The values of b and c for which the identity `f(x+1)-f(x)=8x+3` is satisfied, where `f(x)=bx^(2)+cx+d`, are

If non-zer real numbers b and c are such that min f(x) gt max (g)x, where f(x)=x^(2)+2bx+2c^(2) and g(x)=-x^(2)-2cx+b^(2)(x in R) , Then |(c)/(b)| lies in the interval

The value of 3 f(x ) - 2 f(1/x)=x then f^(1)(2) =

Find the approximate value of f (3.02), where f(x) = 3x^(2)+ 5x + 3.

f(x) = log((1+x)/(1-x)) satisfies the equation: f(x_(1)) +f(x_(2))

If f: R rarr R such that f(x)=ax+b, a != 0 and the equation f(x)=f^(-1)(x) is satisfied by

If f(x)=ax^(5)+bx^(3)+cx+d is odd then

Let f(x) be a function satisfying f'(x)=f(x) with f(0)=1andg(x) be a function that satisfies f(x)+g(x)=x^(2) . Then the value of the integral int_(0)^(1)f(x)g(x)dx, is

a) The number of elements in the range of a constant function. (b) If f(x)=ax^(5) + bx^(3) + cx +d is an odd function, then the value of d is: ( c) If f: R to R defined by f(x)=3x-4 , then f^(-1)(5) = ( d) If f: R^(+) to R such that f(x) = log_(5)x , then f^(-1)(-1) = Then arrange the above values in ascending order:

The function y=f(x) satisfying the condition f(x+1//x) =x^(3)+1//x^(3) is: