Respuesta :
Option A, B, C
(-4, -3) and (1, 6) and (2, 4) is a solution to given system of inequalities
Solution:
Given system of inequalities are:
Line 1 : 3y < 2x + 18
Line 2 : -4y < -x + 12
Let us substitute the given solution set in options and check if it satisfies both the inequalities
Option A
Substitute x = -4 and y = -3 in Line 1
[tex]3(-3) < 2(-4) + 18\\\\-9<-8+18\\\\-9<10[/tex]
-9 less than 10 is true
Substitute x = -4 and y = -3 in Line 2
[tex]-4(-3) < -(-4) + 12\\\\12<4+12\\\\12<16[/tex]
12 less than 16 is true
Thus (-4, -3) is a solution to given system of inequalities
Option B
Substitute x = 1 and y = 6 in line 1
[tex]3(6)<2(1) + 18\\\\18<2+18\\\\18<20[/tex]
18 less than 20 is true
Substitute x = 1 and y = 6 in line 2
[tex]-4(6) < -(1) + 12\\\\-24<-1+12\\\\-24<11[/tex]
-24 is less than 11 is true
Thus (1, 6) is a solution to given system of inequalities
Option C
Substitute x = 2 and y = 4 in line 1
[tex]3(4) <2(2) + 18\\\\12<4+18\\\\12<22[/tex]
12 is less than 22 is true
Substitute x = 2 and y = 4 in line 2
[tex]-4(4)<-(2) + 12\\\\-16<-2+12\\\\-16<10[/tex]
-16 less than 10 is true
So, (2, 4) is a solution to given system of inequalities
Option D
Substitute x = 5 and y = -5 in line 1
[tex]3(-5) <2(5) +18\\\\-15<10+18\\\\-15<28[/tex]
-15 is less than 28 is true
Substitute x = 5 and y = -5 in line 2
[tex]-4(-5)<-(5) + 12\\\\20<-5+12\\\\20<7[/tex]
20 less than 7 is not true
Thus (5, -5) is not a solution to given system of inequalities
Option E
Substitute x = 3 and y = 2 in line 1
[tex]3(2)<2(3)+18\\\\6<6+18\\\\6<24[/tex]
6 less than 24 is not true
Thus (3, 2) is not a solution to given system of inequalities
