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REFRESHERLinear Graphs
INTERPRETING STRAIGHT-LINE GRAPHS
Equations and graphs are used to study the relationship between two variables such as distance and speed.
If a relationship exists between the variables, one can be said to be a function of the other. A function can be described by a table, a rule or a graph.
We are going to analyze linear functions.
Standard linear equation
y = mx + c
Where ‘m’ is the gradient and ‘c’ is the y-intercept.
Gradient
m =m =
200
4000.5 500
4001.25
400 m
500 m
200 m
400 m
The gradient (or slope) is the steepness of a line. The gradient gives us information about how
much one variable changes compared to another. The steeper the line the greater the gradient Gradient is simply the change in the vertical distance
(rise) over the change in the horizontal distance (run).
Gradient = m = Rise
Run
rise
rise
runrun
Gradient
Gradient = m = Rise
Run
run
rise
8
4
m = 8 4 = 2
The graph of y = 2x - 4
Gradient
Gradient = m = Rise
Run
run
rise
4
2
m = 4 2 = 2
The graph of y = 2x - 4
The gradient is the same at any point along a straight line
o If a line goes up from left to right,
then the slope has to be positive
o If a line goes down from left to right,
then the slope has to be negative
o Lines that are horizontal have zero slope.
o Vertical lines have no slope, or undefined
slope.
Gradient: Positive or negative?
Gradient: Positive or Negative?
Positive gradiento x- value increases o y- value increases
Negative gradiento x- value increases o y- value decreases
o Since the rise is simply the change in the vertical distance and the run is the change in the horizontal distance. The rise and run can be found by calculating the change between two points on a line.
12
12
xx
yy
x
y
run
risemslope
Gradient: Definition
oIn order to use this formula we need to know, or be able to find 2 points on the line. Eg (0,-4) & (2,0)
x1, y1 x2, y2
Gradient
m = 4- -4 4-0 = 8 4 = 2
The graph of y = 2x - 4
12
12
xx
yym
1. Choose two points on the graph
2. Substitute the values and calculate
(4,4)
(0,-4)
(0,-4) (4,4) x1, y1 x2, y2
Exercise 6.2 Q1, Q2, Q3, Q4, Q5, Q6 RHS
Gradient
m = 0 - 4 2 - 0 = -4 2 = -2
The graph of y = -2x + 4
12
12
xx
yym
1. Choose two points on the graph
2. Substitute the values and calculate
(2,0)
(0, 4)
(0,4) (2,0) x1, y1 x2, y2
Exercise 6.2 Q1, Q2, Q3, Q4, Q5, Q6 RHS
Intercepts The x-intercept occurs where the line cuts
the x-axis. At the x- intercept the y-value always equals to
0.
The y- intercept occurs where the line cuts
the y-axis. At the y-intercept the x-value is always equal to 0.
x-intercept
y-intercept
(2,0)
(0,-4)
Brain Storm!1. Explain how you could find the y-intercept by:
a) Looking at a graph
b) Looking at an equationy = 2x +3
c) Looking at a table of values
X 0 2 4
Y 4 8 12
Find the coordinates for the point where the line passes through the x-axis (the x-intercept), and for the point where the line passes through the y axis (the y-intercept)
Substitute y = 0 into the equation to find the x value for the x-intercept.Substitute x = 0 into the equation to find the y-value for the y-intercept.
Carefully plot the points and look at the graph. OR... Work out the rule used and use the method listed above under looking at an equation Rule: y = 2x +4
Find the Intercepts:
1. Find the x and y intercepts of the following graphs:a. b.
c. d.
x-intercept(2,0)
x-intercept(2,0)
x-intercept(0,0)
x-intercept(4,0)
y-intercept(0,-4)
y-intercept(0, 4)
y-intercept(0,0)
y-intercept(0, 4)
Find the interceptsExample 1. Find the x and y intercepts of thefollowing equation: y = 3 x + 2
x int: y = 00 = 3 x + 20-2 = 3 x +2 - 2-2 = 3 x 3 3X = - 2 3 x – intercept = -2/3 i.e. The line cuts the x –axis at (-2/3, 0)
y int: x = 0 y = 3 (0) + 2y = 0 + 2y = 2y-intercept = 2 i.e. the line cuts the y axis at (0,2)
Find the interceptsExample 2. Find the x and y intercepts of thefollowing equation: y = -2x + 1
x int: y = 00 = -2x + 10-1 = -2x + 1 - 1-1 = -2x -2 -2X = 1 2 x – intercept = ½ i.e. The line cuts the x –axis at ( ½ , 0)
y int: x = 0 y = -2(0) + 1y = 0 + 1y = 1y-intercept = 1 i.e. the line cuts the y axis at (0,1)
Find the intercepts
Example 1. Find the x and y intercepts of thefollowing equation: 2x + 3y = 6
x int: y = 02x + 3(0) = 62x + 0 = 62x = 6 2 2x = 6 2 x = 3x – intercept = 3 i.e. The line cuts the x –axis at (3, 0)
y int: x = 0 2 (0) + 3y = 60 + 3y = 63y = 6• 3y = 2y-intercept = 2 i.e. the line cuts the y axis at (0,2)
REMEMBER!! The x-intercept occurs where the line cuts
the x-axis. At the x- intercept the y-value always equals to
0.
The y- intercept occurs where the line cuts
the y-axis. At the y-intercept the x-value is always equal to 0.
x-intercept
y-intercept
(2,0)
(0,-4)
Sketching linear graphs using the x- and y-intercepts
State the equation Find the x- intercept (substitute 0 for y and
solve for x) Find the y- intercept (substitute 0 for x and
solve for y) Mark the x intercept and y intercept and rule
a straight line through them.
Sketch the linear equationExample 1. Find the x and y intercepts of the
following equation and sketch the line. y = 2 x + 4
x int: y = 00 = 2 x + 40-4 = 2 x +4 - 4-4 = 2 x 2 2X = - 4 2 X = -2x – intercept = -2 i.e. The line cuts the x –axis at (-2, 0)
y int: x = 0 y = 2 (0) + 4y = 0 + 4y = 4y-intercept = 4 i.e. the line cuts the y axis at (0,4)
STEP 1: FIND THE INTERCEPTS...
STEP 2: PLOT THE COORDINATES AND RULE A STRAIGHT LINE BETWEEN THEM...
Sketch the linear equationExample 1. Find the x and y intercepts of the
following equation and sketch the line. y = 2 x + 4
X int
(-2,0)
Y int
(0,4) x
y
y = 2 x + 4
