n=18, p=0.4, x=12 compute the probability of x success, using the bionomial distrbution table

Suppose X is a binomial random variable, where n=12 and p = 0.4 compute p >=...

Suppose X is a binomial random variable, where n=12 and p = 0.4 compute p >= 10 a) 0.00032 b) 0.00661 c) 0.00459 d) 0.00281

approximate the following binomial probabilities for this continuous probability distribution p(x=18,n=50,p=0.3) p(x>15,n=50,p=0.3) p(x>12,n=50,p=0.3) p(12<x<18,n=50,p,=0.3)

approximate the following binomial probabilities for this continuous probability distribution p(x=18,n=50,p=0.3) p(x>15,n=50,p=0.3) p(x>12,n=50,p=0.3) p(12<x<18,n=50,p,=0.3)

a binomial probability experiment is conducted within the given parameters. compute the probability of x success...

a binomial probability experiment is conducted within the given parameters. compute the probability of x success in the n independent trials of the period. n = 12, p= 0.3, x is less than or equal to 4

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used...

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used to estimate this probability. If​ so, approximate​ P(X) using the normal distribution and compare the result with the exact probability. n= 62​, p= 0.4​, and X= 31

Normal Approximation to Binomial Assume n = 100, p = 0.4. Use the Binomial Probability function...

Normal Approximation to Binomial Assume n = 100, p = 0.4. Use the Binomial Probability function to compute the P(X = 40) Use the Normal Probability distribution to approximate the P(X = 40) Are the answers the same? If not, why?

compute the probability of x's success's using the binomial formula n=6, x=3, p=0.03

compute the probability of x's success's using the binomial formula n=6, x=3, p=0.03

Suppose that X follows geometric distribution with the probability of success p, where 0 < p...

Suppose that X follows geometric distribution with the probability of success p, where 0 < p < 1, and probability of failure 1 − p = q. The pmf is given by f(x) = P(X = x) = q x−1p, x = 1, 2, 3, 4, . . . . Show that X is a pmf. Compute the mean and variance of X without using moment generating function technique. Show all steps. To compute the variance of X, first compute...

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used...

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used to estimate this probability. If​ so, approximate​ P(X) using the normal distribution and compare the result with the exact probability. n=62 p=.5 x=41

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used...

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used to estimate this probability. If​ so, approximate​ P(X) using the normal distribution and compare the result with the exact probability. n=66, p=0.66 and X=39 A. find P(X) B. find P(x) using normal distribution C. compare result with exact probability

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used...

Compute​ P(X) using the binomial probability formula. Then determine whether the normal distribution can be used to estimate this probability. If​ so, approximate​ P(X) using the normal distribution and compare the result with the exact probability. n=62​, p=0.3 and X=16 A. find P(X) B. find P(x) using normal distribution C. compare result with exact probability