1.
5
x
β
2
y
=
4
; (β1, 1)
2.
3
x
β
4
y
=
10
; (2, β1)
3.
β
3
x
+
y
=
β
6
; (4, 6)
4.
β
8
x
β
y
=
24
; (β2, β3)
5.
β
x
+
y
=
β
7
; (5, β2)
6.
9
x
β
3
y
=
6
; (0, β2)
7.
1
2
x
+
1
3
y
=
β
1
6
; (1, β2)
8.
3
4
x
β
1
2
y
=
β
1
; (2, 1)
9.
4
x
β
3
y
=
1
;
(
1
2
,
1
3
)
10.
β
10
x
+
2
y
=
β
9
5
;
(
1
5
,
1
10
)
11.
y
=
1
3
x
+
3
; (6, 3)
12.
y
=
β
4
x
+
1
; (β2, 9)
13.
y
=
2
3
x
β
3
; (0, β3)
14.
y
=
β
5
8
x
+
1
; (8, β5)
15.
y
=
β
1
2
x
+
3
4
;
(
β
1
2
,
1
)
16.
y
=
β
1
3
x
β
1
2
;
(
1
2
,
β
2
3
)
17.
y
=
2
; (β3, 2)
18.
y
=
4
; (4, β4)
19.
x
=
3
; (3, β3)
20.
x
=
0
; (1, 0)
Find the ordered pair solutions given the set of x-values.
21.
y
=
β
2
x
+
4
; {β2, 0, 2}
22.
y
=
1
2
x
β
3
; {β4, 0, 4}
23.
y
=
β
3
4
x
+
1
2
; {β2, 0, 2}
24.
y
=
β
3
x
+
1
; {β1/2, 0, 1/2}
25.
y
=
β
4
; {β3, 0, 3}
26.
y
=
1
2
x
+
3
4
; {β1/4, 0, 1/4}
27.
2
x
β
3
y
=
1
; {0, 1, 2}
28.
3
x
β
5
y
=
β
15
; {β5, 0, 5}
29.
β
x
+
y
=
3
; {β5, β1, 0}
30.
1
2
x
β
1
3
y
=
β
4
; {β4, β2, 0}
31.
3
5
x
+
1
10
y
=
2
; {β15, β10, β5}
32.
x
β
y
=
0
; {10, 20, 30}
Find the ordered pair solutions, given the set of y-values.
33.
y
=
1
2
x
β
1
; {β5, 0, 5}
34.
y
=
β
3
4
x
+
2
; {0, 2, 4}
35.
3
x
β
2
y
=
6
; {β3, β1, 0}
36.
β
x
+
3
y
=
4
; {β4, β2, 0}
37.
1
3
x
β
1
2
y
=
β
4
; {β1, 0, 1}
38.
3
5
x
+
1
10
y
=
2
; {β20, β10, β5}
Part B: Graphing Lines
Given the set of x-values {β2, β1, 0, 1, 2}, find the corresponding y-values and graph them.
39.
y
=
x
+
1
40.
y
=
β
x
+
1
41.
y
=
2
x
β
1
42.
y
=
β
3
x
+
2
43.
y
=
5
x
β
10
44.
5
x
+
y
=
15
45.
3
x
β
y
=
9
46.
6
x
β
3
y
=
9
47.
y
=
β
5
48.
y
=
3
Find at least five ordered pair solutions and graph.
49.
y
=
2
x
β
1
50.
y
=
β
5
x
+
3
51.
y
=
β
4
x
+
2
52.
y
=
10
x
β
20
53.
y
=
β
1
2
x
+
2
54.
y
=
1
3
x
β
1
55.
y
=
2
3
x
β
6
56.
y
=
β
2
3
x
+
2
57.
y
=
x
58.
y
=
β
x
59.
β
2
x
+
5
y
=
β
15
60.
x
+
5
y
=
5
61.
6
x
β
y
=
2
62.
4
x
+
y
=
12
63.
β
x
+
5
y
=
0
64.
x
+
2
y
=
0
65.
1
10
x
β
y
=
3
66.
3
2
x
+
5
y
=
30
Part C: Horizontal and Vertical Lines
Find at least five ordered pair solutions and graph them.
67.
y
=
4
68.
y
=
β
10
69.
x
=
4
70.
x
=
β
1
71.
y
=
0
72.
x
=
0
73.
y
=
3
4
74.
x
=
β
5
4
75. Graph the lines
y
=
β
4
and
x
=
2
on the same set of axes. Where do they intersect?
76. Graph the lines
y
=
5
and
x
=
β
5
on the same set of axes. Where do they intersect?
77. What is the equation that describes the x-axis?
78. What is the equation that describes the y-axis?
Part D: Mixed Practice
Graph by plotting points.
79.
y
=
β
3
5
x
+
6
80.
y
=
3
5
x
β
3
81.
y
=
β
3
82.
x
=
β
5
83.
3
x
β
2
y
=
6
84.
β
2
x
+
3
y
=
β
12
Step-by-step explanation:
