In a nationwide poll, P people were asked 2 questions. If \(\frac{2}{3}\) answered "yes" to question 1, and of those \(\frac{1}{5}\) also answered "yes" to question 2, which of the following represents the number of people polled who did not answer "yes" to both questions?
Show Hint
- \(\frac{2}{15} P\)
- \(\frac{3}{5} P\)
- \(\frac{3}{4} P\)
- \(\frac{5}{6} P\)
- \(\frac{13}{15} P\)
The Correct Option is
Solution and Explanation
Since \(\frac{2}{3}\) answered "yes" to question 1, the number of people who answered "yes" to question 1 is: \[ \frac{2}{3} P \] Step 2: Number of people who answered "yes" to both questions.
Of those who answered "yes" to question 1, \(\frac{1}{5}\) also answered "yes" to question 2. So, the number of people who answered "yes" to both questions is: \[ \frac{1}{5} \times \frac{2}{3} P = \frac{2}{15} P \] Step 3: Number of people who did not answer "yes" to both questions.
The number of people who did not answer "yes" to both questions is: \[ P - \frac{2}{15} P = \frac{13}{15} P \] Final Answer: \[ \boxed{\frac{13}{15} P} \]
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