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

(dy)/(dx)=(x+e^(2x))/(y)

(dy)/(dx)=(x^2+e^(x))/(y)

(dy)/(dx)=(x^2+e^(x))/(y^2)

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

Find the general solution of each of the following differential equations: (dy)/(dx)=e^(x+y)+e^(x-y)

The general solution of (dy)/(dx) = 2x e^(x^(2)-y) is

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

Solve the following differential equations: (dy)/(dx)=e^(x+y)+e^(y)x^(3)

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

The solution of the differential equation (dx)/(dy)=(x^(2))/(e^(y)-x)(AA x gt0) is lambdax+2cx^(2)e^(y)=e^(y) (where, c is an arbitrary constant). Then, lambda is euqal to