Graphing Quadratics Jeopardy! Jeopardy Template

Axis of Symmetry

Vertex

Domain/Range, and End Behavior

Graphing Pattern

Discriminant and Intercepts

100

The formula for the axis of symmetry.

What is x=-b/2a?

100

How do we calculate the x-coordinate of the vertex?

What is x=-b/2a?

100

What is the domain of any parabola?

What is (-∞,∞)?

100

How do we know if our graphing pattern will be down or up?

Based on the value of a. If a is negative, the pattern will be down. If a is positive, the pattern will be up.

100

What is the formula for discriminant?

What is b²-4ac?

200

How do we represent the axis of symmetry on our graph?

What is a dashed, vertical line?

200

How do we calculate the y-coordinate of the vertex?

First, find x=-b/2a.

Then, substitute that number into the equation/function.

200

What is the range of the graph?

(-∞,3]

200

When we create our pattern, at what point do we begin to count from?

What is the vertex?

200

What is the maximum number of x-intercepts a parabola can have?

What is 2?

300

What is the axis of symmetry for the following equation?

f(x)=0.5x²+2x

x=-2

300

What is the value of "a" if our parabola has a minimum?

Positive

300

State the left end behavior for the following equation.

y=3x²+6

As x->-∞, y->∞

300

Create the pattern table for the equation

y=x²+3x+9

right up

1 1

2 4

3 9

300

Calculate the discriminant AND state the number of zeros.

y=x²+3x+2

Discriminant = 1

Since the discriminant is positive, there would be 2 zeros (x-intercepts) on the graph.

400

What is the axis of symmetry for the following equation?

y=3x²+6

x=0

400

Give an equation of a parabola that has a maximum.

Answers will vary but can be any function of the form ax² + bx + c with an "a" value that is negative.

400

State the range of the graph for the following equation.

y=3x²+6x+2

Hint: You do not need the entire graph. Find the vertex and think about which direction the parabola opens.

[-1,∞)

400

Create the pattern table for the equation

y=-2x²+3x+5

right down

1 -2

2 -8

3 -18

400

Calculate the discriminant AND state the number of zeros.

y=3x²+6

Discriminant = -72

Since the discriminant is negative, the graph would have 0 zeros (x-intercepts).

500

What is the axis of symmetry for the following equation?

y=-2x²+3x+5

x=3/4

500

Given the equation f(x)=4x²+8x,

find the vertex of the function AND state whether it is a maximum or minimum.

What is (-1,-4) and minimum?

This vertex is a minimum because a=4 is positive so the parabola will open up, making the vertex the lowest point on the graph.

500

State the left AND right end behavior for the equation

y=-0.5x²+4x+2

Left: As x->-∞, y->-∞

Right: As x->∞, y->-∞

500

Create the pattern table for the equation

f(x)=0.5x²+2x

right up

1 0.5

2 2

3 4.5

500

Create the equation of a parabola which will have a discriminant of 0.

Answers will vary. Equations should be written such that b²-4ac=0 and a≠0.