if y(x) is satisfy the differential equation `(dy)/(dx)=(tanx-y)sec^(2)x` and `y(0)=0`. Then `y=(-(pi)/(4))` is equal to

if y(x) is satisfy the differential equation (dy)/(dx)=(tan x-y)sec^(2)x and y(0)=0. Then y=(-(pi)/(4)) is equal to

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

If. y (x) satisfies the differential equation y' – y tan x = 2x sec x and y (0) = 0, then

If y(x) satisfies the differential equation : y'-y tan x = 2 x sec x and y (0) =0 , then :

If y(x) satisfies the differential equation y'-y tan x=2x sec x and y(0)=0, then

Solve the differential equation: y\ dx+(x-y^2)dy=0

Let C, be the curve obtained by the solution of differential equation (dy)/(dx)+(tanx)y=sinx,0lexle(pi)/(3) , with y(0)=0, then y((pi)/(4)) equal to :