Let `f:[0,1] rarr R` be such that `f(xy)=f(x).f(y),` for all `x,y in [0,1]` and `f(0) ne 0.` If `y=y(x)` satisfies the differential equation, `dy/dx=f(x)` with `y(0)=1,` then `y(1/4)+y(3/4)` is equal to

Let f:[0,1] rarr R be such that f(xy)=f(x).f(y), for all x,y in [0,1] and f(0) ne 0. If y=y(x) satisfies the differential equation, dy/dx=f(x) with y(0)=1, then y(1/4)+y(3/4) is equql to (A) 5 (B) 3 (C) 2 (D) 4

If y=f(x) satisfy differential equation ( dy )/(dx)-y=e^(x) with f(0)=1 then value of f'(0) is

If y=f (x) satisfy the differential equation (dy)/(dx) + y/x =x ^(2),f (1)=1, then value of f (3) equals:

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 ydx-(x+2y^(2))dy=0 is x=f(y). If f(-1)=1, then f(1) is equal to

A function f:R rarr R satisfies the differential equation 2xy+(1+x^(2))y'=1 where f(0)=0 then