Properties of Logarithms
-
Properties of Logarithms and their proofs
Property 1:
logbxy = ylogbx
Proof:
We havelogbxy = logb(blogb(x))y
= logb(bylogb(x)) = ylogbx
Property 2:
logb(xy) = logbx + logby
Property 3:
logb(x/y) = logbx - logby
Exercise:
Prove properties 2 and 3.
-
Examples
Expand
Solution:
We have
ln(3x3)1/2 = 1/2 ln(3x3) (Property 1)= 1/2ln3 + 1/2lnx3 (Property 2)
= 1/2ln3 + 3/2lnx. (Property 1)
Exercises: Expand the following:
-
log[(x2(x - 4)5)/100]
-
log3(sqrt(x5/9))
Example:
Write the following with only one logarithm:3log4x - 5log4(x2 + 1) + 2log4x2
Solution:
We use the properties:log4x3 - log4(x2 + 1)5 + log4(x2)2 (Property 1)
= log4[x3/(x2 + 1)5] + log4(x4) (Property 3)
= log4[x3x4/(x2 + 1)5] (Property 2)
= log4[x7/(x2 + 1)5] (A Property of Exponents)
Exercises:
Write the following with only one logarithm:
-
2log3x - 2log3sqrt(x) + 5log31/x
-
logx - 2log(x - 1) + log(x + 1)
-
-
Application
The Rictor scale for earthquakes is as follows: if I is the intensity of an earthquake and I0 is the intensity of the shaking without an earthquake, then the magnitude R of an earthquake is defined byR = log[I/I0]
The Loma Prieta quake measured 7.1 on the Rictor scale and the Hokkaido quake measured 8.2. How many times more intense was the Hokkaido quake?
Solution
Let
IL = The intensity of the Loma Prieta quake
and
IH = The intensity of the Hokkaido quake
We write
log(IH/IL) = log(IH/I0 / IL/I0)
= log(IH/I0) - log(IL/I0)= 8.2 - 7.1 = 1.1
By exponentiating both sides with base ten, we get
IH/IL = 101.1 = 12.6We can conclude that the Hokkaido quake was more than 12 times more intense than the Loma Prieta quake.
Back to the College Algebra Part II (Math 103B) Site
Back to the LTCC Math Department Page
e-mail Questions and Suggestions