If the domain of `g(x)` is [3,4], then the domain of `g(log_2(x^2+3x-2))` is

If domain of f(x) is [1, 3], then the domain of f(log_(2)(x^(2)+3x-2)) is

If domain of f(x) is [1, 3], then the domain of f(log_(2)(x^(2)+3x-2)) is

If domain of f(x) is [1, 3], then the domain of f(log_(2)(x^(2)+3x-2)) is

If the domain of f(x)is[-1,3], then the domain g(x)=f(x^(2)-2x) is

If the domain of the function f(x) is [1,3] .then the domain of g(x), ,where g(x)=f(ln x)+f(ln((x)/(2)))+f(ln((x)/(3)))+....+f(ln((x)/(n)))*n in N and n<=6

Domain of (log(x-2))/(sqrt(3-x)) is

Let f be a function with domain [-3, 5] and let g(x)=[3x+4] . Then , the domain of (fog)(x) is

If domain of y=f(x) is [-4,3], then domain of g(x)=f(|x]|) is,where [.] denotes greatest integer function

Find the domain of log_3{log_(1/2)(x^2+4x+4)}