Question #332794

The Average weight of 25 chocolate bars selected from a normally distributed population is 200 grams with a standard deviation of 10 grams. Find the point estimate and the confidence interval using 95%confidence level.

Steps: Solution:

2.Specify the confidence interval criteria.

b.Determine the test statistic to be used The test statistic is ___-test(4)

to calculate the interval.

c.State the level of confidence The level of confidence is _______(5)



1
Expert's answer
2022-04-28T16:06:21-0400

A sample mean is a point estimate of a population mean: xˉ=200 g.\bar{x}=200\ g.

A confidence interval is the most common type of interval estimate.

a. The critical value for α=0.05\alpha = 0.05 and df=n1=24df = n-1 = 24 degrees of freedom is tc=z1α/2;n1=2.063899.t_c = z_{1-\alpha/2; n-1} = 2.063899.

The corresponding confidence interval is computed as shown below:


CI=(xˉtc×sn,xˉ+tc×sn)CI=(\bar{x}-t_c\times\dfrac{s}{\sqrt{n}}, \bar{x}+t_c\times\dfrac{s}{\sqrt{n}})

=(2002.063899×1025,=(200-2.063899\times\dfrac{10}{\sqrt{25}},

200+2.063899×1025)200+2.063899\times\dfrac{10}{\sqrt{25}})

=(195.8722,204.1278)=(195.8722, 204.1278)

Therefore, based on the data provided, the 95% confidence interval for the population mean is 195.8722<μ<204.1278,195.8722<\mu<204.1278, which indicates that we are 95% confident that the true population mean μ\mu is contained by the interval (195.8722,204.1278).(195.8722, 204.1278).


b. The test statistic is t-test to calculate the interval.


c. The level of confidence is 0.95.




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Ireland #332289 on Oct 2022