5.jx^(3)log x

Find x, if log x^(3) - log 3x =2 log 2 + log 3 ,

Find the value of x satisfying the equation ((log)_3 (3x)^(1/3)+(log)_x(3x)^(1/3))dot(log)_3x^3+((log)_3(x/3)^(1/3)+(log)_x(3/x)^(1/3))dot(log)_3x^3=2

Solve for x : 3^(log x)-2^(log x) =2^(log x+1)-3^(log x-1)

Find the value of x satisfying the equation ((log)_(3)3x3+(log)_(x)3x3)log_(3)x^(3)+((log)_(3)x/33+(log)_(x)3/x3)log_(3)x^(3)=2

3^(log_(3)log sqrt(x))-log x+(log x)^(2)-3=0

3^(log_(3)log sqrt(x))-log x+log^(2)x-3=0

3^(log x)-2^(log x)=2^(log x+1)-3^(log x-1), where base is 10,

The value of X satisfying 5^(log x)-3^(log x-1)=3^(log x+1)-5^(log x-1) , (where the base of logarithm is 3 ),is

Find the value of x satisfying the equation, sqrt((log_3(3x)^(1/3)+log_x(3x)^(1/3))log_3(x^3))+sqrt((log_3(x/3)^(1/3)+log_x(3/x)^(1/3))log_3(x^3))=2

Find the value of x satisfying the equation, sqrt((log_3(3x)^(1/3)+log_x(3x)^(1/3))log_3(x^3))+sqrt((log_3(x/3)^(1/3)+log_x(3/x)^(1/3))log_3(x^3))=2