ORDER OF OPERATIONS

1. ORDER OF OPERATIONS How to do a math problem with more than one operation in the correct order.

2. Objective • I will be able to apply the order of operations to simplify expressions.

3. VOCABULARY Numerical Expression A collection of numbers, operations, and grouping symbols Grouping Symbols Characters used to change the order of operations in an expression EX: ( ) Parenthesis [ ] Brackets Division Bar ----

4. VOCABULARY Order of operations A procedure for evaluating an expression involving more than one operation PEMDAS ( ) 3² x/÷ (WHICHEVER COMES 1ST) +/- (WHICHEVER COMES 1ST)

5. Simplify • To simplify an expression when there are more than two operations in the expression, you must use a set of rules called the order of operations.

6. ORDER OF OPERATIONS • Simplify the terms within parentheses. • Simplify the terms with exponents. • Multiply and divide from left to right. • Add and subtract from left to right. PEMDAS

7. PEMDAS • Remember the order by the phrase • Please • Excuse • My Dear • Aunt Sally

8. The “P” and “E” • The “P” stands for items in parenthesis • Do all items in the parenthesis first (2 + 3) The “E” stands for Exponents Do anything that has a exponent (power) 82

9. The “MD” • Represents Multiply and Divide • Do which ever one of these comes first in the problem Work these two operations from left to right

10. The “AS” • Represents Add and Subtract • Do which ever one of these comes first • Work left to right 8 + 7 - 5 + 2

11. Example Find 8 + (4 x 24) ÷ 32 Step 1: Simplify within the parentheses. 8 + (4 x 24)÷ 32 8 + (96) ÷ 32 Step 2: Divide 96 ÷ 32 8 + 3 Step 3: Add 8 +3 11 Solution:8 + (4 x 24) ÷ 32 = 11 24 X 4 32 96 8 + 3

12. What happens if we don’t follow the order of operations? • If we just work the problem from left to right, we won’t get the correct answer! 8 + (4 x 24) ÷ 32 8+4 = 12 12 x24 = 288 288 ÷ 32 9 9 does not equal 11!

13. Another Example Simplify: (20 – 2) ÷ 3 Step 1: Simplify within parentheses (20 -2) ÷ 3 Step 2: Divide (18) ÷ 3 Solution: (20 – 2) ÷ 3 = 6

14. Janet 14 – (5+2) X 2 14 – 7 x 2 7 x 2 14 John 14 – (5+2) X 2 14 – 7 x 2 14 – 14 0 Look at the two students and decide which one correctly followed the order of operations!

15. 3+23- (9+1) PEMDAS 3+23- 10 3+8-10 11-10 1

16. 3 (9+1) + 62 PEMDAS 3(10)+62 3(10)+36 30+36 66

17. Let’s practice!You have 5 seconds:take out your whiteboard, expo marker, and felt eraser.

18. 4+5 x (6-2) PEMDAS 4+5 x 4 4+20 24

19. 4+ 10 x 23 -16 PEMDAS 4+10 x 8 -16 4+ 80 -16 84-16 68

20. 21 + 102 10 PEMDAS 21+10010 21 + 10 31

21. 10+72-2 x 5 PEMDAS 10+49–2 x 5 10+49- 10 59 - 10 49

22. 64  (9 x 3-19) PEMDAS 64(27 –19) 64 8 8

23. PROPERTIES • COMMUTATIVE (+) 2 + 7 = 7 + 2 a + b = b + a • COMMUTATIVE (x) 4 x 9 = 9 x 4 ab = ba • ASSOCIATIVE (+) 3 + (5+1) = (3+5) + 1 a + (b+c) = (a+b) + c • ASSOCIATIVE (x) 8 x (2x9) = (8x2) x 9 a(bc) = (ab)c • DISTRIBUTIVE

24. YOUR TURN … ON SLATES!!! YOU HAVE 5 SECONDS!!! 1) 5 + (12 – 3) 5 + 9 14 2) 8 – 3 • 2 + 7 8 - 6 + 7 2 + 7 9 3) 39 ÷ (9 + 4) 39 ÷ 13 3

25. 15 • 103 15 • 1,000 15,000 • 10 + 8 ÷ 2 – 6 10 + 4 - 6 14 - 6 8 • 36 ÷ (1 + 2)2 36 ÷ 32 36 ÷ 9 4 7) 3 • 104 3 • 10,000 30,000

26. 14 + 3(7 -2) – 2 • 5 14 + 3 • 5 - 2 • 5 14 + 15 - 2 • 5 14 + 15 – 10 29 – 10 19 • (5 – 1)3 ÷ 4 43 ÷ 4 64 ÷ 4 16