Let `f" [1,2] to (-oo,oo)` be given by `f(x)=(x^(4)+3x^(2)+1)/(x^(2)+1)` then find value of in `[f_(max)]" in "[-1,2]` where [.] is greatest integer function :

Let f(x) = (x[x])/(x^2+1) : (1, 3) rarr R then range of f(x) is (where [ . ] denotes greatest integer function)

Let f(x) = [x]^(2) + [x+1] - 3 , where [.] denotes the greatest integer function. Then

Let a function f:[a,oo)rarr[b,oo) and f(x)=(e^(x))/(x^(2)) is invertible,then for minimum possible value of a, the value of [a sqrt(b)] is (where [.] is greatest integer function)

Let f:[4,oo)to[4,oo) be defined by f(x)=5^(x^((x-4))) .Then f^(-1)(x) is

Let f:R rarr[-1,oo] and f(x)=ln([sin2x|+|cos2x|]) (where[.] is greatest integer function),then- -

If domain of f(x) is [-1,2] then domain of f(x]-x^(2)+4) where [.] denotes the greatest integer function is

If f^(2)(x)*f((1-x)/(1+x))=x^(3),[x!=-1,1 and f(x)!=0] then find |[f(-2)]| (where [] is the greatest integer function).

f:(2,3)rarr(0,1) defined by f(x)=x-[x], where [.] represents the greatest integer function.

Let f:(-oo,2] to (-oo,4] be a function defined by f(x)=4x-x^(2) . Then, f^(-1)(x) is