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Chapter 9: Tests of hypotheses
MATH 450
November 9th, 2017
MATH 450 Chapter 9: Tests of hypotheses
![Page 2: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/2.jpg)
Overview
Week 1 · · · · · ·• Chapter 1: Descriptive statistics
Week 2 · · · · · ·• Chapter 6: Statistics and SamplingDistributions
Week 4 · · · · · ·• Chapter 7: Point Estimation
Week 7 · · · · · ·• Chapter 8: Confidence Intervals
Week 10 · · · · · ·• Chapter 9: Tests of Hypotheses
Week 12 · · · · · ·• Chapter 10: Two-sample inference
MATH 450 Chapter 9: Tests of hypotheses
![Page 3: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/3.jpg)
Overview
9.1 Hypotheses and test procedures
test procedureserrors in hypothesis testingsignificance level
9.2 Tests about a population mean
normal population with known σlarge-sample testsa normal population with unknown σ
9.4 P-values
9.2* Type II error and sample size determination
9.3 Tests concerning a population proportion
MATH 450 Chapter 9: Tests of hypotheses
![Page 4: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/4.jpg)
Type II error and sample size determination
MATH 450 Chapter 9: Tests of hypotheses
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Hypothesis testing
In any hypothesis-testing problem, there are two contradictoryhypotheses under consideration
The null hypothesis, denoted by H0, is the claim that isinitially assumed to be true
The alternative hypothesis, denoted by Ha, is the assertionthat is contradictory to H0.
MATH 450 Chapter 9: Tests of hypotheses
![Page 6: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/6.jpg)
Test procedures
A test procedure is specified by the following:
A test statistic T : a function of the sample data on which thedecision (reject H0 or do not reject H0) is to be based
A rejection region R: the set of all test statistic values forwhich H0 will be rejected
A type I error consists of rejecting the null hypothesis H0 when it istrueA type II error involves not rejecting H0 when H0 is false.
MATH 450 Chapter 9: Tests of hypotheses
![Page 7: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/7.jpg)
Hypothesis testing for one parameter
1 Identify the parameter of interest
2 Determine the null value and state the null hypothesis
3 State the appropriate alternative hypothesis
4 Give the formula for the test statistic
5 State the rejection region for the selected significance level α
6 Compute statistic value from data
7 Decide whether H0 should be rejected and state thisconclusion in the problem context
MATH 450 Chapter 9: Tests of hypotheses
![Page 8: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/8.jpg)
Type II error and sample size determination
A level α test is a test with P[type I error] = α
Question: given α and n, can we compute β (the probabilitiesof type II error)?
This is a very difficult question.
We have a solution for the cases when: the distribution isnormal and σ is known
MATH 450 Chapter 9: Tests of hypotheses
![Page 9: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/9.jpg)
Type I error
Test of hypotheses:
H0 : µ = 75
Ha : µ < 75
n = 25, σ = 9. Rule: If x̄ ≤ 72, reject H0.
Question: What is the probability of type I error?
α = P[Type I error]
= P[H0 is rejected while it is true]
= P[X̄ ≤ 72 while µ = 75]
= P[X̄ ≤ 72 while X̄ ∼ N (75, 1.82)] = 0.0475
MATH 450 Chapter 9: Tests of hypotheses
![Page 10: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/10.jpg)
Type II error
Test of hypotheses:
H0 : µ = 75
Ha : µ < 75
n = 25. New rule: If x̄ ≤ 72, reject H0.
β(70) = P[Type II error when µ = 70]
= P[H0 is not rejected while it is false because µ = 70]
= P[X̄ > 72 while µ = 70]
= P[X̄ > 72 while X̄ ∼ N (70, 1.82)] = 0.1335
MATH 450 Chapter 9: Tests of hypotheses
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Practice problem
Problem
The drying time of a certain type of paint under specified testconditions is known to be normally distributed with standarddeviation 9 min. Assuming that we are testing
H0 : µ = 75
Ha : µ < 75
from a dataset with n = 25.
What is the rejection region of the test with significance levelα = 0.05.
What is β(70) in this case?
MATH 450 Chapter 9: Tests of hypotheses
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General cases
Test of hypotheses:
H0 : µ = µ0
Ha : µ < µ0
Rejection region: z ≤ −zαThis is equivalent to x̄ ≤ µ0 − zασ/
√n
Let µ′ < µ0
β(µ′) = P[Type II error when µ = µ′]
= P[H0 is not rejected while it is false because µ = µ′]
= P[X̄ > µ0 − zασ/√n while µ = µ′]
= P
[X̄ − µ′
σ/√n>µ0 − µ′
σ/√n− zα while µ = µ′
]= 1− Φ
(µ0 − µ′
σ/√n− zα
)MATH 450 Chapter 9: Tests of hypotheses
![Page 13: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/13.jpg)
Remark
For µ′ < µ0:
β(µ′) = 1− Φ
(µ0 − µ′
σ/√n− zα
)If n, µ′, µ0, σ is fixed, then
β(µ′) is small
↔ Φ
(µ0 − µ′
σ/√n− zα
)is large
↔ µ0 − µ′
σ/√n− zα is large
↔ α is large
MATH 450 Chapter 9: Tests of hypotheses
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α− β compromise
Proposition
Suppose an experiment and a sample size are fixed and a teststatistic is chosen. Then decreasing the size of the rejection regionto obtain a smaller value of α results in a larger value of β for anyparticular parameter value consistent with Ha.
MATH 450 Chapter 9: Tests of hypotheses
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General formulas
MATH 450 Chapter 9: Tests of hypotheses
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Tests concerning a population proportion
MATH 450 Chapter 9: Tests of hypotheses
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Population and sample proportion
Let p denote the proportion of successes in a population
A random sample of n individuals is to be selected, and X isthe number of successes in the sample
Sample proportion
p̂ =X
n
MATH 450 Chapter 9: Tests of hypotheses
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Central limit theorem for sample proportion
E (p̂) = p, σp̂ =√p(1− p)/n
When n > 30,p̂ − p√
p(1− p)/n
is approximately standard normal
MATH 450 Chapter 9: Tests of hypotheses
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Test for population proportion with large samples
MATH 450 Chapter 9: Tests of hypotheses
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Chapter 9: Review
MATH 450 Chapter 9: Tests of hypotheses
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Hypothesis testing
In any hypothesis-testing problem, there are two contradictoryhypotheses under consideration
The null hypothesis, denoted by H0, is the claim that isinitially assumed to be true
The alternative hypothesis, denoted by Ha, is the assertionthat is contradictory to H0.
MATH 450 Chapter 9: Tests of hypotheses
![Page 22: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/22.jpg)
Test procedures
A test procedure is specified by the following:
A test statistic T : a function of the sample data on which thedecision (reject H0 or do not reject H0) is to be based
A rejection region R: the set of all test statistic values forwhich H0 will be rejected
A type I error consists of rejecting the null hypothesis H0
when it is true
A type II error involves not rejecting H0 when H0 is false.
MATH 450 Chapter 9: Tests of hypotheses
![Page 23: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/23.jpg)
Hypothesis testing for one parameter
1 Identify the parameter of interest
2 Determine the null value and state the null hypothesis
3 State the appropriate alternative hypothesis
4 Give the formula for the test statistic
5 State the rejection region for the selected significance level α
6 Compute statistic value from data
7 Decide whether H0 should be rejected and state thisconclusion in the problem context
MATH 450 Chapter 9: Tests of hypotheses
![Page 24: Chapter 9: Tests of hypotheses - GitHub Pagesvucdinh.github.io/Files/lecture21.pdfWeek 12 Chapter 10: Two-sample inference MATH 450 Chapter 9: Tests of hypotheses Overview 9.1Hypotheses](https://reader035.vdocument.in/reader035/viewer/2022071408/60ffd69042a3fa692b684d7a/html5/thumbnails/24.jpg)
Normal population with known σ
Null hypothesis: µ = µ0Test statistic:
Z =X̄ − µ0σ/√n
MATH 450 Chapter 9: Tests of hypotheses
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Large-sample tests
Null hypothesis: µ = µ0Test statistic:
Z =X̄ − µ0S/√n
[Does not need the normal assumption]
MATH 450 Chapter 9: Tests of hypotheses
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t-test
[Require normal assumption]
MATH 450 Chapter 9: Tests of hypotheses
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P-value
MATH 450 Chapter 9: Tests of hypotheses
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Testing by P-value method
Remark: the smaller the P-value, the more evidence there is in thesample data against the null hypothesis and for the alternativehypothesis.
MATH 450 Chapter 9: Tests of hypotheses
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P-values for z-tests
MATH 450 Chapter 9: Tests of hypotheses
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P-values for z-tests
MATH 450 Chapter 9: Tests of hypotheses
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Interpreting P-values
A P-value:
is not the probability that H0 is true
is not the probability of rejecting H0
is the probability, calculated assuming that H0 is true, ofobtaining a test statistic value at least as contradictory to thenull hypothesis as the value that actually resulted
MATH 450 Chapter 9: Tests of hypotheses