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प्रश्न
Find the principal solutions of the following equation:
sin 2θ = `-1/2`
उत्तर
sin 2θ = `- 1/2`
Since, θ ∈ (0, 2π), 2θ ∈ (0, 4π)
`sin 2θ = - 1/2 = - sin π/6 = sin (π + π/6) = sin (2π - π/6)`
= `sin (3π + π/6) = sin(4π - π/6)` .......[∵ sin (π + θ) = sin(2π – θ) = sin(3π + θ) = sin(4π – θ) = – sin θ]
∴ `sin 2θ = sin (7π)/6 = sin (11π)/6 = sin (19π)/6 = sin (23π)/6`
∴ `2θ = (7π)/6 or 2θ = (11π)/6 or 2θ = (19π)/6 or 2θ = (23π)/6`
∴ `θ = (7π)/12 or θ = (11π)/12 or θ = (19π)/12 or θ = (23π)/12`
Hence, the required principal solutions are `{(7π)/12, (11π)/12, (19π)/12, (23π)/12}`.
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