Answer:
a
The null hypothesis is [tex]H_o : p = 0.75[/tex]
The alternative hypothesis is [tex]H_a : p \ne 0.75[/tex]
b
[tex]t = 2.51[/tex]
c
[tex]p-value = 0.01207[/tex]
d
There no sufficient evidence to conclude that 75% of adults say that it is morally wrong to not report all income on tax returns
Step-by-step explanation:
From the question we are told that
The sample size is [tex]n = 745[/tex]
The number that said it is morally wrong is [tex]k = 589[/tex]
The level of significance is [tex]\alpha = 0.01[/tex]
The population proportion is [tex]p = 0.75[/tex]
Generally the sample proportion is mathematically represented as
[tex]\r p = \frac{k}{n}[/tex]
=> [tex]\r p = \frac{589}{745}[/tex]
=> [tex]\r p = 0.79[/tex]
The null hypothesis is [tex]H_o : p = 0.75[/tex]
The alternative hypothesis is [tex]H_a : p \ne 0.75[/tex]
The standard error is mathematically represented as
[tex]SE = \sqrt{\frac{p(1-p)}{n} }[/tex]
=> [tex]SE = \sqrt{\frac{0.75(1-0.75)}{745} }[/tex]
=> [tex]SE =0.0159[/tex]
Generally the test statistics is mathematically represented as
[tex]t = \frac{\r p - p }{SE}[/tex]
=> [tex]t = \frac{0.79 - 0.75 }{0.0159}[/tex]
=> [tex]t = 2.51[/tex]
Generally the p-value is mathematically represented as
[tex]p-value = 2 * P(Z > 2.51)[/tex]
From the the z-table
[tex]P(Z > 2.51) = 0.0060366[/tex]
=> [tex]p-value = 2 * 0.0060366[/tex]
=> [tex]p-value = 0.01207[/tex]
From the calculation [tex]p-value >\alpha[/tex]
Hence we fail to reject the null hypothesis
Thus there no sufficient evidence to conclude that 75% of adults say that it is morally wrong to not report all income on tax returns
