If `f:R rarr [pi/6,pi/2], f(x)=sin^(-1)((x^(2)-a)/(x^(2)+1))` is an onto function, the set of values `a` is

Show that f: R rarr R , f(x) = x/(x^(2)+1) is not one one and onto function.

Let f:R rarr R and f(x)=(3x^(2)+mx+n)/(x^(2)+1) . If the range of this function is [-4,3], then the value of (m^(2)+n^(2))/(4) is ….

f: R rarr R, f(x) = sec^(2)x - tan^(2) x is constant function .

f: [2,oo) rarr y, f(x) = x^(2)-4x +5 is a one and Onto function . If y in[a,oo) then the value of a is .........

f:[0,3] rarr [1,29],f(x) =2x^(3)-15x^2+36x+1 then f is ........ function.

f: R rarr R , f(x) = (x-1) (x-2)(x-3) then f is ........

If f(x)=(sin([x]pi))/(x^2+x+1) , where [dot] denotes the greatest integer function, then

Let f :[2,oo)to {1,oo) defined by f (x)=2^(x ^(4)-4x ^(3))and g : [(pi)/(2), pi] to A defined by g (x) = (sin x+4)/(sin x-2) be two invertible functions, then The set "A" equals to

Let f :[2,oo)to {1,oo) defined by f (x)=2^(x ^(4)-4x ^(3))and g : [(pi)/(2), pi] to A defined by g (x) = (sin x+4)/(sin x-2) be two invertible functions, then f ^(-1) (x) is equal to

If f: R->R ,f(x)=(alphax^2+6x-8)/(alpha+6x-8x^2) is onto then alpha in