Let `f:R -> ( 0,(2pi)/2]` 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(0,(2 pi)/(2)] 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)={2kx+3,x =0 If f(x) is injective then find the smallest integral value of

Let f:R rarr(0,(pi)/(2)) be a function defined by f(x)=cot^(-1)(x^(2)+4x+alpha^(2)-alpha), complete set of valuesof alpha for which f(x) is onto,is (A) [(1-sqrt(17))/(2),(1+sqrt(17))/(2)] (B) (-oo,(1-sqrt(17))/(2)]uu[(1+sqrt(17))/(2),oo)(C)((1-sqrt(17))/(2),(1+sqrt(17))/(2))( D) none of these

Let f:R rarr(0,(pi)/(6)] be defined as f(x)=sin^(-1)((4)/(4x^(2)-12x+17)) then f(x)

Let f(x)=(alpha x)/(x+1) Then the value of alpha for which f(f(x)=x is

Let f:R to R be defined as f (x) =( 9x ^(2) -x +4)/( x ^(2) _ x+4). Then the range of the function f (x) is

Let f(x) be defined as f(x)={tan^(-1)alpha-5x^(2),0 =1 if f(x) has a maximum at x=1, then find the values of alpha.

Let f : R - {(alpha )/(6) } to R be defined by f (x) = ( 3x + 3)/(6x - alpha). Then the value of alpha for which (fof) (x) = x , for all x in R -{(alpha)/(6)}, is :

Let f : R to [0, pi/2) be defined by f ( x) = tan^(-1) ( 3x^(2) + 6x + a)". If " f(x) is an onto function . then the value of a si

Define a function f : R-{9/4}rarr R by f(x)=(3+alpha-1)/(9-4x) The number of values of alpha in R such that f(f(x))=x is