Problems solved correctly: 15, 16, 17, 18, 19, 20, 21, 22
Problems solved correctly: 15, 16, 17, 18, 19, 21, 22, 23
17 wrong confused
20 wrong, time sink
21 wrong
22 right of hands
23 wrong understood solution
24 wrong time sink casework
25 easy casework, right
Consider the seven points on the circle shown. If George draws line segments connecting pairs of points so that each point is connected to exactly two other points, what is the probability that the resulting figure is a convex heptagon? Express your answer as a common fraction.
Try the question first before you read the solution down below.
Label the points 1 – 7 clockwise around the circle. Each point must be joined to exactly two others, so the drawing is a 2-regular graph (a disjoint union of cycles).
Adding the two cases gives the total number of admissible drawings: \[ N_{\text{total}} = 360 + 105 = 465 . \]
Exactly one of those drawings is the perimeter \(1\!-\!2\!-\!3\!-\!4\!-\!5\!-\!6\!-\!7\!-\!1\), which yields a convex heptagon.
Checks: the same counting method gives \(70\) total for 6 points (hexagon) and \(3507\) total for 8 points (octagon), agreeing with \(1/70\) and \(1/3507\) respectively.
