Given that, $\dfrac{\log_{15}{a} + \log_{32}{a}}{(\log_{15}{a})(\log_{32}{a})} = 4$
$\Rightarrow \log_{15}{a} + \log_{32}{a} = 4\left[(\log_{15}{a})(\log_{32}{a})\right]$
$\Rightarrow \dfrac{\log_{c}{a}}{\log_{c}{15}} = 4 \times \dfrac{\log_{c}{a}}{\log_{c}{15}} \times \dfrac{\log_{c}{a}}{\log_{c}{32}}$
$\Rightarrow \require{cancel} \cancel{\log_{c}{a}} \left[\dfrac{\log_{c}{32} + \log_{c}{15}}{\cancel{(\log_{c}{15})} \cdot \cancel{(\log_{c}{32})}}\right] = 4 \times \dfrac{\cancel{\log_{c}{a}}}{\cancel{\log_{c}{15}}} \times \dfrac{\log_{c}{a}}{\cancel{\log_{c}{32}}}$
$\Rightarrow \log_{c}{32} + \log_{c}{15} = 4\log_{c}{a}$
$\Rightarrow \log_{c}{480} = \log_{c}{a}^{4}$
$\Rightarrow \boxed{a^{4} = 480}$
We know that,
- $4^{4} = 256$
- $5^{4} = 625$
$\therefore \boxed{4<a<5}$
Correct Answer $:\text{C}$