Exer. 35–36: (a) Find the length of the arc that subtends the given central angle ? on a circle of diameter d. (b) Find the area of the sector determined by ?. 35 ? = 50°, d = 16 m 36 ? = 2.2, d = 120 cm
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Step 1: Convert the central angle from degrees to radians for the first part of the question: Given central angle = 50° Convert 50° to radians: \(50^\circ \times \frac{\pi}{180} = \frac{5\pi}{18}\) Show more…
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Exer. $35-36:$ (a) Find the length of the are that subtends the given central angle $\boldsymbol{\theta}$ on a circle of diameter $d .$ (b) Find the area of the sector determined by $\theta$ $$\theta=50^{\circ}, \quad d=16 \mathrm{m}$$
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(a) Find the length of the arc that subtends the given central angle $\theta$ on a circle of diameter $d$ (b) Find the area of the sector determined by $\boldsymbol{\theta}$. $$\theta=50^{\circ}, \quad d=16 \mathrm{m}$$
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