The solution of differential equation `sec^(2)xdx+sec^(2)ydy=0` is :

2e^(x)dx-sec^(2)ydy=0

int x sec^(2)xdx

The solution of the differential equation dy =sec^2x dx is -

int sec^(2)xdx=

Find the general solution of the differential equations sec^(2)x tan ydx+sec^(2)y tan xdy=0

The solution of differential equation xdx+ydy=a(x^(2)+y^(2))dy ,is

Let y=y(x) be the solution of the differential equation sec^(2)xdx+(e^(2y)tan^(2)x+tan x)dy=0,0 lt x lt (pi)/(2), y(pi/4)=0 .If y(pi/6)=alpha ,then e^(8a) is equal to:

The solution of the differential equation x sec y "dy"/"dx"=1 is

The solution of the differential equation xdx+ysin^(2)xdy=ydy+xsin^(2)ydx is (where, c is an arbitrary constant)