The chi-square distribution, The chi-square distribution ,17-11 – HP 50g Graphing Calculator User Manual

Page 560

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Page 17-11

where

Γ(α) = (α-1)! is the GAMMA function defined in Chapter 3.

The calculator provides for values of the upper-tail (cumulative) distribution
function for the t-distribution, function UTPT, given the parameter

ν and the value

of t, i.e., UTPT(

ν,t). The definition of this function is, therefore,

For example, UTPT(5,2.5) = 2.7245…E-2. Other probability calculations for the
t-distribution can be defined using the function UTPT, as follows:

Θ P(T<a) = 1 - UTPT(

ν,a)

Θ P(a<T<b) = P(T<b) - P(T<a) = 1 - UTPT(

ν,b) - (1 - UTPT(ν,a)) =

UTPT(

ν,a) - UTPT(ν,b)

Θ P(T>c) = UTPT(

ν,c)

Examples: Given

ν = 12, determine:

P(T<0.5) = 1-UTPT(12,0.5) = 0.68694..
P(-0.5<T<0.5) = UTPT(12,-0.5)-UTPT(12,0.5) = 0.3738…
P(T> -1.2) = UTPT(12,-1.2) = 0.8733…

The Chi-square distribution

The Chi-square (

χ

2

) distribution has one parameter

ν, known as the degrees of

freedom. The probability distribution function (pdf) is given by

<

<

−∞

+

Γ

+

Γ

=

+

t

t

t

f

,

)

1

(

)

2

(

)

2

1

(

)

(

2

1

2

ν

ν

πν

ν

ν

=

=

=

t

t

t

T

P

dt

t

f

dt

t

f

t

UTPT

)

(

1

)

(

1

)

(

)

,

(

ν

0

,

0

,

)

2

(

2

1

)

(

2

1

2

2

>

>

Γ

=

x

e

x

x

f

x

ν

ν

ν

ν

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