Let `f : [-1, -1/2] rarr` ..................

Let f:[-1/2,2] rarr R and g:[-1/2,2] rarr R be functions defined by f(x)=[x^2-3] and g(x)=|x|f(x)+|4x-7|f(x) , where [y] denotes the greatest integer less than or equal to y for yinR . Then,

Let f:[-1/2,2] rarr R and g:[-1/2,2] rarr R be functions defined by f(x)=[x^2-3] and g(x)=|x|f(x)+|4x-7|f(x) , where [y] denotes the greatest integer less than or equal to y for yinR . Then,

Let f : [0, 1] rarr [0, 1] be a continuous function such that f (f (x))=1 for all x in[0,1] then:

Let f : {1, 2, 3} rarr {1, 2, 3] be a function. Then the number of functions g : {1, 2, 3} rarr {1, 2, 3} . Such that f(x) = g(x) for atleast one x in {1, 2, 3} is

Let f:[-pi//2,pi//2] rarr [-1,1] where f(x)=sinx. Find whether f(x) is one-one or not.

Statement-1 : Let f : [1, oo) rarr [1, oo) be a function such that f(x) = x^(x) then the function is an invertible function. Statement-2 : The bijective functions are always invertible .

Function f : [(pi)/(2), (3pi)/(2)] rarr [-1, 1], f(x) = sin x is

Let f: (-2, 2) rarr (-2, 2) be a continuous function such that f(x) = f(x^2) AA Χin d_f, and f(0) = 1/2 , then the value of 4f(1/4) is equal to

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