Lifespan: Assume the average life-span of those
born in the U.S. is 78.2 years with a standard deviation of 16
years. The distribution is not normal (it is skewed left). The good
people at Live-Longer-USA (fictitious) claim that their
regiment of acorns and exercise results in longer life. So far, 50
people on this program have died and the mean age-of-death was 85.5
years.
(a) Calculate the probability that a random sample of 50 people
from the general population would have a mean age-of-death greater
than 85.5 years. Round your answer to 4 decimal
places.
(b) Which statement best describes the situation for those in the
Live Longer program?
This provides solid evidence that acorns and exercise cause people to live longer.
This provides solid evidence that acorns and exercise have nothing to do with age-of-death.
Since the probability of getting a sample of 50 people with a mean age-of-death greater than those in the Live Longer program is so small, this suggests that people enrolled in the program do actually live longer on average.
(c) Why could we use the central limit theorem here despite the
parent population being skewed?
Because the sample size is greater than 30.
Because skewed-left is almost normal.
Because the sample size is greater than 20.
Because the sample size is less than 100.
| for normal distribution z score =(X-μ)/σx | |
| here mean= μ= | 78.2 |
| std deviation =σ= | 16 |
| sample size =n= | 50 |
| std error=σx̅=σ/√n= | 2.2627 |
a)
| probability = | P(X>85.5) | = | P(Z>3.23)= | 1-P(Z<3.23)= | 1-0.9994= | 0.0006 |
b)
Since the probability of getting a sample of 50 people with a mean age-of-death greater than those in the Live Longer program is so small, this suggests that people enrolled in the program do actually live longer on average.
c)
Because the sample size is greater than 30.
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