STATISTICS
Using (31.113) to substitute for ̄x−μ 0 in (31.116), and noting thatdx ̄=
(s/
√
N−1)dt, we findP( ̄x, s|H 0 )d ̄xds=AsN−^1 exp[
−Ns^2
2 σ^2(
1+t^2
N− 1)]
dt ds,whereAis another normalisation constant. In order to obtain the sampling
distribution oftalone, we must integrateP(t, s|H 0 ) with respect tosover its
allowed range, from 0 to∞. Thus, the required distribution oftalone is given by
P(t|H 0 )=∫∞0P(t, s|H 0 )ds=A∫∞0sN−^1 exp[
−Ns^2
2 σ^2(
1+t^2
N− 1)]
ds.
(31.117)To carry out this integration, we sety=s{1+[t^2 /(N−1)]}^1 /^2 , which on substi-
tution into (31.117) yields
P(t|H 0 )=A(
1+t^2
N− 1)−N/ 2 ∫∞0yN−^1 exp(
−Ny^2
2 σ^2)
dy.Since the integral overydoes not depend ont, it is simply a constant. We thus
find that that the sampling distribution of the variabletis
P(t|H 0 )=1
√
(N−1)πΓ( 1
2 N)Γ( 1
2 (N−1))(
1+t^2
N− 1)−N/ 2
,
(31.118)wherewehaveusedthecondition
∫∞
−∞P(t|H^0 )dt= 1 to determine the normali-
sation constant (see exercise 31.18).
The distribution (31.118) is calledStudent’st-distribution withN− 1 degrees offreedom. A plot of Student’st-distribution is shown in figure 31.11 for various
values ofN. For comparison, we also plot the standard Gaussian distribution,
to which thet-distribution tends for largeN. As is clear from the figure, the
t-distribution is symmetric aboutt= 0. In table 31.3 we list some critical points
of the cumulative probability functionCn(t)ofthet-distribution, which is defined
by
Cn(t)=∫t−∞P(t′|H 0 )dt′,wheren=N−1 is the number of degrees of freedom. Clearly,Cn(t) is analogous
to the cumulative probability function Φ(z) of the Gaussian distribution, discussed
in subsection 30.9.1. For comparison purposes, we also list the critical points of
Φ(z), which corresponds to thet-distribution forN=∞.