.The sum of the values of x satisfying t...

.The sum of the values of x satisfying the equation `9(log_8x)^3 + log_8(x^11) = (log_(27)64) (log_8 27) + 18(log_8x)^2` is greater than or equals to

Similar Questions

Explore conceptually related problems

The value of x satisfying the equation 2log_(3)x+8=3.x log_(9)4

The value of x satisfying the equation 2^(log3x)+8=3*x^(log_(9)4), is

The value of x satisfying the equation 2^(log_2e^(In^5log 7^(log_10^(log_10(8x-3)))

The number of values of x satisfying the equation log_(2)(log_(3)(log_(2)x)))>=sqrt(8-x)+sqrt(x-8) is :

The value of x, satisfying the inequality log_(0.3)(x^(2)+8)>log_(0.3)9x, lies in

Let the sum of values of x ,satisfying the equation x^((log_(2)x)^(2)-5(log_(2)x)+8)=2^(log_(2)x^(2)) is lambda then (lambda)/(2) is

The sum of all the solutions of the equation (log_(27)x^(3))^(2)=log_(27)x^(6), is

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 solution of the equation (log_(27)x^(3))^(2)=log_(27)x^(6) is equal to