The sum of all positive numbers x such that `(log_(x)3)(log_(x) 9)+2=5 log_(x) 3` is a value between

The sum of all the solution(s) of the equation (log_(9x)3)(log_((x)/(9))3)=log_((x)/(81))3 is equal to

The x,y,z are positive real numbers such that log_(2x)z=3,log_(5y)z=6, and log_(xy)z=(2)/(3), then the value of ((1)/(2z)) is .........

Let x,y,z be positive real numbers such that log_(2x)z=3,log_(5y)z=6 and log_(xy)z=(2)/(3) then the value of z is

The product of all values of x satisfying the equations log_(3)a-log_(x)a=log_(x//3)a is :

The number of solution of log_(9)(2x-5) = log_(3) (x-4) is:

If x and y are positive real numbers such that 2log(2y - 3x) = log x + log y," then find the value of " x/y .

Sum of all possible values of 'x' which satisfy the equation log_(3)(x – 3) = log_(9)(x – 1) is :

sqrt(log_(3)(3x^(2))log_(9)(81x))=log_(9)x^(3)