Everything about Integers

1. Everything about Integers

2. Interesting Integers! • We can represent integers using red and yellow counters. • Red tiles will represent negative integers, and yellow tiles will represent positive integers. Positive integer Negative integer

3. Definition • Positive number – a number greater than zero. 0 1 2 3 4 5 6

4. Definition • Negative number – a number less than zero. -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6

5. Definition • Opposite Numbers – numbers that are the same distance from zero in the opposite direction -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6

6. 7 -7 opposite Definition • Integers – Integers are all the whole numbers their opposites and zero.

7. What are Opposites? • Two integers the same distance from the origin, but on different sides of zero • Every positive integer has a negative integer an equal distance from the origin • Example: The opposite of 6 is -6 • The opposite of -2 is 2

8. Interesting Integers! • If there are the same number of red tiles as yellow tiles, what number is represented? zero pair • It represents 0.

9. Definition • Absolute Value – The size of a number with or without the negative sign. The absolute value of 9 or of –9 is 9.

10. What is Absolute Value? • Distance a number is from zero on a number line (always a positive number) • Indicated by two vertical lines | | • Every number has an absolute value • Opposites have the same absolute values since they are the same distance from zero • Example: |-8| = 8 and |8| = 8 • |50| = 50 and |-50| = 50

11. Examples 7 = 7 10 = 10 -100 = 100 5 - 8 = -3= 3

12. |7| – |-2| = ? • -9 • -5 • 5 • 9

13. |-4 – (-3)| = ? • -1 • 1 • 7 • Purple

14. Negative Numbers Are Used to Measure Temperature

15. Negative Numbers Are Used to Measure Under Sea Level 30 20 10 0 -10 -20 -30 -40 -50

16. Negative Numbers Are Used to Show Debt Let’s say your parents bought a car but had to get a loan from the bank for $5,000. When counting all their money they add in -$5.000 to show they still owe the bank.

17. Hint • If you don’t see a negative or positive sign in front of a number it is positive. 9 +

18. Interesting Integers! ADDITION AND SUBTRACTION

19. ADDING INTEGERS • We can model integer addition with tiles. • Represent -2 with the fewest number of tiles • Represent +5 with the fewest number of tiles.

20. ADDING INTEGERS • What number is represented by combining the 2 groups of tiles? • Write the number sentence that is illustrated. -2 + +5 = +3 +3

21. ADDING INTEGERS • Use your red and yellow tiles to find each sum. -2 + -3 = ? ANSWER = -5 + -2 + -3 = -5

22. ADDING INTEGERS ANSWER -6 + +2 = ? + - 4 = -6 + +2 = -4 -3 + +4 = ? ANSWER +1 = + -3 + +4 = +1

23. Solve the Problems -8 • -3 + -5 = • 4 + 7 = • (+3) + (+4) = • -6 + -7 = • 5 + 9 = • -9 + -9 = 11 7 -13 14 -18

24. Solve These Problems -2 • 3 + -5 = • -4 + 7 = • (+3) + (-4) = • -6 + 7 = • 5 + -9 = • -9 + 9 = 3 -1 1 -4 0

25. Adding Integers Number line T-Method

26. Adding Integers using the number line - 3 + 2 = -1 Negative three means move 3 places to the left Positive two means move 2 places to the right 1 2 0 -3 -2 -1 The answer is: -1

27. Adding Integers using the number line 8 - 3 = 5 Positive eightmeans move 8 places to the right Negative three means move 3 places to the left 4 5 6 3 1 7 8 2 8 0 7 5 6 1 2 3 The answer is: 5

28. Adding Integers T- Method T-Method

29. Use your red and yellow tiles to find each sum. 2 + 5 = ? - + 2 + = 5 7 T-Method

30. Use your red and yellow tiles to find each sum. -2 + (-5) = ? - + 2 + = 5 7 T-Method

31. Use your red and yellow tiles to find each sum. 2 + (-5) = ? + - 5 2 2 + = 3 T-Method

32. Use your red and yellow tiles to find each sum. -2 + 5 = ? - + 2 2 5 + = 3 T-Method

33. Subtracting Integers and T- Method T-Method

34. SUBTRACTING INTEGERS • We often think of subtraction as a “take away” operation. • Which diagram could be used to compute +3 - +5 = ? +3 +3

35. SUBTRACTING INTEGERS • This diagram also represents +3, and we can take away +5. • When we take 5 yellow tiles away, we have 2 red tiles left. We can’t take away 5 yellow tiles from this diagram. There is not enough tiles to take away!!

36. SUBTRACTING INTEGERS • Use your red and yellow tiles to model each subtraction problem. -2 - -4 = ? ANSWER

37. SUBTRACTING INTEGERS Now you can take away 4 red tiles. 2 yellow tiles are left, so the answer is… This representation of -2 doesn’t have enough tiles to take away -4. Now if you add 2 more reds tiles and 2 more yellow tiles (adding zero) you would have a total of 4 red tiles and the tiles still represent -2. -2 - -4 = +2

38. SUBTRACTING INTEGERS Work this problem. +3 - -5 = ? ANSWER

39. SUBTRACTING INTEGERS • Add enough red and yellow pairs so you can take away 5 red tiles. • Take away 5 red tiles, you have 8 yellow tiles left. +3 - -5 = +8

40. SUBTRACTING INTEGERS Work this problem. -3 - +2 = ? ANSWER

41. SUBTRACTING INTEGERS • Add two pairs of red and yellow tiles so you can take away 2 yellow tiles. • Take away 2 yellow tiles, you have 5 red tiles left. -3 - +2 = -5

42. SUBTRACTING INTEGERS • -3 – ( -5) = • 4 - 7 = • (+3) - (+4) = • -6 – (-7) = • 5 - 9 = • -9 – (-9) = 2 -3 -1 1 -4 0

43. SUBTRACTING INTEGERS • 3 – (-5) = • -4 - 7 = • (+3) - (-4) = • -6 - 7 = • 5 – (-9)= • -9 - 9 = 8 -11 7 13 14 -18

44. In order to subtract two integers, you would need to re-write the problem as an addition problem. Keep in mind that subtract means add the opposite. - - 2 2 (-5) -5 = = 5 + T-Method

45. SUBTRACTING INTEGERS • -8 – ( -2) = • 5- 4 = • (+7) - (+2) = • -8 – (-7) = • 8- 5 = • -10 – (-2) = 6 1 5 -1 3 -8