MathDB

19

Part of 1987 IMO Shortlist

Problems(1)

Construct a triangle with area ≤ A (IMO SL 1987-P19)

Source:

8/19/2010
Let α,β,γ\alpha,\beta,\gamma be positive real numbers such that α+β+γ<π\alpha+\beta+\gamma < \pi, α+β>γ\alpha+\beta > \gamma,β+γ>α \beta+\gamma > \alpha, γ+α>β.\gamma + \alpha > \beta. Prove that with the segments of lengths sinα,sinβ,sinγ\sin \alpha, \sin \beta, \sin \gamma we can construct a triangle and that its area is not greater than A=18(sin2α+sin2β+sin2γ).A=\dfrac 18\left( \sin 2\alpha+\sin 2\beta+ \sin 2\gamma \right).
Proposed by Soviet Union
geometrytrigonometrygeometric inequalityTrigonometric inequalityIMO Shortlist