Answer:
Points (-3,-2), (-1,-2), (1,-2) and (1,2) are solutions to the given inequality.
Step-by-step explanation:
We are given the following inequality in the question:
[tex]y < 0.5x + 2[/tex]
We have to check which points give the solution to the given inequality.
1) (-3,-2)
Putting the values in the given inequality:
[tex]-2 < 0.5\times (-3) + 2\\-2 < 0.5\\\text{which is true}[/tex]
The above point is a solution to the given inequality.
2) (-2,1)
Putting the values in the given inequality:
[tex]1 < 0.5\times (-2) + 2\\1 < 1\\\text{which is not true}[/tex]
The above point is not a solution to the given inequality.
3) (-1,-2)
Putting the values in the given inequality:
[tex]-2 < 0.5\times (-1) + 2\\-2 < 1.5\\\text{which is true}[/tex]
The above point is a solution to the given inequality.
4) (-1,2)
Putting the values in the given inequality:
[tex]2< 0.5\times (-1) + 2\\2 < 1.5\\\text{which is not true}[/tex]
The above point is not a solution to the given inequality.
5) (1,-2)
Putting the values in the given inequality:
[tex]-2 < 0.5\times (1) + 2\\-2 < 2.5\\\text{which is true}[/tex]
The above point is a solution to the given inequality.
6) (1,2)
Putting the values in the given inequality:
[tex]2 < 0.5\times (1) + 2\\2 < 2.5\\\text{which is true}[/tex]
The above point is a solution to the given inequality.
Points (-3,-2), (-1,-2), (1,-2) and (1,2) are solutions to the given inequality.
