Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x = 14, n = 16, p = 0.80) =
Calculate the following binomial probability by either using one of the binomial probability tables, software, or...
Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x = 11, n = 13, p = 0.80) =
Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x = 11, n = 13, p = 0.70) =
Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x > 12, n = 15, p = 0.7) =
Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x = 10, n = 12, p = 0.75) =
Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x > 10, n = 15, p = 0.8) =
Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p ) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x < 4, n = 10, p = 0.4) = If you can please explain to me how to do this besides just the answer?
How do I get the answer to Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x < 8, n = 9, p = 0.9) =
How do you figure this in excel? Correct answer? Calculate the following binomial probability by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answer to 3 decimal places. P(x | n, p) = n! (n − x)! x! · px · qn − x where q = 1 − p P(x = 7, n = 10, p = 0.4) =
Calculate the following binomial probabilities by either using one of the binomial probability tables, software, or a calculator using the formula below. Round your answers to 3 decimal places. A.) P(x | n, p) = n! / (n − x)! x! · p^x · q^n − x where q = 1 − p P(x < 7, n = 8, p = 0.9)= B.) P(x | n, p) = n! / (n − x)! x! · p^x · q^n − x...
Assume the random variable X has a binomial distribution with the given probability of obtaining a success. Find the following probability, given the number of trials and the probability of obtaining a success. Round your answer to four decimal places. P(X>2)P(X>2), n=5n=5, p=0.4 success. Find the following probability, given the number of trials and the probability of obtaininga success. Round your answer to four decimal places. PX > 2), n 5, p = 0.4 Tables Keypad Answer How to enter...