Sum of values of x and y satisfying `log_(x)(log_(3)(log_(x)y))=0 and log_(y)27=1` is :

The sum of the values of x satisfying the equation 9(log_(8)x)^(3)+log_(8)(x^(11))=(log_(27)64)(log_(8)27)+18(log_(8)x)^(2) is greater than or equals to

Sum of the values of x satisfying the equation log_(3)(5x-6)log_(x)sqrt(3)=1 is

If (log_(5)x)(log_(x)3x)(log_(3x)y)=log_(x)x^(3) then y equals

Sum of all values of x satisfying the system of equations 5 (log_(y)x+log_(x)y)=26, xy=64 is :

Sum of all values of x satisfying the system of equations 5 (log_(y)x+log_(x)y)=26, xy=64 is :

If log_(3)x + log_(3)y =2 + log_(3)2 and log_(3)(x+y) =2 , then

If (log_(5)x)(log_(x)3x)(log_(3x)y)=log_(x)x^(3) , then y equals