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Definition of LogarithmsWe recall from the last lesson that a logarithm is defined
as y = logbx if and only if By = x.
We will use this definition to solve equations involving logarithmic functions.
So…
3 = log7 x 73 = x
2 = logx 25 x2 = 25
y = log4 16 4y = 16
And…
62 = x 2 = log6 x
x3 = 8 3 = logx 8
8y = 64 y = log8 64
Rewriting Logarithms You can use the log properties to solve equations when the variable is contained in a logarithm.
1. Use the logarithm properties to rewrite as one log.
2. Rewrite the log into exponential form.
3. Solve • Raise 2 to the 5th
power• Distribute• Add 4 to both sides• Divide by the
coefficient
2 2
2
5
log 1 log 4 5
log 4 1 5
2 4 1
32 4 4
36 4
9
x
x
x
x
x
x
Equations with Natural LogsUse the same method when working with ln.
2
2
ln 1 1 3
ln 1 2
1
1
x
e
e
x
x
x
1.Isolate the ln
2.Rewrite in exponential form
Remember, natural logs have a base of e
3.Isolate variable
Application of LogarithmsIn 1906, San Francisco suffered a magnitude 7.8 (by many estimates) earthquake that caused unthinkable damage to the city.
To read more details about the quake go to:http://en.wikipedia.org/wiki/1906_San_Francisco_earthquake
The magnitude of an earthquake can be calculated using the
function y = log(1000x), where x represents the seismographic
reading 100 km from the center of the quake. What was the
Seismographic reading, in mm, for this earthquake?
Application of Logs, con’t1. Identify
variables
2. Sub in values3. Rewrite in
exponential form4. Isolate the
variable
10
7.8
7.8 log 1000
10 1000
63095734.45 1000
63095.73 mm
x
x
x
x
y= 7.8
y = log(1000x)
The seismographic reading 100 km from the center of the quake is ≈ 63,096 mm.
Additional Resourceshttp://math.usask.ca/emr/menu_exp.html
http://www.purplemath.com/modules/solvelog.htm
http://www.purplemath.com/modules/solvelog2.htm
http://www.wtamu.edu/academic/anns/mps/math/mathlab/col_algebra/col_alg_tut46_logeq.htm
http://www.phschool.com/webcodes10/index.cfm?fuseaction=home.gotoWebCode&wcprefix=age&wcsuffix=0805
