Logarithm Laws
The Product Law
- add logarithms with the same base combining them into one logarithm and by multiplying their arguments
- log[b]x + log[b]y = log[b](xy)
The Quotient Law
- subtract logarithms with the same base combining them into one logarithm and by dividing their arguments
- log[b]x + log[b]y = log[b](x/y)
The Power Law
- if the argument in a logarithm is raised to an exponent, you can move the exponent so it becomes a coefficient of the logarithm
- log[b](x^n) = n*log[b]
- summary: you can convert exponents to coefficients and vise versa
Using Logarithm Laws to Expand Logarithms
- any variable in the numerator will become a positive logarithm (product law)
- any variable in the denominator will become a negative logarithm (quotient law)
- any exponent of an argument will become a coefficient (power law)
Using Logarithm Laws to Simplify Logarithms
- any coefficients will become exponents (power law)
- any positive logarithms will be in the numerator (product law)
- any negative logarithms will be in the denominator (quotient law)
Using Logarithm Laws to Evaluate Logarithms Example #1
Using Logarithm Laws to Evaluate Logarithms Example #2
Using Logarithm Laws to Evaluate Logarithms Example #3
Using Logarithm Laws to Evaluate Logarithms Example #4
Using Logarithm Laws to Evaluate Logarithms Example #5
Changing the Base of a Logarithm
- log[b]c = log[a]c / log[a]b
- where "a" is any new base
- the argument goes in the numerator
- the base goes in the denominator
Evaluating Logarithms Using a Graphing Calculator
- change the logarithm to base 10