HP 50g Graphing Calculator User Manual

Page 18-34

The confidence interval for the population variance

σ

2

is therefore,

[(n-1)

⋅S

2

/

χ

2

n-1,

α/2

; (n-1)

⋅S

2

/

χ

2

n-1,1-

α/2

].

where

χ

2

n-1,

α/2

, and

χ

2

n-1,1-

α/2

are the values that a

χ

2

variable, with

ν = n-1

degrees of freedom, exceeds with probabilities

α/2 and 1- α /2, respectively.

The one-sided upper confidence limit for

σ

2

is defined as (n-1)

⋅S

2

/

χ

2

n-1,1-

α

.

Example 1 – Determine the 95% confidence interval for the population variance
σ

2

based on the results from a sample of size n = 25 that indicates that the

sample variance is s

2

= 12.5.

In Chapter 17 we use the numerical solver to solve the equation

α = UTPC(γ,x).

In this program,

γ represents the degrees of freedom (n-1), and α represents the

probability of exceeding a certain value of x (

χ

2

), i.e., Pr[

χ

2

>

χ

α

2

] =

α.

For the present example,

α = 0.05, γ = 24 and α = 0.025. Solving the

equation presented above results in

χ

2

n-1,

α/2

=

χ

2

24,

0.025

= 39.3640770266.

On the other hand, the value

χ

2

n-1,

α/2

=

χ

2

24,

0.975

is calculated by using the

values

γ = 24 and α = 0.975. The result is χ

2

n-1,1-

α/2

=

χ

2

24,

0.975

=

12.4011502175.

The lower and upper limits of the interval will be (Use ALG mode for these
calculations):

(n-1)

⋅S

2

/

χ

2

n-1,

α/2

= (25-1)

⋅12.5/39.3640770266 = 7.62116179676

(n-1)

⋅S

2

/

χ

2

n-1,1-

α/2

= (25-1)

⋅12.5/12.4011502175 = 24.1913044144

Thus, the 95% confidence interval for this example is:

7.62116179676 <

σ

2

< 24.1913044144.