Basic
Mathematics Lesson : 4
Properties of
Number
With your host :
Luis Antony Ast – The video Math Tutor
Hello, I’m Luis
Antony Ast –The Video Math Tutor. Welcome to Basic Math Lesson Number 4 –
Properties of number. Get start.
Introduction
All real
numbers, variables and algebraic expression follow certain properties. They are little
complicated. What I hope to do in this lesson is presents you in every kind way and provide you some certain example
where necessary.
A special note.
When explain
properties, I would use the variable ABC to present my number or my variable or
my algebraic expression.
Properties
of number.
1. The Reflexive Property of Equality. A
number is equal to itself.
Symbolically,
this about thing. A equal to A itself. 2 is the same as 2 and 3
is same with 3.
This
is very simple of this rule but it also important. In algebra, we have to check
you word problem, we have A equals A, 2 equals 2.
2.
The
Symmetric Property of Equality. If one value is equal to another,
then that second value is the same as the first.
Symbolically, if
3.
The
Transitive Property of Equality. If one value is
equal to a second, and the second happens to be the same as a third, then we
can conclude the first value must also equal the third.
Symbolically,
if A=B and B=C
4.
The
Substitution Property. If one value is equal to another, then the
second value can be used in place of the first in any algebraic expression
dealing with the first value.
then
can be sunstituted
for A in any expression.
5.
The
Additive Property of Equality. We can add equal
values to both sides of an equation without changing the validity of equation.
To see this rule, we have
we can add the same in both side of equation
6.
The
Concelation Law of Addition
If
we have
, add both sides
we subtract with
it will be cancel
the equation. So,
7.
The Multiplicative Property of Equality. We can
multiply equal values to both sides of an equation without changing the
validity of the equation.
8.
The Cancelation Law of Multiplication.
9.
The
Zero Factor Property. If two values taht being multuplied together equal zero,
the one of the values, or both of them must be zero.
If
. So, A must be 0
or B must be 0 or both of them are 0. All numbers if times zero the result is
0.
is the same thing
as
, keep its
identity.
(just switch it)
Properties of Inequality
1.
The
Law of Trichotomy. For any two values, only one of the following can be true
about this values:
·
They are equal
·
The first has smaller value than the second
·
The first has a langer value than the second
Given
any numbers A and B:
2.
The
Transitive Property of Inequality. If one value is
smaller than a second, and is less than a third, then we can conclude taht the
first value is smaller than the third.
If
Properties of absolute value
·
·
·
·
·
Property of Numbers, Closure.
1.
The Closure Property of Addition. When you add real
numbers to other real numbers, the sum is also real.
Addition is a “closed” operation. A real number + a real number = a real
number.
2.
The Closure Property of Multiplication. When you
multiply real numbers to other real numbers, the product is real numbers.
Multiplication is a real “closed” operation. A real number • a real number
= a real number.
.
A Special Note.
Natural number is
all number that positive,
. So, if we have
. Negative 2 is not natural number.
Commutativity.
1.
The
Commutative Property of Addition. It doesn’t matter
the order in which number are added together.
Assosiativity
1.
The
Associative Property of Addition. When we wish to add
three (or more) numbers, it does not matter how we group them together for
adding purposes. The parentheses can be palced as we wish.
We
can associate
2.
The
Associative Property of Multiplication. When we wish to
multiply three (or more) numbers, it does not matter how we group them together
for multiplication purposes. The parentheses can be placed as we wish.
Identity
1.
The
Identity Property of Addition. There exixt a
special number, called the “additive identity”, when added to any other number,
then that other number will still “keep its identity” and remain the same.
2. The Identity Property of Multiplication.
There exists a special number, called the “ multiplicative identity,” when
multiplied to any other number, then that other number will still “keep its
identity” and remain the same.
Of
course no big surprise its also work multiplication. A • 1 = A. A kept its
identity.
Like
before if it’s switch around we still get the same result.
A
special note.
Zero
is the unique additive identity and 1
is the unique multiplicative adentity.
Inverse.
1. The Inverse Property of Addition. For
every real number, there exists another real number that is called its
opposite, such that, when added together, you get additive identity (the number
of zero).
Symbolically,
A + (-A) = 0, the (-A) we called the inverse because of A, so A + (-A) = 0. And
if we switch around we get the same result (-A) + A = 0.
2. The Inverse Property of Multiplication. For
every real number, except zero, there is another real number that is called its
multiplicative inverse, or reciprocal, such that, when multiplied together, you
get the multiplicative identity (the number one).
Symbolically
we can say the A number times its multiplicated invers, which is 1/A the result
is the multiplicated identity that is 1. And also if we switch around 1/A • A
the result is same, 1.
By
the way, there is one number that doesn’t have multiplicated numbers, can you
guess? It’s 0. But why? Because if you divide anything number with zero, the
result is undefined. So zero has no multiplicative numbers.
Distributivity.
1. The Distributive Law of Multiplication
Over Addition. Multiplying a number by a sum of numbers is the same
as multiplying each number in the sum individually, then adding up our product.
So
this is the first example, 5 ( 7 + 3 ) = ? If you want to simplify and solve we
can write
5(7+3)
= 5(10)
=
50
Look
at another situation
5 ( 7
) + 5 ( 3 ) = 35 + 15
=
50
So the result is same. But why it can be same?
Because we use the distributive law of multiplication over addition.
Symbolically we can write like this A ( B + C ) = AB + AC. A goes times the B
and A goes times the C, so we get AB+AC. It called the left distributive
properties. It’s same with ( A + B ) C = AC + AB.
2. The Distributive Law of Multiplication
Over Substraction. The distributive properties also work in
substraction. A(B-C)=AB-AC
The
General Distributive Property
Example
: 2 ( 1 + 3 + 5 + 7 ) . From that example we can distribute 2 to the 1, 2 to
the 3 and so on. So we get 2 ( 1 + 3 + 5 + 7 ) = 2 + 6 + 10 + 14
= 32
Symboliccally, we get something like this
a(b1+b2+b3+...+bn)=ab1+ab2+ab3+...+abn (a is going distribute among all b’s
terms).
3. The Negation
Distributive Property. If you negate (or find the
opposite) of sum, just “change the sign” of whatever is inside the parentheses.
-(A+B) =(-A)+(-B)
=-A-B
Answer to the quiz questions
1.
Find the opposite
·
-5=5
·
2/3=-(2/3)
·
-1=1
·
0=0
2.
Find the multiplicated numbers
·
-5=-(1/5)
·
2/3=3/2
·
-1=1
·
0=none
3.
What is the additive identity?
The answer of course zero (0).
4.
What is the multiplicative
identity? The anwers 1
5.
Do all numbers have additive
invers? The answer is yes, they all do.
6.
Do all numbers have invers
multiplicative invers? No, zero is not
7.
Complete this equation
·
-4=4
·
8x7=7x8 (multiplication)
·
5(w-y)=5w-5y (distributive)
·
-3+(6+2)=(-3+6)+2 (addition)
·
a<b
8.
We have
(invers property
of multiplication)
Since
and C are real
numbers, so is
so that is the
closer property of addition.
·
(addition)
·
(associative
property of addition)
·
(identity properties in multiplication
·
If
and
, then
(transitive
property of equality)
·
this kept the
identity so it called identity property of addition
·
In this example,
i’m negating something and distributing negative sign (negation distributive
property)
9.
This little bit sneaky and difficult, so if
you follow the property rule, its gonna be fine.
·
(assosiative
propery of addition)
·
(assosiative
property of multiplication)
·
(distributive law)
·
(the invers
property of multiplication)
·
(commutative property
of addition)
·
(identity property
multiplication, the invers property of multiplication)
·
(this the invers
propertyof addition)
·
(asssociate
property of multiplication)
·
(properties of
absolute value)
·
(distributive law
of multiplication)
·
(the identity
property of multiplication)
10.
11.
End of quiz.
Rachma Hanan Tiasto
11313244020
International
Mathemathic Education ‘11
