Course Content

Introduction to Polynomial Functions

Advanced Polynomial and Rational

Exponential and Logarithmic Functions

Trigonometric
Functions

Characteristics of Functions

100

State the degree and the leading coefficient of the polynomial

y= 5x⁴- 3x³+ 4

Degree = 4

Leading coefficient = 5

100

Even, odd, or neither

f(x) = x²- 2x

Neither

100

Rewrite the equation in logarithmic form

5^-2 = 1/25

log₅ (1/25) = -2

100

Determine the exact radian measure of the angle

200°

10π/9

100

Determine the average rate of change for the following on the interval -1≦ x ≦ 2

g(x) = 3(2)^x

△f(x)/△x = 3.5

200

Long Division

(m²-7m-11)÷(m-8)

m ÷ 1 - 3 / m - 8

200

Match the function with the corresponding transformation of y=xⁿ

y=(-x)ⁿ+2

a) no reflection

b) reflection in the x-axis

c) reflection in the x-axis and the y-axis

d) reflection in the y-axis

d) Reflection in the y-axis

200

Evaluate

log 100^-4

-8

200

Determine the exact value of the following

sec (7π/4)

√2

200

Solve

logx<2^x

x>0

300

Factor each and find all zeros

f(x) = x³+ 9x² + 23x + 15; x + 5

Factors to: f(x) = (x + 1)(x + 3)(x + 5)

Zeros: {-1,-3,-5}

300

The profit function for a company selling widgets is given by p(x)= -2x² + 5x -2 where x is the number of widgets sold. The average profit per widget is given by: A(x) = p(x) / x

Write the defining statement for A(x)

A(x) = -2x² + 5x -2 / x

300

Solve for x

100 = 10 log 1000^x

x = 3.333

300

State the period, amplitude, phase shift and the equation of the axis of the curve

g(x)= -cos (x - 2π) -3

Vertical reflection

Horizontal shift right 2π units

Vertical shift down three units

300

Given the function f(x)=3x³-4x and g(x)=2x²-3 determine an equation for

(fg)(x)

(fg)(x) = 6x⁵-17x³+12x

400

Solve the inequality

2 - 2x ≦ x - 8

x ≧ 10 / 3

400

State the domain, range, vertical and horizontal asymptotes

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

Domain: {x l x ≠ -3, x ≠ 5, xER}

Range: {y l y ≠ 0, yER}

Vertical Asymptotes: x = -3 and x = 5

Horizontal Asymptotes: y = 0

400

Solve

log₃(x+4)+log₃(x-4) = 2

x=5

400

Solve the following on the interval 0 ≦ ø ≦ 2π

5sin ø - √3 = 3sin ø

ø= π/3, ø = 2π/3

400

In the advertisments of a certain bathroom cleaner, the product promises to eliminate 99% of bacteria. The function f(x) = 100(0.85)^x represents the percent of bacteria that are still alive at a time x, in minutes.

Determine the average rate of change over the first 5 minutes

-11.13% bacteria/min

500

Write a rule for the sign function s(n): s(n) is -1 when n is negative, +1 when n is positive, and 0 otherwise

s(n) = {-1, n<0}

{0, n=0}

{1, n>0}

500

Create a function that has a graph with the given features:

A vertical asymptote at x=2, a horizontal asymptote at y=0, no x-intercept and a y-intercept at (0,3)

f(x) = -6 / x-2

500

Solve

48(1.03)^x=96

x=23.45

500

The water at a local beach has an average depth of 1 metre at low tide. The average depth of the water at high tide is 8 meters. One cycle of the tides takes approximately 12 hours.

Determine an equation for the periodic function assuming the water level is at the low tide mark at midnight (t=0)

f(t) = 3.5cos [π/6 (t-6)] + 4.5

500

Let f(x) = √x-9 and g(x) = 1/x². Write a simplified algebraic model for each composite function. State the domain and the range of each.

y=f(g(x))

y = √1-9x²/ x, x≠0

Restrictions: -1/3 ≦ x ≦ 1/3, x ≠ 0

Domain: {xER, -1/3 ≦ x < 0, 0< x ≦ 1/3}

Range: {yER}