Question 1- A game is played with a spinner on a circle, like the minute hand on a clock. The circle is marked evenly from 0 to 100, so, for example, the 3:00 position corresponds to 25, the 6:00 position to 50, and so on. The player spins the spinner, and the resulting number is the number of seconds he or she is given to solve a word puzzle. If 100 players are selected randomly, how many players are expected to get between 42 and 72 seconds to solve the puzzle?
Question 2-A game is played with a spinner on a circle, like the minute hand on a clock. The circle is marked evenly from 0 to 100, so, for example, the 3:00 position corresponds to 25, the 6:00 position to 50, and so on. The player spins the spinner, and the resulting number is the number of seconds he or she is given to solve a word puzzle. If 100 players are selected randomly, what is the probability that the number of players who will get between 42 and 72 seconds to solve the puzzle is within two standard deviations of the expected number of players to do so?