For each of the improper integrals below, if the comparison test applies, enter either Aor B followed by one letter from C to K that best applies, and if the comparison testdoes not apply, enter only L. For example, one possible answer is BF, and another oneis L.Hint: 0 < e < 1 for x > 1.cos (x)dx2.x2 + 3A. The integral is convergentB. The integral is divergent1dx.x2 – 3C. by comparison to1dx.x2 + 3D. by comparison to1cos“(x)dx.E. by comparison toF. by comparison todx.x21eG. by comparison todx.2x11dx.H. by comparison toI. by comparison todx.1dx.x2J. by comparison to1dx.x3K. by comparison to1L. The comparison test does not apply.

Answered: Image /qna-images/answer/dfa90a3f-ad27-4a7a-8c4b-8e39f31723ac.jpg

2/* cos"(@) dx x2 + 3 A. The integral is convergent B. The integral is divergent 1 dx. 3 C. by comparison to x2 1 1 dx. x2 + 3 D. by comparison to 1 cos (x) dx. E. by comparison to F. by comparison to dx. x 2 1 G. by comparison to dx. 2x 1 1 dx. H. by comparison to 1

2/* cos"(@) dx x2 + 3 A. The integral is convergent B. The integral is divergent 1 dx. 3 C. by comparison to x2 1 1 dx. x2 + 3 D. by comparison to 1 cos (x) dx. E. by comparison to F. by comparison to dx. x 2 1 G. by comparison to dx. 2x 1 1 dx. H. by comparison to 1

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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Question

For each of the improper integrals below, if the comparison test applies, enter either A
or B followed by one letter from C to K that best applies, and if the comparison test
does not apply, enter only L. For example, one possible answer is BF, and another one
is L.
Hint: 0 < e < 1 for x > 1.
cos (x)
dx
2.
x2 + 3
A. The integral is convergent
B. The integral is divergent
1
dx.
x2 – 3
C. by comparison to
1
dx.
x2 + 3
D. by comparison to
1
cos“(x)
dx.
E. by comparison to
F. by comparison to
dx.
x2
1
e
G. by comparison to
dx.
2x
1
1
dx.
H. by comparison to
I. by comparison to
dx.
1
dx.
x2
J. by comparison to
1
dx.
x3
K. by comparison to
1
L. The comparison test does not apply.

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