Let `f(x)=log(log_(1//3)(log_(7)(sinx+a)))` be defined for every real value of x, then the possible value of a is

If log_(3)729=x then the value of x is

Let f(x)=log_(2)log_(3)log_(4)log_(5)(sin x+a(2)) . Find the set of values of n for which the domain of f(x) is R.

Let f(x) be a function such that f'(x)=log_(1//3)[log_(3)(sinx+a)] . If f(x) is decreasing for all real values of x , then

If log 27 = 1.431, then the value of log 9 is:

2log x-log(x+1)-log(x-1)=

If 3log(x+3)=log27, then the value of x is……………..

f(x)=log_((100x))((2log_(10)x+1)/(-x)) exists if x in

Let f(x)=log_(e)(x+ sqrt(x^(2)+1)) , domain of f is where f(x) is defined for real values of x, If f is bijective then f^(-1)(x) exists f^(-1)(x) is defined on

If f(x)=log(sinx) , then domain f=