1. LESSON 1.1 INTEGERS MFM1P

2. Homework Check
McGraw-Hill [Ch. 5.1]: pages Q# 5a, 6, 8, 10, 11, 12, 13, 14, 16

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

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

6. Definition
Integers – Integers are all the whole numbers and all of their opposites on the negative number line including zero. 7
opposite -7

7. Negative Numbers Are Used to Measure Temperature

8. Negative Numbers Are Used to Measure Under Sea Level30 20 10
-10
-20
-30
-40
-50

9. 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.

10. Remember…. Red Algebra Tiles indicates (-)
“Zero Pairs” are two matching tiles, one red, and one another color, that cancel each other out and equal 0
For example:

12. ADDING INTEGERS

13. Addition of Integers
Addition can be viewed as “combining”.
Combining involves the forming and removing of all zero pairs.
For each of the given examples, use algebra tiles to model the addition.
To demonstrate understanding, you may be asked to use Algebra Tiles to solve a problem in front of teacher OR draw pictorial diagrams which show the modeling.

14. Addition of Integers
(+3) + (+1) =
(-2) + (-1) =

15. Addition of Integers
(+3) + (-1) =
(+4) + (-4) =

16. Positive + Positive = Positive ( +3) + (+2) = +5
ADDING INTEGERS
Positive + Positive = Positive
( +3) + (+2) = +5
When a number is positive, you do not have to use the (+) sign.
(+3) + (+2) = 5

17. ADDING TWO NEGATIVE NUMBERS
Negative + Negative = Negative
(- 6) + (- 3) = - 9
When a number is NEGATIVE, you do have to use the (-) sign.

18. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 1:
(- 6) + 3 = -3
COPY DOWN QUESTION

19. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 1:
(- 6) + 3 = -3
COPY DOWN QUESTION
6 – 3 = 3
Subtract the numbers without negative signs.

20. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 1:
(- 6) + 3 = -3
COPY DOWN QUESTION
6 – 3 = 3
Subtract the numbers without negative signs.
= -3
Keep the sign of the larger number.

21. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 2:
9 + (-12) = - 3
COPY DOWN QUESTION

22. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 2:
9 + (-12) = - 3
COPY DOWN QUESTION
12 – 9 = 3
Subtract the numbers without negative signs.

23. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 2:
9 + (-12) = - 3
COPY DOWN QUESTION
12 – 9 = 3
Subtract the numbers without negative signs.
= -3
Keep the sign of the larger number.

24. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 3:
(- 5) + 7 = 2
COPY DOWN QUESTION

25. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 3:
(- 5) + 7 = 2
COPY DOWN QUESTION
7 – 5 = 2
Subtract the numbers without negative signs.

26. ADDING POSITIVE AND NEGATIVE INTEGERS
Sum of a negative and a positive number - Keep the sign of the larger number and subtract
EXAMPLE 3:
(- 5) + 7 = 2
COPY DOWN QUESTION
7 – 5 = 2
Subtract the numbers without negative signs.
= 2
Keep the sign of the larger number.

27. SUBTRACTING INTEGERS

28. Subtraction of Integers
Subtraction can be interpreted as “take-away.”
Subtraction can also be thought of as “adding the opposite.”
For each of the given examples, use algebra tiles to model the subtraction.
To demonstrate understanding, you may be asked to use Algebra Tiles to solve a problem in front of teacher OR draw pictorial diagrams which show the modeling.

29. SUBTRACTING INTEGERS Negative - Positive = Negative
(same as adding two negative numbers)
(- 8) - 3 = -8 + (-3) = -11
Another way of saying this:
ADD THE OPPOSITE

30. SUBTRACTING INTEGERS
Positive - Negative = Positive + Positive = Positive
4 - (-3) = = 7
Once again you are adding the opposite

31. SUBTRACTING INTEGERS Negative - Negative = Negative + Positive =
Keep the sign of the larger number and subtract
(-7) - (-5) = ( -7) + 5 = -2
(-5) - ( -7) = (-5) + 7 = 2

32. Subtracting Integers Rule: Add the opposite.
(+3) – (-5)
(-4) – (+1)
When doing subtraction problems, CHANGE the subtraction sign to an addition sign. Then “flip” the sign of the number after the new addition sign.
For example: (+3) – (-5) becomes (+3) + (+5)
(-4) – (+1) becomes (-4) + (-1)

33. Subtracting Integers
(+3) – (-3)

34. TRY THESE ADD SUBTRACT 1) (+6) + (-2) 1) (7) – (2) 2) (+7) + 3
2) (+8) – (-2)
3) (-5) + (+2)
3) (-9) – (+3)
4) (-6) – (-2)

35. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2)
2) (+7) + 3
2) (+8) – (-2)
3) (-5) + (+2)
3) (-9) – (+3)
4) (-6) – (-2)

36. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2)
2) (+7) + 3 = 10
2) (+8) – (-2)
3) (-5) + (+2)
3) (-9) – (+3)
4) (-6) – (-2)

37. TRY THESE ADD SUBTRACT 1) (+6) + (-2) = 4 1) (7) – (2)
2) (+7) + 3 = 10
2) (+8) – (-2)
3) (-5) + (+2) = -3
3) (-9) – (+3)
4) (-6) – (-2)

38. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2) = 5
2) (+7) + 3 = 10
2) (+8) – (-2)
= (+8) + (+2)
= 10
3) (-5) + (+2) = -3
3) (-9) – (+3)
= (-9) + (-3)
4) (-6) – (-2)

39. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2) = 5
2) (+7) + 3 = 10
2) (+8) – (-2)
= (+8) + (+2)
= 10
3) (-5) + (+2) = -3
3) (-9) – (+3)
= (-9) + (-3)
= - 12
4) (-6) – (-2)

40. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2) = 5
2) (+7) + 3 = 10
2) (+8) – (-2)
= (+8) + (+2)
= 10
3) (-5) + (+2) = -3
3) (-9) – (+3)
= (-9) + (-3)
= - 12
4) (-6) – (-2)
= (-6) + (2)

41. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2) = 5
2) (+7) + 3 = 10
2) (+8) – (-2)
= (+8) + (+2)
= 10
3) (-5) + (+2) = -3
3) (-9) – (+3)
= (-9) + (-3)
= - 12
4) (-6) – (-2)
= (-6) + (2)
= -4

42. MULTIPLYING AND DIVIDING INTEGERS

43. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2) = 5
2) (+7) + 3 = 10
2) (+8) – (-2)
3) (-5) + (+2) = -3
3) (-9) – (+3)
4) (-6) – (-2)

44. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2) = 5
2) (+7) + 3 = 10
2) (+8) – (-2)
= (+8) + (+2)
3) (-5) + (+2) = -3
3) (-9) – (+3)
4) (-6) – (-2)

45. ADD
SUBTRACT
1) (+6) + (-2) = 4
1) (7) – (2) = 5
2) (+7) + 3 = 10
2) (+8) – (-2)
= (+8) + (+2)
= 10
3) (-5) + (+2) = -3
3) (-9) – (+3)
4) (-6) – (-2)

46. MEMORY TRICK!

48. SUCCESS CRITERIA
I understand the difference between rational and irrational numbers
I understand the meaning of the term “operations”
I understand the meaning of other words related to addition, subtraction, multiplication, division and equal.
I am able to add and subtract positive and negative integers using algebra tiles
I am able to add and subtract positive and negative integers using the rules provided.
I can multiply and divide positive and negative integers using the help of a memory trick (the love/hate analogy).

49. Homework for Wednesday
Exercise & 1.1.6
McGraw-Hill [Ch. 5.2]: page(s) questions 1, 3, 5, 6, 10