Struggling to understand the divisibility rule of 8 to simplify your academics? Well, we are here to simplify it all for yourself with our dedicated article on the same. Here we are going to make our readers aware of the divisibility rule for the integer of 8. The article is not limited to the divisibility of any particular integer. It rather breaks down the whole standard process of divisibility for the readers. So, if you are a scholar or any general individual then this article will greatly help you in the same.

The law of divisibility is universal in mathematics and at some point, we all use it in our academics and the other practical domain of life. The divisibility rule is basically nothing but the set of some fundamentals that are based upon the concept of division. Here we find out whether one integer is divisible by the other by using the simple calculations of division. If the integer is divisible by the other then it becomes its divisible factor or the multiple. Similarly one can take any two numbers to use the rule of divisibility and come upon the desired results.

Divisibility Rule for 8

Well, since we are here to make our discussion on the divisibility law of 8 thus we will keep it restricted to the same only. Here in this particular scenario, we have the integer of 8 for which we need to calculate the divisibility factor. In order to do this, we will basically take some other integer and then see whether the 8 can divide the other integer fully. If it divides the other integer fully then the other integer becomes the divisibility factor for it. We also call it the multiple of that basic integer since the other number falls into the category of those multiples that it can divide easily.

Divisibility Rule for 8

For instance, if we divide the 16 by 8 then we get the remainder as 2 which suggests that 8 is dividing 16 fully. Here subsequently the 16 becomes the multiple of 8 in the way that we have suggested. On the other hand, if there is another number such as 18 then 8 can’t divide the number fully thus it doesn’t become the divisible multiple of 8. The reason being is there shouldn’t be any fractional remainder in the process of division. The eligibility of the whole remainder is significant in order to hold the integer as the multiple for the other.

Divisibility Rule for 8 with Example

Well, if you are willing to excel at mathematics then the law of divisibility is something that you will mostly come across. The implication of the divisibility rule is eternal since you will be using it in both your academics and your practical life as well. Having a thorough understanding of the divisibility rule will make it quite easier for you to solve the various problems of mathematics. Since divisibility is based on the concept of division therefore you have to learn it in all circumstances.

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