Solve the equation [x]{x}=x, where [] and {} denote the greatest integer function and fractional part, respectively.

Number of points of non-differentiability of the function g(x) = [x^2]{cos^2 4x} + {x^2}[cos^2 4x] +x^2 sin^2 4x + [x^2][cos^2 4x] + {x^2}{cos^2 4x} in (-50, 50) where [x] and {x} denotes the greatest integer function and fractional part function of x respectively, is equal to :

Solve the equation x^(3)-[x]=3 , where [x] denotes the greatest integer less than or equal to x .

Range of the function f defined by f(x) =[(1)/(sin{x})] (where [.] and {x} denotes greatest integer and fractional part of x respectively) is

Domain of f(x)=sin^(-1)(([x])/({x})) , where [*] and {*} denote greatest integer and fractional parts.

If [x]^(2)- 5[x] + 6= 0 , where [.] denote the greatest integer function, then

Solve 1/[x]+1/([2x])= {x}+1/3where [.] denotes the greatest integers function and{.} denotes fractional part function.

The number of points of discontinuity of f(x)=[2x]^(2)-{2x}^(2) (where [ ] denotes the greatest integer function and { } is fractional part of x) in the interval (-2,2) , is

Sketch the curves (ii) y=[x]+sqrt(x-[x]) (where [.] denotes the greatest integer function).

The function f(x) = [x] cos((2x-1)/2) pi where [ ] denotes the greatest integer function, is

f(x)=log(x-[x]) , where [*] denotes the greatest integer function. find the domain of f(x).