Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

31.7 HYPOTHESIS TESTING


0


0


0. 1


0. 2


0. 3


0. 4


0. 5


− 4 − 3 − 2 − 1123 4


t

P(t|H 0 )

N=2


N=3


N=5


N=10


Figure 31.11 Student’st-distribution for various values ofN. The broken
curve shows the standard Gaussian distribution for comparison.

Ten independent sample valuesxi,i=1, 2 ,..., 10 , are drawn at random from a Gaussian
distribution with unknown meanμand unknown standard deviationσ. The sample values
are as follows:

2 .22 2.56 1.07 0.24 0.18 0.95 0. 73 − 0 .79 2.09 1. 81

Test the null hypothesisH 0 :μ=0at the10%significance level.

For our null hypothesis,μ 0 = 0. Since for this sample ̄x=1.11,s=1.01 andN= 10, it
follows from (31.113) that


t=

̄x
s/


N− 1


=3. 33.


The rejection region fortis given by (31.114) wheretcritis such that


CN− 1 (tcrit)=1−α/ 2 ,

andαis the required significance of the test. In our caseα=0.1andN= 10, and from
table 31.3 we findtcrit=1.83. Thus our rejection region forH 0 at the 10% significance
level is


t<− 1. 83 and t> 1. 83.

For our samplet=3.30 and so we can clearly reject the null hypothesisH 0 :μ=0atthis
level.


It is worth noting the connection between thet-test and the classical confidence

interval on the meanμ. The central confidence interval onμat the confidence


level 1−αis the set of values for which


−tcrit<

̄x−μ
s/


N− 1

<tcrit,
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