A chord of a circle of radius 15 cm subtends an angle of $60^{\circ}$ at the centre. Find the areas in $c m^{2}$ of the corresponding minor and major segments of the circle.(Use $π = 3.14$ and $\sqrt{3} = 1.73$ ) [3 MARKS]

Open in App

Solution

Concept: 1 Mark
Application: 2 Marks

The area of the sector $= \frac{60}{360} \times π \times 15^{2} = 117.83 c m^{2}$

Perpendicular from chord is drawn to the centre.

By RHS congruence, the two triangles will be congruent.

The perpendicular divides the chord into equal halves.

The angle subtended by each triangle at the centre is $30^{\circ}$ .

Height of perpendicular
$= r \times c o s 30^{\circ} = 15 \times \frac{\sqrt{3}}{2} = 12.75 c m$ .

Length of chord
$= 2 \times r \times s i n 30^{\circ} = 30 \times \frac{1}{2} = 15 c m$ .

The area of triangle
$= 0.5 \times 12.75 \times 15 = 95.63 c m^{2}$

The area of minor segment
$= 117.83 - 95.63 = 22.21 c m^{2}$

Area of the major segment = Area of the circle - Area of the minor segment

$= π r^{2} - 22.21$

$= 3.14 \times 15^{2} - 22.21$

$= 706.5 - 22.21$

$= 684.29 c m^{2}$

Suggest Corrections

Similar questions

A chord in a circle of radius 15 cm subtends an angle of 60 $^{\circ}$ at the centre. Find the areas in $c m^{2}$ of the corresponding minor and major segments of the circle.(Use $π$ = 3.14 and $\sqrt{3}$ = 1.73)

Q. A chord of a circle of radius

15

cm subtends an angle of

60^{o}

at the centre. Find the area of the corresponding minor and major segments of the circle.
(Use

π = 3.14

and

\sqrt{3} = 1.73

)

A chord of a circle of radius 12 cm subtends an angle of $120^{\circ}$ at the centre. Find the area in $c m^{2}$ of the corresponding segment of the circle.

$Use π = 3.14 and \sqrt{3} = 1.73$