Can any of these be divisible by 18? - Abbey Badges

Understanding the Context

Divisibility by 18 hinges on two fundamental rules:

1. Divisible by 2 — The number must be even (ends in 0, 2, 4, 6, or 8).
   
2. Divisible by 9 — The sum of its digits must be divisible by 9.

Since 18 = 2 × 9 and 2 and 9 are coprime, a number is divisible by 18 if and only if it satisfies both conditions above.

Key Insights

How to Check Divisibility by 18: Step-by-Step

Let’s break it down with examples:

1. Is the number even?
   Example: 54 → ends in 4 → even ✅
   Example: 37 → ends in 7 → odd ❌

2. Sum the digits and check divisibility by 9:
   Example: 54 → 5 + 4 = 9 → 9 is divisible by 9 ✅
   Example: 37 → 3 + 7 = 10 → not divisible by 9 ❌

If a number passes both checks, it is divisible by 18.

Final Thoughts

Examples: Can These Numbers Be Divisible by 18?

Let’s apply this to common number sets (since yours were not specified, we discuss typical candidates):

| Number | Even? | Digit Sum | Divisible by 9? | Divisible by 18? |
|--------|-------|----------|------------------|------------------|
| 36 | ✅ | 3 + 6 = 9 ✅ | ✅ Yes | ✅ Yes |
| 54 | ✅ | 5 + 4 = 9 ✅ | ✅ Yes | ✅ Yes |
| 72 | ✅ | 7 + 2 = 9 ✅ | ✅ Yes | ✅ Yes |
| 27 | ❌ | — | — | ❌ No |
| 81 | ❌ | — | — | ❌ No |
| 90 | ✅ | 9 + 0 = 9 ✅ | ✅ Yes | ✅ Yes |

• Numbers like 36, 54, 72, and 90 above can be divided evenly by 18.
  
• Odd numbers or numbers with digit sums not divisible by 9 cannot be divisible by 18, even if they’re even.