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Question
If cos(α – β) + cos(β – γ) + cos(γ – α) = `- 3/2`, then prove that cos α + cos β + cos γ = sin α + sin β + sin γ = 0
Solution
⇒ Given cos(α – β) + cos(β – γ) + 2cos(γ – α) = `- 3/2`
2 cos(α – β) + 2cos(β – γ) + 2cos(γ – α) = – 3
2cos(α – β) + 2cos(β – γ) + 2cos(γ – α) + 3 = 0
[2 cos α cos β + 2 sin α sin β] + [2 cos β cos γ + 2 sin β sin γ] + [2 cos γ cos α + sin γ sin α] + 3 = 0
= [2 cos α cos β + 2 cos β cos γ + 2 cos γ cos α] + [2 sin α sin β + 2 sin β sin γ + 2 sin γ sin α] + (sin2 α + cos2 α) + (sin2 β + cos2 β) + (sin2 γ + cos2 γ) = 0
⇒ (cos2 α + cos2 β + cos2 γ + 2 cos α cos β + 2 cos β cos γ + 2 cos γ cos α) + (sin2 α + sin2 β) + (sin2 γ + 2 sin α sin β + 2 sin β sin γ + 2 sin γ sin α) = 0
(cos α + cos β + cos γ)2 + (sin α + sin β + sin γ)2 = 0
= (cos α + cos β + cos γ) = 0 and sin α + sin β + sin γ = 0
Hence proved
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