How do you graph the inequality y> -2x^2-4x+3y>2x24x+3?

1 Answer
MathFact-orials.blogspot.com
Feb 23, 2017

See below:

Explanation:

Let's first see that we're going to have a parabola to draw.

The -2x^22x2 tells us that the parabola will look like a nn

The y-intercept is:

y=-2(0)^2-4(0)+3=3=>(0,3)y=2(0)24(0)+3=3(0,3)

The vertex is at:

x=-b/(2a)=-(-4)/(2(-2))=- (-4)/(-4)=-1x=b2a=42(2)=44=1

y=-2(-1)^2-4(-1)+3=-2(1)+4+3=5y=2(1)24(1)+3=2(1)+4+3=5

and so (-1,5)(1,5)

We can now draw a graph:

graph{-2x^2-4x+3 [-11.25, 11.25, -4.05, 7.2]}

We want to now work with the inequality. We want values where y> -2x^2-4x+3y>2x24x+3. These will either be inside the parabola or outside. Let's see which.

Let's look at the origin, (0,0)(0,0). Is this a point that satisfies the inequality?

0> -2(0)^2-4(0)+30>2(0)24(0)+3

0>3 color(white)(000)color(red)"No"0>3000No

Which means the valid solution set is outside the parabola (but doesn't include the line defining the parabola itself, and so we use a dotted line. Had the question been >=, then it'd be a solid line and the line defining the parabola would be a part of the solution set):

graph{y> -2x^2-4x+3 [-11.25, 11.25, -4.05, 7.2]}

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