HELP. ME!!!A player gets to throw 4 darts at the target shown. Assuming the player will always hit the target, the probability of hitting an odd number three times is times more than the probability of hitting an even number three times.
Accepted Solution
A:
Answer:The probability of hitting an odd number three times is 3.375 times more than the probability of hitting an even number three times..Step-by-step explanation:Probability of hitting an odd number = 3/5Probability of hitting an odd number = 2/5Probability of hitting an odd number three times = (3/5)^3Probability of hitting an odd number three times = (2/5)^3Now divide (3/5)^3 by Β (2/5)^3 we get: (3/5)^3 / (2/5)^3 (3)^3/(2)^327/8 = 3.375The probability of hitting an odd number three times is 3.375 times more than the probability of hitting an even number three times..