Upload
alexus-glass
View
217
Download
2
Tags:
Embed Size (px)
Citation preview
Statistical tests for Quantitative variables (z-test & t-test)
BY
Dr.Shaikh Shaffi Ahamed Ph.D.,
Associate Professor
Dept. of Family & Community Medicine
College of Medicine,
King Saud University
Choosing the appropriate Statistical test
Based on the three aspects of the data
Types of variables Number of groups being
compared & Sample size
Statistical Tests
Z-test:Study variable: QualitativeOutcome variable: Quantitative or QualitativeComparison: Sample mean with population mean &
sample proportion with population proportion; two sample means or two sample proportions
Sample size: larger in each group(>30) & standard deviation is known
Student’s t-test:Study variable: QualitativeOutcome variable: QuantitativeComparison: sample mean with population mean; two
means (independent samples); paired samples.Sample size: each group <30 ( can be used even for
large sample size)
Test for sample proportion with population proportion
In an otological examination of school children, out of 146 children examined 21 were found to have some type of otological abnormalities. Does it confirm with the statement that 20% of the school children have otological abnormalities?
a . Question to be answered:a . Question to be answered: Is the sample taken from a population of children
with 20% otological abnormality
b. Null hypothesis :b. Null hypothesis : The sample has come from a population with 20% otological abnormal children
ProblemProblem
c. Test statistics
d.Comparison with theoritical value Z ~ N (0,1); Z 0.05 = 1.96 The prob. of observing a value equal to or
greater than 1.69 by chance is more than 5%. We therefore do not reject the Null Hypothesis
e. Inference There is a evidence to show that the sample
is taken from a population of children with 20% abnormalities
69.1
1466.85*4.140.204.14
npq
Ppz
Test for sample prop. with population prop.
P – Population. Prop.p- sample prop.n- number of samples
Comparison of two sample proportions
In a community survey, among 246 town school children, 36 were found with conductive hearing loss and among 349 village school children 61 were found with conductive hearing loss. Does this data, present any evidence that conductive hearing loss is as common among town children as among village children?
ProblemProblem
Comparison of two sample proportions
a. Question to be answered: Is there any difference in the proportion
of hearing loss between children living in town and village?
Given data sample 1 sample 2
size 246 342 hearing loss 36 61 % hearing loss 14.6 % 17.5%
b. Null Hypothesis There is no difference between the
proportions of conductive hearing loss cases among the town children and among the village children
Comparison of two sample proportions
c. Test statistics
81.1
3425.82*5.17
2466.85*4.14
5.176.14
222
111
21
nqp
nqp
ppz
p1, p2 are sample proportions, n1,n2 are subjects in sample 1 & 2
q= 1- p
Comparison of two sample proportions
d. Comparison with theoretical value
Z ~ N (0,1); Z 0.05 = 1.96 The prob. of observing a value equal to
or greater than 1.81 by chance is more than 5%. We therefore do not reject the Null Hypothesis
e. Inference There is no evidence to show that the
two sample proportions are statistically significantly different. That is, there is no statistically significant difference in the proportion of hearing loss between village and town, school children.
Comparison of two sample meansExample : Weight Loss for Diet vs Exercise
Diet Only:sample mean = 5.9 kgsample standard deviation = 4.1 kgsample size = n = 42standard error = SEM1 = 4.1/ 42 = 0.633
Exercise Only:
sample mean = 4.1 kgsample standard deviation = 3.7 kgsample size = n = 47standard error = SEM2 = 3.7/ 47 = 0.540
Did dieters lose more fat than the exercisers?
measure of variability = [(0.633)2 + (0.540)2] = 0.83
Example : Weight Loss for Diet vs ExerciseStep 1. Determine the null and alternative hypotheses.
The sample mean difference = 5.9 – 4.1 = 1.8 kg and the standard error of the difference is 0.83.
Null hypothesis: No difference in average fat lost in population for two methods. Population mean difference is zero.
Alternative hypothesis: There is a difference in average fat lost in population for two methods. Population mean difference is not zero.
Step 2. Sampling distribution: Normal distribution (z-test)
Step 3. Assumptions of test statistic ( sample size > 30 in each group)
Step 4. Collect and summarize data into a test statistic.
So the test statistic: z = 1.8 – 0 = 2.17 0.83
Example : Weight Loss for Diet vs ExerciseStep 5. Determine the p-value.Recall the alternative hypothesis was two-sided. p-value = 2 [proportion of bell-shaped curve above 2.17]Z-test table => proportion is about 2 0.015 = 0.03.
Step 6. Make a decision.
The p-value of 0.03 is less than or equal to 0.05, so … • If really no difference between dieting and exercise as fat
loss methods, would see such an extreme result only 3% of the time, or 3 times out of 100.
• Prefer to believe truth does not lie with null hypothesis. We conclude that there is a statistically significant difference between average fat loss for the two methods.
Student’s t-test1.1. Test for single meanTest for single mean Whether the sample mean is equal to the predefined population
mean ?
2. Test for difference in means. Test for difference in means Whether the CD4 level of patients taking treatment A is equal
to CD4 level of patients taking treatment B ?
3. Test for paired observationTest for paired observation Whether the treatment conferred any significant benefit ?
Steps for test for single meanSteps for test for single mean
1. Questioned to be answered Is the Mean weight of the sample of 20 rats is 24 mg?
N=20, =21.0 mg, sd=5.91 , =24.0 mg
2. Null Hypothesis The mean weight of rats is 24 mg. That is, The
sample mean is equal to population mean.
3. Test statistics --- t (n-1) df
4. Comparison with theoretical value if tab t (n-1) < cal t (n-1) reject Ho, if tab t (n-1) > cal t (n-1) accept Ho,5. Inference
ns
xt
/
x
t –test for single mean • Test statistics
n=20, =21.0 mg, sd=5.91 , =24.0 mg
t = t .05, 19 = 2.093 Accept H0 if t < 2.093 Reject
H0 if t >= 2.093
x
30.22091.5240.21 ll
t
Inference : We reject Ho, and conclude that the Inference : We reject Ho, and conclude that the data is not providing enough evidence, that the data is not providing enough evidence, that the sample is taken from the population with mean sample is taken from the population with mean weight of 24 gmweight of 24 gm
Given below are the 24 hrs total energy expenditure (MJ/day) in groups of lean and obese women. Examine whether the obese women’s mean energy expenditure is significantly higher ?.
Lean
6.1 7.0 7.5
7.5 5.5 7.6
7.9 8.1 8.1
8.1 8.4 10.2
10.9
t-test for difference in means
ObeseObese 8.8 9.2 9.28.8 9.2 9.2 9.7 9.7 10.09.7 9.7 10.0 11.5 11.8 12.811.5 11.8 12.8
Null Hypothesis
Obese women’s mean energy expenditure is equal to the lean women’s energy expenditure.
Data Summary
lean Obese
N 13 9
8.10 10.30
S 1.38 1.25
• H0: 1 - 2 = 0 (1 = 2)
• H1: 1 - 2 0 (12)
= 0.05• df = 13 + 9 - 2 = 20• Critical Value(s):
t0 2.086-2.086
.025
Reject H0 Reject H0
.025
Solution
tX X
Sn S n S
n n
df n n
P
1 2 1 2
2 1 12
2 22
1 2
1 2
1 1
1 1
2
Hypothesized Difference (usually zero when testing for equal means)
•Compute the Test Statistic:
( ))(
( ) ( )( ) ( )
112pS n1 n2
_ _
Calculating the Test Statistic:
Developing the Pooled-Variance t Test
•Calculate the Pooled Sample Variances as an Estimate of the Common Populations Variance:
)n()n(
S)n(S)n(Sp 11
11
21
222
2112
2pS
21S
22S
1n
2n
= Pooled-Variance
= Variance of Sample 1
= Variance of sample 2
= Size of Sample 1
= Size of Sample 2
Sn S n S
n nP
2 1 12
2 22
1 2
2 2
1 1
1 1
13 1 1 38 9 1 125
13 1 9 11 765
. ..
((((
((
( (
)
))
))
)))
First, estimate the common variance as a weighted average of the two sample variances using the degrees of freedom as weights
tX X
Sn nP
1 2 1 2
2
1 2
10.3 0
176 1 +13
19
3.82 8.1
.
Calculating the Test Statistic:
( (( )) )
11
tab t 9+13-2 =20 dff = t 0.05,20 =2.086
T-test for difference in means
Inference : The cal t (3.82) is higher than tab t at 0.05, 20. ie 2.086 . This implies that there is a evidence that the mean energy expenditure in obese group is significantly (p<0.05) higher than that of lean group
ExampleSuppose we want to test the effectiveness of a
program designed to increase scores on the quantitative section of the Graduate Record Exam (GRE). We test the program on a group of 8 students. Prior to entering the program, each student takes a practice quantitative GRE; after completing the program, each student takes another practice exam. Based on their performance, was the program effective?
• Each subject contributes 2 scores: repeated measures design
Student Before Program After Program
1 520 555
2 490 510
3 600 585
4 620 645
5 580 630
6 560 550
7 610 645
8 480 520
• Can represent each student with a single score: the difference (D) between the scores
StudentBefore Program After Program
D
1 520 555 35
2 490 510 20
3 600 585 -15
4 620 645 25
5 580 630 50
6 560 550 -10
7 610 645 35
8 480 520 40
• Approach: test the effectiveness of program by testing significance of D
• Null hypothesis: There is no difference in the scores of before and after program
• Alternative hypothesis: program is effective → scores after program will be higher than scores before program → average D will be greater than zero
H0: µD = 0
H1: µD > 0
StudentBefore
ProgramAfter
Program D D2
1 520 555 35 1225
2 490 510 20 400
3 600 585 -15 225
4 620 645 25 625
5 580 630 50 2500
6 560 550 -10 100
7 610 645 35 1225
8 480 520 40 1600
∑D = 180 ∑D2 = 7900
So, need to know ∑D and ∑D2:
Recall that for single samples:Recall that for single samples:
error standard
mean - score
X
obt s
Xt
For related samplesFor related samples::
D
Dobt s
Dt
where:
N
ss D
D and
1
2
2
N
N
DD
sD
45.23
188
1807900
1
22
2
N
N
DD
sD
5.228
180
N
DD
Standard deviation of D:Standard deviation of D:
Mean of D:Mean of D:
Standard error:Standard error:
2908.88
45.23
N
ss D
D
D
Dobt s
Dt
Under H0, µD = 0, so:
714.22908.8
5.22
D
obt s
Dt
From Table B.2: for α = 0.05, one-tailed, with df = 7,
t critical = 1.895
2.714 > 1.895 → reject H0
The program is effective.
Z- value & t-Value“Z and t” are the measures of:How difficult is it to believe the null hypothesis?
High z & t valuesDifficult to believe the null hypothesis -
accept that there is a real difference.
Low z & t valuesEasy to believe the null hypothesis -
have not proved any difference.
In conclusion !Z-test will be used for both
categorical(qualitative) and quantitative outcome variables.
Student’s t-test will be used for only quantitative outcome variables.