Consider a population with the following. μ = 49 and σ = 4.7
(a) Calculate the z-score for an x of 48.8 from a sample of size 32. (Give your answer correct to two decimal places.)
(b) Could this z-score be used in calculating probabilities using Table 3 in Appendix B? Why or why not?
Consider a population with the following. μ = 49 and σ = 4.7 (a) Calculate the...
Consider a population with the following. μ = 35 and σ = 4.7 (a) Calculate the z-score for an x of 47.9 from a sample of size 43. (Give your answer correct to two decimal places.) (b) Could this z-score be used in calculating probabilities? Why or why not?
onsider a population with the following. μ = 46 and σ = 5.8 (a) Calculate the z-score for an x of 47.1 from a sample of size 41. (Give your answer correct to two decimal places.) (b) Could this z-score be used in calculating probabilities using Table 3 in Appendix B? Why or why not? You may need to use the appropriate table in Appendix B to answer this question.
1) Consider a population with the following. μ = 35 and σ = 4.7 (a) Calculate the z-score for an x of 47.9 from a sample of size 43. (Give your answer correct to two decimal places.) (b) Could this z-score be used in calculating probabilities using Table 3 in Appendix B? Why or why not? (c) If α is assigned the value 0.001, what are we saying about the type I error? -very serious -somewhat serious -not at all...
5. О-n0 points JKEStat11 E030 Consider a population with the following μ=38 and σ = 5 (a) Calculate the z score for an x of 48.9 from a sample of size 29. (Give your answer correct to two decimal places.) (b) Could this z-score be used in calculating probabilities using Table 3 in Appendix 8? Why or why not?
Consider a normal population with μ = 37 and σ = 4.3. Calculate the z-score for an x of 48.5 from a sample of size 11. (Give your answer correct to two decimal places.) You may need to use the appropriate table in Appendix B to answer this question.
Consider a normal population with the following. (Give your answers correct to two decimal places.) μ = 24.5 and σ = 4 (a) Calculate the z-score for an x of 21.5. (b) Calculate the z-score for an x of 21.5 from a sample of size 22. (c) Explain how 21.5 can have such different z-scores. x and x belong to the same distribution x and x belong to different distributions You may need to use the appropriate table in Appendix...
Consider a normal population with the following. (Give your answers correct to two decimal places.) μ = 26 and σ = 4.6 (a) Calculate the z-score for an x of 20.9. (b) Calculate the z-score for an x of 20.9 from a sample of size 26. (c) Explain how 20.9 can have such different z-scores. x and x belong to the same distribution x and x belong to different distributions
10. -10 points JKEStat11 7.E.048 Consider a normal population with the following. (Give your answers correct to two decimal places.) μ-24.6 and σ 4.8 (a) Calculate the z-score for an x of 21. (b) Calculate the z-score for an x of 21 from a sample of size 25. (c) Explain how 21 can have such different z-scores. O x and x belong to the same distribution O x and x belong to different distributions You may need to use the...
A population of values has a normal distribution with μ = 118.5 and σ = 4.7 . You intend to draw a random sample of size n = 120 . Enter your answers as numbers accurate to 4 decimal places. Find the probability that a single randomly selected value is greater than 119.4. Find the probability that a sample of size n = 120 is randomly selected with a mean greater than 119.4.
A population of values has a normal distribution with μ=90.9 μ=90.9 and σ=46.3 σ=46.3 . You intend to draw a random sample of size n=69 n=69 . Find the probability that a single randomly selected value is between 78.6 and 89.8. P(78.6 < X < 89.8) = Find the probability that a sample of size n=69 n=69 is randomly selected with a mean between 78.6 and 89.8. P(78.6 < M < 89.8) = Enter your answers as numbers accurate to...