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Use a normal approximation to find the probability of the indicated number of voters. In this case assume that 150 eligible voters aged 18-24 are randomly selected. Suppose a previous study showed that
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Use a normal approximation to find the probability of the indicated number of voters. In this case assume that 150 eligible voters aged 18-24 are randomly selected. Suppose a previous study showed that among eligible voters aged 18-24, 22% of them voted.

The probability that fewer than 39 of 150 eligible voters voted is

User Mehdi Jahed Manesh
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The number of people who voted follows a binomial distribution with probability of having voted
p=0.22 and
n=150 subjects, which means the approximating normal distribution should have mean
np=33 and standard deviation
√(np(1-p))\approx5.07.

With the continuity correction, you have


\mathbb P(X<39)\approx\mathbb P(X<38.5)=\mathbb P\left((X-33)/(5.07)<(38.5-33)/(5.07)\right)=\mathbb P(Z<1.08)\approx0.86
User Robert Massa
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