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Chapter 9B SBM Modeling Our World

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Modeling Our World 'Linear Modeling' What is Linear Modeling? ... The following 3 steps summarize the process. Creating a Linear Function from 2 Data Points... – PowerPoint PPT presentation

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Title: Chapter 9B SBM Modeling Our World


1
Chapter 9B SBMModeling Our World
  • Linear Modeling

2
What is Linear Modeling?
  • In 9A we represented functions with tables and
    graphs.
  • In lesson 9B, we will turn our focus to
    representing functions with equations.
  • These basic principles will be those of
    straight-line graphs called linear functions.

3
Linear Functions
  • Whenever a graph is a straight line and is
    dealing with an independent and dependent
    variable, it is a linear function.

4
Slope (m)
  • The slope of a line is defined as the amount that
    a graph rises vertically for a given distance
    that it runs horizontally. Or in other words
    rise over run.
  • Take the change in y and divide it by the change
    in x.
  • y-intercept form y mx b
  • m slope and b y-intercept

5
Slope of Lines
The slope of a line through (x1 , y1) and (x2 ,
y2) with x1 not equal to x2, is y2 y1 x2
x1.
Ex. Find the slope (m) of a line through (7,5)
and (2,4).
Answer 1/5
6
The Change in the Dependent Variable
  • The Change in the Dependent Variable is
    calculated by
  • See example 3 on page 514.

(rate of change) X (change in indep. variable)
7
Equations for a Linear Function
  • To generalize a linear function, you need
  • A dependent variable
  • An independent variable
  • The initial value of the dependent variable when
    time (t) 0.
  • The rate of change of N with respect to time or
    the change in N.

8
General Equation for a Linear Function
  • The General Equation for a Linear Function is
    calculated by
  • See examples 4 - 5 on pages 517-18.

Dependent
Variable Initial value
(rate of change) X (indep. variable)
9
Linear Functions from 2 Data Points
  • Suppose we have 2 data points and want to find a
    linear function that fits them.
  • You find the equation for the linear function by
    using the 2 data points to determine the rate of
    change (slope) and the initial value of the
    function.
  • The following 3 steps summarize the process.

10
Creating a Linear Function from 2 Data Points
  • Step 1 Let x be the independent variable and y
    be the dependent variable. Find the change in
    each variable between the 2 given points, and use
    these changes to calculate the slope (or rate of
    change).
  • Slope

change in y
change in x
11
Steps (cont)
  • Step 2 Substitute the slope (from step 1) and
    the numerical values of x and y from either data
    point into the y-intercept equation.
  • You can then solve for the y-intercept, and slope
    because it will be the only unknown in the
    equation.
  • Step 3 Now use the slope and y-intercept to
    write the equation of the linear function in the
    form of y mx b.
  • See example 7 on pages 519-20.

12
Homework
  • 9B 2 4, 8 12, 14 18, 20 22.
  • Extra Credit 5 points possible for each
  • 9B s 28, 30, 32
  • (On separate sheet of paper please)
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