Solve the equation #3loga^x=loga^8# ?

#3loga^x=loga^8#

the "a" on both sides is meant to be subscript and the "x" on both sides is meant to be written normally, however I couldn't find a way to express this in the question.

2 Answers
Feb 27, 2018

#x = 2#

Explanation:

#3log_ax = log_a8#

#log_ax^3 = log_a8#

After canceling log on both sides , you get

#x^3 = 8#

#x^3 = 2^3#

You can cancel the cubes

Therefore , #x =2#

Feb 27, 2018

#x=2#

Explanation:

Given:

#3log_ax=log_a8#

#8=2^3#

#3log_ax=log_a2^3#

Using the power rule in logarithms

#log(a^m)=mloga#

#3log_ax=3log_a2#

#x=2#