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प्रश्न
In the given figure, O is the centre of the sector. \[\angle\]ROQ = \[\angle\]MON = 60° . OR = 7 cm, and OM = 21 cm. Find the lengths of arc RXQ and arc MYN. (\[\pi = \frac{22}{7}\])
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उत्तर
Given: ∠ROQ = ∠MON = 60°,
radius (r) = OR = 7 cm, radius (R) = OM = 21 cm
To find: Lengths of arc RXQ and arc MYN.
i. Length of arc RXQ = `θ/360 xx 2π"r"`
`= 60/360 × 2 × 22/7 × 7`
`= 1/6 × 2 × 22`
= 7.33 cm
ii. Length of arc MYN = `θ/360 xx 2π"R"`
`= 60/360 × 2 × 22/7 × 21`
`= 1/6 × 2 × 22 × 3`
= 22 cm
∴ The lengths of arc RXQ and arc MYN are 7.33 cm and 22 cm respectively.
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