Past records indicate that 15 percent of the flights for a certain airline are delayed. Suppose...

According to an airline flights on a certain route are on time 85% of the time....

According to an airline flights on a certain route are on time 85% of the time. Suppose 15 flights are randomly selected and the numbee of on time flights is recorded. a) Explain why this is a binomial experiment. b) Find and interpret the probability that exactly 11 flights are on time. c) Find and interpret the probability that fewer than 11 flights are on time. d) Find and interpret the probability that at least 11 flights are on time....

According to an​ airline, flights on a certain route are on time 80​% of the time....

According to an​ airline, flights on a certain route are on time 80​% of the time. Suppose 20 flights are randomly selected and the number of​ on-time flights is recorded. ​(a) Explain why this is a binomial experiment. ​(b) Find and interpret the probability that exactly 12 flights are on time. ​(c) Find and interpret the probability that fewer than 12 flights are on time. ​(d) Find and interpret the probability that at least 12 flights are on time. ​(e)...

According to an? airline, flights on a certain route are on time 75?%of the time. Suppose...

According to an? airline, flights on a certain route are on time 75?%of the time. Suppose 24 flights are randomly selected and the number of? on-time flights is recorded. ?(a) Explain why this is a binomial experiment. ?(b) Find and interpret the probability that exactly 14 flights are on time. ?(c) Find and interpret the probability that fewer than 14 flights are on time. ?(d) Find and interpret the probability that at least 14 flights are on time. ?(e) Find...

According to an​ airline, flights on a certain route are on time 75% of the time....

According to an​ airline, flights on a certain route are on time 75% of the time. Suppose 20 flights are randomly selected and the number of​ on-time flights is recorded. ​(a) Explain why this is a binomial experiment. ​(b) Determine the values of n and p. ​(c) Find and interpret the probability that exactly 11 flights are on time. ​(d) Find and interpret the probability that fewer than 11 flights are on time. ​(e) Find and interpret the probability that...

A certain flight arrives on time 81 percent of the time. Suppose 122 flights are randomly...

A certain flight arrives on time 81 percent of the time. Suppose 122 flights are randomly selected. Use the normal approximation to the binomial to approximate the probability that ​(a) exactly 110 flights are on time. ​(b) at least 110 flights are on time. ​(c) fewer than 110 flights are on time. ​(d) between 110 and 111, inclusive are on time.

A certain flight arrives on time 83 percent of the time. Suppose 130 flights are randomly...

A certain flight arrives on time 83 percent of the time. Suppose 130 flights are randomly selected. Use the normal approximation to the binomial to approximate the probability that ​(a) exactly 117 flights are on time. ​(b) at least 117 flights are on time. ​(c) fewer than 96 flights are on time. ​(d) between 96 and 108​, inclusive are on time.

A certain flight arrives on time 85 percent of the time. Suppose 188 flights are randomly...

A certain flight arrives on time 85 percent of the time. Suppose 188 flights are randomly selected. Use the normal approximation to the binomial to approximate the probability that ​(a) exactly 160 flights are on time. ​(b) at least 160 flights are on time. ​(c) fewer than 155 flights are on time. ​(d) between 155 and 166​, inclusive are on time.

A certain flight arrives on time 90 percent of the time. Suppose 166 flights are randomly...

A certain flight arrives on time 90 percent of the time. Suppose 166 flights are randomly selected. Use the normal approximation to the binomial to approximate the probability that ​(a) exactly 146 flights are on time. ​(b) at least 146 flights are on time. ​(c) fewer than 139 flights are on time. ​(d) between 139 and 158​, inclusive are on time.

A certain flight arrives on time 81 percent of the time. Suppose 113 flights are randomly...

A certain flight arrives on time 81 percent of the time. Suppose 113 flights are randomly selected. Use the normal approximation to the binomial to approximate the probability that ​(a) exactly 89 flights are on time. ​(b) at least 89 flights are on time. ​(c) fewer than 87 flights are on time. ​(d) between 87 and 97 ​, inclusive are on time.

A certain flight arrives on time 89 percent of the time. Suppose 118 flights are randomly...

A certain flight arrives on time 89 percent of the time. Suppose 118 flights are randomly selected. Use the normal approximation to the binomial to approximate the probability that ​ (a) exactly 95 flights are on time.​ (b) at least 95 flights are on time.​ c) fewer than 107 flights are on time. ​(d) between 107 and 108​, inclusive are on time.