[" The solution of primitive integral solution "],[qquad y(1)=1" and "y(x_(0))=e," then "x_(0)" is "]

The solution of the primitive integral equation (x^(2)+y^(2))dy=xydx is y=y(x)* If y(1)=1 and y(x_(0))=e, then x_(0) is

The solution of the primitive integral equation (x^2+y^2)dy=x y dx is y=y(x)dot If y(1)=1 and y(x_0)=e , then x_0 is

The solution of the primitive integral equation (x^2+y^2)dy=x ydx is y=y(x)dot If y(1)=1 and y(x_0)=e , then x_0 is

The solution of the primitive integral equation (x^2+y^2)dy=x ydx is y=y(x)dot If y(1)=1 and y(x_0)=e , then x_0 is

Let y=f(x) is a solution of differential equation e^(y)((dy)/(dx)-1)=e^(x) and f(0)=0 then f(1) is equal to

Let y=f(x) is a solution of differential equation e^(y)((dy)/(dx)-1)=e^(x) and f(0)=0 then f(1) is equal to

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

Let y(x) be the solution of the differential equation 2x^2dy + (e^y-2x)dx = 0, x>0. If y(e) = 1, then y(1) is equal to :

The solution of the differential equation (1+e^(x))y(dy)/(dx) = e^(x) when y=1 and x = 0 is

The solution of the equation (dy)/(dx)+y=e^(-x), y(0)=0 is -