Post on 12-Jan-2016
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Logarithmic FunctionsLogarithmic Functions
ObjectivesObjectives
To write exponential equations in To write exponential equations in logarithmic form.logarithmic form.
To use properties of logarithms to expand To use properties of logarithms to expand and condense logarithmic expressions.and condense logarithmic expressions.
Don’t be afraid of logs!
Logarithmic FunctionsLogarithmic Functions
Key to understanding logarithms:Key to understanding logarithms:
A logarithm is an A logarithm is an exponentexponent!!
logB A CExponent
Base Argument
CB A
Logarithmic FunctionsLogarithmic Functions
32 8 2log 8 3
25 25 5log 25 2
10 7x 10log 7 x
34 64 4log 64 3
5 125x 5log 125 x
Exponential FormExponential Form Logarithmic FormLogarithmic Form
Logarithmic FunctionsLogarithmic Functions
Evaluate:Evaluate: 3log 9 n
3 9n
2n
Logarithmic FunctionsLogarithmic Functions
Evaluate:Evaluate: 5log 1 n
5 1n
0n
Logarithmic FunctionsLogarithmic Functions
Evaluate:Evaluate: 4log 2 n
4 2n
2 12 2n
2 12 2n
2 1n
12n
Logarithmic FunctionsLogarithmic Functions
Evaluate:Evaluate: 5log 5 n
5 5n
1n
Logarithmic FunctionsLogarithmic Functions
Evaluate:Evaluate: 35log 5 n
35 5n
3n
Logarithmic FunctionsLogarithmic Functions
Evaluate:Evaluate: 10log 1000 n
10 1000n
3n
Logarithmic FunctionsLogarithmic Functions
Evaluate:Evaluate: log0.01 n
110010n
21
1010n
210 10n
2n
Special BasesSpecial Bases
10log logA A
log lne A A
Common log
Natural log
Natural LogarithmNatural Logarithm
Evaluate:Evaluate: ln1
lne
4ln e
0
1
4
Properties of LogarithmsProperties of Logarithms
ln ln lnAB A B
ln ln lnA
A BB
ln lnBA B A
ln Ae A
ln Ae A
Properties of LogarithmsProperties of Logarithms
Expand:Expand:23
lnx
y
2ln3 lnx y2ln3 ln lnx y
ln3 2ln lnx y
Properties of LogarithmsProperties of Logarithms
Expand:Expand: 2ln 1x x
2ln ln 1x x
ln 2ln 1x x
ln does not distribute!
ln 1 ln ln1x x
Properties of LogarithmsProperties of Logarithms
Expand:Expand:2
3ln
6
x
y
2 3ln ln 6x y
2 3ln ln 6 lnx y
2ln ln 6 3lnx y
Properties of LogarithmsProperties of Logarithms
Expand:Expand: 2
3ln xy
1
22
3ln xy
2
312 ln x
y
2 312 ln lnx y
12 2ln 3lnx y
32ln lnx y
Properties of LogarithmsProperties of Logarithms
Combine:Combine: ln 4 ln x
4ln x
Properties of LogarithmsProperties of Logarithms
Combine:Combine: 2ln8 5ln z
2 5ln8 ln z
5ln 64z
Properties of LogarithmsProperties of Logarithms
Combine:Combine: ln 1 ln 2 3lnx x x
3ln 1 2 lnx x x
2 3ln 3 2 lnx x x
2
33 2ln x xx
Properties of LogarithmsProperties of Logarithms
Combine:Combine: 4ln3 2ln lnx y
4 2ln3 ln lnx y
281ln lnx
y
281lnx y
Properties of LogarithmsProperties of Logarithms
Combine:Combine: 2122ln3 ln 1x
1
22 2ln3 ln 1x
2
9
1ln
x
Solving Equations Using LogsSolving Equations Using Logs
Solve:Solve: Solve:Solve:24 64x 2 34 4x 2 3x
2 7x
ln 2 ln 7x
ln 2 ln 7x 1x ln 7
ln 2x
2.807x
Solving Equations Using LogsSolving Equations Using Logs
Solve:Solve: Solve:Solve:34 9x 3ln 4 ln9x
( 3)ln 4 ln9x
2 10xe
5xe
ln ln5xe ln9ln 43x
ln9ln 4 3x
4.585x
ln5x
1.609x
Solving Equations Using LogsSolving Equations Using Logs
Solve:Solve: Solve:Solve:2 15 2 115xe 2 12 110xe 2 1 55xe
32 1.5 640x
1.5 20x
ln 1.5 ln 20x
2 1ln ln55xe 2 1 ln55x
ln 1.5 ln 20x ln 20ln1.5x
2 ln55 1x
1.504x
7.39xln55 12x
Solving Equations Using LogsSolving Equations Using Logs
Solve:Solve: Solve:Solve: 250 3 125xe 23 2.5xe
2 0.5xe
8ln 3 2 1.5x ln(3 2) 0.1875x
0.1875 3 2e x 2 0.5xe 2ln ln 0.5xe 2 ln 0.5x
0.1875 2 3e x 0.1875 2
3ex
ln 0.52x
0.35x
1.07x
Using LogarithmsUsing Logarithms
Suppose you deposit money into an account whose Suppose you deposit money into an account whose annual interest rate is 4% compounded continuously. annual interest rate is 4% compounded continuously. How long will it take for the money to double?How long will it take for the money to double?
rtA Pe0.042 tP Pe
0.042 te0.04ln 2 ln te
ln 2 0.04t17.3 yearst
Using LogarithmsUsing Logarithms
Chris wants to buy a car. It costs $30,000, and he only Chris wants to buy a car. It costs $30,000, and he only has $27,000. If he invests it in a bank account at 6% has $27,000. If he invests it in a bank account at 6% interest compounded quarterly, how long will he have to interest compounded quarterly, how long will he have to wait before it matures to $30,000?wait before it matures to $30,000?
1ntr
nA P
40.06430000 27000 1
t
4109 1.015
t
4109ln ln 1.015
t109ln 4 ln1.015t
109
ln
ln1.015 4t
1.77 yearst
Logarithmic FunctionsLogarithmic Functions
Consider:Consider: 2( ) logf x x
2(8) log 8f 1 1
24 4( ) logf
2(2) log 2f
2(1) log 1f
3
2
1
0
Logarithmic FunctionsLogarithmic Functions
2( ) logf x x
Logarithmic FunctionsLogarithmic Functions
The inverse of a logarithmic function is an The inverse of a logarithmic function is an exponential function.exponential function.
Logarithmic FunctionsLogarithmic Functions
2( ) logf x x
( ) 2xf x (red)
ConclusionConclusion
A logarithm indicates the exponent to which you A logarithm indicates the exponent to which you raise a certain base in order to produce a given raise a certain base in order to produce a given value.value.
The inverse of logarithmic function is an The inverse of logarithmic function is an exponential function.exponential function.
Logs to the base 10 are written without a base.Logs to the base 10 are written without a base.
Logs to the base Logs to the base ee are indicated by the symbol are indicated by the symbol lnln..