MHF4U Advanced Functions
Link
to Ms. Mitchells webpage
Link to: Unit 1
Unit #2: Rational
Functions
page 499 # 
1 
Reciprocal Functions 
Page 146 # 
1, 2 
Reciprocal Functions Domain and Range Solve Inequalities 
TOPIC 
Text 
Day 
Homework Questions 
Solving Rational Equations

3.4 
1 
Page
183 #1, 2, 6, 9, 15 
Reciprocal of a Linear Function

3.1 
2 
Page
153 #2 5, 7 10, 13, 15 
Reciprocal of a Quadratic
Function 
3.2 
3 
Page
164 #2, 4, 5ace (omit table), 7, 8adgh 
Reciprocal of a Quadratic
Function 
3.2 
4 
Page
165 #3 (omit last row), 9, 11 14, 16, 17 
Rational Functions of the
Form 
3.3 
5 
Page
174 #1 12, 14 
More Rational Functions 

6 
Page
176 #16 
Oblique Asymptotes 

7 
Page
176 #17 19 (answer for 18 should be C) 
Review of Graphing 

8 
Handout:
Review of Graphing Rational Functions 
QUIZ 
Date: 
THURSDAY, OCTOBER
18, 2018 

Solving Rational Inequalities 
3.4 
9 
Page 185
#4, 5, 13, 16 
Applications
of Rational Functions/ 
3.5 
10 
Page 189 #1, 2, 14, 15 
Review Day 1

11 
Page 192 #1 5, 7 12 (omit 12c), 13, 15, 16 

INCLASS ASSIGNMENT

Date: 
WEDNESDAY, OCTOBER
24, 2018 

Review Day 2

13 
Page 192 #1 5, 7 12 (omit 12c), 13, 15, 16 

UNIT #2 TEST

Date: 
FRIDAY, OCTOBER 26, 2018 
Learning
Targets:
¨ Identify
the vertical and horizontal asymptotes, domain and range, intercepts,
positive/negative intervals and increasing/decreasing intervals from the graphs
of rational functions that are reciprocals of linear and quadratics functions
¨ Make
connections between the algebraic and graphical representations of rational
functions that are reciprocals of linear and quadratic functions
¨ Identify
the vertical and horizontal asymptotes, domain and range, intercepts,
positive/negative intervals and increasing/decreasing intervals from the graphs
of rational functions that have linear expressions in the numerator and
denominator ie:
f (x) = (ax
+ b)
/ (cx
+ d)
¨ Sketch
the graph of a simple rational function given the equation
¨ Make
connections between the real roots of a rational equation and the xintercepts of a rational function
¨ Solve
simple rational equations in one variable algebraically
¨ Solve
problems involving the application of simple rational functions and equations
¨ Understand
the difference between the solution to an rational equation and a rational
inequality