The differential equation `(e^x+1) y dy=(y+1)e^x dx`, has the solution

The general solution of differential equation (e^(x) + 1) y dy = (y + 1) e^(x) dx is

Solve the differential equation dy/dx + 1 = e^(x+y)

Find the general solution of the differential equation (x cos y) dy = e^(x) (x log x +1) dx.

Solve the differential equation (dy)/(dx)+1=e^(x+y)

The solution of the differential equation x(e^(2y)-1)dy + (x^2-1) e^y dx=0 is

General solution of differential equation e^(x)(dy)/(dx)+e^(x)y=1 , is: (where c is constant of integration)

General solution of differential equation e^(x)(dy)/(dx)+e^(x)y=1 ,is (where c is constant of integration)

Solve the differential equation. (dy)/(dx) - y = e^(x) Hence find the particluar solution for x = 0 and y = 1 .

Find the particular solution of the differential equation x(dy)/(dx) - y = (x + 1 ) e^(-x) given that y = 0 when x = 1 .