Cut the trapezium \(ABCD\) into two parts which you can use to construct a triangle.
Cut an arbitrary triangle into 3 parts and out of these pieces construct a rectangle.
Daniel has drawn on a sheet of paper a circle and a dot inside it. Show that he can cut a circle into two parts which can be used to make a circle in which the marked point would be the center.
Is it possible to cut such a hole in \(10\times 10 \,\,cm^2\) piece of paper, though which you can step?
Find all rectangles that can be cut into \(13\) equal squares.
Cut a square into two equal:
1. Triangles.
2. Pentagons
3. Hexagons.
Cut the "biscuit" into 16 congruent pieces. The sections are not necessarily rectilinear.