Rewrite the following in the form log(c).
\log(A) + \log(B)
C
Use the rule: \log(a) + \log(b) = \log(a \cdot b).
\log(A) + \log(B) = \log(A \cdot B)
= \log(C)
Rewrite in the form log(c).
\log(C) - \log(A)
B
Use the rule: \log(a) - \log(b) = \log(\frac{a}{b}).
\log(C) - \log(A) = \log(\frac{C}{A})
= \log( B )
Rewrite in the form log(c).
A\log(B)
pow( B, A )
Use the rule: n \cdot \log(a) = \log(a^{n}).
A\log(B) = \log(B^{A})
= \log(pow( B, A ))