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Chapter 8: Q 35. (page 670)

Find the interval of convergence for each power series in Exercises 21–48. If the interval of convergence is finite, be sure to analyze the convergence at the endpoints.

∑k=0∞k!22k!x+2k

Short Answer

Expert verified

The interval of convergence for power series is-4,0.

Step by step solution

01

Step 1. Given information.

The given power series is:

∑k=0∞k!22k!x+2k

02

Step 2. Find the interval of convergence.

Let us assumebk=k!22k!x+2ktherefore

bk+1=k+1!22k+1!x+2k+1

The ratio for the absolute convergence is

limk→∞bk+1bk=limk→∞k+1!22k+1!x+2k+1k!22k!x+2k=limk→∞k+122k+22k+1x+2=limk→∞x+2k+12k+112

Here the limit role="math" 12x+2is So, by the ratio test of absolute convergence, we know that series will converge absolutely when 12x+2<1that is -4<x<0.

03

Step 3. Find the interval of convergence.

Now, since the intervals are finite so we analyze the behavior of the series at the endpoints.

So, when x=-4

∑k=0∞k!22k!x+2k=∑k=0∞k!22k!-4+2k=∑k=0∞k!22k!-2k

The result is just a constant multiple of the arithmetic series, which diverges conditionally.

So, when x=0

∑k=0∞k!22k!x+2k=∑k=0∞k!22k!0+2k=∑k=0∞k!22k!2k

The result is the alternating multiple of the harmonic series, which diverges.

Therefore, the interval of convergence of the power series ∑k=0∞k!22k!x+2kis -4,0.

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Most popular questions from this chapter

In Exercises 23–32 we ask you to give Lagrange’s form for the corresponding remainder, R4(x)

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