Answer:
OPTION B.
OPTION C.
Step-by-step explanation:
Given the equation of the line:
[tex]y - 1 = -2(x -2)[/tex]
We can substitute the coordinates of each set of ordered pairs into the equation in order to know which belong to the graph of that equation:
A. [tex](0, -2)\ and\ (1, 3)[/tex]
Substituting into the equation these coordinates:
[tex]x=0\\\\y=-2[/tex]
We get:
[tex]-2 - 1 = -2(0 -2)\\\\-3\neq 4[/tex]
The graph of the given line does not contain this set of ordered pairs.
B. [tex](0, 5)\ and\ (-2, 9)[/tex]
Substituting into the equation these coordinates:
[tex]x=0\\\\y=5[/tex]
We get:
[tex]5 - 1 = -2(0 -2)\\\\4=4[/tex]
Substituting into the equation the coordinates of the other ordered pair:
[tex]x=-2\\\\y=9[/tex]
We get:
[tex]9 - 1 = -2(-2 -2)\\\\8=8[/tex]
The graph of the given line contains this set of ordered pairs.
C. [tex](-1, 7)\ and\ (2, 1)[/tex]
Substituting into the equation these coordinates:
[tex]x=-1\\\\y=7[/tex]
We get:
[tex]7- 1 = -2(-1 -2)\\\\6=6[/tex]
Substituting into the equation the coordinates of the other ordered pair:
[tex]x=2\\\\y=1[/tex]
We get:
[tex]1 - 1 = -2(2 -2)\\\\0=0[/tex]
The graph of the given line contains this set of ordered pairs
D. [tex](3, -1)\ and\ (2, -1)[/tex]
Substituting into the equation these coordinates:
[tex]x=3\\\\y=-1[/tex]
We get:
[tex]-1 - 1 = -2(3 -2)\\\\-2=-2[/tex]
Substituting the other ordered pais (2, -1):
[tex]-1 - 1 = -2(2 -2)\\\\-2\neq 0[/tex]
The graph of the given line does not contain this set of ordered pairs.
