" The function "f(x)=[x]^(2)-[x^(2)]," where "[x]rArr" G.I.F.is discontinuous at "

The function f(x)=[x]^(2)-[x^(2)] is discontinuous at (where [gamma] is the greatest integer less than or equal to gamma) ,is discontinuous at

The function f(x)=[x]^2-[x^2] is discontinuous at (where [gamma] is the greatest integer less than or equal to gamma ), is discontinuous at

The function f(x)=[x]^2-[x^2] is discontinuous at (where [gamma] is the greatest integer less than or equal to gamma ), is discontinuous at

The function f(x) = [x]^2-[x^2] (where [.] denotes the greatest integer function ) is discontinuous at

Let g be the greatest integer function. Then the function f(x)=(g(x))^(2)-g(x) is discontinuous at

Show that the function f, defined by f(x) ={(2x, x 2):} is discontinuous at x = 2.

The number of points of discontinuity of the function f:(-2,2)>R,f(x)=[2^(-x^(2))[2^(x^(2))]] (where [.] represents g.i.f.) is

The function f:R rarr B is defined by f(x)=[x]+[-x] where [.] is G.I.F. is surjective then B is