Deandre is playing a game of chance in which he tosses a dart into a rotating dartboard with 8 equal-sized slices numbered 1 through 8 . The dart lands on a numbered slice at random. This game is this: Deandre tosses the dart once. He wins $1 if the dart lands in slice 1 , $2 if the dart lands in slice 2 , $5 if the dart lands in slice 3, and $8 if the dart lands in slice 4. He loses $2.50 if the dart lands in slices 5 ,6 , 7, or 8.


Find the expected value of playing the game.


$ amount


B) What can Deandre expect in the long run, after playing the game many times?


a) Deandre can expect to gain money / He can expect to win ___dollars per toss


b) Deandre can expect to lose money/He can expect to lose___dollars per toss


c) Deandre can expect to break even(neither gain or lose money)