The domain of `f(x)=log_(10)x^(2)+[sin x]+{cos x}` is where [.]is greatest integer function and `{.}` is fractional part function is

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

If f = int_(0)^(20){x}[x]dx . Where [x] is greatest integer function and {x} is fractional part function. Then, f = ?

The function f(x)={x} sin (pi[x]) , where [.] denotes the greatest integer function and {.} is the fractional part function, is discontinuous at

The domain of f(x)=log_([x])[x]+log_({x}){x} (where I.] denotes greatest integer function and ( denotes fractional function) is

The domain of the function f(x)=(sin^(-1)x)/([x]) is (where [ ] is greatest integer function)

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

The domain of the function f(x)=(sin^(-1)x)/([x]) is (where is greatest integer function)

The complete set of values of x in the domain of function f (x)= sqrt(log _(x+2{x})([x] ^(2)-5[x] +7)) where [.] denote greatest integer functioon and {.} denote fraction pert function) is :

The domain of f(x)=log_(e)(4[x]-x) ; (where [1 denotes greatest integer function) is