Answer:
- The graph of this line i.e. [tex]2x-3y>12[/tex] should be BELOW the DOTTED line as [tex]y<\frac{-12+2x}{3}[/tex] involves < symbol.
- The graph of this line i.e. [tex]y>-2x+5[/tex] should be ABOVE the DOTTED line as it involves > symbol.
- The correct graph for line 1 and line 2 is shown in attached figure.
Step-by-step explanation:
- If the inequality involves < or >, then the graph of the equation involves a dotted line.
- If the inequality involves ≤ or ≥, then the graph of the equation involves a solid line.
Considering the line 1
[tex]2x-3y>12[/tex]
Solving line 1
[tex]2x-3y>12[/tex]
[tex]-3y>12-2x[/tex]
[tex]3y<-12+2x[/tex]
[tex]y<\frac{-12+2x}{3}[/tex]
As [tex]y<\frac{-12+2x}{3}[/tex] involves < symbol, so the graph of this line should be BELOW the DOTTED line.
But, as you can see that there is an error in the graph. As the graph of [tex]y<\frac{-12+2x}{3}[/tex] is being shown ABOVE the SOLID line.
Therefore, the graph of this line i.e. [tex]y<\frac{-12+2x}{3}[/tex] should be BELOW the DOTTED line as it involves < symbol.
Considering the line 2
[tex]y>-2x+5[/tex]
As [tex]y>-2x+5[/tex] involves > symbol, so the graph of this line should be ABOVE the DOTTED line.
But, as you can see that there is an error in the graph. As the graph of [tex]y>-2x+5[/tex] is being shown ABOVE the SOLID line.
Therefore, the graph of this line i.e. [tex]y>-2x+5[/tex] should be ABOVE the DOTTED line as it involves > symbol.
The correct graph for line 1 i.e. [tex]2x-3y>12[/tex] and line 2 i.e. [tex]y>-2x+5[/tex] is shown in attached figure.
From the attached graph, it is shown that only (5, -2) satisfies the both inequalities. So, (5, -2) is the correct solution for the given inequalities.
Solution Verification:
Putting (5, -2) in line 1 and line 2
For line 1:
2x - 3y > 12 ⇒ 2(5) - 3(-2) > 12 ⇒ 10 + 6 > 12 ⇒ 16 > 12 which is true.
For line 2:
y > -2x + 5 ⇒ -2 > -2(5) + 5 ⇒ -2 > -10 + 5 ⇒ -2 > -5 which is true.
So, (5, -2) is IN the solution for line 1 and line 2
Putting (-1, -1) in line 1 and line 2
For line 1:
2x - 3y > 12 ⇒ 2(-1) - 3(-1) > 12 ⇒ -2 + 3 > 12 ⇒ 1 > 12 which is false.
For line 2:
y > -2x + 5 ⇒ -1 > -2(-1) + 5 ⇒ -1 > 2 + 5 ⇒ -1 > 7 which is false.
So, (-1, -1) is NOT in the solution for line 1 and line 2
Putting (0, 5) in line 1 and line 2
For line 1:
2x - 3y > 12 ⇒ 2(0) - 3(5) > 12 ⇒ 0 - 15 > 12 ⇒ -15 > 12 which is false.
For line 2:
y > -2x + 5 ⇒ 5 > -2(0) + 5 ⇒ 5 > 0 + 5 ⇒ 5 > 5 which is false.
So, (0, 5) is NOT in the solution for line 1 and line 2
Keywords: inequality, solution, graph, dotted line, solid line
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