Algebra 1 Glencoe McGraw-Hill JoAnn Evans Math 8H Properties (Equality, Arithmetic, Identity)
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Transcript of Algebra 1 Glencoe McGraw-Hill JoAnn Evans Math 8H Properties (Equality, Arithmetic, Identity)
Algebra 1 Glencoe McGraw-Hill JoAnn Evans
Math 8H
Properties
(Equality, Arithmetic, Identity)
Identity Property
Additive Identity: ZERO is the additive identity.
How do you keep the same answer when adding?
Add zero. 5 + 0 = 5 x + 0 = x
Think: The answer must remain identical (the
same) in value.
0
How do you keep the same answer when multiplying? Multiply by one.
-11 • 1 = -11 x • 1 = x
Multiplicative Identity:
ONE is the multiplicative identity.1
Multiplicative Property of Zero
93 • 0 = 0 2 • 0 = 0
x • 0 = 0
Think: The answer MUST be zero if you are
multiplying by zero.
Inverse Property
Additive Inverse: A number plus its additive inverse (opposite) equals ZERO.
9 + (-9) = 0 x + -x = 0
Multiplicative Inverse: A number times its multiplicative inverse (RECIPROCAL) equals
ONE.
Think: Opposites Cancel
1x1
x
1
81
8
Reflexive Property
Think: Reflexive = Reflection
(like a mirror)
x = x 3 = 3 x + 2 = x + 2
This may seem painfully obvious, but it is an essential property of equality. It clearly shows the role of the equal sign as stating thatthe two sides of an equation are
equal.
x + 2 x + 2
The Symmetric Property
23 + 19 = 42 42 = 23 + 19
a = b b = a
Think: The expressions on the two sides of the equal
sign can change places with each other since they’re equal (symmetrical).
Transitive Property
Think: Logical Reasoning
If a = b and b = c, then a = c.
126
21
,126
63
63
21
thenandIf
Substitution Property
If x = 2, then 5x = 5(2).
If y = 7, then y + 3 = (7) + 3.
Think: A quantity may be substituted for its equal.
Distributive Property
Think: Distribute (pass out) the
multiplication to each term.
2(3x + 5y + 4)
= 2(3x + 5y + 4)
= 6x + 10y + 8 a(b + c) = ab + ac
Commutative Property
Commutative Property of Addition: 2 + 3 = 3 + 2 a + b = b + a
Commutative Property of Multiplication: 4 • 7 = 7 • 4
a • b = b • a
Think: It’s okay to Change the Order. (first two letters of the word commutative)
Associative Property
Think: a change of association (an association is a group)…
Associative Property means a change of GROUPING.
Associative Property of Addition:
(1 + 2) + 9 = 1 + (2 + 9)
(a + b) + c = a + (b + c)
Associative Property of Multiplication:
(1 • 2) • 3 = 1 • (2 • 3)
Remember:
Associative Property means a change of GROUPING.
(a • b) (c) = a • (b • c)
Property of Negative One
Negative one • any number = the opposite of the number.
A negative coefficient is a coefficient of negative one.
Think: A number times negative one equals its opposite.
-1 • 8 = -8 -1 • -3 = 3
-x = (-1)x
And finally………………The Closure Property
A set of numbers is CLOSED under an operation if the
result of the operation (the answer) is in the same number set as the two numbers used in the
operation.
Example: Is the set of even integers closed under
the operation of division? In other words…When you divide an even integer by an even integer, is
the answer an even integer?
Counterexamples: 6 divided by 2 results in an odd answer.
2 divided by 4 results in a fractional answer.The set of even integers is not closed under
division.
21
42 326 No. No.
Example: Is the set of odd integers closed under the operation of multiplication?
In other words…When an odd integer is multiplied times another odd integer, is the answer an odd integer?
7 • 5 = 35 3 • 11 = 33 5 • 13 = 65
The set of odd integers is closed under the operation of multiplication.