The intercepts are and. To find a third point, we let.
Let.
Multiply.y=- 4 Subtract 8.
8 + y= 4
2142 + y= 4 x= 4
2 x+ y= 4
1 0, 4 2 1 2, 0 2 x= 4
190 CHAPTER 3 Linear Equations and Inequalities in Two Variables; Functions
xy(–2, 6) is used as a check.(0, 3)(2, 0)y = x + 3–2–1 12346 5 4 3 2 1–1
–23- 2
FIGURE 10xy
03
20- 26
NOW TRYOBJECTIVE 2 Find intercepts.In FIGURE 10, the graph intersects (crosses) the
y-axis at and the x-axis at For this reason, is called the y-intercept
and is called the x-interceptof the graph. The intercepts are particularly use-
ful for graphing linear equations.
1 2, 0 2
1 0, 3 2 1 2, 0 2. 1 0, 3 2
Finding InterceptsFind the intercepts for the graph of Then draw the graph.
To find the y-intercept, let. To find the x-intercept, let
Let Let.y = 4 y-intercept is 1 0, 4 2. x= 2 x-intercept is 1 2, 0 2.
0 +y= 4 2 x= 4
2102 +y= 4 x=0. 2 x+ 0 = 4 y= 0
2 x+y= 4 2 x+ y= 4
x= 0 y= 0.
2 x+ y=4.
EXAMPLE 3
This gives the ordered pair. We plot the three ordered pairs and draw a line
through them, as shown in FIGURE 10.
1 - 2, 6 2
This gives the ordered pair The graph, with the two intercepts in red, is
shown in FIGURE 11 on the next page.
1 4, - 42.
NOW TRY
EXERCISE 2Graph .y=^13 x+ 1
(–3, 0)^0 x(0, 1)y =^13 x + 1
yNOW TRY ANSWER
2.
Finding InterceptsTo find the x-intercept, let in the given equation
and solve for x. Then is the x-intercept.
To find the y-intercept, let in the given equation
and solve for y. Then 1 0, y 2 is the y-intercept.x= 0
1 x, 0 2
y= 0
xy
y-interceptx-intercept0(0, y)(x, 0)http://www.ebook777.com
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