Multiple Choice
Consider the claim that 60% of the members of a population of bacteria have a plasmid conferring antibiotic resistance. If we collected some random bacterial samples and the P-value of a binomial test was 0.15, what would our conclusion be?
A) We fail to reject the null hypothesis and therefore conclude that the true proportion of bacteria with resistance plasmids differs from 60%.
B) We fail to reject the null hypothesis and therefore conclude that the true proportion of bacteria with resistance plasmids does not differ from 60%.
C) We reject the null hypothesis and therefore conclude that the true proportion of bacteria with resistance plasmids differs from 60%.
D) We reject the null hypothesis and therefore conclude that the true proportion of bacteria with resistance plasmids does not differ from 60%.
Correct Answer:
Verified
Correct Answer:
Verified
Q2: Consider a set of nine separate water
Q3: The term <span class="ql-formula" data-value="\left(\begin{array}{c}10
Q4: Consider a binomial distribution with a sample
Q5: When calculating binomial probabilities, we use the
Q6: Imagine a surgery that is known to
Q8: What is the 95% confidence interval, using
Q9: Consider a situation in which a group
Q10: If a study with a total sample
Q11: Consider the claim that 60% of the
Q12: The value of 99! / 97! is