Assume that a procedure yields a binomial distribution with a trial repeated n = 14 n = 14 times. Use either the binomial probability formula (or a technology like Excel or StatDisk) to find the probability of k = 14 k = 14 successes given the probability p = p = 23/30 of success on a single trial. (Report answer accurate to 4 decimal places.) P ( X = k ) =
solution:
Given data
sample size (n) = 14
Probability of success (p) = 23/30
k = 14
Let X be the random variable representing the no.of success
X~B(n,p)
~B(14, 23/30)
P(X=x) = nCx * (p)^x * (1-p)^n-x
Now, P(X=k) = P(X=14)
= 14C14 * (23/30)^14 * (7/30)^0
= 0.0242
For k=14 , P(X=k) = 0.0242
Assume that a procedure yields a binomial distribution with a trial repeated n = 14 n...
Assume that a procedure yields a binomial distribution with a trial repeated n = 8 times. Use either the binomial probability formula (or technology) to find the probability of k = 5 successes given the probability p = 0.31 of success on a single trial. (Report answer accurate to 4 decimal places.) P(X = k) = Submit Question Question 8 Assume that a procedure yields a binomial distribution with a trial repeated n = 15 times. Use either the binomial...
Assume that a procedure yields a binomial distribution with a trial repeated n = 18 times. Use either the binomial probability formula (or a technology like Excel or StatDisk) to find the probability of k = 0 successes given the probability p = 0.36 of success on a single trial.
Assume that a procedure yields a binomial distribution with a trial repeated n = 9 times. Use either the binomial probability formula (or technology) to find the probability of k = 6 successes given the probability p = 0.53 of success on a single trial. (Report answer accurate to 4 decimal places.) P(X = k) = C
Assume that a procedure yields a binomial distribution with a trial repeated n = 18 n=18 times. Use either the binomial probability formula (or a technology like Excel or StatDisk) to find the probability of k = 2 k=2 successes given the probability p = 0.29 p=0.29 of success on a single trial. (Report answer accurate to 4 decimal places.) P ( X = k ) = P(X=k)= * trying to do this in Exel so far all I have...
Assume that a procedure yields a binomial distribution with a trial repeated n = 5 times. Use some form of technology like Excel or StatDisk to find the probability distribution given the probability p = 0.413 of success on a single trial. (Report answers accurate to 4 decimal places.) k P(X = k) 0 1 N 3 4 5 Question Help: Video Post to forum Submit Question
Assume that a procedure yields a binomial distribution with a trial repeated n= 12 times. Use either the binomial probability formula (or a technology like Excel, Google Sheets, or Desmos) to find the probability of k = 7 successes given the probability q = 0.65 of a failure on a single trial. (Report answer accurate to 4 decimal places.) P(X = k) = 1 I Enter an integer or decimal number
1) Assume that a procedure yields a binomial distribution with a trial repeated n=5n=5 times. Use some form of technology like Excel or StatDisk to find the probability distribution given the probability p=0.444p=0.444 of success on a single trial. (Report answers accurate to 4 decimal places.) k P(X = k) 0 1 2 3 4 5
Assume that a procedure yields a binomial distribution with a trial repeated n=5 times. Use some form of technology like Excel or StatDisk to find the probability distribution given the probability p=0.808 of success on a single trial. k P(X = k) 0 1 2 3 4 5
please help with both ***Assume that a procedure yields a binomial distribution with a trial repeated n = 16 times. Find the probability of X > 3 successes given the probability p = 0.26 of success on a single trial. (Report answer accurate to 3 decimal places.) ***Assume that a procedure yields a binomial distribution with a trial repeated n=20n=20 times. Find the probability of x≥11x≥11 successes given the probability p=0.6p=0.6 of success on a single trial. (Report answer accurate...
Assume that a procedure yields a binomial distribution with a trial repeated n=17n=17 times. Use the binomial probability formula to find the probability of k=3k=3 successes given the probability p=p=1/4 of success on a single trial. (Report answer accurate to 4 decimal places.) P(X=3)=