The numbers that are considered to be a portion of real numbers and encompass all the numbers from 1 to infinity are interpreted as natural numbers. Natural numbers do not incorporate 0 in them. It implies that 0 is not a natural number.

Any decimal values are also not incorporated into the natural numbers. Natural numbers also do not incorporate any negative values.

**What are Some of the Examples of Natural Numbers?**

Examples are one of the nicest logical ways to clear the concepts to comprehend them. Here, we will be illustrating some examples of natural numbers.

- 6790
- 62451
- 1190
- 777
- 999
- 435
- 44478

Here, we will also be illustrating a few examples that are not natural numbers. Those are illustrated below:

- 99.87
- 0
- -767
- -56.7/89
- 511/11

All these are not assessed to be natural numbers.

**Also Read: How To Pick The Right Six Sigma Exam And To Prepare For It Using Dumps?**

**Some of the Properties of Natural Numbers**

When we indicate the properties of any natural number, there are 4 fundamental properties of natural numbers. All of them are illustrated below:

**Property of Closure**

When any 2 natural numbers or more than 2 natural numbers are added or subtracted, then the concluding value will be the natural numbers. This is not credible when multiplication or division is performed.

We will illustrate this property with the assistance of an example,

When the operation of a + v is performed, then the result will be a natural number. When the operation of a – v is performed, then the result will be a natural number. But, when a * v or a / v will be performed, then that will never be a natural number.

**Property of Association**

The association property is valid when the addition or the multiplication is performed. This specific property is not valid when subtraction or division is performed.

We will illustrate this with the assistance of an example of when this operation will be performed,

( 888+9999)+6765 = 888+(9999+6765)

The equivalent goes with the Multiplication. But, this will not happen when subtraction or division will be performed.

**Commutative Property**

This specific property is valid when the addition or the multiplication is performed. This is not acceptable when subtraction or division is performed.

We will be illustrating this with the help of an example,

When the operation of h + b is performed then, h+b = b+h. This belongs to multiplication too.

**Distributive Property**

According to this distributive property, when natural numbers are multiplied, then they are distributive when the addition is performed.

**What are the Whole Numbers?**

All the numbers from 0 to eternity, are inferred as the Whole Number. 0 is summed up in the Whole Number. This is the distinction between the Natural Numbers and the Whole Numbers.

**What do you Understand by Adjacent Angles?**

When any two angles have the equivalent apex and the equivalent walls, then those angles are interpreted as adjacent angles. When any adjacent angle’s total is 90°, they are interpreted as “Complementary” to each other. When any adjacent angle’s total is 180°, they are interpreted as “Supplementary” to each other.

**Also Read: PowerPoint Add-In To Help You Create Powerful Presentations**

**Talk Over Some of the Properties of the Adjacent Angles**

Coming to the properties possessed by the adjacent angles, some of them are illustrated below;

- Adjacent angles are recognized to have identical apex.
- Adjacent angles are also recognized to have identical branches.
- Adjacent angles never have their occurrence side-by-side.
- No identical inward degree is noticed in the Adjacent angle.

To learn further about this particular topic, in a very fun and inventive way, one should surely visit Cuemath. Teachers or Instructors help to understand numerous distinct topics too.