The solution of the equation `"log"_pi("log"_(2) ("log"_(7)x)) = 0`, is

The solution set of the equation "log"_(x)2 xx "log"_(2x)2 = "log"_(4x) 2, is

The solution of the equation 3^(log[a] x)

Statement-1: The solution set of the equation "log"_(x) 2 xx "log"_(2x) 2 = "log"_(4x) 2 "is" {2^(-sqrt(2)), 2^(sqrt(2))}. Statement-2 : "log"_(b)a = (1)/("log"_(a)b) " and log"_(a) xy = "log"_(a) x + "log"_(a)y

The number of real solutions of the equation "log" (-x) = 2"log" (x+1) , is

The number of solutions of the equation "log"_(4) (x-1) = "log"_(2) (x-3) , is

The number of solutions of the equation 3"log"_(3)|-x| = "log"_(3) x^(2), is

Sum of all the solutions of the equation 5^((log_(5)7)^(2x))=7^((log_(7)5)^(x)) is equal to

The solution of the equation "log"_("cos"x) "sin" x + "log"_("sin"x) "cos" x = 2 is given by

The solution of the equation log_(7)log_(5)(sqrt(x+5)+sqrt(x)=0 is...