Question #f1f96

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Question #f1f96

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Answer 1 · 2017-04-14T18:13:04

$2pi$

Explanation:

The two curves would intersect where $3cos theta = 1+cos theta$ . This gives $2 cos theta =1$ , or $cos theta= 1/2$ . Hence
$theta= pi/3, -pi/3$ . The figure showing the common area(shaded in black pen) is given below.
enter image source here

The area would be given by the integral $int_(-pi/3)^(pi/3) {(3cos theta)^2 - (1+cos theta)^2} d theta$

= $int_(-pi/3)^(pi/3) (8cos^2 theta -2cos theta -1)d theta$

= $int_(-pi/3)^(pi/3) (4+4 cos 2theta -2 cos theta-1)d theta$

= $[3 theta +2 sin 2 theta - 2 sin theta]_(-pi/3)^(pi/3)$

$=[3 pi/3 +2 sin ((2pi)/3) - 2 sin (pi/3)]-[-3pi/3-2sin ((2pi)/3) +2 sin (pi/3)]$

$= 2pi$

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Question #f1f96

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