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10.5% of the population is 65 or older. Find the probability that the following number of persons selected at random from 25 people are 65 or older.The probability that at most 2 are 65 or older is(Round to three decimal places as needed)

User Mojtaba Ramezani
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1 Answer

12 votes
12 votes

Given:

The sample size n=25

Probability of population is 65 or older is 10.5%.

This date follows the binomial distribution,


\begin{gathered} n=25,p=0.105 \\ X\rightarrow B(n=25,p=0.105) \end{gathered}

To find the probability that at most 2 are 65 or older,


\begin{gathered} P(X=x)=^nC_x(p)^x(1-p)^(n-x) \\ P(0\leq X\leq2)=P(X=0)+P(X=1)+P(X=2) \\ =^(25)C_0(0.105)^0(1-0.105)^(25-0)+^(25)C_1(0.105)^1(1-0.105)^(25-1)+^(25)C_2(0.105)^2(1-0.105)^(25-2) \\ =0.0625+0.1832+0.2579 \\ =0.5036 \\ \approx0.504 \end{gathered}

Answer: Probability is 0.504 .

User Lita
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