MathDB

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Part of 2008 Bosnia And Herzegovina - Regional Olympiad

Problems(4)

Squares drawn outwardly of ABC

Source: Federation of Bosnia, 1. Grades 2008.

4/23/2008
Squares BCA1A2 BCA_{1}A_{2} , CAB1B2 CAB_{1}B_{2} , ABC1C2 ABC_{1}C_{2} are outwardly drawn on sides of triangle ABC \triangle ABC. If AB1AC2 AB_{1}A'C_{2} , BC1BA2 BC_{1}B'A_{2} , CA1CB2 CA_{1}C'B_{2} are parallelograms then prove that: (i) Lines BC BC and AA AA' are orthogonal. (ii)Triangles ABC \triangle ABC and ABC \triangle A'B'C' have common centroid
geometryparallelogramanalytic geometryvectorcomplex numbers
Nice geometry

Source: Federation of Bosnia and Heryegovina, 2nd grades, 2008.

4/28/2008
Given is an acute angled triangle ABC \triangle ABC with side lengths a a, b b and c c (in an usual way) and circumcenter O O. Angle bisector of angle BAC \angle BAC intersects circumcircle at points A A and A1 A_{1}. Let D D be projection of point A1 A_{1} onto line AB AB, L L and M M be midpoints of AC AC and AB AB , respectively. (i) Prove that AD\equal{}\frac{1}{2}(b\plus{}c) (ii) If triangle ABC \triangle ABC is an acute angled prove that A_{1}D\equal{}OM\plus{}OL
geometrycircumcirclerectangletrigonometryangle bisector
Nice and old one

Source: Federation of Bosnia and Heryegovina, 3rd grades, 2008.

4/28/2008
Two circles with centers S1 S_{1} and S2 S_{2} are externally tangent at point K K. These circles are also internally tangent to circle S S at points A1 A_{1} and A2 A_{2}, respectively. Denote by P Pone of the intersection points of S S and common tangent to S1 S_{1} and S2 S_{2} at K K.Line PA1 PA_{1} intersects S1 S_{1} at B1 B_{1} while PA2 PA_{2} intersects S2 S_{2} at B2 B_{2}. Prove that B1B2 B_{1}B_{2} is common tangent of circles S1 S_{1} and S2 S_{2}.
Really nice

Source: Federation of Bosnia and Herzegovina, 4th grades, 2008.

5/1/2008
Given are three pairwise externally tangent circles K1 K_{1} , K2 K_{2} and K3 K_{3}. denote by P1 P_{1} tangent point of K2 K_{2} and K3 K_{3} and by P2 P_{2} tangent point of K1 K_{1} and K3 K_{3}. Let AB AB (A A and B B are different from tangency points) be a diameter of circle K3 K_{3}. Line AP2 AP_{2} intersects circle K1 K_{1} (for second time) at point X X and line BP1 BP_{1} intersects circle K2 K_{2}(for second time) at Y Y. If Z Z is intersection point of lines AP1 AP_{1} and BP2 BP_{2} prove that points X X, Y Y and Z Z are collinear.
trigonometrygeometrycircumcirclegeometry proposed