int("sin"(5x)/(3))/("sin"(x)/(2))dx is e...

`int("sin"(5x)/(3))/("sin"(x)/(2))dx` is equal to (where, C is a constant of integration)

A

`x+2 sin x +2 sin 2x +c`

B

`2x + sin x + sin 2x +c`

C

`2x + sin x +2 sin 2x +c`

D

`x+2 sin x + sin 2x +c`

Verified by Experts

The correct Answer is:

D

Similar Questions

Explore conceptually related problems

int("sin"(5x)/(2))/("sin"(x)/(2))dx is equal to (where, C is a constant of integration)

The value of int(ln(cotx))/(sin2x)dx is equal to (where, C is the constant of integration)

The integral int((x)/(x sin x+cos x))^(2)" dx is equal to (where C is a constant of integration )

The integral int((x)/(x sin x+cos x))^(2)dx is equal to (where "C" is a constant of integration

The integral int(1)/(4sqrt((x-1)^(3)(x+2)^(5)) dx is equal to (where c is a constant of integration)

The value of int((x-4))/(x^2sqrt(x-2)) dx is equal to (where , C is the constant of integration )

The integral int(2x^(3)-1)/(x^(4)+x)dx is equal to: (Here C is a constant of integration)

int(dx)/(1+e^(-x)) is equal to : Where c is the constant of integration.

The integral int(2x^(12)+5x^(9))/((x^(5)+x^(3)+1)^(3))dx is equal to (where C is a constant of integration)

Let I=int(cos^(3)x)/(1+sin^(2)x)dx , then I is equal to (where c is the constant of integration )