$\frac{3}{\ln{2}-12}$ Is this form simplified enough?
There is a number '$12$' below the fraction line, do i need to transform the $\log$ more to make it simpler?
I wrote that in a college math exam
$\frac{3}{\ln{2}-12}$ Is this form simplified enough?
There is a number '$12$' below the fraction line, do i need to transform the $\log$ more to make it simpler?
I wrote that in a college math exam
The only complaint I can see is that it obscures the fact that it is negative, so one might prefer $\frac {-3}{12-\ln 2}$ but otherwise I don't see a simpler form. I guess you could go to $\frac 3{\ln \frac 2{e^{12}}}= \frac 1{\ln \sqrt [3]{\frac 2{e^{12}}}}=\frac 1{\ln \frac{\sqrt [3] 2}{e^4}}$ but I don't think this is progress.