If it is given that `x=9` is a solution of the equation `ln(x^2+15a^2)-ln(a-2)=ln((8ax)/(a-2))` then

The solution set of the equation ln(2x-1)+ln(3x-2)=ln7, is:

If x = 9 is one of the solutions of log_(e)(x^(2)+15a^(2))-log_(e)(a-2)=log_(e)((8ax)/(a-2)) ,then

If x = 9 is one of the solutions of log_(e)(x^(2)+15a^(2))-log_(e)(a-2)=log_(e)((8ax)/(a-2)) ,then

If x = 9 is one of the solutions of log_(e)(x^(2)+15a^(2))-log_(e)(a-2)=log_(e)((8ax)/(a-2)) ,then

If x = 9 is one of the solutions of log_(e)(x^(2)+15a^(2))-log_(e)(a-2)=log_(e)((8ax)/(a-2)) ,then

It is known that x=9 is root of the equation. log_lamda(x^2+15a^2)-log_lamda(a-2)=log_lamda "(8ax)/(a-2) find the other roots of this equation.

It is known that x=9 is root of the equation. log_lamda(x^2+15a^2)-log_lamda(a-2)=log_lamda "(8ax)/(a-2) find the other roots of this equation.

It is known that x=9 is root of the equation. log_lamda(x^2+15a^2)-log_lamda(a-2)=log_lamda "(8ax)/(a-2) find the other roots of this equation.

It is known that x=9 is root of the equation. log_lamda(x^2+15a^2)-log_lamda(a-2)=log_lamda "(8ax)/(a-2) find the other roots of this equation.

Number of solutions of the equation ln|x|=||x|-2|