`f(x)=sin^(-1)[e^(x)]+sin^(-1)[e^(-x)]` where [.] greatest integer function then

f(x)=sin^(-1)[2x^(2)-3] , where [*] denotes the greatest integer function. Find the domain of f(x).

If f(x)=e^(sin(x-[x])cospix) , where [x] denotes the greatest integer function, then f(x) is

f(x)= [x] + sqrt(x -[x]) , where [.] is a greatest integer function then …….. (a) f(x) is continuous in R+ (b) f(x) is continuous in R (C) f(x) is continuous in R - 1 (d) None of these

If [sin^-1 (cos^-1(sin^-1 (tan^-1 x)))]=1 , where [*] denotes the greatest integer function, then x in

f:(2,4)rarr(1,3),f(x) = x - [(x)/2] , where [.] is a greatest integer function then f^(-1)(x) = ......

f(x)= cosec^(-1)[1+sin^(2)x] , where [*] denotes the greatest integer function.Then f(x) equal to (a){ π/2 ​ ,cosec^ (−1) 2}(b) π/2 (c)cosec^(-1) 2 (d)none of these

domin of f(x)=sin^-1[log_2(x^2/2)] where [ . ] denotes the greatest integer function.

If f(x)=cos[pi/x] cos(pi/2(x-1)) ; where [x] is the greatest integer function of x ,then f(x) is continuous at :

If f(x)={{:(,x[x], 0 le x lt 2),(,(x-1)[x], 2 le x lt 3):} where [.] denotes the greatest integer function, then (x) is continuous at x=2

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