In regular algebra you have the commutative, associative,
and distributive properties. In "logarithm algebra" you
have three more besides those.
1. logb(A) + logb(C) = logb(AC)
2. logb(A) + logb(C) = logb()
3. C·logb(A) = logb(AC)
Condensing logarithms means using these 3 additional rules
on them to write a simpler equivalent logarithm expression.
The "condensed" version is on the right of the above three
equations, because what's on the right side is shorter and
more concise than the expression on the left. Those same
rules can be used in reverse to "expand" the logarithm expression.
Example:
Use rule 1 to change the sum of logs to the log of a producr:
We don't need those big parentheses anymore:
On both terms use rule 3 to change the coefficients to
exponents of the quantity to which the log is being taken:
Use a familiar rule of exponents to change to ,
Use rule 1 to change the sum of logs to the log of a producr:
Use a familiar rule of exponents to change to
The condensed form consists of only one single logarithm.
Edwin
