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A random sample of 16 students selected from the student body of a large university had an average age of 25 years and a standard deviation of 2 years. We want to determine if the average age of all the students at the university is significantly more than 24. Assume the distribution of the population of ages is normal. The p-value is between
(A) .005 to .01
(B) .01 to .025
(C) .025 to .05
(D) .05 to .10

Respuesta :

Answer:

P value is  =  0.0228

option b is correct .01 to .025

Step-by-step explanation:

given data

sample n = 16 students

mean  = 25 years

standard deviation SD = 2 years

to find out

p-value

solution

first we find value of Z that is

Z = mean +  ( 1 - mean ) / (SD /√n)

put all value

Z = 25 - 24 / (2 /√16)

Z = 2

so p value for P(Z 2.0 ) from Z table

P value is  =  0.0228

so option b is correct

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