A random sample of 100 credit sales in a department store showed an average sale of $130.00.$ From past data, it is known that the standard deviation of the population is $35.00.$

(a) Determine the standard error (in dollars) of the mean.
(b) With a 0.95 probability, determine the margin of error (in dollars).
(c) What is the 95% confidence interval of the population mean (in dollars)?

Answer :

Given information :

Sample mean, $\bar{x} = 130$

Population standard deviation $(σ) = 35$

Sample size $(n) = 100$

Confidence level = 95%

Solution :

→ The standard error of the mean :

$$\therefore \sigma_x = \frac{\sigma}{\sqrt{n}}$$ $$= \frac{35}{\sqrt{100}}$$ $$= 3.5$$

For a 0.95 probability, $α = 1−0.95 = 0.05$

Critical value $$Z_c = Z_{\frac{\alpha}{2}} = Z_{0.025} = 1.96$$

→ The 95% confidence interval :

$$\text{The 95\% confidence interval} = \bar{x} \pm \text{ME}$$ $$= 130 \pm 6.86$$ $$= (123.14, 136.86)$$

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