What are Divisibility Rules? | 7 Most Important Rules and Bonus Rules

What are divisibility rules? These are shortcut techniques to find factor or multiples of a number.

Introduction

When it comes to mathematics, understanding the rules for division can make our calculations faster and easier. These rules help to determine whether a number can be divided evenly by another number without actually performing the division process.

Here, we shall learn the these rules for numbers from 2 to 31, providing examples of numbers that satisfy these rules and those that do not. However, to keep the content short only 7 the most used are discussed here, the rest are in the attachment.

Note, all numbers, excluding prime numbers, can be solved using these rules of division. However, we shall write few of their rules as well for the sake of comprehension. Larger composite number can be solved by a combination lesser composite and prime numbers.

What is a Divisibility Rule?

It is a shortcut that helps us quickly determine if a given number is divisible by another number. For instance, if you want to know if 18 is divisible by 3, you can use the rule rather than dividing 18 by 3. These rules simplify math problems and are especially useful in higher-level mathematics, such as algebra and number theory.

What are Divisibility Rules (for Numbers 2 to 31)?

What are Divisibility Rules?

Divisibility by 2

A number is said to be divisible by 2 if its last digit is even (0, 2, 4, 6, or 8).

Example

Abiding Rule

2520

The last digit is 0 which is even, so, 2520 is divisible by 2.

Defying Rule

491

The last digit is 1 which is not even, so, 491 is not divisible by 2.

Divisibility by 3

A number is said to be divisible by 3 if the sum of its digits is divisible by 3.

Example

Abiding Rule

2520 \quad \text{→} \quad 2 + 5 + 2 + 0 = 9

Here, the sum is 9 which is divisible by 3, so, 2520 is divisible by 3[/latex].

Defying Rule

491 \quad \text{→} \quad 4 + 9 + 1 = 14

Since, 14 is not divisible by 3, so 491 is not divisible by 3.

Divisibility by 4

A number is said to be divisible by 4 if the last two digits of the number is divisible by 4.

Example

Abiding Rule

2520

Here, 20–the last two digits–is divisible by 4 so, 2520 is divisible by 4.

Defying Rule

491

Since, in 491 the last two digits are 91 which is not divisible by 4, so, 491 is not divisible by 4.

Divisibility by 5

A number is said to be divisible by 5 if its last digit is either 0 or 5.

Example

Abiding Rule

2520

As, the last digit is 0, so, 2520 is divisible by 5.

Defying Rule

491

Since, we have 1 as last digit, so, it is not divisible by 5.

Divisibility by 7

A number is divisible by 7 if the result of subtraction between twice the last digit and the rest of the number is divisible by 7.

    \[\text{Number (Excluding Last Digit)} \quad - \quad 2 \quad \times \quad \text{Last Excluded Digit} = 0 \quad\text{or divisible by 7}\]

If the number is still larger, repeat the process.

    \[\text{Resultant Number (Excluding Last Digit)} \quad - \quad 2 \quad \times \quad \text{Last Excluded Digit} = 0 \quad\text{or divisible by 7}\]

Example

Abiding Rule

343

    \[34 - 2 \times 3 = 28\]

Since, the answer 28 is divisible by 7, so, 343 is also divisible by 7.

Defying Rule

2455

    \[245\,(5) - 2 \times 5 = 235\]

Since, 235 is still a larger number, check again for division.

    \[23\,(5) - 2 \times 5 = 13\]

Here, we have 13 which is not divisible by 7, so, 2455 is not divisible by 7.

Divisibility by 10

A number is said to be divisible by 10 if its last digit is 0.

Example

Abiding Rule

2520

As, the last digit is 0, therefore, 2520 is divisible by 10.

Defying Rule

491

Here, we see 1 as last digit, so, it is not divisible by 10.

Divisibility by 11

A number is said to be divisible by 11 if the difference between the sum of the digits in odd positions and the sum of the digits in even positions are multiple of 11.

\text{Sum of Digits in Odd Position - Sum of Digits in Even Position = Number (Divisible by 11)}

Example

Abiding Rule

7194

\text{Sum of Even Place Digits - Sum of Odd Place Digits = Number}

\text{(7 + 9) - (1 + 4) = 16 - 5 = 11}

As, the difference of the digits is 11 and is divisible by 11, so, 7194 is also divisible by 11.

Defying Rule

Do it yourself as an exercise and leave your answer in the comment below. For that use the your birth year and check it.

Conclusion

Understanding the divisibility rules from 2 to 31 is a valuable skill in mathematics. These rules not only simplify calculations but also enhance number sense. The more rules we are familiar with, the better we become over time with the mental mathematics as well as calculations.

Practicing these rules can help you tackle more complex mathematical concepts with ease. Whether it is a student or just someone looking to sharpen his math skills, these rules are a great tool.

Frequently Asked Questions (FAQs)

Why are divisibility rules useful in mathematics?

These rules allow for quick determination of whether a number can be divided by another without performing full division. This simplifies calculations in basic arithmetic and is particularly helpful in algebra, number theory, and other areas of advanced mathematics.

How do divisibility rules help in higher-level math?

In higher-level math, these rules can assist in factoring, simplifying expressions, and solving equations, as well as understanding properties of numbers in topics like prime factorization, modular arithmetic, and cryptography.

Are divisibility rules the same for all numbers?

No, these rules vary depending on the divisor. Each rule is unique to the characteristics of the divisor, for example, rules for 2 and 5 focus on the last digit, while rules for 3 and 9 use the sum of digits. Some rules even require a multi-step process, as seen with divisors like 7 and 13.

Can we always apply division rules instead of doing full division?

These rules are shortcuts and work well for quick checks, but they do not replace division in all cases. For example, when accuracy or remainder information is essential, performing the actual division is still necessary.

Why do divisibility rules change for composite numbers like 6, 12, or 15?

Composite numbers have dividing rules that combine the rules of their factors. For instance, a number divisible by 6 must meet the conditions of both 2 and 3, the factors of 6. This approach leverages existing divisibility rules to test divisibility by larger composite numbers.

2 thoughts on “What are Divisibility Rules? | 7 Most Important Rules and Bonus Rules”

  1. The article provides easy-to-understand divisibility rules. It is one of the best articles on improving number sense and mental calculation skills. Examples and explanations are very lucid and understandable for learners of all levels.

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