4.3 laws of logarithms
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4.3 Laws of Logarithms4.3 Laws of Logarithms
2
Laws of LogarithmsLaws of Logarithms
Just like the rules for exponents there are corresponding rules for logs that allow you to rewrite the log of a product, the log of a quotient, or the log of a power.
3
Log of a ProductLog of a Product
Logs are just exponents The log of a product is the sum of the logs of
the factors: logb xy = logb x + logb y
Ex: log (25 ·125) = log 25 + log 125
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Log of a QuotientLog of a Quotient
Logs are exponents The log of a quotient is the
difference of the logs of the factors: logb = logb x – logb y
Ex: ln ( ) = ln 125 – ln 25
x
y125
25
5
Log of a PowerLog of a Power
Logs are exponents The log of a power is the product of
the exponent and the log: logb xn = n∙logb x Ex: log 32 = 2 ∙ log 3
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Rules for LogarithmsRules for Logarithms
These same laws can be used to turn an expression into a single log:
logb x + logb y = logb xy
logb x – logb y = logb
n∙logb x = logb xn
x
y
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logb(xy) = logb x + logb y
Express 3logAB
C
as a sum and difference of logarithms:
3logAB
C
= log3A + log3B
ExamplesExamples
logb( ) = logb x – logb y logb xn = n logb x_______________________________
Solve: x = log330 – log310
= log33
3
30= log
10
Evaluate: 5 25 125log1
25 525 125log log
5
1125
22 log
= 2 = 13
2
7
2
– log3C
x = 1
= log3 AB
x
y
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Sample ProblemSample Problem Express as a single logarithm:
3log7x + log7(x+1) - 2log7(x+2) 3log7x = log7x3
2log7(x+2) = log7(x+2)2
log7x3 + log7(x+1) - log7(x+2)2
log7(x3·(x+1)) - log7(x+2)2
log7(x3·(x+1)) - log7(x+2)2 =
log( )7
3
2
1
2
x x
x
b glog
( )7
3
2
1
2
x x
x
b g
To use a calculator to evaluate logarithms with other bases, you can change the base to 10 or “e” by using either of the following:
For all positive numbers a, b, and x, where a ≠ 1 and b ≠ 1:
Example: Evaluate log4 22
≈ 2.2295
b
a b
log xlog x
log a
Change of Base Formula
a
log xlog x
log a
a
ln xlog x
ln a22
224
4
loglog
log1.3424
=0.6021
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