Answer
See the explanation
Work Step by Step
The product rule of logarithmic property states that:
Let $b, M$ and $N$ be positive real numbers with $b\ne1$,
$\log_{b}(MN)=\log_{b}M+\log_{b}N$
The logarithm of a product is the sum of the logarithms,
Thus, for example, $M=6, N=5, b=2$
$\log_{2}(6\cdot5)=\log_{2}6+\log_{2}5$
