Suppose that the height of Mc female students has normal distribution with mean
ID: 3256904 • Letter: S
Question
Suppose that the height of Mc female students has normal distribution with mean 62 inches and standard deviation 8 inches. a. Find the height below which is the shortest 30% of the female students. b. Find the height above which is the tallest 5% of the female students 8.MENSA is an organization whose members possess IQs in the top 2% of the population. If IQs are normally distributed, with mean 100 and a standard deviation of 16, what is the minimum IQ required for admission to MENSA 9. Let X be a normal random variable with mean = 12 and standard deviation = 2. Find the X corresponding to the 10th percentile of this distribution 10. Entry to a certain University is determined by a national test. The scores on this test are normally distributed with a mean of 500 and a standard deviation of 100. Tom wants to be admitted to this university and he knows that he must score better than at least 70% of the students who took the test. Tom takes the test and scores 585. Will he be admitted to this university? 11. Let X be scores on a computer skills test with mean = 100 and standard deviation = 10. Assume the scores follow a normal distribution. Find the 90th percentile for these scoresExplanation / Answer
7)
for bottom 30%; zscore =-0.5244
hence corresponding height =mean +z*std deviation=62-0.5244*8=57.8048
for top 5%; z=1.645
hence corresponding height =mean +z*std deviation=62+1.645*8=75.1588
8)
for top 2%; z=2.0537
hence corresponding score =mean +z*std deviation=100+2.0537*16=132.86
9)
for 10-th percentile ; zscore =-1.2816
corresponding X =12-1.2816*2=9.4369
10)
for 70 percentile; z=0.5244
therefore corresponding score =500+0.5244*100=552.44
as Tom score is higher then that ; therefore he should get admission
11)
for 90th percentile; z=1.2816
therefore corresponding score =100+1.2816*10=112.816
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