Let's find each of these key pieces of information for the inequalities in the system.
Information
Inequality (I)
Inequality (II)
Given Inequality
4x+4 > 2y
3x-4y ≥ 1
Boundary Line Equation
4x+4 = 2y
3x-4y = 1
Solid or Dashed?
> ⇒ Dashed
≥ ⇒ Solid
y= mx+ b
y= 2x+ 2
y= 3/4x+( -1/4)
Great! With all of this information, we can plot the boundary lines.
Shading the Solution Sets
Before we can shade the solution set for each inequality, we need to determine on which side of the plane their solution sets lie. To do that, we will need a test point that does not lie on either boundary line.
It looks like the point ( 0, 1) would be a good test point. We will substitute this point for x and y in the given inequalities and simplify. If the substitution creates a true statement, we shade the same region as the test point. Otherwise, we shade the opposite region.
Information
Inequality (I)
Inequality (II)
Given Inequality
4x+4>2y
3x-4y≥ 1
Substitute (0,1)
4( 0)+4? >2( 1)
3( 0)-4( 1)? ≥1
Simplify
4>2
-4≱1
Shaded Region
same
opposite
For Inequality (I) we will shade the region containing our test point, or below the boundary line. For Inequality (II), however, we will shade the region opposite the test point, also below the boundary line.
