The hypotheses are:
H
0
:
The sample is drawn from a population whose mean is the same as
the
standardized
population
(
µ
=
µ
)
.
0
H
A
:
The sample is drawn from a population whose mean is larger than
that of the standardized population
(
µ >
µ
)
.
0
NUM
In the
PLOT
.
Enter the values for the mean and standard deviation of the standardized
If we now change to the
view we can see that the test z score is
less than the required critical z*, and the probability of obtaining a
mean of the value found is 0.1080, which is larger than the required test
view, we can see visually that the vertical line representing
the sample mean is not within the region of rejection marked by the R
Change to the
NUM SETUP
view, you can use the
import facility to import the summary statistics from
the Statistics aplet.
test, and the significance level of 0.05 (5%).
value of 0.05.
From the evidence the teacher must reject the alternate hypothesis and conclude that it is not possible to say at
the 5% level of significance that his class has averaged significantly higher than the standardized population
from which the test was drawn. He should re-think his proposed paper or his new teaching method.
Alternatively, from the diagram in the
PLOT
view it seems that his mean is not far from being significant.
Perhaps he simply needs to collect more data in the hopes that this may back up his view. The result he has
obtained is, after all, only a probability and further investigation may give a different view.
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