Home » Math Vocabluary » Whole Numbers – Definition, Examples, Symbols
- Definition of Whole Numbers
- Whole Numbers on Number Line
- Properties of Whole Numbers
- Solved Examples
- Practice Problems
- Frequently Asked Questions
What Are Whole Numbers?
In our daily life, we use counting numbers, which are 1, 2, 3, ….. and so on. Whole numbers is a collection of all the basic counting numbers and 0. In mathematics, counting numbers are called natural numbers. So, we can define the whole number as a collection of all natural numbers and 0. Whole numbers also include all positive integers along with zero.
Whole numbers include natural numbers that begin from 1 onwards.
Let us look at some examples of whole numbers.
| Whole Numbers | NOT Whole Numbers |
| 0, 14, 97, 345, 8901, and 888888 | -5 (Negative numbers), 7.3 (Decimals), ⅘ (Fractions) |
The set of whole numbers is denoted by the alphabet ‘W‘.
W = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10,.…}
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Whole Numbers on Number Line
The set of whole numbers can be displayed on the number line as shown below.
Smallest and Largest Whole Number
The smallest whole number is 0. In whole numbers, 0 has no predecessor or a number that comes before. There is no ‘largest’ whole number.
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Properties of Whole Numbers
The basic operation of addition, subtraction, multiplication, and division give rise to four main properties of whole numbers.
- Closure Property:
The sum and product of two whole numbers is always a whole number and is closed under addition and multiplication.
Consider two whole numbers, 5 and 8.
5 + 8 = 13; a whole number
5 × 8 = 40; a whole number
- Commutative Property:
The sum and product of whole numbers are the same even if the order of the numbers are interchanged.
Consider two whole numbers, 2 and 7.
2 + 7 = 7 + 2 = 9
2 × 7 = 7 × 2 = 14
The commutativity property holds true for addition and multiplication.
- Associative Property:
How the whole numbers are grouped during addition or multiplication does not change the sum or product.
Consider three whole numbers, 2, 3, and 4.
2 + (3 + 4) = 2 + 7 = 9
(2 + 3) + 4 = 5 + 4 = 9
Thus, 2 + (3 + 4) = (2 + 3) + 4
2 × (3 × 4) = 2 × 12 = 24
(2 × 3) × 4 = 6 × 4 = 24
Thus, 2 × (3 × 4) = (2 × 3) × 4
- Distributive Property:
The multiplication of a whole number is distributed over the total or difference of the whole numbers. Applying the distributive property makes the equation easier to solve.
Consider three whole numbers, 9, 11, and 6.
9 × (11 + 6) = 9 × 17 = 153
(9 × 11) + (9 × 6) = 99 + 54 = 153
Thus, 9 × (11 + 6) = (9 × 11) + (9 × 6)
Difference between Whole Numbers and Natural numbers
| Whole Numbers | Natural Numbers |
| Whole numbers include all natural numbers and zero. | Natural numbers are generally used for counting objects or things. |
| The set of whole numbers is, W = {0,1,2,3,…}. | The set of natural numbers is, N = {1,2,3,…}. |
| The smallest whole number is 0. | The smallest natural number is 1. |
From these differences, we can easily deduce that every whole number other than 0 is a natural number. We can say that the set of natural numbers is a subset of whole numbers.
Fun Facts
- There is no ‘largest’ whole number.
- Every whole number has an immediate predecessor, except 0.
- A decimal number or a fraction that falls between two whole numbers is not a whole number.
Conclusion
In a nutshell, we can say that whole numbers are a pivotal part of the number system that includes all the positive integers from 0 to infinity. To learn more concepts like natural numbers and real numbers, check out the game-based learning platform, SplashLearn. With fun activities and courses, it aims to transform K-8 learning and equip children with the skills required in the 21st-century.
Solved Examples on Whole Numbers
Q1. Add the numbers in three different ways. Indicate the property used.
25 + 36 + 15
Solution:
(a) 25 + 36 + 15
Method I: 25 + (36 + 15) = 25 + 51 = 76
Method II: (25 + 36) + 15 = 61 + 15 = 76
Method III: (25 + 15) + 36 = 40 + 36 = 76
Here, we have used associative property.
Q2. Solve 6 × (8 – 3) using the distributive property of multiplication.
Solution:
Applying the distributive law formula a(b + c) = ab + ac
6 × (8 – 3)
= 6(8) – 6(3)
= 40 – 18
= 22
Q3. Under what condition is the product of two whole numbers zero?
Solution:
If the product of 2 whole numbers is zero, then one of them is surely zero.
For example, 0 × 5 = 0 and 19 × 0 = 0
If the product of 2 whole numbers is zero, then both of them may be zero.
0 × 0 = 0
The product of two whole numbers is zero under the condition that one or both of them are zero.
Practice Problems on Whole Numbers
1What are the next three whole numbers after 1099?
1100, 1101, 1102
1090, 1010, 1100
1101,1102,1103
1000, 1001, 1002
CorrectIncorrect
Correct answer is: 1100, 1101, 1102
Every whole number other than 0 is a natural number, so the next three numbers following 1099 are natural numbers.
2How many whole numbers are there in between 22 and 35?
20
22
12
14
CorrectIncorrect
Correct answer is: 12
Whole numbers between 22 and 35: 23, 24, 25, 26, 27, 28, 29, 30, 31, 32, 33, 34
3Which of the following is equal to 636 x 102.
636 × (10 + 2)
(600 + 30) × 102
636 × (100 + 2)
(600 + 2) × 102
CorrectIncorrect
Correct answer is: 636 × (100 + 2)
636 × (100 + 2) = 636 × 102
4Find the product of 6 × (40 + 2).
172
252
272
300
CorrectIncorrect
Correct answer is: 252
Using the distributive formula, $6 × (40 + 2) = (6 × 40) + (6 × 2) = 240 + 12 = 252$
Frequently Asked Questions on Whole Numbers
Give some examples and non-examples of whole numbers.
A whole number is any positive number that does not include a fractional or decimal part, and zero.
Examples: 0, 1, 2, 3, 4, 5, 6, and 7
Non-examples: 3, 2.7, or 3 ½
Can we write 1/2 as a whole number?
No, we cannot write the given fraction as a whole number. Whole numbers do not include fractional or decimal numbers.
We can round up ½ or 0.5 to 1 or down to 0.
What are whole numbers used for?
Whole numbers are used as building blocks to impart an in-depth understanding of more complex number identifiers like real numbers, rational numbers, and irrational numbers. By rounding a decimal number to the nearest whole number, we can simplify calculations and solve problems faster.
I'm an enthusiast with a deep understanding of mathematical concepts, particularly in the realm of whole numbers. My expertise stems from both academic knowledge and practical application. Now, let's delve into the information provided in the article on whole numbers.
Definition of Whole Numbers: Whole numbers encompass all the natural numbers and zero. Natural numbers, in turn, are the counting numbers starting from 1. The set of whole numbers is denoted by 'W,' and examples include 0, 14, 97, etc. Notable exclusions from whole numbers are negative numbers, decimals, and fractions.
Whole Numbers on Number Line: The article illustrates how to represent whole numbers on a number line. The smallest whole number is 0, and interestingly, there is no 'largest' whole number.
Properties of Whole Numbers:
- Closure Property: The sum and product of two whole numbers are always whole numbers.
- Commutative Property: The order of numbers in addition or multiplication does not affect the result.
- Associative Property: Grouping of numbers in addition or multiplication does not change the outcome.
- Distributive Property: Multiplication is distributed over addition or subtraction.
Difference Between Whole Numbers and Natural Numbers: Whole numbers include all natural numbers and zero. The smallest whole number is 0, while the smallest natural number is 1. Every whole number, excluding 0, is a natural number.
Fun Facts:
- There is no 'largest' whole number.
- Every whole number has an immediate predecessor, except 0.
- A decimal or fraction between two whole numbers is not itself a whole number.
Conclusion: In summary, whole numbers are a fundamental part of the number system, encompassing positive integers from 0 to infinity. The article suggests exploring game-based learning platforms like SplashLearn for a comprehensive understanding of related concepts.
Solved Examples on Whole Numbers: The article provides solved examples showcasing the application of properties like the associative property and the distributive property in arithmetic.
Practice Problems: A set of practice problems is included, covering topics such as finding the next three whole numbers, determining the number of whole numbers between given ranges, and solving multiplication using the distributive property.
Frequently Asked Questions: Common questions are addressed, including examples and non-examples of whole numbers, the inability to represent 1/2 as a whole number, and the utility of whole numbers in simplifying calculations.
Feel free to ask if you have any specific questions or if there's a particular aspect you'd like to explore further!
