An archer is able to hit the bull's-eye 32% of the time. If she shoots 9 arrows, what is the probability that she does not get exactly 4 bull's-eyes? Assume each shot is independent of the others. Express your answer as a percentage rounded to the nearest hundredth.
An archer is able to hit the bull's-eye 32% of the time. If she shoots 9...
An archer is able to hit the bull's-eye 58% of the time. If she shoots 8 arrows, what is the probability that she gets exactly 4 bull's- eyes? Assume each shot is independent of the others. 0.2465 0.1131 0.1433 0.00352
an archer is able to hit the bulls-eye 50% of the time. if she shoots 8 arrows, what is the probability that she gets exactly 4 bulls-eyes? Assume each shot is independent of the others.
An Olympic archer is able to hit the bull's-eye 84% of the time. Assume each shot is independent of the others. She shoots 6 arrows. a) How many bull's-eyes do you expect her to get? b) What is the standard deviation? c) If she keeps shooting arrows until she hits the bull's-eye, how long do you expect it will take?
An Olympic archer is able to hit the bull's-eye 89% of the time. Assume each shot is independent of the others. She shoots 8 arrows. a) How many bull's-eyes do you expect her to get? b) What is the standard deviation? c) If she keeps shooting arrows until she hits the bull's-eye, how long do you expect it will take?
An Olympic archer misses the bull's eye 14% of the time. Assume each shot is independent of the others. If she shoots 7 arrows, what is the probability of each of the results described in parts a through f below? c) Her first miss comes on the second or third arrow The probability is 0.2239 (Round to four decimal places as needed.) d) She misses the bull's-eye exactly 3 times. The probability is 0.0525. (Round to four decimal places as...
Ch6 Q7 An Olympic archer misses the bull's-eye 11% of the time. Assume each shot is independent of the others. If she shoots 9 arrows, what is the probability of each of the results described in parts a through f below? a) Her first miss comes on the third arrow. The probability is __________________ (Round to four decimal places as needed.) b) She misses the bull's-eye at least once. The probability is __________________ (Round to four decimal places...
id An Olympic archer misses the bul's-eye 14 % of the time. Assume each shot is independent of the others. If she shoots 7 arrows, what is the probability of each of the results described in parts a through f below? The probability is 0.0766 (Round to four decimal places as needed.) O b) She misses the bul's-eye at least once. The probability is 0.6521 nl (Round to four decimal places as needed.) c) Her first miss comes on the...
A) The distribution of exam scores for Statistics is normally distributed with a mean of 78 and a standard deviation of 5.2. What is the z-score for a raw score of 85? Round to the nearest hundredth. B) An Olympic archer is able to hit the bull’s eye 80% of the time. Assume each shot is independent of the others. She will shoot 6 arrows. Let X denote the number of bull’s eyes she makes. Find the standard deviation of...
An archer shoots an arrow at a 73.0 m distant target, the bull's-eye of which is at same height as the release height of the arrow. (a) At what angle must the arrow be released to hit the bull's-eye if its initial speed is 33.0 m/s? (Although neglected here, the atmosphere provides significant lift to real arrows.) Incorrect: Your answer is incorrect. °
An archer shoots an arrow at a 73.0 m distant target, the bull's-eye of which is at same height as the release height of the arrow. (a) At what angle must the arrow be released to hit the bull's-eye if its initial speed is 35.0 m/s? (Although neglected here, the atmosphere provides significant lift to real arrows.) ° (b) There is a large tree halfway between the archer and the target with an overhanging branch 3.50 m above the release...