A tetrahedron, whose faces are each equilateral triangles with side length 1, sits on a circular table with radius 10, with one vertex lying on the centre of the table. The face which the tetrahedron rests on is freshly painted red. As we roll the tetrahedron around the table (without picking it up or sliding it), this red face makes a red triangular stain every time it touches the tabletop. At most how many complete triangular marks can we make on the table this way? (You can assume that the paint on the red face never stops staining.)

This problem was first solved on Wed 21st January at 4:35:25pm

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