the director of health services is concerned about a possible flu outbreak at her college. she surveyed 100…

the director of health services is concerned about a possible flu outbreak at her college. she surveyed 100 randomly selected residents from the colleges dormitories to see whether they had received a preventative flu shot. the results are shown below. what is the probability that a dormitory resident chosen at random from this group has had a flu shot, given that he is male?\n| | had flu shot | didnt have flu shot | total |\n|--|--|--|--|\n| male | 39 | 12 | 51 |\n| female | 41 | 8 | 49 |\n| total | 80 | 20 | 100 |

the director of health services is concerned about a possible flu outbreak at her college. she surveyed 100 randomly selected residents from the colleges dormitories to see whether they had received a preventative flu shot. the results are shown below. what is the probability that a dormitory resident chosen at random from this group has had a flu shot, given that he is male?\n| | had flu shot | didnt have flu shot | total |\n|--|--|--|--|\n| male | 39 | 12 | 51 |\n| female | 41 | 8 | 49 |\n| total | 80 | 20 | 100 |

Answer

Explanation:

Step1: Recall conditional - probability formula

The formula for conditional probability is $P(A|B)=\frac{P(A\cap B)}{P(B)}$. In the context of a two - way table, if $A$ is the event of having a flu shot and $B$ is the event of being male, $P(A|B)=\frac{\text{Number of males who had flu shot}}{\text{Total number of males}}$.

Step2: Identify values from the table

The number of males who had a flu shot is 39, and the total number of males is 51.

Step3: Calculate the probability

$P(\text{Flu Shot}|\text{Male})=\frac{39}{51}$.

Answer:

$\frac{39}{51}$