Let `f:R -> ( 0,(2pi)/3]` defined as `f(x) = cot^-1 (x^2-4x + alpha)` Then the smallest integral value of `alpha` such that, `f(x)` is into function is

Let f: R rarr R be defined as f(X) = 3x. Then

A function f : R rarr R, where R is the set of real numbers, is defined by : f(x)= (alpha x^2+6x-8)/(alpha+6x-8x^2) . Find the interval of values of alpha for which f is onto. Is the function one-one for alpha = 3 ? Justify your answer.

Let f : R to [0, pi/2) be defined by f ( x) = tan^(-1) ( x^(2) + x + a. Then set of value of a for which f(x) is onto is

f:R->R is defined as f(x)=2x+|x| then f(3x)-f(-x)-4x=