IMO 1970 LL BUL14

Let \alpha + \beta + \gamma = \pi. Prove that

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IMO 1970 LL BUL14

Origin: BUL

Problem

Let \alpha + \beta + \gamma = \pi. Prove that sin 2\alpha + sin 2\beta + sin 2\gamma = 2(sin \alpha + sin \beta + sin \gamma)(cos \alpha + cos \beta + cos \gamma) −2(sin \alpha + sin \beta + sin \gamma).