Three squares of which two vertices are connected. If the red triangle has area 1.5 and the green square area 1, what is the side length x?
Four circles and a common tangent. The areas of the green and yellow circle are given. What are the areas of the red and blue circle?
The flat earth
An observer is standing on a plane at h metres below the centre of a reflecting sphere of radius r. Another object on the plane is perceived at an angle α from the vertical. What is α of the horizon in terms of h and r?
Z
A green quadrilateral of which two sides are tangent to a quarter circle of radius r. What is its area?
Overlapping interests
A square, a rectangle and a circle that partially overlap. One square vertex coincides with a rectangle-circle tangency point. Prove that the area of the square equals that of the rectangle.
The common point
Two equilateral triangles share a vertex. What’s the angle α?
The sliding square
A square of variable size inscribed in a semicircle of radius r. What is the maximum distance d of the lowest square vertex to the nearest semicircle corner?
A rectangle with two congruent circles, a semicircle and a common tangent. What is the proportion of side lengths a : b?
The rising sun
A rectangle with a circle and a semicircle. What is the proportion red : blue in terms of a and b?
The vanishing point
A square and an equilateral triangle. An extended side and diagonal meet in a point. What is the angle α?