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7. In a survey, 156 people indicated that they prefer cats, 59 indicated that they prefer dogs, and 61 indicated that they don't enjoy either pet. Find the probability that a randomly chosen person will prefer dogs.

User Sayantam
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1 Answer

18 votes
18 votes

Let C and D be the set of people who prefer cats and dogs respectively.

According to the given problem,


\begin{gathered} n(C)=156 \\ n(D)=59 \\ n(none)=61 \end{gathered}

Note that mathematically, you can prefer one thing at a time. That means that none of the surveyed people will prefer cat and dog both,


n(C\cap D)=0

Then the total number of people surveyed is calculated as,


\begin{gathered} n(Total)=n(C)+n(D)+n(none) \\ n(Total)=156+59+61 \\ n(Total)=276 \end{gathered}

The probability of an event is given by,


\text{ Probability}=\frac{\text{ Number of favorable outcomes}}{\text{ Total number of outcomes}}

So the probability that a randomly chosen person will prefer dogs, is calculated as,


\begin{gathered} P(D)=(n(D))/(n(Total)) \\ P(D)=(59)/(276) \end{gathered}

Thus, the corresponding probability is,


(59)/(276)

User Clzola
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