2. Hosted by Mr. Brett

3. 100 200 400 300 400 Function Notation Domain and Range Characteristics of Functions Graphing and Transformations 300 200 400 200 100 500 100

4. Row 1, Col 1 Suppose. What is ?

5. 1,2 What is the domain of: Domain = {2, 4, 6} 246246 12 4 1

6. 1,3 What is the absolute maximum of the function in this graph? Max: y = 4

7. 1,4 Draw the graph of.

8. 2,1 The quadratic function passes through (3,-18). Find the function rule for.

9. 2,2 Make a change to the domain of the following relation which would make it into a function. {(-2,7), (0,0), (2,3), (3,5), (3,-6), (4,0), (5,2)} Change one of the points with x = 3 to another number not already in the domain (like 1).

10. 2,3 What is the interval of increase of the following exponential function? (Everywhere!)

11. 2,4 Graph.

12. 3,1 If a pie is split 4 ways, each person gets 140g of pie. How much pie would each person get if it were split 9 ways? Bonus 150: Write the function rule which describes this. 62.22g (Bonus: )

13. 3,2 What is the range of the exponential ?

14. 3,3 What is (are) the interval(s) of increase for the function ?

15. 3,4 Draw the graph of

16. 4,1 Find 9

17. 4,2 Find the domain and range of the quadratic.

18. 4,3 What is the period? Period =

19. 4,4 Draw the graph of the function

20. 5,1 A bacterial culture starts with a population of 1200000. After 3 days there are 32400000 bacteria. What is the function rule which describes this situation?

21. 5,2 A rational function is of the form where a < 0. What is its interval of positive sign?

22. 5,3 Explain how a function could have a relative maximum but not an absolute maximum. If the function increased to then it would not have an absolute maximum. It could have a relative maximum because there could be a point that is bigger than all the points around it.

23. 5,4 Draw the inverse of the following function.