The discussion revolves around logarithmic functions, specifically solving an equation involving logarithms with different bases. The original poster seeks guidance on how to approach the problem, which involves determining the value of \( n^3 \) given the equation \(\log_{2n}(1944) = \log_{n}(486\sqrt{2})\).
Several participants have offered insights into rewriting the logarithmic equation and have pointed out relationships between the logarithms involved. There is an ongoing exploration of different methods to approach the problem, with some participants questioning assumptions and clarifying notation.
Participants note that the original problem was presented in an image format, which may have led to some misunderstandings regarding the details of the equation. There is also mention of the original poster being new to logarithmic functions, which may influence the level of guidance provided.
Feldoh said:First thing I would do is change the bases so they are equivalent.
xRadio said:kk sooo log 1944/ log 2n = log 486/2 / log n
Do the logs cancel?
xRadio said:yea it is that but i didnt know how to do the thingie
Hallsofivy said:\frac{1944}{log(n)+ log(2)}= \frac{log(468)}{log(n)}
Yes, don't know why I dropped the \sqrt{2}.matadorqk said:Umm, by this don't you mean:
\frac{\log1944}{\log(n)+\log(2)}=\frac{log(486\sqrt{2})}{log(n)}