Let `f:R to R` be a function such that `|f(x)|le x^(2),"for all" x in R.` then at x=0, f is

let f: R to R be a function such that f(2-x)= f(2+x) and f(4-x)=f(4+x) , for all x in R and int_(0)^(2)f(x)dx=5 . Then the value of int_(10)^(50) f(x) dx is

If f: R rarr R is a function such that f(x +y) =f(x) +f(y) forall x,y in R then f is continuous on R if it is continuous at a single point in R.

Let f : R to R be a differentiable function such that f(2) = -40 ,f^1(2) =- 5 then lim_(x to 0)((f(2 - x^2))/(f(2)))^(4/(x^2)) is equal to

If 'f is a function such that f (x + y) =f (x) f (y) for all x,y in R and f ^(1) (0) exists, show that f ^(1) (x) = f(x) f ^(1)(0) for all x, y in R.

Let f and g be two diffrentiable functions on R such that f'(x) gt 0 and g'(x) lt 0 for all x in R . Then for all x

Let f: R to R be a function satisfying f(2-x) = f(2+x) and f(20 -x) = f(x) AA x in R . For this functions f. answer the following If f(0) =5 then the minimum possible number of values of x satisfying f(x)= 5 for x in [0,170] is

Let f:R to R be a continuous function and f(x)=f(2x) is true AA x in R . If f(1) = 3 then the value of int_(-1)^(1) f(f(x))dx=