Derivatives
Comprehensive notes, formulas, and practice questions for Derivatives.
Derivatives
Derivatives
What you'll learn
- The derivative as instantaneous rate of change and slope of the tangent to y = f(x).
- To compute derivatives from first principles (limit definition) for polynomials.
- The geometric meaning of f′(x) > 0, f′(x) < 0, and f′(x) = 0.
- Physical interpretation: velocity as derivative of position, acceleration as derivative of velocity.
Key concepts
Level 1 — Definition and interpretation
Verbal: The derivative f′(a) measures how fast f(x) changes as x passes through a. On a graph, it is the slope of the tangent at x = a.
Symbolic: f′(x) = lim(h→0) [f(x+h) − f(x)]/h; for xⁿ, f′(x) = n xⁿ⁻¹; (sin x)′ = cos x, (cos x)′ = −sin x.
Symbolic (first principles): f′(x) = lim(h→0) [f(x+h) − f(x)] / h
Example: f(x) = x² f′(x) = lim(h→0) [(x+h)² − x²]/h = lim(h→0) [2xh + h²]/h = lim(h→0) (2x + h) = 2x
Notation: f′(x), dy/dx, Df(x) — all equivalent for y = f(x).
Level 2 — Basic results and applications
Class 11 standard derivatives (from first principles or given):
| f(x) | f′(x) |
|---|---|
| c (constant) | 0 |
| xⁿ | n xⁿ⁻¹ |
| sin x | cos x |
| cos x | −sin x |
Physical meaning: If s(t) is displacement (m), v(t) = ds/dt (m/s), a(t) = dv/dt (m/s²).
Increasing/decreasing: f′(x) > 0 → f increasing near x; f′(x) < 0 → decreasing.
Tangent line at (a, f(a)): y − f(a) = f′(a)(x − a).
Differentiability vs continuity: Differentiable at a ⇒ continuous at a. Converse false (e.g., |x| at 0 is continuous but not differentiable).
NCERT spotlight — Differentiability and applications
|x| at 0 is continuous but not differentiable because left and right derivatives differ. For displacement s(t), velocity is ds/dt and acceleration is d squared s/dt squared.
Tangent and normal: Tangent slope is f prime (a). Normal slope is negative reciprocal if f prime (a) is not zero.
Mean value theorem preview: On [a,b], some point c satisfies f prime (c) equals average rate of change — foundation for Class 12 analysis.
Worked example
Find the derivative of f(x) = 3x² − 5x + 2 from first principles, and the equation of the tangent at x = 1.
Step 1 — f(x+h) = 3(x+h)² − 5(x+h) + 2
= 3(x² + 2xh + h²) − 5x − 5h + 2.
Step 2 — f(x+h) − f(x) = 3(2xh + h²) − 5h = h(6x + 3h − 5).
Step 3 — [f(x+h) − f(x)]/h = 6x + 3h − 5 → f′(x) = 6x − 5.
Step 4 — At x = 1: f(1) = 0, f′(1) = 1.
Step 5 — Tangent: y − 0 = 1(x − 1) → y = x − 1.
Applications — optimisation sketch
For rectangle perimeter 20, area A = x(10-x) = 10x - x squared. dA/dx = 10 - 2x = 0 gives x = 5, square maximises area. Sign of derivative: positive before x=5, negative after — confirms maximum. Marginal cost in economics is derivative of total cost function with respect to quantity produced.
Common mistakes
| Mistake | Why it happens | Fix |
|---|---|---|
| (f+g)′ = f′ + g′ applied to products | Wrong rule | Product needs product rule (Class 12) |
| Derivative of constant × function | Forgetting factor | d/dx(5x²) = 10x, not 5x |
| x | differentiable at 0 | |
| Confusing average and instantaneous rate | Similar wording | Derivative is limit as Δt → 0 |
Deep dive — geometric interpretation and motion problems
Derivative as slope function f prime(x) gives tangent slope at every x — where f prime = 0 horizontal tangent candidate extremum. Normal line slope −1/f prime(a) perpendicular to tangent at (a, f(a)). Increasing/decreasing intervals: f prime > 0 increasing, < 0 decreasing — sign chart from critical points. Particle motion s(t) = t cubed − 6t: v(2) = 12−6 = 6 m/s, a(2) = 6 m/s² — interpret positive velocity direction motion. Differentiability corner |x| at 0 — left derivative −1 right +1; cusp x^(2/3) vertical tangent. Mean value theorem geometric: somewhere tangent parallel secant chord — existence not construction. First principles on x^n establishes power rule for integer n — binomial expansion of (x+h)^n or induction proof in rigorous courses. Board exams may ask 4-mark first principles on simple polynomial — practise full limit steps without skipping h cancellation justification.
Review and practice drill
Review checklist: (1) First principles four steps: f(x+h), subtract, divide, limit. (2) Tangent slope = derivative at point. (3) Positive derivative means increasing locally. (4) Differentiability implies continuity. Practice: Find derivative of f(x) = 1/x at x = 2 using definition — result -1/4.
Quick check
- Differentiate f(x) = x³ − 4x from first principles.
- A particle has s(t) = t² − 3t. Find velocity at t = 2 s.
- Where is f(x) = x² − 6x + 5 increasing?
Open the Practice tab for graded questions on Derivatives.
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?"
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- 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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