8. Which of the following is true for the integral da ? xP (In x) q It diverges for p < 1 and converges for p > 1. It diverges for p ≤ 1 and converges for p > 1. It diverges for p < 1 and converges for p > 1. If p= 1, then it diverges for q ≤ 1 and converges for q> 1. It diverges for p < 1 and converges for p > 1. If p= 1, then it diverges for q> 1 and converges for q ≤ 1. It converges for q ≤ 1 and diverges for q> 1. (a) (b) (c) (d) (e)
8. Which of the following is true for the integral da ? xP (In x) q It diverges for p < 1 and converges for p > 1. It diverges for p ≤ 1 and converges for p > 1. It diverges for p < 1 and converges for p > 1. If p= 1, then it diverges for q ≤ 1 and converges for q> 1. It diverges for p < 1 and converges for p > 1. If p= 1, then it diverges for q> 1 and converges for q ≤ 1. It converges for q ≤ 1 and diverges for q> 1. (a) (b) (c) (d) (e)
Algebra for College Students
10th Edition
ISBN:9781285195780
Author:Jerome E. Kaufmann, Karen L. Schwitters
Publisher:Jerome E. Kaufmann, Karen L. Schwitters
Chapter9: Polynomial And Rational Functions
Section9.2: Remainder And Factor Theorems
Problem 51PS
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