A well-dressed stranger approaches you on the street and asks you to play a game. Since he is well dressed, you are not threatened by this odd request and decide to play. Using a standard six-sided, balanced die, he tells you if you roll a 1 then he will give you $100. if you roll a 2, 3, 4, 5, or 6 then you have to give him $5. You decide to play the game 5 times. for each game, you record whether you win or lose. Assuming the binomial formula can be used, fill in the blanks below to calculate the probability of winning exactly 2 out of the 5 games. Enter single values only (i.e. no arithmetic operations such as subtraction.) Report any probabilities to four decimal places.