Answer:
The power of the test will be highest for;
C. The sample size is n = 1,000, and 55 percent of all students actually use vending machines
Step-by-step explanation:
For a large sample test for proportions, we have;
[tex]z=\dfrac{\hat{p}-p}{\sqrt{\dfrac{p \cdot q}{n}}}[/tex]
Where;
[tex]\hat p[/tex] = The percentage of the hypothesized proportion = 20% = 0.20
p = The actual proportion
n = The size of the sample
The power of the test increases when;
The sample size 'n' is large
When the true vale of the measured items in the test is much larger than the value set as the null hypothesis
When the significant level is high
Therefore, we have;
The power of the test will be highest when the sample size is n = 1,000, and 55 percent of all students actually use vending machines
