Describe the sampling distribution of p. Round to three decimal places when necessary. N = 24.000,...
Describe the sampling distribution of p. Assume the size of the population is 20,000. n = 800, p = 0.525 Describe the shape of the sampling distribution of P. Choose the correct answer below. O A. The shape of the sampling distribution of p is approximately normal because ns 0.05N and np(1 -p) 10. OB. The shape of the sampling distribution of p is approximately normal because n s 0.05N and np(1-p) < 10. OC. The shape of the sampling...
Describe the sampling distribution of p. Assume the size of the population is 30,000. n 800, p 0.465 Describe the shape of the sampling distribution of p. Choose the correct answer below O A. The shape of the sampling distribution of p is approximately normal because n s 0.05N and np(1 -p)2 10 О с. OD. The shape of the sampling distribution of pis not normal because n s 0.05N and np(1-p)2 10. Determine the mean of the sampling distribution...
could i please get help with this question thank you! Describe the sampling distribution of P. Assume the size of the population is 20,000. n=300, p=0.7 Choose the phrase that best describes the shape of the sampling distribution of p below. O A. Approximately normal because ns0.05N and np(1-P) < 10. OB. Not normal because ns0.05N and np(1-P) 10. O C. Approximately normal because ns0.05N and np(1 - p) 10. OD. Not normal because ns0.05N and np(1-p) < 10. Determine...
Describe the sampling distribution of p. Assume the size of the population is 25,000. n = 200, p = 0.8 Choose the phrase that best describes the shape of the sampling distribution of p below. O O A. Not normal because ns0.05N and np(1 - p) 2 10. B. Not normal because n s 0.05N and np(1-p) < 10. OC. Approximately normal because ns0.05N and np(1 - p) 10. OD. Approximately normal because ns0.05N and np(1 - p) < 10....
Describe the sampling distribution of p. Assume the size of the population is 30,000. n-1400, p 0.376 Describe the shape of the sampling distribution of p. Choose the correct answer belovw. O A. The shape of the sampling distribution of p is not normal because ns0.05N and np(1-p)210. O B. The shape of the sampling distribution of p is approximately normal because n s0.05N and np(1 p)10. O C. The shape of the sampling distribution of p is approximately normal...
Describe the sampling distribution of p. Assume the size of the population is 25,000. n 700, p 0.548 Describe the shape of the sampling distribution of p. Choose the correct answer below. O A. O B. The The shape of the sampling distribution of p is not normal because ns 0.05N and np ( p)10 n0.05N and np(1-p)1 distribution of p is approximately normal because ns The shape of the sampling distribution of p is approximately normal because ns0.05N and...
8f 28 (7 complete) Describe the sampling distribution of p. Assume the size of the population is 20,000 n-900, p-0712 Describe the shape of the sampling distribution of p. Choose the correct answer below O A. The shape of the sampling distribution of 'p is not normal because n s 0.05N and np(1-p)2 10 O B. The shape of the sampling distribution of p is not normal because n s0.05N and np(1-p)< 10. O C. The shape of the sampling...
Describe the sampling distribution of p. Assume the size of the population is 15,000 n = 500, p = 0.6 Choose the phrase that best describes the shape of the sampling distribution of p below. A. Approximately normal because ns0.05N and np(1-p) < 10. B. Not normal because ns 0.05N and np(1-p) < 10. OC. Not normal because ns0.05N and np(1-P) 10. O D. Approximately normal because ns 0.05N and np(1-P) 2 10. Determine the mean of the sampling distribution...
According to a study conducted in one city, 29% of adults in the city have credit card debts of more than $2000. A simple random sample of n=250 adults is obtained from the city. Describe the sampling distribution of the sample adults who have credit card debts of more than $2000. Round to three decimal places when necessary. proportion O A. Approximately normal; Hp = 0.29, = 0.029 O B. Binomial; p = 72.5, 7.175 OC. Approximately normal; Hp =...
According to a study conducted in one city, 32% of adults in the city have credit card debts of more than $2000. A simple random sample of n=200 adults is obtained from the city. Describe the sampling distribution of p, the sample proportion of adults who have credit card debts of more than $2000. Round to three decimal places when necessary. Awnser this A B C D pick the correct awnser and make sure it correct I put it in...