Gm533 Week 5 Lecture March 2012

Week 5 Lecture
GM 533
Applied Managerial Statistics

B. Heard
(Do not copy, post or distribute without my
permission. Students are free to download a
copy for personal use)

GM 533 Week 5
Checkpoint Examples

GM 533 Week 5
• A new computer company keeps up with its
customers’ satisfaction on a 10 point scale. The
company thinks their customer satisfaction
rating is at least 8.2. Suppose that the company
wishes to use the random sample of 33
satisfaction ratings to provide evidence
supporting the claim that the mean customers’
satisfaction rating exceeds 8.2.

GM 533 Week 5
• a: Letting μ represent the mean customer satisfaction
rating for the company, set up the null hypothesis H0
and the alternative hypothesis Ha needed if we wish to
attempt to provide evidence supporting the claim that μ
exceeds 8.2.
• b: The random sample of 33 satisfaction ratings yields a
sample mean of x̄ = 8.295 . Assuming that s equals
0.28, use critical values to test H0 versus Ha at each of α
= .10, .05, .01, and .001.
• c: Using the information in part b, calculate the p-value
and use it to test H0 versus Ha at each of α =
.10, .05, .01, and .001.
• d: How much evidence is there that the mean customer
satisfaction rating exceeds 8.2?

GM 533 Week 5
• a: Letting μ represent the mean customer
satisfaction rating for the company, set up the
null hypothesis H0 and the alternative
hypothesis Ha needed if we wish to attempt to
provide evidence supporting the claim that μ
exceeds 8.2.

GM 533 Week 5
a: Since the claim is that the mean exceeds 8.2, it
will be our alternative. If they noted it was “at
least 8.2” it would be the null. The null always
contains equality (it will be either =, ≤ or ≥ ). So
we have
Ho: μ ≤ 8.2
Ha: μ > 8.2 (claim)

GM 533 Week 5
• b: The random sample of 33 satisfaction ratings
yields a sample mean of x̄ = 8.295 . Assuming
that s equals 0.28, use critical values to test H0
versus Ha at each of α = .10, .05, .01, and .001.

GM 533 Week 5
Calculate z, I used a template I made. Compare to
values at .10, .05, .01, and .001.
I calculate z to be 1.949

Population
Sample Mean Mean Sample Std Dev. Sample Size
8.295 8.2 0.28 33
Calculated z to compare to critical values
1.949

GM 533 Week 5
I then compared this value to the z’s calculated for the
various alpha’s (on my template also).
I compared to the “Right Tailed” column since we are
dealing with “greater than.”

As you can see z’s at 0.1
z Right Tailed and 0.05 are less than
0.1 1.28 1.949, but z’s at 0.01 and
0.001 are greater than
0.05 1.64 1.949. So we would
reject Ho at 0.1 and 0.05,
0.01 2.33 but not at 0.01 and
0.001.
0.001 3.09

GM 533 Week 5
c: Using the information in part b, calculate the p-
value and use it to test H0 versus Ha at each of α
= .10, .05, .01, and .001.

GM 533 Week 5
Using your calculated z, find the p value (I used template).
Compare to alpha’s of 0.1, 0.05, 0.01 and 0.001. The
calculated value (right tailed value) of 0.0256 again falls
in between 0.05 and 0.01. So we would reject Ho at 0.1
and 0.05, but not at 0.01 and 0.001.

P-Value Method

z Left Tailed Right Tailed Two Tailed

1.949 0.9744 0.0256 0.0513

GM 533 Week 5
• d: How much evidence is there that the mean
customer satisfaction rating exceeds 8.2?

GM 533 Week 5
How much evidence is there?
Well, at alpha’s of 0.1 and 0.05, we would accept
the claim that the mean customer satisfaction
rating is more than 8.2.
At alpha’s of 0.01 and 0.001, we would not be able
to reject the null hypothesis than the satisfaction
score is 8.2 or less.
So there is pretty strong evidence (in the 95%
confidence range, think 1- alpha)

GM 533 Week 5
• The Energy Shotz Energy Drink Company has just
installed a new bottling process that will fill 8-ounce
bottles of the popular Super Shotz Energy Drink. Both
overfilling and underfilling bottles are undesirable:
Underfilling leads to customer complaints and overfilling
costs the company considerable money and loss of
product. In order to verify that the filler is set up
correctly, the company wishes to see whether the mean
bottle fill, μ, is close to the target fill of 8 ounces. To this
end, a random sample of 64 filled bottles is selected from
the output of a test filler run. If the sample results cast a
substantial amount of doubt on the hypothesis that the
mean bottle fill is the desired 8 ounces, then the filler’s
initial setup will be readjusted.

GM 533 Week 5
• a) The energy drink company wants to set up a
hypothesis test so that the filler will be
readjusted if the null hypothesis is rejected. Set
up the null and alternative hypotheses for this
hypothesis test.

GM 533 Week 5
We want to know if it’s 8 or not.

Ho: μ = 8 (claim)
Ha: μ ≠ 8

GM 533 Week 5
• b) Suppose that Company has just installed a
new bottling process that will fill 8-ounce
decides to use a level of significance of α = .01,
and suppose a random sample of 64 bottle fills is
obtained from a test run of the filler. For each of
the following sample mean, x̄ = 8.02 −
determine whether the filler’s initial setup
should be readjusted. Use a critical value, a p-
value, and a confidence interval. Assume that s
equals .1.

GM 533 Week 5
• The calculated z of 1.60 is within the bounds of +/- 2.58, so we can
not reject Ho.

Two Tailed
z (alpha) Left Tailed Right Tailed (+/-)

0.1 -1.28 1.28 1.64

0.05 -1.64 1.64 1.96

0.01 -2.33 2.33 2.58

0.001 -3.09 3.09 3.29

GM 533 Week 5
• The p value of 0.1096 (Two tailed because of =
sign) is greater than 0.01, so we can not reject
Ho.
P-Value Method
1.600 0.9452 0.0548 0.1096

Compare to
0.1
0.05
0.01
0.001

GM 533 Week 5
• The confidence interval is [7.99, 8.05], we are
good to go. No readjustment needed!
Confidence
Interval
C (1 - alpha) s n (sample size) x bar Left Right
0.99 0.1 64 8.02 7.9878 8.0522
Margin of
Error
0.0322
0.995

GM 533 Week 5
• An excellent score on the Kindergarten Aptitude
Test (KAT) is a 9.1 out of ten points.
• a: Letting μ represent the mean score on the KAT,
set up the null and alternative hypotheses needed if
we wish to attempt to provide evidence supporting
the claim that μ exceeds 9.1.
• b: The mean and the standard deviation of a sample
of n = 49 Kindergarten Aptitude Test Takers ratings
are x̄ = 9.192 and s = 0.19. Use a critical value to
test the hypotheses you set up in your hypothesis by
setting α equal to .01.

GM 533 Week 5
• Letting μ represent the mean score on the KAT,
set up the null and alternative hypotheses
needed if we wish to attempt to provide evidence
supporting the claim that μ exceeds 9.1.
Ho: μ ≤ 9.1
Ha: μ > 9.1 (claim)

GM 533 Week 5
• The mean and the standard deviation of a
sample of n = 49 Kindergarten Aptitude Test
Takers ratings are x̄ = 9.192 and s = 0.19. Use a
critical value to test your hypothesis by setting α
equal to .01.

GM 533 Week 5
Sample Mean Population Mean Sample Std Dev. Sample Size
9.192 9.1 0.19 49
Calculated z to compare to critical values
3.389

Compare to
z (alpha) Left Tailed Right Tailed Two Tailed (+/-)
0.1 -1.28 1.28 1.64
0.05 -1.64 1.64 1.96
0.01 -2.33 2.33 2.58
0.001 -3.09 3.09 3.29

P-Value Method
3.389 0.9996 0.0004 0.0007

Compare to
0.1
0.05
0.01
0.001

GM 533 Week 5
• At a z of .01 we get 2.33 on the right tailed
(greater than). Since 3.389 is greater than 2.33
we reject Ho and say that we accept the claim
that the mean score is greater than 9.1.
• On the p-value method, 0.1,0.05,0.01 and 0.001
are all greater than the 0.0004 so we reject Ho
and accept that our mean is greater than 9.1.
There would be very strong evidence.

GM 533 Week 5
• Consider a medical company that wishes to
determine whether a new ingredient, catalyst
ST-109, changes the mean hourly yield of its
process from the historical process mean of 200
pounds per hour. When six trial runs are made
using the new catalyst, the following yields (in
pounds per hour) are recorded:
190,195,201,209,219 and 237.

GM 533 Week 5
• a: Letting μ be the mean of all possible yields
using the new ingredient, set up the null and
alternative hypotheses needed if we wish to
attempt to provide evidence that μ differs from
200 pounds.

GM 533 Week 5
Ho: μ = 200
Ha: μ≠ 200 (claim)

GM 533 Week 5
• b: The mean and the standard deviation of the
sample of 6 catalyst yields are x̄ = 208.5 and s =
17.3407 . Using a critical value and assuming
approximate normality, test the hypotheses you set
up in part α by setting α equal to .01. The p-value for
the hypothesis test is given in the Excel output
below. Interpret this p-value.
t-statistic
1.201
p-value*
0.135 •p-value made up, not calculated
in the case of this example.

GM 533 Week 5
190 Sample Mean Population Mean Sample Std Dev. Sample Size
195 208.5 200 17.3407 6
201 Calculated t to compare to critical values
209 1.201
219
237 Compare to
t (alpha) t alpha/2 (2 tailed)
Mean 0.1 2.015
208.5 0.05 2.571
Std Dev 0.01 4.032
17.3407 0.001 6.869

GM 533 Week 5
• Calculated t of 1.201 is less than t(.01/2) of 4.302, so
I would not reject Ho.

• p-value of 0.135 is larger than 0.1, 0.5, 0.01 and
0.001 so again there is strong evidence that I can
not reject that the mean is 200 pounds thus
providing no evidence to support the claim that
it is different from 200 pounds.

GM 533 Week 5
• The manufacturer of the ACME Apple Slicer
claims that 98 percent of its slicers last at least
one year without breaking. In order to test this
claim, a consumer group randomly selects 250
consumers who have owned and used an ACME
Apple Slicer for at least one year. Of these 250
consumers, 246 say that their slicer is still slicing
away, while 4 say that their slicers just don’t cut
it anymore.

GM 533 Week 5
• a.: Letting p be the proportion of slicers that last
one year without a problem, set up the null and
alternative hypotheses that the consumer group
should use to attempt to show that the
manufacturer’s claim is false or that it is less
than 98%.

GM 533 Week 5
Ho: p ≥ 0.98
Ha: p < 0.98 (claim)

GM 533 Week 5
• b.: Use critical values and the previously given
sample information to test the hypotheses you
set up in part a by setting α equal to .10, .05, .01,
and .001. How much evidence is there that the
manufacturer’s claim is false?

GM 533 Week 5
Total # of the Total p hat mu n sigma (calc) Calculated z test statistic
250 246 0.984 0.98 250 0.008854377 0.452

* p hat is a p with a rooftop

Compare to
z (alpha) Left Tailed Right Tailed Two Tailed (+/-)
0.1 -1.28 1.28 1.64
0.05 -1.64 1.64 1.96
0.01 -2.33 2.33 2.58
0.001 -3.09 3.09 3.29

P-Value Method
0.452 0.6743 0.3257 0.6514

Compare to
0.1
0.05
0.01
0.001

GM 533 Week 5
• The calculated z test statistic of 0.452 is to the right
of the left tailed values of z for every alpha given,
thus I can NOT reject the null hypothesis that p =
0.98
• There is strong evidence! (Thus I can’t agree with
the consumer group’s claim that it is less than 98%
or better yet I can not reject the null that it is greater
than or equal to 98%)
• By the p-value method, 0.6743 is greater than 0.1,
0.05, 0.01 and 0.001 thus again I can NOT reject the
null hypothesis.

GM 533 Week 5
• c.: Do you think the results of the consumer
group’s survey have practical importance?
Explain your opinion.
• Yes, I do, but not what they expected. “p hat”
was calculated to be 0.984 which is above the
company’s claimed 98%, it seems there is strong
evidence that we CAN NOT reject the company’s
claim and definitely can’t agree with the
consumer group that it is less than that.

GM 533 Week 5
• I will post these charts in my Statcave at

www.facebook.com/statcave

I will also make my Excel template available at the
Statcave by Wednesday at the latest. (I needed
to change a couple of things so it handles
negative z-scores correctly).

Gm533 Week 5 Lecture March 2012

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