In the world of mathematics, the commutative property is considered to be the best possible explanation of the orders into terms that will never matter in the whole process of performing the arithmetic operations. This particular application of property will only be undertaken in the cases of addition and multiplication procedures which very well justifies that whenever the people will be changing the position of swiping the numbers in the whole system at the time of adding or multiplying to numbers then the order will never matter because everything will be carried out very professionally without any kind of issue.

The commutative property very well justifies that whenever two numbers will be added or multiply together then the change into their position will never change the result in the whole process and this is considered to be the simplest possible explanation of this particular system. This is considered to be one of the major properties of integers so that there is no problem at any point in time. A very basic example is that 2+3 will be five and similarly 3+2 will also be five.

2×3 will be 6 and similarly, 3×2 will also be 6 which is very well justified that this particular property will be applicable in this particular area without any kind of problem.

The official utilisation of this particular property began at the end of the 18th century and this particular property also has a very good historical relevance in the whole world. It has been originated from the French word which very well justifies the meaning of switching or moving around in the whole process. Hence, the literal meaning of this particular world is to switch or move around in the whole process and it will very well justify that if the state or position of the integers will be changed the result will always remain the same in the whole system without any kind of issue. According to this particular property whenever the people will be adding to my teachers the result will always remain unchanged regardless of the position of the numbers in the whole process.

In the cases of multiplication, this particular property will very well justify that whenever the position of numbers will be changed the result will overlay remain the same without any kind of problem in the whole process.

## Despite the presence of this particular property in the world of mathematics, there are other two properties as well which have been explained as follows:

- As per the associative property regardless of the whole numbers that have been grouped people can very easily go with the option of adding or multiplying them without any kind of problem in the answer will always remain the same without any kind of issue. In other words, the placement of the parentheses will never matter in the world of adding or multiplying the whole thing.
- The distributive property of the multiplication or addition we always justify that multiplication of the number by the same number is the same as multiplying each addend by the value and then adding the products without any kind of problem.

Hence, being clear about all the above-mentioned properties is the basic way of ensuring good command over the world of mathematics without any kind of problem. Apart from this people also need to be clear about several other kinds of things for example non-commutative property, distributive property and several other kinds of things so that there is no hassle at any point in time and overall goals are easily achieved without any kind of issue. Hence, depending on the platforms like Cuemath is the best way of ensuring that people have a good command of the whole thing very easily and are capable to score well in the exams without any kind of issues.