Which equation has x=-6 as the solution? A-logx36=2. B-log3(2x-9)=3. C-log3 216=x. D-log3(-2x-3)=2

So we have:

A) [tex]\log_x(36)=2[/tex]

B) [tex]\log_3(2x-9)=3[/tex]

C) [tex]\log_3(216)=x[/tex]

D) [tex]\log_3(-2x-3)=2[/tex]

We need to try x = –6 in each equation until we find a solution that makes both sides of the equation equal.

For A, this gives an undefined result. Logarithms are only defined for bases that are positive real numbers not equal to 1.

For B, this again gives an undefined result. The logarithm of a number is only defined when that number is a positive real number. It would be –21, which is undefined.

For C, we have a defined operation, but [tex]\log_3(216)=4.893 \neq -6[/tex].

Finally, for D, we have 

[tex]\log_3(-2(-6)-3)=2\\ \log_3(9)=2 \\ 3^2=9 \\ 9=9[/tex]

This is true.