What is #x# in the equation #log_3x^2 - log_"5"25 = log_"2"16#?

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Answer 1 · 2016-01-24T09:47:20

#x = +-27#

#log_5 25 = log_5 5^2 = 2#

#log_2 16 = log_2 2^4 = 4#

So:

#log_3 x^2 = log_2 16 + log_5 25 = 4+2=6#

Hence:

#x^2 = 3^(log_3 x^2) = 3^6#

So

#x = +-sqrt(3^6) = +-3^3 = +-27#

Footnote

Notice that: #log_3 x^2 = 2 log_3 abs(x)# and not simply #2 log_3 x#.

If I had thought that #log_3 x^2 = 2 log_3 x#, then I would only have found the solution #x=27#.