Divisibility Rule Calculator

What are Divisibility Rules?

Divisibility Rules are shortcuts that help determine whether a given number is divisible by another number without actually performing the division. These rules are based on patterns in the decimal number system and provide quick mental checks for divisibility by numbers 2 through 20 (and beyond). They are essential for mental math, competitive exams, factorization, and simplifying fractions.

Divisibility Rules for Numbers 2-20

Complete Divisibility Rules Table

Basic Rules (2-10)

Divisor	Rule	Example	Quick Check
2	Last digit is even (0,2,4,6,8)	1,234 → last digit 4 (even) ✓	Check last digit
3	Sum of digits divisible by 3	123 → 1+2+3=6, 6÷3=2 ✓	Add all digits
4	Last two digits divisible by 4	1,324 → 24÷4=6 ✓	Check last 2 digits
5	Last digit is 0 or 5	235 → last digit 5 ✓	Check last digit
6	Divisible by both 2 and 3	138 → even ✓, 1+3+8=12÷3=4 ✓	Check 2 and 3 rules
7	Double last digit, subtract from rest, repeat	182 → 18-2×2=14, 14÷7=2 ✓	Double subtract method
8	Last three digits divisible by 8	3,216 → 216÷8=27 ✓	Check last 3 digits
9	Sum of digits divisible by 9	1,458 → 1+4+5+8=18÷9=2 ✓	Add all digits
10	Last digit is 0	250 → last digit 0 ✓	Check last digit

Advanced Rules (11-20)

Divisor	Rule	Example	Method
11	Alternating sum of digits divisible by 11	2,915 → (9+5)-(2+1)=11 ✓	Alternating sum
12	Divisible by both 3 and 4	156 → 1+5+6=12÷3=4 ✓, 56÷4=14 ✓	Check 3 and 4 rules
13	Multiply last digit by 4, add to rest, repeat	169 → 16+9×4=52, 52÷13=4 ✓	Multiply-add method
14	Divisible by both 2 and 7	154 → even ✓, 15-4×2=7 ✓	Check 2 and 7 rules
15	Divisible by both 3 and 5	135 → ends with 5 ✓, 1+3+5=9÷3=3 ✓	Check 3 and 5 rules
16	Last four digits divisible by 16	1,232 → 1,232÷16=77 ✓	Check last 4 digits
17	Multiply last digit by 5, subtract from rest	187 → 18-7×5=-17, |17|÷17=1 ✓	Multiply-subtract
18	Divisible by both 2 and 9	198 → even ✓, 1+9+8=18÷9=2 ✓	Check 2 and 9 rules
19	Multiply last digit by 2, add to rest	209 → 20+9×2=38, 38÷19=2 ✓	Multiply-add method
20	Last two digits divisible by 20 (ends with 00,20,40,60,80)	340 → 40÷20=2 ✓	Check last 2 digits

Real-World Applications

Mathematics & Education

• Mental Math: Quick calculations without calculator
• Fraction Simplification: Finding common factors quickly
• Prime Factorization: Identifying prime factors of numbers
• Competitive Exams: Speed math for tests like SAT, GRE, GMAT

Computer Science & Programming

• Algorithm Optimization: Efficient divisibility checks in code
• Data Validation: Checking valid numbers (e.g., even numbers only)
• Game Development: Turn-based games, scoring systems
• Cryptography: Number theory applications

Finance & Business

• Accounting: Checking calculations, error detection
• Inventory Management: Packing items in sets
• Pricing Strategies: Creating price points divisible by certain numbers
• Statistical Analysis: Data grouping and categorization

Everyday Life

• Sharing Equally: Dividing items among people
• Time Management: Scheduling in intervals
• Recipe Adjustments: Scaling ingredient quantities
• Budget Planning: Allocating funds in portions

Step-by-Step Divisibility Check Process

Example 1: Checking 1,234 for divisibility by 4

1. Number: 1,234
2. Divisor: 4
3. Rule: Check last two digits
4. Last two digits: 34
5. Check: 34 ÷ 4 = 8.5 (not integer)
6. Remainder: 34 - (8×4) = 34 - 32 = 2
7. Conclusion: 1,234 is NOT divisible by 4 (remainder 2)
8. Verification: 1,234 ÷ 4 = 308.5

Example 2: Checking 342 for divisibility by 3

1. Number: 342
2. Divisor: 3
3. Rule: Sum of digits divisible by 3
4. Sum digits: 3 + 4 + 2 = 9
5. Check: 9 ÷ 3 = 3 (integer)
6. Conclusion: 342 IS divisible by 3
7. Verification: 342 ÷ 3 = 114
8. Note: Works because 10 ≡ 1 (mod 3)

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Frequently Asked Questions (FAQs)

Q: Why do divisibility rules work?

A: Divisibility rules work because of patterns in our base-10 number system. For example, the rule for 3 works because any number can be expressed as a sum of digits multiplied by powers of 10, and since 10 ≡ 1 (mod 3), the number ≡ sum of digits (mod 3).

Q: What's the most useful divisibility rule?

A: The rules for 2, 3, 5, 9, and 11 are most commonly used. Rule for 2 (even numbers) is simplest, rule for 3 helps with mental math, and rule for 11 is useful for checking palindromic numbers and certain patterns.

Q: Can divisibility rules be extended beyond 20?

A: Yes, divisibility rules exist for all numbers, but they become more complex. For prime numbers, rules can be derived using modular arithmetic. For composite numbers, rules combine rules of their prime factors.

Q: How do I check divisibility by 7 quickly?

A: For 7, use the "double and subtract" method: Double the last digit, subtract from the rest of the number, repeat until you get a number you recognize as divisible by 7. Example: 182 → 18 - (2×2) = 14 → 1 - (4×2) = -7 (divisible).

Master mental math with Toolivaa's free Divisibility Rule Calculator, and explore more mathematical tools in our Number Theory Calculators collection.