Which statement below is FALSE? If a series converges absolutely, then it converges. If an improper integral converges to a number L, then the associated infinite series converges to the same number...

I need help with these two questions pleaseWhich statement below is FALSE?<br>If a series converges absolutely, then it converges.<br>If an improper integral converges to a number L, then the associated<br>infinite series converges to the same number L.<br>O If a series converges, then the limit of the nth term approaches zero.<br>100<br>O If 2-1 an converges to L, then the series En=1 can converges to<br>cL. (c is a constant)<br>

Extracted text: Which statement below is FALSE? If a series converges absolutely, then it converges. If an improper integral converges to a number L, then the associated infinite series converges to the same number L. O If a series converges, then the limit of the nth term approaches zero. 100 O If 2-1 an converges to L, then the series En=1 can converges to cL. (c is a constant)
Use the Integral Test to determine whether the series is convergent or divergent.<br>n-6<br>n = 1<br>Evaluate the following integral.<br>x-6dx<br>Give the value of the integral, then say if it the series is convergent or<br>divergent<br>O-1/5, Divergent<br>Infinity, Divergent<br>O 1/5, Convergent<br>

Extracted text: Use the Integral Test to determine whether the series is convergent or divergent. n-6 n = 1 Evaluate the following integral. x-6dx Give the value of the integral, then say if it the series is convergent or divergent O-1/5, Divergent Infinity, Divergent O 1/5, Convergent

Jun 05, 2022
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