Arithmetic Progression (AP)
Sequences & Series: Arithmetic Progression (AP)
Arithmetic Progression (AP)
Arithmetic Progression (AP)
What you'll learn
- The nth term of an AP: aₙ = a + (n−1)d.
- Sum of n terms: Sₙ = n/2 · [2a + (n−1)d] = n/2 · (first + last).
- Arithmetic mean and inserting AMs between two numbers.
- Property: if a, b, c are in AP then 2b = a + c.
- The difference-of-sums trick: aₙ = Sₙ − Sₙ₋₁.
Key concepts
Level 1 — AP definition and nth term
AP: A sequence where each term differs from the previous by a constant common difference d. General form: a, a+d, a+2d, … , a+(n−1)d.
nth term: aₙ = a + (n−1)d. Here a = first term, d = aₙ₊₁ − aₙ (constant).
Finding d: d = (last term − first term)/(n − 1) when n terms are known.
Sum formula: Sₙ = n/2 · [2a + (n−1)d]. Equivalent form: Sₙ = n/2 · (a + l) where l = last term = aₙ.
Arithmetic mean: AM of a and b is (a+b)/2. If m is inserted between a and b as AM, then a, m, b is AP with d = (b−a)/2.
Inserting n AMs between a and b: d = (b−a)/(n+1). The k-th AM = a + k·(b−a)/(n+1).
Level 2 — Advanced properties and problem-solving patterns
Property — three terms in AP: a, b, c in AP iff 2b = a + c. Use 3 terms as a−d, a, a+d (sum = 3a simplifies many problems).
Property — four terms in AP: Use a−3d, a−d, a+d, a+3d (sum = 4a, pairs symmetric about centre).
Difference-of-sums trick: aₙ = Sₙ − Sₙ₋₁ for n ≥ 2 (and a₁ = S₁). Vital when Sₙ is given as a quadratic in n — find d from coefficient of n².
If Sₙ = pn² + qn: Then aₙ = p(2n−1) + q (linear in n → confirms AP). First term a₁ = p + q, common difference d = 2p.
Sum of AP with last term l: Sₙ = n(a + l)/2. Number of terms n = (l − a)/d + 1.
Key JEE pattern: If terms of an AP are a₁, a₂, … then a₁ + aₙ = a₂ + aₙ₋₁ = … (equidistant terms have equal sums). Also useful: if Sₘ = Sₙ (m ≠ n), then S(m+n) = 0.
Reciprocal in HP — link: If a, b, c are in HP then 1/a, 1/b, 1/c are in AP.
NCERT spotlight
Standard result: Sum of first n natural numbers = n(n+1)/2 (AP with a=1, d=1). Sum of first n odd numbers = n². Tip: for Sₙ = pn² + qn, the sequence is always an AP — recognise by the quadratic form and use d = 2p.
Worked example
The sum of first n terms of an AP is Sₙ = 3n² + 5n. Find the nth term and the common difference.
Step 1 — Use aₙ = Sₙ − Sₙ₋₁ for n ≥ 2:
Sₙ = 3n² + 5n
Sₙ₋₁ = 3(n−1)² + 5(n−1) = 3n² − 6n + 3 + 5n − 5 = 3n² − n − 2.
Step 2 — aₙ = Sₙ − Sₙ₋₁ = (3n² + 5n) − (3n² − n − 2) = 6n + 2.
Step 3 — Check a₁ = S₁ = 3(1)² + 5(1) = 8. Formula gives 6(1)+2 = 8. ✓
Step 4 — Common difference d = a₂ − a₁ = [6(2)+2] − [6(1)+2] = 14 − 8 = 6.
Step 5 — Alternatively: Sₙ = 3n² + 5n is quadratic in n with leading coefficient 3, so d = 2×3 = 6. ✓
How many terms of the AP 3, 7, 11, … must be taken so that the sum is 820?
Step 1 — Identify: a = 3, d = 4. Sₙ = n/2 [2(3) + (n−1)(4)] = n/2 [6 + 4n − 4] = n/2 [4n + 2] = n(2n+1).
Step 2 — Set Sₙ = 820: n(2n + 1) = 820 → 2n² + n − 820 = 0.
Step 3 — Discriminant: 1 + 4×2×820 = 1 + 6560 = 6561 = 81².
Step 4 — n = (−1 + 81)/(2×2) = 80/4 = 20. (Take positive root.)
Step 5 — Verify: S₂₀ = 20(40+1) = 20×41 = 820. ✓
Common mistakes
| Mistake | Why it happens | Fix |
|---|---|---|
| aₙ = a + nd (off by one) | Forgetting that first term has n=1 | aₙ = a + (n−1)d; the (n−1) is the number of steps from term 1 |
| Sₙ = n(a + d·n)/2 instead of n[2a+(n−1)d]/2 | Misremembering formula | Derive: Sₙ = Σ[a + (k−1)d], k=1 to n; sum of k−1 is n(n−1)/2 |
| a₁ computed from Sₙ − Sₙ₋₁ with n=1 giving wrong value | Formula aₙ = Sₙ − Sₙ₋₁ not valid for n=1 | Use a₁ = S₁ directly |
| Assuming 2b = a + c means b is average (confusing mean and condition) | Language ambiguity | 2b = a+c is BOTH the AP condition AND means b = (a+c)/2; both are correct |
Quick check
- Find the 20th term of the AP 5, 8, 11, …
- Find the sum of first 15 terms of the AP 2, 5, 8, …
- If a = 7, l = 63, Sₙ = 385, find n and d.
- Insert 4 arithmetic means between 3 and 23.
- Stretch: Prove that if Sₘ = Sₙ for an AP (m ≠ n), then S(m+n) = 0, and find the term that is zero.
Open the Practice tab for graded questions on Sequences & Series — AP.
Interactive Exploration Suggestions (Drishti Live Worlds)
- Use the platform-native live simulation or PhET-style tool for this topic (number line, Venn, physics playground, molecule builder, sensor dashboard, etc.).
- Mirror / body / home activity: physically do the concept (count objects, measure, role-play) and photograph or describe for portfolio.
- Voice or text reflection with AI Mentor: explain the concept to a younger student or family member.
AI Mentor Prompts (Socratic, Board-Adaptive)
- "Explain this concept to a Class 6 student using one real example from an Indian home, school, market, or festival."
- "What is one common mistake students make here, and how would you catch yourself making it?"
- Stretch: "How does this connect to coding, robotics, money, health, environment, or a future career?"
Gamification, Portfolio & Parent Visibility
- Complete the core practice + one extension activity (photo, table, short reflection, or mini-project) for base XP + topic badge.
- 5-7 day streak or family discussion note = multiplier + visible artifact in parent/principal dashboard.
- Best real-world application stories (anonymised) featured on class or national leaderboard.
Robotics, STEM & Future Skills Bridges
- One hands-on project or measurement using the Drishti kit or household items that makes the concept physical.
- Direct link to at least one Future Skill track (Money Management, Green Tech, Cyber Defenders, Micro-Entrepreneurship, AI Mastery, Sustainable Living, Personality Development).
- Coding extension where relevant (simple script, simulation, or data logging).
NEP 2020 & Full Education OS Alignment
This material emphasises experiential "learning by doing", competency (apply/create/analyse), vocational exposure, critical thinking, and multidisciplinary connections. Designed to feed live worlds, AI Mentor (with memory), gamification, robotics, parent analytics, and future skills — not just exam prep.
Portfolio Evidence Idea: Your photo/table/reflection/project + one sentence on "How this helps me in real life or a possible future path."
Open the Practice tab for aligned questions (easy/medium/hard + case-based) with full AI scaffolding.
See curriculum for cross-links and the full future-skills/robotics chapters.
Key Takeaways (TL;DR)
- What you'll learn
- Key concepts
- Worked example
- Common mistakes
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