Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download Logarithms and Logarithmic Functions
Document related concepts
no text concepts found
Transcript
Logarithms and Logarithmic Functions
Example 1
Logarithmic to Exponential Form
Write each equation in exponential form.
a. log216 6 =
log216 6 =
1
b. log5
3
1
1
6 = 216 3
3
log5
1
= –5
3125
1
3125
= –5
1
3125
= 5–5
Example 2
Exponential to Logarithmic Form
Write each equation in logarithmic form.
–
a.
1331
1
3
1
=
b. 84 = 4096
11
1331
–
1
3
=
1
11
Example 3
1
4
1024
1
1024
=y
=
1
84 = 4096
3
.
y
Definition of logarithm
4
4–5 = 4–y
–5 = –y
5=y
4
1
Let the logarithm equal y.
4–5 = (4–1)y
So, log 1
11
=–
1024
4
1
1
Evaluate Logarithmic Expressions
Evaluate log 1
log 1
log1331
1
1024
= 5.
1
=4
1024
5
and
1
=4
4
1
Power of a Power
Property of Equality for Exponential Functions
Divide each side by –1.
log8 4096 = 4
Example 4
Solve a Logarithmic Equation
2
Solve log 1 a =
log 1 a =
8
.
3
8
2
Original equation
3
a=
Definition of logarithm
8
3
1
a=
a=
2
3
1
2
3
1
2
8
=
2
1
or
2
1
4
1
3
2
Power of a Power
Example 5
Solve a Logarithmic Inequality
Solve log7 x > 3. Check your solution.
log7 x > 3
x > 73
x > 343
Original inequality
Logarithmic to exponential inequality.
Simplify.
The solution set is {x | x > 343}.
CHECK
Try 2401 to see if it satisfies the inequality.
log7 x > 3
Original inequality.
?
log7 (2401) 3
4>3
Substitute 2401 for x.
4
log7 2401 = 4 because 7 = 2401.
Example 6
Solve Equations with Logarithms on Each Side
Solve log6 (a2 – 15) = log6 (2a). Check your solution.
log6 (a2 – 15) = log6 (2a)
a2 – 15 = 2a
2
a – 2a – 15 = 0
(a – 5)(a + 3) = 0
a – 5 = 0 or
a+3=0
a = 5 or
a = –3
CHECK
Original equation
Property of Equality for Logarithmic Functions
Subtract 2a from each side.
Factor.
Zero Product Property
Solve each equation.
Substitute each value into the original equation.
log6 (52 – 15) = log6 [2(5)]
log6 10 = log6 10
Substitute 5 for a.
Simplify.
log6 [(–3)2 – 15] = log6 [2(–3)]
Substitute –3 for a.
Since log6 (–6) is undefined, –3 is an extraneous solution and must be eliminated. Thus, the
solution is 5.
Example 7
Solve Inequalities with Logarithms on Each Side
Solve log3 (5x + 7) < log3 (3x + 13). Check your solution.
log3 (5x + 7) < log3 (3x + 13)
5x + 7 < 3x + 13
2x < 6
x<3
Original inequality
Property of Inequality for Logarithmic Functions
Subtract Property of Inequalities
Divide each side by 2.
We must exclude all values of x such that 5x + 7 0 or 3x + 13 0. Thus, the solution set is
7
13
7
x > -5, x > - 3 , and x < 3. This compound inequality simplifies to -5 < x < 3. The solution set is
7
{x| -5 < x < 3}.
Related documents