The-Real-Number-System.ppt
JunreyChristianWong
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Oct 28, 2022
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About This Presentation
The real numbers are the set of numbers containing all of the rational numbers and all of the irrational numbers. The real numbers are “all the numbers” on the number line. There are infinitely many real numbers just as there are infinitely many in the other sets of numbers.
Slide Content
N
W
Z
Q
IR
The Real Number System
W
Z
Q
IR
The Real Number System
The Real Number System
The Real Number System is made up of
a set of rational and irrational numbers.
It has at five subsets:
1.Rational Numbers (Q)
2.Integers (Z)
3.Whole Numbers (W)
4.Natural Numbers (N)
5.Irrational Numbers (IR)
The Real Number System is made up of
a set of rational and irrational numbers.
It has at five subsets:
1.Rational Numbers (Q)
2.Integers (Z)
3.Whole Numbers (W)
4.Natural Numbers (N)
5.Irrational Numbers (IR)
Real Numbers Definitions
Real Numbers–consists of all rational
and irrationalnumbers.
It includes any number that can be written as
a fraction, mixed numbers, terminating and
repeating decimals, whole numbers, integers. 1
2 3
5
4 1.5 2.3333
O2
Real Numbers–consists of all rational
and irrationalnumbers.
It includes any number that can be written as
a fraction, mixed numbers, terminating and
repeating decimals, whole numbers, integers. 1
2 3
5
4 1.5 2.3333
O2
Rational Numbers
Rational Numbers–consists of integers,
terminating, and repeating decimals.
It can also be expressed as a fraction.1
.5
2
.9 7.5
{…-3, -2, -1, 0, 1, 2, 3, …}16 4 5
8 8.83333
6
Rational Numbers–consists of integers,
terminating, and repeating decimals.
It can also be expressed as a fraction.1
.5
2
.9 7.5
{…-3, -2, -1, 0, 1, 2, 3, …}16 4 5
8 8.83333
6
Rational Numbers
Integers–consist of natural numbers,
their opposites (negative #’s), and zero.
It does not include fractions or decimals.
All whole numbers are integers.
For example:
{…-3, -2, -1, 0, 1, 2, 3, …}
Integers–consist of natural numbers,
their opposites (negative #’s), and zero.
It does not include fractions or decimals.
All whole numbers are integers.
For example:
{…-3, -2, -1, 0, 1, 2, 3, …}
Integers
Whole numbers–consist of natural
numbers and zero. {0, 1, 2, 3, 4,…}
Natural numbers–are all the counting
numbers. {1, 2, 3, 4…}
Negative numbers={…-4, -3, -2, -1}
Whole numbers–consist of natural
numbers and zero. {0, 1, 2, 3, 4,…}
Natural numbers–are all the counting
numbers. {1, 2, 3, 4…}
Negative numbers={…-4, -3, -2, -1}
Rational Numbers
Terminating Decimalsare rational
numbers that stops before or after the
decimal point.
For example: 5.0, 2.75, .40, .0001…etc.
Repeating Decimalsare rational numbers
that repeats after the decimal point.
For example: .3333…,, .75 10.635
Terminating Decimalsare rational
numbers that stops before or after the
decimal point.
For example: 5.0, 2.75, .40, .0001…etc.
Repeating Decimalsare rational numbers
that repeats after the decimal point.
For example: .3333…,, .75 10.635
Irrational Numbers
Irrational numbersconsist of numbers that
are non-terminating and non-repeating
decimals.
They cannot be express as a fraction!
Pi is an great example of an irrational number
http://www.joyofpi.com/pi.htmlpi
.001, .0011, .00111, .001111…etc47 4.25837547984... 2
Irrational numbersconsist of numbers that
are non-terminating and non-repeating
decimals.
They cannot be express as a fraction!
Pi is an great example of an irrational number
http://www.joyofpi.com/pi.htmlpi
.001, .0011, .00111, .001111…etc47 4.25837547984... 2
Real Number System Tree Diagram
Real Numbers
Integers
Terminating
Decimals
Repeating
Decimals
Whole
Numbers
Rational
Numbers
Irrational
Numbers
Negative #’s
Natural #’s Zero
Non-Terminating
And
Non-Repeating
Decimals
Real Numbers
Integers
Terminating
Decimals
Repeating
Decimals
Whole
Numbers
Rational
Numbers
Irrational
Numbers
Negative #’s
Natural #’s Zero
Non-Terminating
And
Non-Repeating
Decimals
Your Turn
1. How are the natural and whole numbers different?
2. How are the integers and rational numbers different?
3. How are the integers and rational numbers the same?
4. How are integers and whole numbers the same?
5. Can a number be both rational and irrational? Use the
diagram to explain your answer.
1. How are the natural and whole numbers different?
2. How are the integers and rational numbers different?
3. How are the integers and rational numbers the same?
4. How are integers and whole numbers the same?
5. Can a number be both rational and irrational? Use the
diagram to explain your answer.
Your Turn
Answer True or False to the statements below. If the statement is
False, explain why.
6. −5 is a rational number. _______
7. is rational. _______
8. is a natural number __________
9. is an integer. _______
10. 2.434434443… is a rational number.____________ 16 3.25 8
Answer True or False to the statements below. If the statement is
False, explain why.
6. −5 is a rational number. _______
7. is rational. _______
8. is a natural number __________
9. is an integer. _______
10. 2.434434443… is a rational number.____________ 16 3.25 8
Summary
What did you learn in this lesson?
What are some important facts to
remember about the real number system?
Is there something within the lesson that
you need help on?
What did you learn in this lesson?
What are some important facts to
remember about the real number system?
Is there something within the lesson that
you need help on?
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