrt{3}$ then the series converges absolutely and hence convergence.

Therefore, the radius of convergence for is $\sqrt{3}$ . $R=\sqrt{3}$

Conclusion: The radius of convergence for is $\sqrt{3}$ . $R=\sqrt{3}$

(b)

To determine

The interval of convergence of the series ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$

Answer to Problem 16RE

The series always converges for interval $\left[-\sqrt{3},\sqrt{3}\right]$

Explanation of Solution

Given information:

The given series is,

  ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$

Formula used:

Ratio test is used.

Calculation:

Since,

  $\left|\left(\frac{x^2-1}{2}\right)\right|<1$

  $-\sqrt{3}\le x<\sqrt{3}$

Therefore,

The series always converges for interval $\left[-\sqrt{3},\sqrt{3}\right]$

Conclusion:

The series always converges for interval $\left[-\sqrt{3},\sqrt{3}\right]$

(c)

To determine

The series ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$ converges absolutely.

Answer to Problem 16RE

The series always converges absolutely for interval $\left[-\sqrt{3},\sqrt{3}\right]$

Explanation of Solution

Given information:

The given series is,

  ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$

Formula used:

Ratio test is used.

Calculation:

Since,

  $\left|\left(\frac{x^2-1}{2}\right)\right|<1$

From equation (1) and (2) as shown below,

  $-\sqrt{3}\le x<\sqrt{3}$

Therefore,

The series always converges absolutely for interval $\left[-\sqrt{3},\sqrt{3}\right]$

Conclusion:

The series always converges absolutely for interval $\left[-\sqrt{3},\sqrt{3}\right]$

(d)

To determine

The series ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$ converges conditionally.

Answer to Problem 16RE

There is no point of conditional convergence.

Explanation of Solution

Given information:

The given series is,

  ${{\displaystyle \sum _{n=1}^{\infty }\left(\frac{x^2-1}{2}\right)}}^n$

Formula used:

Ratio test is used.

Calculation:

There is no point of conditional convergence.

Conclusion:

There is no point of conditional convergence.