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Solve by Factoring
Solve by Square Roots
Solve by Quadratic Formula
Discriminant
Word Problems
100

x^2=-5x

x=0,-5

100

3x^2=675

x=-15, 15

100

10x^2-x-4=0

x=-0.58, 0.68

100

5x^2-2x+5=0

-96; 0 real solutions

100

Some fireworks are fired into the air from the ground at an initial velocity of 80 feet per second. 

Write an equation to represent this situation. 

How high will the fireworks be after 1 second?

h=-16t^2+80t

64 feet

200

2x^2+8x-64=0

x=-8, 4

200

-7n^2=-182

n=-5.10, 5.10

200

2x^2+5x+7=7-3x

x=-4, 0

200

x^2+9=-6x

0; one solution

200

Some fireworks are fired into the air from the ground at an initial velocity of 80 feet per second.

Will the fireworks go above 75 feet?

1600; yes

300

x^3-5x^2-14x=0

x=-2, 0, 7

300

m^2+2=27

m=-5, 5

300

4x^2-4x+4=3

x=0.5

300

7x^2-2=4

168; two real solutions

300

Some fireworks are fired into the air from the ground at an initial velocity of 80 feet per second.

How long does it take the fireworks to reach the ground?

5 seconds

400

4x^2-9=0

x=-3/2, 3/2

400

(x+5)^2=10

x=-8.16, -1.84

400

3x^2-4x=8-4x

x=-1.63, 1.63

400

What part of the quadratic formula is the discriminant?

The number under the square root 

b^2-4ac

400

A cannonball is shot upwards at a starting height of 4 feet with an initial velocity of 40 feet per second.

Write an equation to model this situation. 

How high will the cannonball be after 1.25 seconds? 

h=-16t^2+40t+4

29 feet

500

7x^2+2=15x

x=1/7, 2

500

-11(x+2)^2+704=0

x=-10, 6

500

16x^2-9x+4=9x^2-2

No real solution

500

What does the discriminant of a quadratic equation tell you about the equation?

How many solutions the quadratic equation will have (0, 1, or 2).

500

A cannonball is shot upwards at a starting height of 4 feet with an initial velocity of 40 feet per second.

Will the cannonball go over 30 feet? 

-64; no.