1. Classification and Patterning EDN 322

2. Classification and Patterning… Fundamental to learning about the real world; involve the creation of relationships; are easily integrated; can be viewed as a form of problem solving and provide students with the opportunity to develop logical reasoning abilities; provide the basis for building early number concepts; facilitate algebraic thinking; are fun!

3. Classification Making decisions about certain attributes of objects and sorting them based on that classification.

4. Difference Trains Each car in a train is different from the car it follows in a specified number of ways. Find the difference pattern in this train… Can you continue the train? Two-difference train: One-difference train:

5. Blue Thin Rectangle Venn Diagram Attribute Blocks

6. Guess my RuleTT T T T T T T T T T T Color – Red, Yellow, Blue Shape – Triangle, Square Thickness – Thick, Thin Size – Small, Large

7. Guess my RuleTT T T T T T T T T T T Triangle Large Thick

8. Quadrilaterals

9. Venn Diagram QuadrilateralsRegular Polygon

10. Quadrilaterals TrapezoidsParallelograms

11. Quadrilaterals TrapezoidsParallelograms

12. Venn Diagram Quadrilateral Parallelograms

13. Seriation Seriation is the ability to place objects in order according to a given or chosen criterion Possible criteria include: - length- width - height- weight - diameter- tone Prerequisite to more abstract ordering of numbers and a foundation for math reasoning

14. Types of patterns Repeating Patterns Growing Patterns or Sequences Number Patterns 2, 4, 8 NEXT

15. Other Repeating Patterns

16. ____ Fill in the missing part: ____

17. Examples of Patterns Number of Boys 123410B Number of Hands 2468202 X B Number of Girls 3691245N Number of Triangles 1234? N  3

18. Calculator Patterns Choose a number between 0 and 9 and add a constant repeatedly to that number. Remember to use the automatic constant feature. For example, to start with 7 and add 4 repeatedly, you press 7 + 4 = = =... What digits appear in the ones place? How long is the pattern before it repeats? Are all patterns the same length? Are there shorter ones? Can you find one that is length 6? Why not? How does this change when the start number changes? How does it change when the skip number changes?

19. Calculator Patterns Repeat the preceding exploration, but this time use multiplication instead of addition. What do you notice? For multiplication, the first factor is generally the one stored. Therefore to start with 4, for example, and repeatedly multiply by 7, press 7 x 4 = = =... In this exploration the calculator will “overload” relatively quickly. Since you are only interested in the values of the ones digit, how can you continue the pattern?

20. Calculator Patterns Pick any one-digit number and multiply by 9, then 99, then 999, then 9999. What do you observe? Try other numbers such as 2, then 22, then 222,…