Math, asked by jaganijeet4103, 4 months ago

A chord of a circle of radius 15cm subtends an angle of 60°at the centre

.Find the corresponding minor segment of the circle​

Answers

Answered by rajesh030457
4

Answer:

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Step-by-step explanation:

ANSWER

In the mentioned figure,

O is the centre of circle,

AB is a chord

AXB is a major arc,

OA=OB= radius = 15 cm

Arc AXB subtends an angle 60

o

at O.

Area of sector AOB=

360

60

×π×r

2

=

360

60

×3.14×(15)

2

=117.75cm

2

Area of minor segment (Area of Shaded region) = Area of sector AOB− Area of △ AOB

By trigonometry,

AC=15sin30

OC=15cos30

And, AB=2AC

∴ AB=2×15sin30=15 cm

∴ OC=15cos30=15

2

3

=15×

2

1.73

=12.975 cm

∴ Area of △AOB=0.5×15×12.975=97.3125cm

2

∴ Area of minor segment (Area of Shaded region) =117.75−97.3125=20.4375 cm

2

Area of major segment = Area of circle − Area of minor segment

=(3.14×15×15)−20.4375

=686.0625cm

2

solution

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