1. Equal, Less than or Greater than sign
- > Greater than
- 5 > -12
- n > 20 where n is a prime number.
- Then n = 23, 29, 31, 37, 41, etc...
- ≥ Greater than or equal
- n ≥ -1 where n is an integer. It means include -1 if it satisfies the given condition
- Then n = -1 (i.e. including the number), 0, 1, 2, 3, 4....
- < Less than
- 20 < 23
- n < 20 where n is a natural number
- Then n = 1, 4, 9, 16
- ≤ Less than or equal
- n ≤ 25 where n is a multiple of 3. It means include 25 if it satisfies teh given condition.
- Then n = 24, 21, 18, 15, 12, 9, 3, 0, -3, -6, ...
Watch the following clip for a Preview of what we will be doing in the next few lessons.
2. Number Lines
3. Real Numbers
4. Operations of Numbers
Integers - Zero Pairs (Basic Concept)
The sum of an integer and its opposite is ZERO
- E.g. 1: - 20 + 20 = 0
- E.g. 2: 56 + (-56) = 0
- E.g. 3: -28 + 28 = 0
Integers - Addition of Integers (Basic Concepts)
Evaluate - 3 + (-2)Rule: To add two negative numbers, add their absolute values and take the negative sign for the answer
- E.g. 1: -25 + (-17) = -42
- E.g. 2: -21 + (-21) = -42
- E.g. 3: -18 + (-11) = -29
Evaluate 3 + (-7)
Rule: To add 2 integers of different signs such that the negative integer has a larger absolute value, we find the difference between their absolute value and take the negative sign for the answer.
- E.g. 1: -17 + 12 = -5
- E.g. 2: 52 + (-67) = -15
- E.g. 3: -88 + 85 = -3
- E.g. 4: 28 + (-82) = -54
- E.g. 1: -12 + 17 = 5
- E.g. 2: -63 + 68 = 5
- E.g. 3: 86 + (-53) = 33
- E.g. 4: -38 + 83 = 45
Integers - Subtraction (Basic Concepts)
Evaluate - 2 - 6Note: Zero Pairs are introduced.
Evaluate - 5 - (-3)
Evaluate 5 - (-7)
Note: Zero Pairs are introduced.
Multiplication (Basic Concepts)
Draw comparison between 2 x 3 (i.e. 2 groups of positive 3)and 2 x (-3) (i.e. 2 groups of negative 3)
2 x 3 = 6
2 x (-3) = -6
Division (Basic Concepts)
Draw comparison between 8 ÷ 2and (-8) ÷ 2
8 ÷ 2 = 4
(-8) ÷ 2 = -4
Using Number Line to Explain...
(A) Adding and Subtracting Negative Numbers
(B) Adding Negative Numbers:
Find: -45 + (-46) + (-29)
(C) Adding Integers of Different Signs
Find: 15 + (-46) + 29
(D) Multiplying 2 Negative Numbers
NOTE 1: We will need to recall how distributive law works
e.g. 2 x 7 = 2 x (3 + 4)
which can be written as = (2 x 3) + (2 x 4)
Note 2: We will need to recall the property of ZERO Pair
e.g. 4 + (-4) = 0
e.g. (-3) + 3 = 0
5. Properties of Operations
Commutative & Associative Properties
Commutative Property of Multiplication
6. Recurring Decimals
Converting Repeating Decimals (Recurring Number) to Fraction
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