The solution of `(dy)/(dx)+yf'(x)-f(x).f'(x)=0,y!=f(x)` is

If for all x,y the function f is defined by f(x)+f(y)+f(x).f(y)=1 and f(x)gt0. Then show f'(x)=0

Find dy/dx if f(x)= 2/ (1-x)

Let y= int_(u(x))^(y(x)) f (t) dt, let us define (dy)/(dx) as (dy)/(dx)=v'(x) f (v(x)) - u' (x) f(u(x)) and the equation of the tangent at (a,b) and y-b=((dy)/(dx))(a,b) (x-a) . If y=int_(x^(2))^(x^(4)) (In t) dt , "then" lim_(x to 0^(+)) (dy)/(dx) is equal to

Find dy/dx if f(x)=x^2e^x

If f:R-{-1}toR and f is differentiable function satisfies: f((x)+f(y)+xf(y))=y+f(x)+yf(x)AAx, yinR-{_1} Find f(x).

Let y= int_(u(x))^(y(x)) f (t) dt, let us define (dy)/(dx) as (dy)/(dx)=v'(x) f^(2) (v(x)) - u' (x) f^(2) (u(x)) and the equation of the tangent at (a,b) and y-b=((dy)/(dx))(a,b) (x-a) . If f(x)=int _(x)^(x^2) t^(2) dt " then" (d)/(dx) f(x) at x = 1 is

A function f : R rarr R satisfies the equation f(x+y) = f(x). f(y) for all x y in R, f(x) ne 0 . Suppose that the function is differentiable at x = 0 and f'(0) = 2 , then prove that f' = 2f(x) .

A function f : R rarr R satisfies the equation f(x + y) = f(x) . f(y) for all, f(x) ne 0 . Suppose that the function is differentiable at x = 0 and f'(0) = 2. Then,