Let `y = f (x)` such that `xy = x+y +1, x in R-{1} and g (x) =x f (x)`
The minimum value of `g (x)` is:

Let y = f (x) such that xy = x+y +1, x in R-{1} and g (x) =x f (x) There exist two values of x, x_(1) and x _(2) where g '(x) =1/2, then |x _(1)| + |x_(2)|=

If f(x) = (1)/(1 -x) x ne 1 and g(x) = (x-1)/(x) , x ne0 , then the value of g[f(x)] is :

Let f be a function such that f(xy) = f(x).f(y), AA y in R and R(1 + x) = 1 + x(1 + g(x)) . where lim_(x rarr 0) g(x) = 0 . Find the value of int_(1)^(2) (f(x))/(f'(x)).(1)/(1+x^(2))dx

Let f :R to R be a continous and differentiable function such that f (x+y ) =f (x). F(y)AA x, y, f(x) ne 0 and f (0 )=1 and f '(0) =2. Let g (xy) =g (x). g (y) AA x, y and g'(1)=2.g (1) ne =0 The number of values of x, where f (x) g(x):

If g(x)=max(y^(2)-xy)(0le yle1) , then the minimum value of g(x) (for real x) is

Consider a differentiable f:R to R for which f(1)=2 and f(x+y)=2^(x)f(y)+4^(y)f(x) AA x , y in R. The minimum value of f(x) is

Let f(x) be a function such that f(x+y)=f(x)+f(y) and f(x)=sin x g(x)" fora ll "x,y in R . If g(x) is a continuous functions such that g(0)=k, then f'(x) is equal to

g(x+y)=g(x)+g(y)+3xy(x+y)AA x, y in R" and "g'(0)=-4. The value of g'(1) is

Let f :R to R be a continous and differentiable function such that f (x+y ) =f (x). F(y)AA x, y, f(x) ne 0 and f (0 )=1 and f '(0) =2. Let g (xy) =g (x). g (y) AA x, y and g'(1)=2.g (1) ne =0 Identify the correct option:

Let f :R to R be a continous and differentiable function such that f (x+y ) =f (x). F(y)AA x, y, f(x) ne 0 and f (0 )=1 and f '(0) =2. Let f (xy) =g (x). G (y) AA x, y and g'(1)=2.g (1) ne =0 Identify the correct option: