How do you find the area of the region bounded by the polar curves $r = cos (2 θ)$ $r=cos(2theta)$ and $r = sin (2 θ)$ $r=sin(2theta)$ ?

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How do you find the area of the region bounded by the polar curves $r = cos (2 θ)$ $r=cos(2theta)$ and $r = sin (2 θ)$ $r=sin(2theta)$ ?

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Answer 1 · 2014-08-30T00:40:08

The areas of both regions are $\frac{π}{2}$ $pi/2$ .

The graph of $r = sin (2 θ)$ $r=sin(2theta)$ , $0 \leq θ < 2 π$ $0leq theta <2pi$ looks like this:

enter image source here

Since the area element in polar coordinates is $r d r d θ$ $r dr d theta$ , we can find the area of the four leaves above by
$A = \int_{0}^{2 π} \int_{0}^{sin (2 θ)} r d r d θ$ $A=int_0^{2pi}int_0^{sin(2 theta)}rdrd theta$ .

Let us evaluate the inside integral first,
$A = \int_{0}^{2 π} {[\frac{r^{2}}{2}]}_{0}^{sin (2 θ)} d θ = \int_{0}^{2 π} \frac{{sin}^{2} (2 θ)}{2} d θ$ $A=int_0^{2pi}[{r^2}/2]_0^{sin(2 theta)}d theta =int_0^{2pi}{sin^2(2 theta)}/2 d theta$

By the double-angle idenitity ${sin}^{2} (2 θ) = \frac{1 - cos (4 θ)}{2}$ $sin^2(2 theta)={1-cos(4 theta)}/2$ ,
$A = \frac{1}{4} \int_{0}^{2 π} [1 - cos (4 θ)] d θ = \frac{1}{4} {[θ - \frac{sin (4 θ)}{4}]}_{0}^{2 π} = \frac{1}{4} [2 π - \frac{sin (8 π)}{4} - (0 - \frac{sin (0)}{4})] = \frac{1}{4} (2 π) = \frac{π}{2}$ $A=1/4int_0^{2pi}[1-cos(4 theta)]d theta =1/4[theta-{sin(4 theta)}/{4}]_0^{2pi} =1/4[2pi-{sin(8pi)}/4-(0-{sin(0)}/{4})]=1/4(2pi)={pi}/2$

Hence, the area is $\frac{π}{2}$ ${pi}/2$ .

For $r = cos (2 θ)$ $r=cos(2 theta)$ , the area can be found by
$A = \int_{0}^{2 π} \int_{0}^{cos (2 θ)} r d r d θ$ $A=int_0^{2pi}int_0^{cos(2 theta)}rdrd theta$

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How do you find the area of the region bounded by the polar curves $r = cos (2 θ)$ $r=cos(2theta)$ and $r = sin (2 θ)$ $r=sin(2theta)$ ?

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How do you find the area of the region bounded by the polar curves $r = cos (2 θ)$ $r=cos(2theta)$ and $r = sin (2 θ)$ $r=sin(2theta)$ ?