1. Prepare for a quiz!! Pencils, please!! No Talking!!
You will have 12 min. for the quiz!!

2. Warm-up (6 min.) Given f(x) = and g(x) = x2.
Find gf. State the domain.
Find g/f. State the domain.
Is f o g = g o f? Justify your answer.

3. Ex3 Let f(x) = x2 - 1 and g(x) =
Ex3 Let f(x) = x2 - 1 and g(x) = . Find the domain of f(g(x)) and g(f(x)).
Note: The domain of a composite function can NOT be determine simply by the resulting function. The domain is determined by the intersection of BOTH functions!!.

4. Decomposing Functions
Many complicated functions can be decomposed into simpler, more familiar functions.
Visualizing the composition of functions requires practice and knowledge of our basic functions.

5. I know you are getting this!!
Ex4 For each function h, find the functions f and g such that h(x) = f(g(x)).
h(x) =
(b) h(x) = (x + 1)2 – 3(x + 1) + 4
Compose Yourself!
I know you are getting this!!

6. Modeling With Function Composition
A satellite camera takes a rectangular-shaped picture. The smallest region that can be photographed is a 5-km by 7-km rectangle As the camera zooms out, the length l and the width w of the rectangle increase at a rate of 2 km/sec. How long will it take for the area A to be at least 5 times its original area?

7. Relations and Implicitly Defined Functions
Relation – a set of ordered pairs typically denoted as (x,y).
Note: A relation is NOT always a function.
What else must be true about a relation for it to also be classified as a function.
Ex Graph x2 + y2 = 4
What relationship appears to be between x and y? Is this a function.

8. Ex 1 Which of the ordered pairs (-1,2), (1,-1), (1,1) are in the relation 3x + 4y2 = 7? Is this relation a function?

9. Implicitly Defined Functions
When an equation in terms of x and y defines a relation between the two variables but not as a function.
Ex 2 Describe the graph of x2 + 2xy + y2 = 1

10. Inverse Relations
Inverse Relation – The ordered pair (a,b) is in a relation if and only if the ordered pair (b,a) is in the inverse relation.
Which two of our basic functions are inverse functions?
Confirm using your graph and your table on your calculator.

11. Horizontal Line Test
The inverse of a relation is a function if and only if each horizontal line intersects the graph of the original relation in at most one point.
Why is a horizontal line used to check for the inverse of a relation?
How is this similar to the vertical line test? Different?

12. Think-Pair-Share (3-2-1)
Which of the twelve basic functions have graphs that have inverses that are also functions?

13. Inverse Functions
Inverse Functions – If f is a one-to-one function with domain D and range R, then the inverse function of f, denoted f -1, is the function with domain R and range D defined by f -1(b) = a if and only if f(a) = b.
Ex 3 Find an equation for f -1(x) if f(x) =

14. How to Find an Inverse Function Algebraically
Given a formula for a function f, proceed as follows to find a formula for f -1.
Determine that there is a function f -1 by checking that f is one-to-one. State any restrictions on the domain of f. (Note that it might be necessary to impose some to get a one-to-one version of f).
Replace f(x) with y in the equation.
Switch x and y in the formula y = f(x).
Solve the resulting equation for y. This is the formula for f -1(x). State any restrictions on the domain of f -1.

15. You Try!!
Determine an equation for the inverse of g(x) = Express a g-1(x).

16. The Inverse Reflection Principle
The points (a,b) and (b,a) in the coordinate plane are symmetric with respect to the line y = x. The points (a,b) and (b,a) are reflections of each other across the line y = x.
Ex 4 Sketch the graph of the
inverse of the function shown
at the right.

17. Composition and Inverse Functions
Given f(x) = x3 + 1 and g(x) =
Find f(g(x)).
Find g(f(x)).
What do you notice about these compositions?
How are f(x) and g(x) related?

18. The Inverse Composition Rule
A function f is one-to-one with inverse function g if and only if
f(g(x)) = x for every x in the domain of g
and
g(f(x)) = x for every x in the domain of f

19. Restricting a Domain to Find an Inverse Function
Show that f(x) = has an inverse function and find a rule for f -1(x). State any restrictions on the domains of f and f -1.

20. Tonight’s Assignment P. 128-130 Ex 27, 30, 39-72 m. of 3
Begin looking at the Chapter 1 Project
Study for Unit #2 Test next Thursday!! 
Enjoy your weekend.