Answer:
(–3, –2)
(–1, –2)
(1, –2)
Step-by-step explanation:
we know that
If a ordered pair is a solution of the linear inequality, then the ordered pair must satisfy the inequality. The ordered pair must lie on the shaded are of the solution set
we have
[tex]y< 0.5x+2[/tex]
The solution of the inequality is the shaded area below the dashed line [tex]y=0.5x+2[/tex]
Verify each ordered pair
Substitute the value of x and the value of y in the inequality and then compare the results
case 1) (–3, –2)
[tex]-2< 0.5(-3)+2[/tex]
[tex]-2< 0.5[/tex] ----> is true
so
The ordered pair satisfy the inequality
therefore
The ordered pair is a solution of the inequality (the ordered pair lie on the shaded area of the solution set)
case 2) (–2, 1)
[tex]1< 0.5(-2)+2[/tex]
[tex]1< 1[/tex] ----> is not true
so
The ordered pair not satisfy the inequality
therefore
The ordered pair is not a solution of the inequality (the ordered pair not lie on the shaded area of the solution set)
case 3) (–1, –2)
[tex]-2< 0.5(-1)+2[/tex]
[tex]-2< 1.5[/tex] ----> is true
so
The ordered pair satisfy the inequality
therefore
The ordered pair is a solution of the inequality (the ordered pair lie on the shaded area of the solution set)
case 4) (–1, 2)
[tex]2< 0.5(-1)+2[/tex]
[tex]2< 1.5[/tex] ----> is not true
so
The ordered pair not satisfy the inequality
therefore
The ordered pair is not a solution of the inequality (the ordered pair not lie on the shaded area of the solution set)
case 5) (1, –2)
[tex]-2< 0.5(1)+2[/tex]
[tex]-2< 2.5[/tex] ----> is true
so
The ordered pair satisfy the inequality
therefore
The ordered pair is a solution of the inequality (the ordered pair lie on the shaded area of the solution set)
see the attached figure to better understand the problem
