Challenger App

No.1 PSC Learning App

1M+ Downloads
A sector of a circle has a central angle of 120 • and a radius of 7 cm. Another sector of the same circle has a central angle of 2∏/3. What is the ratio of the area of the first sector to the area of the second sector?

A3 : 5

B2 : 3

C1 : 1

D4 : 5

Answer:

C. 1 : 1

Read Explanation:

Area of a sector is proportional to its central angle (when the radius is the same).

First sector angle:

120120^\circ

Second sector angle:

2π3 radians\frac{2\pi}{3} \text{ radians}

Convert to degrees:

2π3×180π\frac{2\pi}{3} \times \frac{180^\circ}{\pi}
=120= 120^\circ

So both sectors have the same central angle and the same radius.

Therefore, their areas are equal.

1:1\boxed{1:1}


Related Questions:

The measure of each interior angle of a regular polygon is 120° How many sides does this polygon have?
The diagonal of a quadrilateral is 32 m long, and its two offsets are 6 m and 10 m long. The area of the quadrilateral is
The least number of square tiles required to pave the ceiling of a room 525 centimetre long and 378 centimetre broad is:
If the length, breath and height of room are 25 m, 15 m and 30 m, respectively, then what will be the area (in m³) of the four walls of the room?
In a triangle ABC, angle A is larger than angle C and smaller than angle B by the same amount. If angle B is 70°. what is the value of angle A: