Question

There is a fan with 3 blades at 120° to each other
whose central circular disc has an area of 3π cm^2 and
a blade is (20-√3) cm long. If the tips of the blades
are joined so as to form an equilateral triangle, what
will be its area?
(a) 900 cm
(b) 300√3 cm
(c) (900 + 9π) cm^2(d) (37 + 300 cm^2​

Answer 1

Answer:

c is the correct answer for your question

Answer 2

Given : There is a fan with 3 blades at 120° to each other whose central circular disc has an area of 3π cm^2 and a blade is (20-√3) cm long.

 tips of the blades are joined so as to form an equilateral triangle

To Find :  area  

(a) 900 cm

(b) 300√3 cm

(c) (900 + 9π) cm^2

(d) (37 + 300 cm^2​

Solution:

Area of circular disc = 3π cm²

Area of circle = π(radius)²

=> π(radius)² =  3π

=> radius = √3  cm

Length of fan blade = 20-√3 + √3 = 20 cm

Angle between blades = 120°

Area of one Triangle  = (1/2) * 20 * 20 Sin 120°

= 200  (√3 / 2)

= 100 √3

Area of 3 Triangles = 3 * 100 √3 = 300 √3 cm²

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