Logs equal logs?

#\log_mx=\log_nx#

1 Answer
Jake M.
Apr 19, 2018

Yes

Explanation:

We are basically trying to prove that #m=n# if #log_mx = log_nx# for all #x > 0#. We can prove this with a proof by contradiction.

Let #y = log_mx = log_nx#. Assume #n ne m#.

By definition,
#m^y = m^(log_mx) = x # and #n^y = n^(log_nx) = x#
so we know that
#m^x = n^x#

Now since #x# is a positive real, we can take the #xth# root of both sides without problem, yielding #m=n#, violating our initial assumption and proving the statement above.

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