Homework SourseSuppose X is a normally distributed random variable with mu
Solution
a)
First, we get the z score from the given left tailed area. As
Left tailed area = 0.8315
Then, using table or technology,
z = 0.960109714
As x = u + z * s,
where
u = mean = 50
z = the critical z score = 0.960109714
s = standard deviation = 5
Then
x = critical value = 54.80054857 [ANSWER]
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b)
First, we get the z score of the left endpoint. As
x1 = left endpoint = 40
u = mean = 50
s = standard deviation = 5
Thus,
z1 = (x1 - u) / s = leftt endpoint z score = -2
Thus, by table/technology, the left tailed area of the left endpoint is
P(z<z2) = 0.022750132
Thus, the left tailed area of the right endpoint is given by
P(z1<z<z2) = 0.8962
P(z<z2) = P(z<z1) + P(z1<z<z2) = 0.918950132
Using table or technology, we see that
z2 = z score of rightt endpoint = 1.398044395
Thus,
x2 = u + z2*s = 56.99022197 [ANSWER]
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C)
First, we get the z score from the given left tailed area. As
Left tailed area = 0.25
Then, using table or technology,
z = -0.67448975
As x = u + z * s,
where
u = mean = 50
z = the critical z score = -0.67448975
s = standard deviation = 5
Then
x = critical value = 46.62755125 [ANSWER]
