How do you solve the logarithmic equation #ln(x) + ln(x - 1) = ln2#?

1 Answer
George C.
Dec 19, 2015

Derive a quadratic equation, one of whose roots is a solution of the original equation, namely #x=2#.

Explanation:

Note first that we want #x > 0# and #x - 1 > 0# in order that the natural logarithms are well defined.

If that is so, then we can say:

#ln(x) + ln(x-1) = ln(x(x-1))#

Then since #ln# is a one-one function from #(0, oo) -> RR# we require that:

#x(x-1) = 2#

Rearrange this to get:

#x^2-x-2 = 0#

which has roots #-1# and #2#

The value #x=-1# is not an acceptable solution of the original equation, since we want #x > 0#. So the only acceptable solution is #x=2#, which does work:

#ln(2) + ln(2 - 1) = ln(2) + ln(1) = ln(2) + 0 = ln(2)#

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