Answer:
The required P value is 0.0901.
The critical value for the test statistic is 1.645.
Step-by-step explanation:
Consider the provided information.
The test statistic of z=1.34 is obtained when testing the claim that p> 0.1
It is given given that z=1.34 as the claim has greater than inequality so it is a right tailed test.
Part (A) P-value
[tex]P\ value=1-P(Z\leq z)\\P\ value=1-P(Z\leq 1.34)[/tex]
From the Standard normal distribution table [tex]P(Z\leq 1.34) =0.9099[/tex].
Therefore,
[tex]P\ value=1-0.9099=0.0901[/tex]
Hence, the required P value is 0.0901.
Part (B) The critical value(s) is/are z=
It is given that the significance level is α=0.05
Using standard z value table we get the critical value for the test statistic is 1.645.
Hence, the critical value for the test statistic is 1.645.
