Logarithms and Their Graphs - PowerPoint PPT Presentation

1 / 7
About This Presentation
Title:

Logarithms and Their Graphs

Description:

Logarithms and Their Graphs John Napier (creator of logarithms) By: Jesus Rocha Period 2 Pre-Calculus Base b in Logarithm Problems The logarithm to the base b of x ... – PowerPoint PPT presentation

Number of Views:191
Avg rating:3.0/5.0
Slides: 8
Provided by: JSR1
Category:

less

Transcript and Presenter's Notes

Title: Logarithms and Their Graphs


1
Logarithms and Their Graphs
? John Napier (creator of logarithms)
  • By Jesus Rocha
  • Period 2 Pre-Calculus

2
Base b in Logarithm Problems
  • The logarithm to the base b of x, log x, is the
    power to which you need to raise b in order to
    get x. log x y     means     b x
  • Logarithmic Form Exponential form
  • Rules
  • 1. Log x is only defined if b and x are both
    positive, and b ?1
  • 2. Log x is called the common logarithm of x,
    and is sometimes written as log 10.
  • 3. Log x is called the natural logarithm of x

b
b
y
b
10
e
3
Solving Logarithms
If log 1,000 3 (or the logarithm to the base
10 of 1,000 is 3) then its exponential form would
be 10 1,000 Solving - Move base 10 to the
left of log (10 log 1,000 3) - It is easy to
figure out that 10 to the power of 3 equals 1,000
so the exponential form would be written as 10
1,000
10
3
3
4
Laws of Logarithms
  • If the logs are being asked to be multiplied, log
    x (mn), then you should add the Logs log m
    log n
  • ex log (4x8) log (4) log (8) 235
  • If the logs are being asked to be divided, log
    (m/n), then you should subtract the Logs log m
    log n
  • ex log (8/4) log (8) log (4) 3-21
  • 3. b 1

b
b
b
2
2
2
b
b
b
2
2
2
0
5
Graphing Logarithms
By nature of the logarithms, most log graphs tend
to have the same shape, looking similar to a
square root graph
Square Root Graph
Logarithm Graph
6
It is simple to graph exponentials. For instance,
to graph y 2x, you would just plug in some
values for x, compute the corresponding y-values,
and plot the points. A negative number or 0 would
make it a little more difficult to solve -
Since 20 1, then log (1) 0, so (1, 0) is on
the graph - Since 21 2, then log (2) 1, so
(2, 1) is on the graph - Since 22 4, then log
(4) 2, so (4, 2) is on the graph - Since 23
8, then log (8) 3, so (8, 3) is on the
graph - Since 3, 5, 6, and 7 arent powers of 2,
they wouldnt work well with each other
2
2
2
2
7
The Results
Write a Comment
User Comments (0)
About PowerShow.com