Chapter 11: Areas Related to Circles
Board Exam Focused Notes, Formulas, and PYQs
Exam Weightage & Blueprint
Total: ~4-5 MarksThis chapter deals with sectors and segments of a circle. Questions range from direct formula application to finding areas of shaded regions involving combinations of plane figures.
| Question Type | Marks | Frequency | Focus Topic |
|---|---|---|---|
| MCQ | 1 | High | Length of Arc, Area of Sector Formula |
| Short Answer | 2 or 3 | High | Clock Hand, Quadrant Area |
| Long Answer | 4 or 5 | Medium | Area of Segment (Chord problems) |
Important Formulas 🔥🔥🔥
Memorize these formulas involving angle $\theta$ (in degrees) at the center.
| Concept | Formula | Notes |
|---|---|---|
| Circumference | $2\pi r$ | Total length of boundary |
| Area of Circle | $\pi r^2$ | Total region enclosed |
| Length of Arc ($l$) | $\frac{\theta}{360} \times 2\pi r$ | Part of Circumference |
| Area of Sector | $\frac{\theta}{360} \times \pi r^2$ | Slice like a Pizza |
• If $\theta = 60^\circ$, Triangle is Equilateral. Area = $\frac{\sqrt{3}}{4} r^2$.
• If $\theta = 90^\circ$, Triangle is Right-Angled. Area = $\frac{1}{2} r^2$.
Concept: Sector vs. Segment ★★★★★
Sector
The region enclosed by two radii and the corresponding arc.
- Minor Sector: Angle $< 180^\circ$
- Major Sector: Angle $> 180^\circ$ (Area = $\pi r^2$ - Minor Sector)
Segment
The region enclosed between a chord and the corresponding arc.
- Minor Segment: Area = Sector - Triangle
- Major Segment: Area = Circle - Minor Segment
Important Solved Examples (Marking Scheme)
Q1. The length of the minute hand of a clock is 14 cm. Find the area swept by the minute hand in 5 minutes. (2 Marks)
Angle swept in 60 mins = $360^\circ$.
Angle in 5 mins = $\frac{360}{60} \times 5 = 30^\circ$.
Area swept = Area of Sector = $\frac{\theta}{360} \times \pi r^2$.
$r = 14$ cm, $\theta = 30^\circ$.
$= \frac{30}{360} \times \frac{22}{7} \times 14 \times 14$
$= \frac{1}{12} \times 22 \times 2 \times 14 = \frac{1}{12} \times 616$
$= \frac{154}{3} = \mathbf{51.33}$ cm².
Q2. A chord of a circle of radius 21 cm subtends an angle of $60^\circ$ at the center. Find the area of the corresponding minor segment. (Use $\pi = 22/7, \sqrt{3} = 1.73$) (4 Marks)
Area = $\frac{60}{360} \times \frac{22}{7} \times 21 \times 21$
$= \frac{1}{6} \times 22 \times 3 \times 21 = 231$ cm².
Since $\theta = 60^\circ$, $\Delta OAB$ is equilateral.
Area = $\frac{\sqrt{3}}{4} \times (\text{side})^2 = \frac{1.73}{4} \times 21 \times 21$
$= 190.73$ cm².
Area = Sector - Triangle
$= 231 - 190.73 = \mathbf{40.27}$ cm².
Previous Year Questions (PYQs)
Hint: Perimeter = $l + 2r$. Find arc length $l$, then Area = $\frac{1}{2}lr$.
Ans: Quadrant of circle ($90^\circ$). Area = $\frac{1}{4} \pi (5)^2$.
Ans: $2\pi r = 22 \Rightarrow r = 3.5$. Area = $\frac{1}{4} \pi (3.5)^2 = 9.625$ cm².
Exam Strategy & Mistake Bank
Mistake Bank 🚨
Scoring Tips 🏆
Self-Assessment Mock Test (10 Marks)
Q1 (1M): Find the length of the arc of a sector with radius 6 cm and angle $60^\circ$.
Q2 (2M): The wheel of a car has diameter 80 cm. How many complete revolutions does it make in 10 minutes if the car is travelling at 66 km/h?
Q3 (3M): Find the area of the shaded region if ABCD is a square of side 14 cm and APD and BPC are semicircles.
Q4 (4M): A brooch is made with silver wire in the form of a circle with diameter 35 mm. The wire is also used in making 5 diameters which divide the circle into 10 equal sectors. Find total wire length and area of each sector.