A sector of a circle with radius 21 cm has an area of 280\(cm^{2}\). (a)

Explanation

(a) Area of sector = \(\frac{\theta}{360} \times \pi r^{2}\)

\(280 = \frac{\theta}{360} \times \frac{22}{7} \times 21 \times 21\)

\(280 = \frac{1386 \theta}{360}\)

\(\theta = \frac{280 \times 360}{1386}\)

\(\theta = 72.72°\)

Perimeter of sector = \(2r + \frac{\theta}{360} \times 2\pi r\)

= \(2(21) + \frac{72.72}{360} \times 2 \times \frac{22}{7} \times 21\)

= \(42 + (0.202 \times 2 \times 66)\)

= \(42 + 26.667\)

= \(68.667 cm\)

\(\approxeq 68.7 cm\)

(b) When the sector is bent to form a cone, its radius becomes the slant height of the cone.

The radius of the base of the cone is obtained from the relation \(r = \frac{R \theta}{360}\),

where r = radius of the base of the cone, R = radius of the sector, θ = angle of the sector.

Therefore, r = \(\frac{21 \times 800}{11 \times 360}\)

= \(\frac{140}{33}\)

If y is the vertical angle of the cone, then \(sin \frac{y}{2} = \frac{r}{l}\)

= \(\frac{140}{33 \times 21}\)

= 0.2020

Hence, required angle = y = 2 x sin\(^{-1}\) (0.2020) = 23\(^o\).