We have to find the integral of sin (3x/2) * cos (x/2)
dx
Int [ sin (3x/2) * cos (x/2)
dx]
use sin 3x = 3sinx -
4(sinx)^3
=> Int [(3sin(x/2) -
4(sin(x/2))^3)*cos(x/2) dx]
let u = sin
x/2
du/dx = (1/2)*cos
(x/2)
=> 2*du = cos(x/2)
dx
=> Int [(3u - 4u^3)*2
du]
=> 2* Int [(3u du] - 2* Int[ (4u^3)
du]
=> 2* 3u^2 / 2 - 2* 4*u^4 /4 +
C
=> 3u^2 - 2*u^4 +
C
substitute u = sin
x/2
=> 3*(sin x/2)^2 - 2*(sin x/2)^4 +
C
=> (sin x/2)^2[ 3 - 2(sin x/2)^2] +
C
=> (1/2)(1 - cos x)[ 2 + cos x] +
C
=> (1/2)(2 - cos x - (cos x)^2) +
C
=> (1/2)(2 - cos x - (1/2 + (1/2)(cos 2x)) +
C
=> 1 - (1/2)cos x - 1/4 - (1/4)(cos 2x) +
C
=> 3/4 - (1/4)(2cos x + (cos 2x)) +
C
The 3/4 is added with the constant
C
=> (-1/4)(cos 2x + 2*cos x) +
C
The required integral is (-1/4)(cos 2x +
2*cos x) + C
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