I cannot make sense of the first problem in a way that allows me to reach the desired conclusion. Surely the line always intersects either 3 or 4 of the six lines. How can it ever intersect fewer than 3? And if it never intersects fewer than 3, how can the expected number be as low as 3? On Sun, Feb 4, 2018 at 11:30 PM, James Propp <jamespropp@gmail.com> wrote:
1. Given a convex quadrilateral, consider the four bounding line segments (i.e. the sides) and the two segments obtained by joining the midpoints of opposite sides — six line segments in all. Let L be a line not parallel to any of the six line segments. Show that a random translate of L, conditioned to intersect at least one of the six segments, can be expected to intersect 3 of them on average.
2. Consider the twelve line segments in a planar projection of the 1-skeleton of a parallelepiped. Let L be a line not parallel to any of the twelve line segments. Show that a random translate of L, conditioned to intersect at least one of the twelve segments, can be expected to intersect 4 of them on average.
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