The solution of (dy)/(dx)=e^(x)(sin x + ...

The solution of `(dy)/(dx)=e^(x)(sin x + cos x)` is

A

`y=e^x (sin x -cos x ) + c `

B

`y=e^x (cos x - sin x ) + c `

C

`y=e^x sin x + c `

D

`y=e^x cos x + c`

Verified by Experts

The correct Answer is:

C

Similar Questions

Explore conceptually related problems

The solution of (dy)/(dx)+y=e^(x) is

The solution of (dy)/(dx)+1 = e^(x+y) is

The solution of (dy)/(dx)=x log x is

The solution of (dy)/(dx) -y=e^(x) , y(0) = 1 , is

The solution of dy/dx+y=cos x-sin x is

The solution of e^(dy//dx) = (x+1) , y=3, at x=0 is

The solution of dy/dx=cos(x+y)+sin(x+y) , is given by

Solution of cos x (dy)/(dx) + y sin x = 1 is

The solution of "dy"/"dx"+2ytan x =sin x is

The solution of the equation (dy)/(dx)=e^(x-y) + x^2 e^(-y) is