Exam 2 Review Jeopardy Template

Domain/
Range

Vertex and inverse problems

Zeros of polynomial function

Asymptotes and composites

Graphs

100

Identify the domain of the following function and write answer in interval notation.

g(x)= 1/(x-9)

(-∞, 9) U (9, ∞)

100

Let f(x) = 8x + 9. What is f^-1(x)?

f^-1(x) =(x-9)/8

100

Identify the zeros of f(x) = (x + 5)²(x - 9)³and their multiplicity. (Smallest to Largest)

x = -5 with a multiplicity of 2

x = 9 with a multiplicity of 3

100

Given f(x) = 2x + 5 and g(x) = x² + 4x.

Find (f o g) (1)

(f o g) (1) = 15

100

Given the function: f(x) =

{2x + 2, x < 0

2x + 4, x >= 0}

What is f(-1), f(0), f(2)?

f(-1) = 0

f(0) = 4

f(2) = 8

200

Identify the domain of the following function and write answer in interval notation.

h(x) = √(x+6)

[-6, ∞)

200

Find the inverse of f(x) = ³√(11x - 6)

f^-1(x) = (x³ + 6)/11

200

Find the quotient and remainder using synthetic division.

(x⁴ - 2x³ + 6x + 5)/(x + 1)

Quotient: x3 - 3x² +3x + 3

Remainder: 2

200

Find the horizontal asymptote or oblique asymptote.

f(x) = (x² + 8x + 4)/(x + 7)

y = x + 1

200

Determine if the functions below are even, odd, or neither without a graph.

y = 2x³+ x²

Neither

300

Find the domain of the function and write your answer in interval notation.

f(x) = √(-8x + 4)

(-∞, 1/2]

300

Find the vertex of f(x) = - (x - 7)²- 2

(7,-2)

300

Is (x-1) a factor of

3x³ + x² - 9x + 5?

Yes, it is a factor

300

Find the horizontal asymptote or oblique asymptote.

f(x) = (x + 4x³ - 5)/(2x³ - 3x² -2)

y = 2

300

Given f(x) = x², after performing the following transformations: shift upward 62 units and shift 73 units to the right, the new function is

y = (x - 73)²+ 62

400

Find the domain of f and write your answer in interval notation.

f(x) = (x + 1)/(x² + 2x - 15)

(-∞, -5) U (-5, 3) U (3, ∞)

400

Write the expression in vertex form

y = 3x² + 6x + 7

y = 3(x+1)² + 4

400

Use the rational zeros theorem to list all possible zeros of the polynomial

p(x) = x³ - 5x² + x + 10

+- 1,2,5,10

400

Determine the vertical asymptotes and holes (removable points of discontinuity) of the rational function shown below.

f(x) = ((x -7)(x + 10))/((x + 10)(x + 6))

Use commas to separate results if there are more than one of each. If there is not a hole or asymptote, record DNE as your answer.

Holes: x = -10

Vertical Asymptotes: x = -6

400

Given f(x) = x², after performing the following transformations: stretched by 4, translated right by 9, and translated down by 1, the new function is

y = 4(x - 9)²- 1

500

Find the domain and range of the following graph on the board.
Write your answer as an interval.

Domain: (-∞, -3]

Range: (-∞,∞)

500

Suppose a border collie jumps in the air and that its height (in meters) above the ground is given by

h = -4.9t²+ 4.5t

What is the maximum height of the border collie above the ground as it jumps? Round your answer to 2 decimal places

1.03 meters

500

Factor the polynomial function below. List the possible rational zeros to find the zeros and factors of the polynomial.

f(x) = 25x³ - 40x² - 23x + 6

The zeros are 2, -3/5, 1/5

f(x) = (x-2)(5x+3)(5x-1)

500

Let f(x) = (x² - 5x + 4)/(x² - 6x + 5)

Find the domain (interval notation), holes, vertical asymptote(s), and horizontal asymptote(s).

Domain: (-∞, 1) U (1,5) U (5,∞)

Holes at x = 1

Vertical Asymptote at x = 5

Horizontal Asymptote at y = 1

500

Find the degree, leading term, leading coefficient, constant term, and end behavior of the given polynomial.

g(x) = x - 5x⁴ - 2 - 3x⁹

Degree: 9, Leading term: -3x⁹, Leading coefficient: -3, Constant term: -2

End behavior:

As x -> -∞, g(x) -> ∞

As x -> ∞, g(x) -> -∞