2

Part of 2000 May Olympiad

Problems(2)

Area of octagon

Source: May Olympiad (Olimpiada de Mayo) 2000

Given a parallelogram with area

1

and we will construct lines where this lines connect a vertex with a midpoint of the side no adjacent to this vertex; with the

8

lines formed we have a octagon inside of the parallelogram. Determine the area of this octagon

lines inside a right triangle, computational

Source:

ABC

be a right triangle in

A

, whose leg measures

1

cm. The bisector of the angle

BAC

cuts the hypotenuse in

R

, the perpendicular to

AR

R

, cuts the side

AB

at its midpoint. Find the measurement of the side

AB

geometryright triangleangle bisectormidpoint