Holiday Season Jeopardy Game

SYSTEMS OF LINEAR EQUATIONS

ALGEBRA & FACTORING

QUADRATICS I (PROPERTIES)

QUADRATICS II (OPTIMIZATION)

ANALYTIC GEOMETRY

MIXED CHALLENGE

Lightning Round

100

Solve by graphing:
y = x + 2
y = −x + 4

(1, 3)

100

Evaluate:

(-2a^2b)^3

-8a^6b^3

100

Does the quadratic relation have max or min?
5x-2x²+4 = 0

max

100

The length of a rectangle is 4 meters longer than the width (x). Write a quadratic expression that represents the area (A) of the rectangle in terms of x.

A=x(x+4)

100

Find the midpoint of the points:
(−4, 2) and (6, −8)

(1, −3)

100

State the y-intercept of:
y = −2x² + 3x − 9

-9

100

State how many solutions the system has:
2x − 3y = 6
4x − 6y = 10

No solution

200

Solve using substitution:
y = 2x − 1
x + y = 5

(2, 3)

200

Expand and simplify:
(x + 4)(x − 7)

x² − 3x − 28

200

State the zeros of:
y = (−3x − 2)(2x + 1)

x = −2/3 and x=−1/2

200

Find the maximum value of:
y = −x² + 6x + 1

y=10

200

Find the distance between the points:
A(1, 3) and B(5, 3)

200

Solve:
2x² − 1 = 31

x=4 and x=-4

200

Find the equation of the line that passes through (−2, 5) and is perpendicular to:
3x + y = 7

y = (1/3)x + 17/3

300

Solve using elimination:
2x + 3y = 21
2x − y = 1

(3, 5)

300

Factor completely:
-6x² − 15x

-3x(2x+5)

300

Find the axis of symmetry of:
y = −x² − 6x + 4

x = −3

300

A garden has a length of x m and perimeter of 24 m. Write a quadratic expression for the area A in standard form.

A = -x^2+12x

300

The circle is centered at the origin with a radius of 4.
Does the point (−2, 3) lie inside, on, or outside the circle?

Inside the circle

300

An endpoint of a line segment is A(2, −4). The midpoint of the segment is M(6, 1).Determine the coordinates of the other endpoint.

(10, 6)

300

Factor fully:
12x² − 27

3(2x − 3)(2x + 3)

400

The equation of a line is 2x − 3y + 6 = 0.
Without rewriting it into slope-intercept form, find the equation of a line that is parallel to this line and passes through the point (4, −1).

2x − 3y − 11 = 0

400

State the number of real solutions:
4x² − 20x + 25 = 0

two equal real roots

400

State the vertex of:
y = −2x² + 8x − 6

(2,2)

400

A company’s revenue is modeled by:
R=−3x² + 36x − 20. What is the maximum revenue?

$88

400

A line passes through the point (2, −4) and has an x-intercept of 6. Determine the equation of the line.

y = x − 6

400

Solve the quadratic equation:

-12x^2+22x-8=0

x=4/3 and x=1/2

400

For the quadratic relation: y = x² + kx + 16
Find the value(s) of k so the parabola touches the x-axis exactly once.

k = ±8

500

A movie theatre sells adult tickets for $12 and student tickets for $8. In one night, 150 tickets were sold for a total of $1560. How many adult and student tickets were sold?

90 adults and 60 students

500

Solve the quadratic equation:
2x² − 7x − 4 = 0

x=4 and x=-1/2

500

Determine the equation of the parabola that has an axis of symmetry at x = 1 and passes through (0, 4) and (3, 1).

y = −(x − 1)² + 5

500

A triangle has a base of x metres and a height of 24−x metres. Find the maximum area of the triangle

72 m^2

500

Determine the equation of the perpendicular bisector of the segment joining the points (1, 2) and (7, −4).

y = x − 5

500

A ball is thrown upward from a height of 2 m and reaches a maximum height of 18 m after 2 seconds.
Write a quadratic equation in standard form that models the height of the ball.

h=−4t² + 16t + 2

500

Solve exactly:
(x − 1)(x + 5) = (x + 2)²

No solution