. Let C1 and C2 be two curves in polar coordinates, whose equations are given by: (see attached image with equations C1 and C2). One of the intersection angles between the curves is: (see the attached image part 2) Which of the following integrals (see the image part 2) allows us to calculate the area outside C1 and inside C2?

. Let C1 and C2 be two curves in polar coordinates, whose equations are given by: (see attached image with equations C1 and C2). One of the intersection angles between the curves is: (see the attached image part 2) Which of the following integrals (see the image part 2) allows us to calculate the area outside C1 and inside C2?

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter7: Analytic Trigonometry

Section7.4: Multiple-angle Formulas

Problem 28E

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Question

A. Let C1 and C2 be two curves in polar coordinates, whose equations are given by: (see attached image with equations C1 and C2).

One of the intersection angles between the curves is: (see the attached image part 2)

Which of the following integrals (see the image part 2) allows us to calculate the area outside C1 and inside C2?

Uno de los angulos de intersección entre las curvas es 0
3.
De las siguientes integrales
(2+ 2 cos(0) de -
| (6 cos(0)" do
1.
2(2+ 2 con(0))* – (6 con(0))" do
3.
(2 + 2 cos(0)) - (6 cos(0)) do +
(2 + 2 cos(0)) do

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