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To convert the X intervals to z intervals.
Fawns Fawns between 1 and 5 months old in Mesa Verde National Park have a body weight that is approximately normally distributed with mean μ = 27.2 kilograms and standard deviation σ = 4.3 kilograms (based on information from The Mule Deer of Mesa Verde National Park, by G. W. Micrau and J. L. Schmidt, Mesa Verde Museum Association). Let x be the weight of a fawn in kilograms. Convert each of the following x intervals to z intervals.
(a) x < 30
(b) 19 < x
(c) 32 < x < 35
Convert each of the following z intervals to x intervals.
(d) - 2.17 < z
(e) z < 1.28
(f) -1.99 < z < 1.44
(g) If a fawn weighs 14 kilograms, would you say it is an unusually small animal?
(h) if a fawn is unusually large, would you say that the z value for the weight of the fawn will be close to 1, --2, or 3? Explain.
At the 0.05 level of significance, is there evidence of a significant relationship between the age groups and where people primarily get their news? If so explain the relationship.
Determine the mean and standard deviation of this distribution?
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Utilizing the 5% level of significance as there was a significant change in cholesterol level. Their total cholesterol levels before also after the diet.
What is the appropriate set of hypotheses to test such that a possible outcome of the test would indicate;
What do you find out when you perform the nonparametric statistics?
The random variable x is known to be uniformly distributed between 1.0 and 1.5.
Find a 95% confidence interval for the mean daily caloric intake. Interpret this interval.
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