Exam 1

  1. Question

    A machine fills milk into 500500ml packages. It is suspected that the machine is not working correctly and that the amount of milk filled differs from the setpoint μ0=500\mu_0 = 500. A sample of 247247 packages filled by the machine are collected. The sample mean y\bar{y} is equal to 521.3521.3 and the sample variance sn12s^2_{n-1} is equal to 527.08527.08.

    Test the hypothesis that the amount filled corresponds on average to the setpoint. What is the value of the t-test statistic?


    1. 1.2751.275
    2. 13.070-13.070
    3. 53.309-53.309
    4. 9.8889.888
    5. 14.58114.581

    Solution

    The t-test statistic is calculated by: t=yμ0sn12n=521.3500527.08247=14.581. \begin{aligned} t & = & \frac{\bar y - \mu_0}{\sqrt{\frac{s^2_{n-1}}{n}}} = \frac{521.3 - 500}{\sqrt{\frac{527.08}{247}}} = 14.581. \end{aligned} The t-test statistic is thus equal to 14.58114.581.


    1. False
    2. False
    3. False
    4. False
    5. True