If y= y(x) is the solution of the differential equation
`dy/dx=(tan x-y) sec^(2)x, x in(-pi/2,pi/2),` such that y (0)=0,
than `y(-pi/4)` is equal to

Solution of the differential equation y dx+(x-y^(2))dy=0 is

Let y=y(x) be the solution of the differential equation, dy/dx+y tan x=2x+x^(2)tanx, x in(-pi/2,pi/2), such that y(0)= 1. Then (a) y'(pi/4)-y'(-pi/4)=pi-sqrt 2 (b) y'(pi/4)+y'(-pi/4)=-sqrt 2 (c) y(pi/4)+y(-pi/4)=-pi^(2)/2+2. (d) y(pi/4)-y(-pi/4)=sqrt 2

Let y = y (x) be the solution of the differential equation cos x (dy)/(dx) + 2y sin x = sin 2x , x in (0, pi/2) . If y(pi//3) = 0, " then " y(pi//4) is equal to :

The general solution of the differential equation (dy)/(dx) = y tan x - y^(2) sec x is

If y = y ( x ) is the solution of differential equation sin y (dy ) /(dx ) - cos y = e ^ ( - x ) such that y ( 0 ) = ( pi ) /(2) then y (A) is equal to

If y=y(x) be the solution of differential equation dy/dx +tanx*y=sinx . If y(0)=0 Then y(pi/4)= ?

The solution of differential equation cos x dy = y (sin x - y ) dx, 0 lt x lt pi //2 is