Решить предел lim при x->0 от (ln(cos3x) / ln(cos5x))

$\lim _{x\to \:0}\left(\frac{\ln \left(\cos \left(3x\right)\right)}{\ln \left(\cos \left(5x\right)\right)}\right)$

Применим правило Лопиталя
$\lim _{x\to \:0}\left(\frac{-3\tan \left(3x\right)}{-\frac{5\sin \left(5x\right)}{\cos \left(5x\right)}}\right)=\lim _{x\to \:0}\left(\frac{3\tan \left(3x\right)\cos \left(5x\right)}{5\sin \left(5x\right)}\right) \\ \\ \\ =\lim _{x\to \:0}\left(\frac{3\left(3\sec ^2\left(3x\right)\cos \left(5x\right)-5\sin \left(5x\right)\tan \left(3x\right)\right)}{25\cos \left(5x\right)}\right) \\ \\ \\$

$=\lim _{x\to \:0}\left(\frac{3\left(3\cos \left(5x\right)-5\cos ^2\left(3x\right)\sin \left(5x\right)\tan \left(3x\right)\right)}{25\cos ^2\left(3x\right)\cos \left(5x\right)}\right)= \\ \\ \\ =\frac{3\left(3\cos \left(5\cdot \:0\right)-5\cos ^2\left(3\cdot \:0\right)\sin \left(5\cdot \:0\right)\tan \left(3\cdot \:0\right)\right)}{25\cos ^2\left(3\cdot \:0\right)\cos \left(5\cdot \:0\right)}=\frac{9}{25}=0,36$