Respuesta :
Answer:
The 95% confidence interval for μ for the given situation is between 87.49 and 94.51.
Step-by-step explanation:
We have that to find our [tex]\alpha[/tex] level, that is the subtraction of 1 by the confidence interval divided by 2. So:
[tex]\alpha = \frac{1-0.95}{2} = 0.025[/tex]
Now, we have to find z in the Ztable as such z has a pvalue of [tex]1-\alpha[/tex].
So it is z with a pvalue of [tex]1-0.025 = 0.975[/tex], so [tex]z = 1.96[/tex]
Now, find the margin of error M as such
[tex]M = z*\frac{\sigma}{\sqrt{n}}[/tex]
In which [tex]\sigma[/tex] is the standard deviation of the population and n is the size of the sample.
[tex]M = 1.96\frac{20}{\sqrt{125}} = 3.51[/tex]
The lower end of the interval is the sample mean subtracted by M. So it is 91 - 3.51 = 87.49
The upper end of the interval is the sample mean added to M. So it is 91 + 3.51 = 94.51
The 95% confidence interval for μ for the given situation is between 87.49 and 94.51.
Answer:
[tex]91-1.96\frac{20}{\sqrt{125}}=87.494[/tex]
[tex]91+1.96\frac{20}{\sqrt{125}}=94.506[/tex]
So on this case the 95% confidence interval would be given by (87.494; 94.506). We have 95% of confidence that the true mean is between the limits founded.
Step-by-step explanation:
Notation
[tex]\bar X=91[/tex] represent the sample mean
[tex]\mu[/tex] population mean (variable of interest)
[tex]\sigma=20[/tex] represent the population standard deviation
n=125 represent the sample size
Confidence interval
The confidence interval for the mean if we know the deviation is given by the following formula:
[tex]\bar X \pm z_{\alpha/2}\frac{\sigma}{\sqrt{n}}[/tex] (1)
Since the Confidence is 0.95 or 95%, the value of significance is [tex]\alpha=0.05[/tex] and [tex]\alpha/2 =0.025[/tex], and we can use excel, a calculator or a table to find the critical value. The excel command would be: "=-NORM.INV(0.025,0,1)".And we see that [tex]z_{\alpha/2}=1.96[/tex]
Now we have everything in order to replace into formula (1):
[tex]91-1.96\frac{20}{\sqrt{125}}=87.494[/tex]
[tex]91+1.96\frac{20}{\sqrt{125}}=94.506[/tex]
So on this case the 95% confidence interval would be given by (87.494; 94.506). We have 95% of confidence that the true mean is between the limits founded.
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