Stage: 5 Challenge Level: 
This solution came from Ruth from Manchester High School for Girls. Well done Ruth!
Let the tetrahedron's vertices be $A$, $B$, $C$ and $D$ and the longest side be $AB$. If you assume that there is not a vertex where the three sides meeting at it could be the sides of a triangle, we must have $AC + AD < AB$ and $BC + BD < AB$ (otherwise the sides meeting at $A$ or $B$ could be the sides of a triangle). Therefore
$$AC + AD + BC + BD< 2 AB$$.Now since $ABC$ and $ABD$ are both triangles, we must have $AC + BC > AB$ and $AD + BD > AB$. Therefore
$$AC+ AD + BC + BD > 2 AB$$. This contradicts (1), so the initial assumption must be wrong. There is at least one vertex (one of $A$ or $B$) where the three sides meeting at it could be the sides of a triangle.
Mathematical reasoning & proof. Tetrahedra. Inequality/inequalities. Manipulating algebraic expressions/formulae. Dynamical systems. Number theory. epsilons. Proof by contradiction. Stage 5 - Reviewed 2012. alphas.
Published November 2002,December 2002.
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