The value of `x` satisfies the equation `(1-2(log x^2)^2)/(log x - 2 (log x)^2)` = 1

The value of x satisfies the equation (1-2(log x^(2)))/(log x-2(log x)^(2))=1

Solve the equation: (log(x+1))/(log x)=2

The value of x satisfying the equation (log_(2)2x)(log_(2)^(2)x+log_(2)((2)/(x)))=2

The value of x :satisfying the equation log_(4)(2log_(2)x)+log_(2)(2log_(4)x)=2 is

Find the sum of all possible values of x satisfying simultaneous the equations log^(2)x3log x=log(x^(2))4 and log^(2)(100x)+log^(2)(10x)=14+log((1)/(x)).[ Note : Assume base of logarithm is 10.1]

The value of x satisfying the equation 2log_(10)x - log_(10) (2x-75) = 2 is