Now, find the largest 3-digit number divisible by 11: - Databee Business Systems
Find the Largest 3-Digit Number Divisible by 11 – A Quick Mathematical Guide
Find the Largest 3-Digit Number Divisible by 11 – A Quick Mathematical Guide
If you’re curious about large numbers and divisibility rules, you might wonder: What is the largest 3-digit number divisible by 11? Whether you're solving math problems, preparing for a competition, or simply exploring numbers, this guide breaks it all down.
Understanding the Context
What Is the Largest 3-Digit Number?
The largest 3-digit number is 999. All numbers between 100 and 999 are 3-digit, with 999 being the biggest. But not all of these are divisible by 11 — so how do we find the largest one that fits?
How to Check Divisibility by 11
Key Insights
A simple rule helps: A number is divisible by 11 if the alternating sum of its digits is a multiple of 11 (including 0).
For example, take 874:
(8 – 7 + 4) = 5 → Not divisible by 11.
But take 913:
(9 – 1 + 3) = 11 → divisible by 11.
Step-by-Step: Find the Largest 3-Digit Number Divisible by 11
Start from 999 and work downward until you find a number divisible by 11.
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- 999 ÷ 11 = 90.818… → Not divisible.
- Count down:
- 998 ÷ 11 = 90.727… → No
- 997 ÷ 11 = 90.636… → No
- 996 → No…
- …
- Check 990 → 990 ÷ 11 = 90 → Exactly divisible.
- 998 ÷ 11 = 90.727… → No
But wait — is 990 the largest?
Try 999, 998, ..., skipping to viable candidates.
Another efficient method:
Subtract the remainder of 999 divided by 11 from 999.
999 ÷ 11 = 90 with remainder 9 (because 11 × 90 = 990)
So subtract 9 → 999 – 9 = 990
990 ÷ 11 = 90, which is an integer.
✅ 990 is divisible by 11 and a 3-digit number.
Is there a larger one? Only 999, 998, ..., 991 failed — none divisible by 11.
Final Answer
🔹 The largest 3-digit number divisible by 11 is 990.
