Find the points of discontinuity of the function: `f(x)=[[x]]-[x-1],w h e r e[dot]` represents the greatest integer function

Draw the graph and find the points of discontinuity for f(x)=[x^(2)-x-1],x in[-1,2] ([.] represents the greatest integer function).

Find the domain of the function f(x)=(1)/([x]^(2)-7[x]-8) , where [.] represents the greatest integer function.

Find the points of discontinuity of the function: f(x)=(1)/(1-e^((x-1)/(x-2)))

Find the range of f(x)=(x-[x])/(1-[x]+x'), where [] represents the greatest integer function.

The domain of the function f(x)=(1)/(sqrt([x]^(2)-[x]-20)) is (where, [.] represents the greatest integer function)

Let f(x) = [x] and [] represents the greatest integer function, then

Find the domain of the function f(x)=log_(e)(x-[x]) , where [.] denotes the greatest integer function.

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

The range of the function f(x)=sin(sin^(-1)[x^(2)-1]) is (where[*] represents greatest integer function)