To find an equivalent expression for log18(logp(2)), we can use the properties of logarithms.
First, we can change the base of the logarithm using the change of base formula:
logb(a) = logk(a) / logk(b), where k is any positive number not equal to 1.
Applying this to our expression, we can write:
log18(logp(2)) = log(logp(2)) / log(18).
Thus, using the change of base, we have expressed log18(logp(2)) in terms of base 10 or natural logarithms, depending on what we choose k to be. This gives us a clearer way to understand and compute the logarithm if necessary.
In summary, the equivalent expression for log18(logp(2)) is:
log(logp(2)) / log(18).