In Exercises 67–72, use the results of Exercises 63 and 64 to ...

Question

In Exercises 67–72, use the results of Exercises 63 and 64 to determine if each series converges or diverges.

∑(from n=2 to ∞) [(ln n)¹⁰⁰⁰ / n¹.⁰⁰¹]

Accepted Answer

Hello. In this video, we are going to be determining whether the given series converges or diverges. So the given series is the infinite series from N equal to 4 to infinity of the natural logarithm of N raised to the power of 100, divided by N raised to the power of 1.0001. Now here we can go ahead and think of the following limit. For any delta which is greater than 0, the natural logarithm of N raised to the power of 100 should equal to the approximate value of n raised to the power of delta. So by using this property, we can go ahead and take the limit of the series. That limit is going to be the limit, as N approaches infinity, of the natural logarithm of N raise to the power of 100 divided by n raise to the power of delta. And by simplifying this limit, this limit is going to give us the value of 0. So, we need to go ahead and make a substitution because this limit does not satisfy the test for divergence. So, we will use a substitution. We will let u equal to the natural logarithm of n. And we will allow in. To equal to e to the power of you. Then we need to choose a respective delta. We will allow delta to equal to 0.00005. And that is going to be less than 0.00001. So, by applying the substitution, we can state that the natural logarithm of N raise of 100 is less than equal to N raise the power of delta. So, by this assumption, we will have the natural logarithm of N raise the power of 100 divided by N raised the power of 1.0001. This is going to be less than or equal to N raises the power of delta, divided by N raised the power of 1.00001. This is equivalent to 1 divided by N raised the power of 1.00001 minus delta, and that is equivalent to 1 divided by N raised the power of 1.00005. Here, we've simplified the original limit to be a convergent P-series. And since this is equivalent to a convergent P series, the overall series is going to converge. And since the series converges, the overall solution to this problem is going to be option A. So I hope this video helps you in understanding on how to approach this problem, and we will go ahead and see you all in the next video.

In Exercises 67–72, use the results of Exercises 63 and 64 to determine if each series converges or diverges.∑(from n=2 to ∞) [(ln n)¹⁰⁰⁰ / n¹.⁰⁰¹]

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In Exercises 67–72, use the results of Exercises 63 and 64 to determine if each series converges or diverges.
∑(from n=2 to ∞) [(ln n)¹⁰⁰⁰ / n¹.⁰⁰¹]