Multiple Choice
Construct a 95% confidence interval for the ratios of two population variances. The random samples of n1= 9 and n2= 11 with sample variances of ![Construct a 95% confidence interval for the ratios of two population variances. The random samples of n<sub>1</sub>= 9 and n<sub>2</sub>= 11 with sample variances of = 500 and = 250, respectively. Assume that the samples were drawn from a normal population. A) [0.50, 2.00] B) [0.52, 8.60] C) [0.25, 1.41] D) [0.44, 4.30]](https://d2lvgg3v3hfg70.cloudfront.net/TB6618/11ea8309_a8e9_cc1d_b223_3bd64a820c98_TB6618_11.jpg)
= 500 and ![Construct a 95% confidence interval for the ratios of two population variances. The random samples of n<sub>1</sub>= 9 and n<sub>2</sub>= 11 with sample variances of = 500 and = 250, respectively. Assume that the samples were drawn from a normal population. A) [0.50, 2.00] B) [0.52, 8.60] C) [0.25, 1.41] D) [0.44, 4.30]](https://d2lvgg3v3hfg70.cloudfront.net/TB6618/11ea8309_a8e9_f32e_b223_3fc892ab4617_TB6618_11.jpg)
= 250, respectively. Assume that the samples were drawn from a normal population.
A) [0.50, 2.00]
B) [0.52, 8.60]
C) [0.25, 1.41]
D) [0.44, 4.30]
Correct Answer:
Verified
Correct Answer:
Verified
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