Inverse functions: 4 perspectives.

1. Baby Play
or
All About
Inverse
Functions
duck wrangling by toyfoto

2. EVEN FUNCTIONS
Graphically: A function is quot;evenquot; if its graph is symmetrical about the y-axis.
These functions
are even...
These are
not ...
Symbolically (Algebraically)
a function is quot;evenquot; IFF (if and only if) ƒ(-x) = ƒ(x)
Examples: Are these functions even?
1. f(x) = x² 2. g(x) = x² + 2x
f(-x) = (-x)² g(-x) = (-x)² + 2(-x)
f(-x) = x² g(-x) = x² - 2x
since f(-x)=f(x) since g(-x) is not equal to g(x)
f is an even function g is not an even function

3. ODD FUNCTIONS
Graphically: A function is quot;oddquot; if its graph is symmetrical about the origin.
These
functions
These are
are odd ... not ...
Symbolically (Algebraically)
a function is quot;oddquot; IFF (if and only if) ƒ(-x) = -ƒ(x)
1. ƒ(x) = x³ - x 2. g(x) = x³- x²
Examples: ƒ(-x) = (-x)³ - (-x) g(-x) = (-x)³ - (-x)²
ƒ(x) = -x³ + x g(x) = -x³ - x²
-ƒ(x) = -(x³ - x) -g(x) = -(x³-x²)
-ƒ(x) = -x³ + x -g(x) = -x³+ x²
since ƒ(-x)= -ƒ(x) since g(-x) is not equal to -g(x)
ƒ is an odd function g is not an odd function

4. Are these functions even or odd? Justify your answers algebraically.
g(x) = x3+ 3x
ƒ(x) = x4+ 2x2+ 3

5. ƒ is an odd function.
COMPLETE THE GRAPH.

6. Baby Play
or
All About
Inverse
Functions
duck wrangling by toyfoto

7. Inverses ...
The concept ...
Numerically speaking ...

8. Inverses ...
Algebraically speaking ... Conceptually analyzing the function ...

9. Inverses ...
Graphically speaking ...