If `f(x)=m x+ca n df(0)=f^(prime)(0)=1.` What is `f(2)?`

If f: RvecR is a differentiable function such that f^(prime)(x)>2f(x)fora l lxRa n df(0)=1,t h e n : f(x) is decreasing in (0,oo) f^(prime)(x) e^(2x)in(0,oo)

Let y=f(x) be a parabola, having its axis parallel to the y-axis, which is touched by the line y=x at x=1. Then, (a) 2f(0)=1-f^(prime)(0) (b) f(0)+f^(prime)(0)+f^(0)=1 (c) f^(prime)(1)=1 (d) f^(prime)(0)=f^(prime)(1)

Suppose f is a derivable function that satisfies the equation f(x+y)=f(x)+f(y)+x^2y+x y^2 for all real numbers x\ a n d\ y . Suppose that (lim)_(x->0)(f(x))/x=1,\ fin d f(0) b. f^(prime)(0) c. f^(prime)(x) d. f(3)

A function f: R->R is such that f^(prime)(x)=0 at x=0 a n d x=2 f^(prime)(x)<0 in 0 lt x >2 f^(prime)(x)>0 for x<0 Which of the following does not hold good? The graph of f has a local maximum point at x=2 The graph of f has a point of inflection at x=2 The graph of f has a local minimum point at x=0 The graph of f has a local minimum point at x=2

If a function 'f' satisfies the relation f(x)f^('')(x)-f(x)f^(')(x) -f^(')(x)^(2)=0 AA x in R and f(0)=1=f^(')(0) . Then find f(x) .

A function f: R->R satisfies sinxcosy(f(2x+2y)-f(2x-2y)=cosxsiny(f(2x+2y)+f(2x-2y))dot If f^(prime)(0)=1/2,t h e n (a)f^(prime)(x)=f(x)=0 (b)4f^(x)+f(x)=0 (c)f^(x)+f(x)=0 (d)4f^(x)-f(x)=0

Let f(x+y)=f(x)f(y) for all x and y . Suppose f(5)=2 and f^(prime)(0)=3 , find f^(prime)(5) .

Let f be a differentiable function satisfying f(x/y)=f(x)-f(y) for all x ,\ y > 0. If f^(prime)(1)=1 then find f(x)dot