How do you solve #5^(x-1) = 2^x#?

1 Answer
GiĆ³
Sep 29, 2015

I found #x=1.7564# but....

Explanation:

I would try by....cheating a bit! I imagine that you can use a pocket calculator to evaluate the natural logarithm, #ln#. So, I take the natural log of both sides:
#ln(5)^(x-1)=ln(2)^x#
I use the rule of logs that tells us that: #loga^x=xloga# to get:
#(x-1)ln(5)=xln2#
#xln5-ln5=xln2# rearranging:
#x(ln5-ln2)=ln5#
#xln(5/2)=ln(5)#
and #x=ln5/(ln(5/2))=# here comes the "cheating" bit:
#x=1.609/0.916=1.7564#

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