If `f(x) = {{:([cos pi x]",",x le 1),(2{x}-1",",x gt 1):}`, where [.] and {.} denotes greatest integer and fractional part of x, then

Discuss the continuity of f(x) in [0, 2], where f(x) = {{:([cos pi x]",",x le 1),(|2x - 3|[x - 2]",",x gt 1):} where [.] denotes the greatest integral function.

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

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

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

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) = {{:([x]+[-x]",",x ne 2),(" "lambda",",x = 2):} and f is continuous at x = 2, where [*] denotes greatest integer function, then lambda is

f(x)= {(x^(10)-1",","if" x le 1),(x^(2)",","if" x gt 1):}

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

f(x) {(|x-(1)/(2)|",",0 le x lt 1),(x[x]",",1 le x lt 2):} where [.] denotes the greatest integer function. Show that f(x) is continuous at x=1 but not differentiable at x=1.