here this is binomial with parameter n=12 and p=0.58 |
P(Overbooking occurs)=P(X>=9)=1-P(X<=8)= | 1-∑x=0x-1 (nCx)px(q)(n-x) = 0.1853 |
P(empty seats )=P(X<=7)= | ∑x=0a (nCx)px(1−p)(n-x) = | 0.6175 |
Question 8 B0/2 pts 53 399 Details A small regional carrier accepted 20 reservations for a...
A small regional carrier accepted 17 reservations for a particular flight with 13 seats. 11 reservations went to regular customers who will arrive for the flight. Each of the remaining passengers will arrive for the flight with a 57% chance, independently of each other. (Report answers accurate to 4 decimal places.) Find the probability that overbooking occurs. Find the probability that the flight has empty seats. Question Help: D Video D Post to forum Submit Question
A small regional carrier accepted 22 reservations for a particular flight with 19 seats. 13 reservations went to regular customers who will arrive for the flight. Each of the remaining passengers will arrive for the flight with a 59% chance, independently of each other. (Report answers accurate to 4 decimal places.) Find the probability that overbooking occurs. Find the probability that the flight has empty seats
A small regional carrier accepted 14 reservations for a particular flight with 12 seats. 6 reservations went to regular customers who will arrive for the flight. Each of the remaining passengers will arrive for the flight with a 59% chance, independently of each other. (Report answers accurate to 4 decimal places.) Find the probability that overbooking occurs. Find the probability that the flight has empty seats.
A small regional carrier accepted 23 reservations for a particular flight with 19 seats. 18 reservations went to regular customers who will arrive for the flight. Each of the remaining passengers will arrive for the flight with a 45% chance, independently of each other. Find the probability that overbooking occurs. Find the probability that the flight has empty seats.
A small regional carrier accepted 13 reservations for a particular flight with 10 seats. 7 reservations went to regular customers who will arrive for the flight. Each of the remaining passengers will arrive for the flight with a 52% chance, independently of each other. Find the probability that overbooking occurs. Preview Find the probability that the flight has empty seats. Preview
Asmall regional carrier accepted 15 reservations for a particular flight with 13 seats. 11 reservations went to regular customers who will arrive for the flight. Each f the remaining passengers will arrive for the flight with a 43% chance, independently of each other. ind the probability that overbooking occurs. ind the probability that the flight has empty seats. Preview
A small regional carrier accepted 12 reservations for a particular flight with 11 seats. 7 reservations went to regular customers who will arrive for the flight. Each of the remaining passengers will arrive for the flight with a 43% chance, independently of each other. (Report answers accurate to 4 decimal places.) Find the probability that overbooking occurs. Find the probability that the flight has empty seats. Question Help: Written Example Submit Question Question 18 After being rejected for employment, Kim...
Flights American Airlines Flight 201 from New York's JFK airport to LAX airport in Los Angeles uses a Boeing 767-200 with 168 seats available for passengers. Because some people with reservations don't show up, American can overbook by accepting more than 168 reservations. If the flight is not overbooked, the airline will lose revenue due to empty seats, but if too many seats are sold and some passengers are denied seats, the airline loses money from the compensation that must...
Question 12 د) < B0/2 pts 53 99 0 Details Here is the probability model for the blood type of a randomly chosen person in the United States. Blood type 0 А. B AB Probability 0.48 0.25 0.07 0.2 What is the probability that a randomly chosen American does not have type o blood? % Round to the nearest 0.01% Question Help: D Post to forum Submit Question
Question 10 > 0/2 pts 399 Details Suppose that a box contains 8 cameras and that 4 of them are defective. A sample of 2 cameras is selected at random. Define the random variable X as the number of defective cameras in the sample. Write the probability distribution for X. k P(X = k) What is the expected value of X? Question Help: D Post to forum Submit Question