Number Series
Logic & Patterns: Number Series
Number Series
Number Series
What you'll learn
- Spot the rule that connects numbers in a list.
- Find the next number by continuing the rule.
- Work with patterns that add, subtract, double, or grow by a growing gap.
- Recognise special patterns like square numbers and sum-of-two-before patterns.
Key concepts
Level 1 — Constant gap
If every number is a fixed amount more than the last one (like +2, +2, +2), just add that same amount again.
Level 2 — Growing gap
Sometimes the gap itself grows: +1, then +2, then +3, then +4. Look at how the gap changes before finding the next number.
Level 3 — Doubling patterns
Each number can be double the one before it (x2 each time).
Level 4 — Sum of two before (Fibonacci-style)
Some patterns are built by adding the two previous numbers together: 1, 1, 2, 3, 5, 8 ...
NCERT anchor: CBSE Class 4 logical reasoning; Math-Magic 4 Ch 12 — patterns in numbers
Worked example
Find the next number: 3, 6, 9, 12, ?
Step 1 — Gap between each number = 3.
Step 2 — Add 3 to the last number: 12 + 3 = 15.
Answer: **15**
Find the next number: 1, 2, 4, 7, ?
Step 1 — Gaps are +1, +2, +3.
Step 2 — Next gap should be +4.
Step 3 — 7 + 4 = 11.
Answer: **11**
Common mistakes
| Mistake | Why it happens | Fix |
|---|---|---|
| Assuming the gap never changes | Some patterns have a growing gap | Check at least three gaps before deciding |
| Adding instead of doubling | Missed a x2 pattern | Compare ratios, not just differences |
| Stopping after one correct guess | Pattern may need more terms to confirm | Verify the rule works for all given numbers |
| Mixing up sum-of-two-before with simple addition | Both involve "adding" | Check if each term uses the previous two numbers, not just one |
Quick check
- 5, 10, 15, 20, ? — what is next?
- 2, 4, 8, 16, ? — what is next?
- 1, 3, 6, 10, ? — what is the growing-gap rule here?
- Stretch: In 1, 1, 2, 3, 5, 8, what are the next two numbers, and what rule do they follow?
Revision tip: Write the gaps between numbers on a line below the series — the gap pattern often reveals the rule instantly.
Open the Practice tab for graded questions on Number Series.
Key Takeaways (TL;DR)
- What you'll learn
- Key concepts
- Worked example
- Common mistakes
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