Which of the following is the integral that gives the area of the region inside thecardioid r= 2+2cos0 and outside the circle r= 6cos e ?3(a) A = [[(6cos 0)² - (2+ 2cos 0)² |d®A = [[(2+2cos0)° (6cos0)° ]a©(b) А —D33(e) A= [(2+2cos0)²d® - ((6cos 0)² do(d) A = [(2+2cos€)² d® - [(6cos 6)² do3332(e) A = [(2+2cos0)² d® - [(6cos0)° de66

Find points of intersection: 2+2cosθ=6cosθcosθ=12θ=π3

Which of the following is the integral that gives the area of the region inside the cardioid r= 2+2cos0 and outside the circle r= 6cos 0 ? 3 (a) A= [[(6cos0)² -(2+2cos 0)² |a® (b) A = J (2+2cos0)² – (6cos 6)* |d0 2 3 (e) A= [(2+2cos0)²d® – [(6cos 0)² d® · OP. [(2+2cos0)²d® – [(6cos 0)² de (d) A= - 3 3 3 2 (e) A = [ (2+2cos 0)² d® – [(6cos0)² d®

Which of the following is the integral that gives the area of the region inside the cardioid r= 2+2cos0 and outside the circle r= 6cos 0 ? 3 (a) A= [[(6cos0)² -(2+2cos 0)² |a® (b) A = J (2+2cos0)² – (6cos 6)* |d0 2 3 (e) A= [(2+2cos0)²d® – [(6cos 0)² d® · OP. [(2+2cos0)²d® – [(6cos 0)² de (d) A= - 3 3 3 2 (e) A = [ (2+2cos 0)² d® – [(6cos0)² d®

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

Which of the following is the integral that gives the area of the region inside the
cardioid r= 2+2cos0 and outside the circle r= 6cos e ?
3
(a) A = [[(6cos 0)² - (2+ 2cos 0)² |d®
A = [[(2+2cos0)° (6cos0)° ]a©
(b) А —D
3
3
(e) A= [(2+2cos0)²d® - ((6cos 0)² do
(d) A = [(2+2cos€)² d® - [(6cos 6)² do
3
3
3
2
(e) A = [
(2+2cos0)² d® - [(6cos0)° de
6
6

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ISBN:

9780470458365

Author:

Erwin Kreyszig

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