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5 votes
5 votes
Calculate the z-test statistic for a hypothesis test in which the null hypothesis states that the population proportion, p, equals 0.14 if the following sample information is

present
n = 200
x= 31
(Round to two decimal places as needed.)
Z=

User Doug Hays
by
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1 Answer

13 votes
13 votes

Answer:

The z-test statistic for a hypothesis test in which the null hypothesis states that the population proportion, p, equals 0.14 if the following sample information is present (n = 200; x = 31) is z = .6114.

Explanation:

The z-test statistic formula is:


  • \displaystyle z=\frac{\hat{p}-p}{\sqrt{(p(1-p))/(n) } }

We are given x = 31 and n = 200, so we can solve for
\hat{p} : 31/200 = .155.

The population proportion,
p=.14, is given in the problem.

We can substitute the known values into the z test statistic formula:


  • \displaystyle z = \frac{.155-.14}{\sqrt{(.14(.86))/(200) } }

  • \displaystyle z=\frac{.015}{\sqrt {.000602}}

  • z=.6114

The z-test statistic for this problem is z = .6114.

User HAxxor
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