Area Under Curves and Between Curves
Application of Integrals: Area Under Curves and Between Curves
Area Under Curves and Between Curves
Area Using Definite Integrals: Under Curves and Between Curves
What you'll learn
- Compute the area enclosed between a curve and the x-axis (handling regions below x-axis)
- Find the area between two curves by integrating their difference
- Locate intersection points of curves to set up correct limits
- Apply standard area formulas for circle, ellipse, and parabola
- Distinguish signed area from geometric (unsigned) area
Key concepts
Level 1 — Foundations
The definite integral ∫ₐᵇ f(x)dx gives the signed area: positive when f(x) > 0 (above x-axis), negative when f(x) < 0 (below x-axis).
For geometric area (always positive), use absolute value:
When the curve crosses the x-axis at c ∈ (a,b), split:
Area between two curves y = f(x) (upper) and y = g(x) (lower) from x = a to x = b:
For geometric area when curves switch position:
Level 2 — JEE depth
Area under curve y=f(x) from a to b (below x-axis):
Area between y=f(x) and y=g(x):
- Find intersection: solve f(x) = g(x) → limits a, b
- Determine which is on top in [a,b]
Standard results:
| Region | Formula |
|---|---|
| Circle x²+y²=r² (full) | A = πr² |
| Semicircle (upper half) | A = ∫₋ᵣʳ √(r²−x²)dx = πr²/2 |
| Ellipse x²/a²+y²/b²=1 | A = πab |
| Parabola y²=4ax and x=a | A = 8a²/3 |
| Parabola y=ax² and line y=c | Find intersection, integrate difference |
Area of circle by integration:
Area bounded by parabola y²=4ax and line x=a: At x=a: y=±2a (intersection points)
Area using y as variable: When curves are expressed as x=f(y), integrate w.r.t. y:
Signed vs geometric area:
- Signed: ∫ₐᵇ f(x)dx (may be negative)
- Geometric: ∫ₐᵇ |f(x)|dx (always non-negative)
- JEE always asks for geometric area unless explicitly stated otherwise
Worked example
Find the area enclosed between y = x² and y = x + 2.
Step 1: Find intersection points
x² = x + 2 → x² − x − 2 = 0 → (x−2)(x+1) = 0
x = −1, x = 2
Step 2: Determine which is on top
At x = 0: x+2 = 2 > 0 = x² → line is above parabola on [−1, 2]
Step 3: Set up integral
A = ∫₋₁² [(x+2) − x²] dx
= ∫₋₁² (x + 2 − x²) dx
Step 4: Evaluate
= [x²/2 + 2x − x³/3]₋₁²
= (4/2 + 4 − 8/3) − (1/2 − 2 + 1/3)
= (2 + 4 − 8/3) − (1/2 − 2 + 1/3)
= (6 − 8/3) − (−3/2 + 1/3)
Compute each:
6 − 8/3 = 18/3 − 8/3 = 10/3
−3/2 + 1/3 = −9/6 + 2/6 = −7/6
A = 10/3 − (−7/6) = 10/3 + 7/6 = 20/6 + 7/6 = 27/6 = 9/2
Area = 9/2 square units
Common mistakes
| Mistake | Why it happens | Fix |
|---|---|---|
| Not taking absolute value when curve is below x-axis | Assuming ∫f(x)dx = area always | Check sign of f(x) in [a,b]; use |
| Forgetting to find intersection points — wrong limits | Jumping to integration too fast | Always solve f(x)=g(x) first; sketch the curves roughly |
| Reversing upper and lower curve — negative answer | Not checking which curve is above | Evaluate both functions at a test point in [a,b]; the larger value is the upper curve |
| Forgetting to check if curves cross within [a,b] | Assuming one curve stays above throughout | Find all intersections in [a,b] and split the integral at each crossing |
Board exam drill
- Find the area between the parabola y=x² and the line y=2x
- Find the area of the region bounded by y²=4x and x=4
- Find the area enclosed between y=sin x and y=cos x from 0 to π/2
- Find the area of the ellipse x²/9 + y²/4 = 1
- Sketch and find the area of the region bounded by y=|x| and y=2
NCERT diagrams to know
- Fig 8.1: Area under a curve as the integral
- Fig 8.3: Area between two curves (upper minus lower)
- Fig 8.7: Region bounded by parabola and line — standard sketch
- Sketch any circle/parabola/ellipse by hand before integrating; marks are often given for correct sketch
Quick check
- Area under y=x² from 0 to 3: → [x³/3]₀³ = 9
- Area between y=x and y=x² from 0 to 1: → ∫₀¹(x−x²)dx = 1/2−1/3 = 1/6
- Area of upper semicircle x²+y²=4: → (π·4)/2 = 2π
- If the integral gives a negative value for an area problem, what should you do? → Take its absolute value (it means the curve was below the axis)
- Stretch: Find the area common to the circle x²+y²=4 and the parabola y²=x (set up the integral; leave in integral form if needed).
NCERT Chapter 8 link: Application of Integrals — full chapter (only chapter) with Exercises 8.1 and 8.2 and Miscellaneous
Exam connections: Directly tested in JEE Main (1–2 questions per paper); requires solid integration skill from Chapter 7; connects to coordinate geometry (circles, parabolas, ellipses from Class 11)
Study strategy: Sketching is non-negotiable — 60% of errors come from not drawing the region. Draw every area problem before integrating. Master 5 standard curve pairs: line+parabola, parabola+parabola, circle+line, ellipse.
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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