" (viii) "sin^(-1)[log_(2)((x)/(2))]

f(x)=sin^(-1)[log_(2)((x^(2))/(2))] where [.] denotes the greatest integer function.

Write the domain of the following real functions sin^(-1)[log_(2)((x)/(2))]

If the domain of the function f(x)= sin^(-1)(log_(2)((x)/(2))) is [a,b], then the value of lim_(x rarr0)(1+ln(a+bx))^(1/x) = is equal to (A) e (B) e^(2) (C) e^(3) (D) e^(4)

The domain of sin^(-1)[log_(2)((x)/(12))] is

The domain of f(x) sin^(-1)(log_(2)(x)/(2)) is

The domain of definition of the function f(x)= sin^(-1){log_(2)((x^(2))/(2))} , is

The domain of definition of the function f(x)= sin^(-1){log_(2)((x^(2))/(2))} , is

The number of integers in the domain of the function f(x)=sin^(-1)(log_(2)((x^(2))/(2)))

The domain of definition of the function f(x)= sin^(-1){log_(2)((x^(2))/(2))} , is

The domain of definition of the function f(x)= sin^(-1){log_(2)((x^(2))/(2))} , is