The heights of a certain group of adult parrots were found to be normally distributed. The mean height is 36 cm with a standard deviation of 7 cm. In a group of 1200 of these birds, how many would be more than 29 cm tall?

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The heights of a certain group of adult parrots were found to be normally distributed. The mean height is 36 cm with a standard deviation of 7 cm. In a group of 1200 of these birds, how many would be more than 29 cm tall?

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Answer 1 · 2017-06-06T11:52:16

1010

Explanation:

Let $X$ $X$ be the height of the birds. $X$ $X$ is distributed normally so we write it: $X ~ N (36, 7^{2})$ $X ~ N(36, 7^2)$ . The expected number of birds more than 29cm tall will be 1200 multiplied by P(Bird is taller than29cm).
$P (X > 29)$ $P(X > 29)$
First, standardise the normal by making it a $z$ $z$ value.
$= P (Z > \frac{29 - 36}{7}) = P (Z > - 1)$ $=P(Z > \frac{29-36}{7}) = P(Z > -1)$
And in the normal distribution: $P (Z > - z) = P (Z < z)$ $P(Z > -z) = P(Z < z)$
So $P (Z > - 1) = P (Z < 1)$ $P(Z > -1) = P(Z < 1)$ .
Using stat tables you can find that $P (Z < 1) = 0.8413$ $P(Z < 1) = 0.8413$ .
So the expected no. birds taller than 29cm is $0.8413 \cdot 1200 = 1010$ $0.8413 * 1200 = 1010$ rounded to the nearest no. birds.

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The heights of a certain group of adult parrots were found to be normally distributed. The mean height is 36 cm with a standard deviation of 7 cm. In a group of 1200 of these birds, how many would be more than 29 cm tall?

1 Answer

Explanation:

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