Show transcribed image text (1 point) Two points are selected randomly on a line of length 32 so as to be on opposite sides of the midpoint of the line. In other words, the two points X and Y are independent random variables such that X is uniformly distributed over (0, 16) and Y is uniformly distributed over (16, 32]. Find the probability that the distance between the two points is greater than 13. answer:
(1 point) Two points are selected randomly on a line of length 32 so as to be on opposite sides of the midpoint of the line. In other words, the two points X and Y are independent random variables such that X is uniformly distributed over (0, 16) and Y is uniformly distributed over (16, 32]. Find the probability that the distance between the two points is greater than 13. answer:
