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2006 Seniors Pancyprian/2nd grade/Problem 4

Revision as of 00:04, 20 February 2020 by Arnav200205 (talk | contribs) (Problem)

Problem

A quadrilateral $\alpha \beta \gamma \delta$, that has no parallel sides, is inscribed in a circle, its sides $\delta \alpha$, $\gamma \beta$ meet at $\epsilon$ and its sides $\beta\alpha$, $\gamma\delta$ meet at $\zeta$. If the bisectors of of $\angle\delta\epsilon\gamma$ and $\angle\gamma\zeta\beta$ intersect the sides of the quadrilateral at the points $\kappa, \lambda, \mu, \nu$ prove that

i)the bisectors intersect normally

ii)the points $\kappa, \lambda, \mu, \nu$ are vertices of a rhombus.

Solution

See also

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