Let f(x) and g(x) be defined and differntiable for all `x ge x_0 and f(x_0)=g(x_0) f(x) ge (x) for x gt x_0` then

Let f(x) and g(x) be two functions which are defined and differentiable for all x>=x_(0). If f(x_(0))=g(x_(0)) and f'(x)>g'(x) for all x>x_(0), then prove that f(x)>g(x) for all x>x_(0).

Iff (x) and g(x) be two function which are defined and differentiable for all x>=x_(0). If f(x_(0))=g(x_(0)) and f'(x)>g'(x) for all f>x_(0), then prove that f(x)>g(x) for all x>x_(0).

Let g'(x)>0 and f'(x)<0AA x in R, then

Given that f(x) gt g(x) for all x in R and f(0) =g(0) then

If f'(x) gt f(x)" for all "x ge 1 and f(1)=0 , then

Let f and g be differentiable functions such that: xg(f(x))f\'(g(x))g\'(x)=f(g(x))g\'(f(x))f\'(x) AA x in R Also, f(x)gt0 and g(x)gt0 AA x in R int_0^xf(g(t))dt=1-e^(-2x)/2, AA x in R and g(f(0))=1, h(x)=g(f(x))/f(g(x)) AA x in R Now answer the question: f(g(0))+g(f(0))= (A) 1 (B) 2 (C) 3 (D) 4

Two distinct polynomials f(x) and g(x) defined as defined as follow : f(x) =x^(2) +ax+2,g(x) =x^(2) +2x+a if the equations f(x) =0 and g(x) =0 have a common root then the sum of roots of the equation f(x) +g(x) =0 is -

If f(x)={:{(x", for " x ge 0),(x^(2)", for " x lt 0):} , then f is