Unit 3: Quadratics Jeopardy Template

Solving

Simplifying/Vertex Form

Quadratic Applications/Regression

Inequalities/Nonlinear Equations

Transformations

100

Find the Discriminant: 5x² = 3x - 7

-131

100

Simplify: (5 + radical -8) + (-13 + 4 radical -2)

(6i radical 2) - 8

100

The height, h(t), of a rocket, t seconds after firing, is given by: h(t) = -16t²+80t+200. Find the max height of the rocket and the amount of time, in sec, it takes to reach that height

300ft in 2.5 sec

100

Determine number of solutions:

x²+ y² = 16

y = -x + 14

No solution

100

List the transformations of the following equation: g(x) = -2(x - 2)² + 2

Reflects over the x axis

Right 2

Up 2

Vertical stretch factor of 2

200

Solve using Factoring: 16 - 36x - 10x² = 0

x= -4 or 2/5

200

Simplify: 4(7 - i) - 5(2 - 6i)

26i + 18

200

The height, h(t), of a rocket, t seconds after firing, is given by: h(t) = -16t²+80t+200. When will the rocket hit the ground?

6.83 seconds

200

Solve:

y = -x² + 4

y = -4x +8

x = 2

200

Write an equation for the following transformations: vertical compression by a factor of 1/2, a reflection over the x axis, and a translation 2 units left.

f(x) = -1/2 (x + 2)²

300

Solving by completing the square: 2x² - 3x - 2 = 0

x = +or-2

300

Simplify: ((radical 5) + 2i)²

(4i radical 5) + 1

300

Old McDonald has 1000 yards of fencing to enclose a rectangular field on his farm. What is the equations that represents the max area?

A = -y² + 500y

300

Solve using graphing calc:

y = -3x² + 6

y = 3x

x = -2

x = 1

300

Write an equation for the following transformations: A translation 10 units down and a translation 4 units left, followed by a vertical compression by a factor of 2/3 and a reflection over the x axis.

f(x) = -2/3 (x + 4)² -10

400

Solve using quadratic equation: x² - 7x = 18

x = 9 or -2

400

Simplify: -5 - 6i/ -2 +4i

16i - 7/ 10

400

Use quadratic regression to find the equation that best fits the given points: (-2, 4), (0, 5), (1,-11)

Y = -5.5x²- 10.5x + 5

400

Solve the Inequality: x² + 6x + 9 < 0

No real solutions

400

The profit function for a company selling Pez candy dispensers is P(x) = -6x^2 + 720x - 12,500. Determine the number of Pez dispensers that will produce the maximum profit and then find the maximum profit.

60 dispensers, profit of $9100.

500

Solve using quadratic formula: -3x² - 5x + 4 = 0

x = 5

500

Write in vertex form: y=x²+16x+71

y=(x+8)²+7

500

Use quadratic regression to find the equation that best fits the given points: (-2, -13), (2, 3), (4, 5)

y = -0.5x² + 4x -3

500

Solves the inequality: x² + 20x + 100 > 0

All real numbers

500

Standing on the roof of a building 160 feet above the ground, Dylan threw a ball upwards with a speed of 48 ft/sec. This can be modeled by the function h(t) = -16t² + 48t + 160. When does the ball reach 100 feet?

3.9 seconds