Applying results

(i)	R4832: Homomorphism property of standard logarithm function in the binary case
(ii)	R4857: Standard logarithm of a positive real number raised to an integer power

to the positive basic real numbers $x$ and $1 / y$, we have \begin{equation} \log_a \frac{x}{y} = \log_a x + \log_a y^{-1} = \log_a x - \log_a y \end{equation} $\square$