How do you solve #\log _ { 8} ( 3x ^ { 2} ) = 2\log _ { 8} ( 3x )#?

1 Answer
Jan 17, 2017

This equation has no solutions

Explanation:

Given:

#log_8(3x^2) = 2log_8(3x)#

Apply the exponential function #f(t) = 8^t# both sides to get:

#3x^2 = 8^(log_8(3x^2)) = 8^(2log_8(3x)) = (3x)^2 = 9x^2#

The derived equation #3x^2=9x^2# only has one solution, namely #x=0#, but #log_b 0# is undefined for any base #b#.

So the original equation has no solutions.