The time (in number of days) until maturity of a certain variety of tomato plant is Normally distributed with mean μ. You select a simple random sample of four plants of this variety and measure the time until maturity. The four times, in days, are as follows: 63 69 62 66 with standard deviation 3.16.

Required:
Calculate the 99% confidence interval for population mean μ. Find the closest answer

Step-by-step explanation: The true mean of a set of data is between an interval of values with a percentage of precision, e.g., a 99% confidence interval means we are 99% confident the true mean is between the lower and upper limits.

To find the interval, use

x±[tex]z\frac{s}{\sqrt{n}}[/tex]

z is z-score related to the % of confidence level

In this case, a 99% confidence interval is 2.576

x is sample mean

Calculating:

[tex]x=\frac{63+69+62+66}{4}[/tex]

x = 65

65±[tex]2.576\frac{3.16}{\sqrt{4}}[/tex]

65±4.07

Confidence Interval: 60.93 < μ < 69.07

Meaning that we are 99% sure the population means is between 60.93 and 69.07.