List the probability value for each possibility in the binomial experiment calculated at the beginning of...

3.) List the probability value for each possibility in the binomial experiment calculated at the beginning...

3.) List the probability value for each possibility in the binomial experiment calculated at the beginning of this lab, which was calculated with the probability of success being 1/2. (Complete sentence not necessary; round your answers three decimal places). P(x=0) 0.001 P(x=6) 0.205 P(x=1) 0.010 P(x=7) 0.117 P(x=2) 0.044 P(x=8) 0.044 P(x=3) 0.117 P(x=9) 0.010 P(x=4) 0.205 P(x=10) 0.001 P(x=5) 0.246 4.) Give the probability for the following based on the calculations in question 3 above, with the probability of...

For the next part of the lab, open the Week 3 Excel worksheet. This will be...

For the next part of the lab, open the Week 3 Excel worksheet. This will be used for the next few questions, rather than the data file used for the first question. Click on the “binomial tables” workbook Type in n=10 and p=0.5; this simulates ten flips of a coin where x is counting the number of heads that occur throughout the ten flips Create a scatter plot, either directly in this spreadsheet (if you are comfortable with those steps),...

Consider a binomial experiment with n = 9 trials where the probability of success on a...

Consider a binomial experiment with n = 9 trials where the probability of success on a single trial is p = 0.10. (Round your answers to three decimal places.) (a) Find P(r = 0). (b) Find P(r ≥ 1) by using the complement rule.

Consider a binomial experiment with n = 6 trials where the probability of success on a...

Consider a binomial experiment with n = 6 trials where the probability of success on a single trial is p = 0.45. (For each answer, enter a number. Round your answers to three decimal places.) (a) Find P(r = 0). (b) Find P(r ≥ 1) by using the complement rule

1) Suppose a random variable, x, arises from a binomial experiment. Suppose n = 6, and...

1) Suppose a random variable, x, arises from a binomial experiment. Suppose n = 6, and p = 0.11. Write the probability distribution. Round to six decimal places, if necessary. x P(x) 0 1 2 3 4 5 6 Find the mean. μ = Find the variance. σ2 = Find the standard deviation. Round to four decimal places, if necessary. σ = 2) Suppose a random variable, x, arises from a binomial experiment. Suppose n = 10, and p =...

Consider a binomial experiment with 16 trials and probability 0.65 of success on a single trial....

Consider a binomial experiment with 16 trials and probability 0.65 of success on a single trial. (a) Use the binomial distribution to find the probability of exactly 10 successes. (Round your answer to three decimal places.) (b) Use the normal distribution to approximate the probability of exactly 10 successes. (Round your answer to three decimal places.)

1.) A binomial experiment consists of 19 trials. The probability of success on trial 12 is...

1.) A binomial experiment consists of 19 trials. The probability of success on trial 12 is 0.54. What is the probability of success on trial 16? 0.54 0.15 0.39 0.88 0.5 0.11 2. Assume that 12 jurors are randomly selected from a population in which 86% of the people are Asian-Americans. Refer to the probability distribution table below and find the indicated probabilities. xx P(x)P(x) 0 0+ 1 0+ 2 0+ 3 0+ 4 0+ 5 0.0004 6 0.0028 7...

For one binomial experiment, n1 = 75 binomial trials produced r1 = 45 successes. For a...

For one binomial experiment, n1 = 75 binomial trials produced r1 = 45 successes. For a second independent binomial experiment, n2 = 100 binomial trials produced r2 = 65 successes. At the 5% level of significance, test the claim that the probabilities of success for the two binomial experiments differ. (a) Compute the pooled probability of success for the two experiments. (Round your answer to three decimal places.) (b) Compute p̂1 - p̂2. p̂1 - p̂2 = (c) Compute the...

For one binomial experiment, n1 = 75 binomial trials produced r1 = 30 successes. For a...

For one binomial experiment, n1 = 75 binomial trials produced r1 = 30 successes. For a second independent binomial experiment, n2 = 100 binomial trials produced r2 = 50 successes. At the 5% level of significance, test the claim that the probabilities of success for the two binomial experiments differ. (a) Compute the pooled probability of success for the two experiments. (Round your answer to three decimal places.) (b) Compute p̂1 - p̂2. p̂1 - p̂2 =   (c)Compute the corresponding...

Assume the random variable X has a binomial distribution with the given probability of obtaining a...

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>4), n=7, p=0.4 Find the standard deviation of the following data. Round your answer to one decimal place. x 1 2 3 4 5 6 P(X=x) 0.1 0.1 0.2 0.1 0.2 0.3