1. What is/are the solution(s)
to the function -3x = – 4 + x2 ?
ANSWER
x = -4
x = 1

2. A point on a graph moves so that the function
y = x2 + 3x – 4 describes how the vertical
position y is related to the horizontal position x.
What is the vertical position when the horizontal
position is –1?
ANSWER -6

3. 3. Graph the function y = x2 + 3x – 4
ANSWER
(On next slide)

4. Graph a quadratic inequality
EXAMPLE 1
Graph a quadratic inequality
Graph y > x2 + 3x – 4.
SOLUTION
STEP 1
Graph y = x2 + 3x – 4. Because the inequality symbol is >, make the parabola dashed.
STEP 2
Test a point inside the parabola, such as (0, 0).
y > x2 + 3x – 4
0 > (0) – 4 ?
0 > – 4 ✓

5. EXAMPLE 1
Graph a quadratic inequality
So, (0, 0) is a solution of the inequality.
STEP 3
Shade the region inside the parabola.

6. GUIDED PRACTICE
for Examples 1, 2, and 3
Graph the inequality.
y > x2 + 2x – 8
ANSWER

7. GUIDED PRACTICE
for Examples 1, 2, and 3
Graph the inequality.
y < 2x2 – 3x + 1
ANSWER

8. GUIDED PRACTICE
for Examples 1, 2, and 3
Graph the inequality.
y < – x2 + 4x + 2
ANSWER

9. Graph a system of quadratic inequalities
EXAMPLE 2
Graph a system of quadratic inequalities
Graph the system of quadratic inequalities.
y < – x2 + 4
Inequality 1
y > x2 – 2x – 3
Inequality 2
SOLUTION
STEP 1
Graph y ≤ – x The graph is the red region inside and including the parabola y = – x2 + 4.

10. EXAMPLE 2
Graph a system of quadratic inequalities
STEP 2
Graph y > x2– 2x – 3. The graph is the blue region inside (but not including) the parabola y = x2 –2x – 3.
STEP 3
Identify the purple region where the two graphs overlap. This region is the graph of the system.

11. GUIDED PRACTICE
for Examples 1, 2, and 3
Graph the system of inequalities consisting of y ≥ x2 and y < −x2 + 5.
ANSWER

12. EXAMPLE 2
Use a quadratic inequality in real life
A manila rope used for rappelling down a cliff can safely support a weight W (in pounds) provided
Rappelling
W ≤ 1480d2
where d is the rope’s diameter (in inches). Graph the inequality.
SOLUTION
Graph W = 1480d2 for nonnegative values of d. Because the inequality symbol is ≤, make the parabola solid. Test a point inside the parabola, such as (1, 2000).

13. EXAMPLE 2
Use a quadratic inequality in real life
W ≤ 1480d2
2000 ≤ 1480(1)2 ?
2000 ≤ 1480
Because (1, 2000) is not a solution, shade the region below the parabola.