Difference between revisions of "2006 Seniors Pancyprian/2nd grade/Problem 4"

Latest revision as of 23:10, 19 February 2020

Problem

A quadrilateral $ABCD$ , that has no parallel sides, is inscribed in a circle, its sides $DA$ , $CB$ meet at $E$ and its sides $BA$ , $CD$ meet at $Z$ . If the bisectors of of $\angle DEC$ and $\angle CZB$ intersect the sides of the quadrilateral at the points $K , L, M ,N$ prove that

i)The bisectors intersect normally

ii)the points $K , L, M ,N$ are vertices of a rhombus.

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 == Problem ==
-A quadrilateral <math>\alpha \beta \gamma \delta</math>, that has no parallel sides, is inscribed in a circle, its sides <math>\delta \alpha</math>, <math>\gamma \beta</math> meet at <math>\epsilon</math> and its sides <math>\beta\alpha</math>, <math>\gamma\delta</math> meet at <math>\zeta</math>.
+A quadrilateral <math>ABCD</math>, that has no parallel sides, is inscribed in a circle, its sides <math>DA</math>, <math>CB</math> meet at <math>E</math> and its sides <math>BA</math>, <math>CD</math> meet at <math>Z</math>.
-If the bisectors of of <math>\angle\delta\epsilon\gamma</math> and <math>\angle\gamma\zeta\beta</math> intersect the sides of the quadrilateral at the points <math>\kappa, \lambda, \mu, \nu</math> prove that
+If the bisectors of of <math>\angle DEC</math> and <math>\angle CZB</math> intersect the sides of the quadrilateral at the points <math>K , L, M ,N</math> prove that
-i)the bisectors intersect normally
+i)The bisectors intersect normally
-ii)the points <math>\kappa, \lambda, \mu, \nu</math> are vertices of a rhombus.
+ii)the points <math>K , L, M ,N</math> are vertices of a rhombus.
 == Solution ==

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Difference between revisions of "2006 Seniors Pancyprian/2nd grade/Problem 4"

Latest revision as of 23:10, 19 February 2020

Problem

Solution

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