x(dy)/(dx)+y=(1+x)e^(x)

Solve the following differential equations: x(dy)/(dx)-y=(x-1)e^(x)

Solve the following differential equations: x(dy)/(dx)-y=(x-1)e^x

Solve the following differential equations: x(dy)/(dx)-y=(x-1)e^x

Solve the differential equation: x(dy)/(dx)-y=(x-1)e^x,x>0

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

Solve (1)/(x)(dy)/(dx)+y.e^(x)=e^((1-x)e^(x))

If e^(x) + e^(y) = e^(x + y) , then prove that (dy)/(dx) = (e^(x)(e^(y) - 1))/(e^(y)(e^(x) - 1)) or (dy)/(dx) + e^(y - x) = 0 .

(dy)/(dx) -y =e^(x ) " when" x=0 and y=1

Find the general solutions of the following differential equations. (i) (dy)/(dx) = e^(x+y) (ii) (dy)/(dx) = e^(y-x) (iii) (dy)/(dx) = (xy+y)/(yx+x) (iv) y(1+x)dx+x(1+y)dy = 0