IT233: Applied Statistics TIHE 2005

IT233: Applied Statistics TIHE 2005

1

1

Example 2: A sample of size 16 is to be taken from a population having a normal distribution with = 6.25. Find a number such that

Solution: Given: = 6.25

= 16 d. f. () = = 15

1

= 0.025

= 0.025

= 0.025

0.025

0 2.4

1

From Chi-Square Table we get

2.4 = 27.488

= 11.453

Example 3: For the Example 2, find a constants and such that

Solution:

1

= 0.90

= 0.90

0.05

0.05

0.90

0 2.4 2.4

1

From Chi-Square Table we find and as follows:

2.4 = 7.261 2.4 = 24.996

= 3.025 = 10.415

1

Theorem: If and are the variances of independent random samples of size and taken from normal populations with variances and , respectively, then the statistic

has an - distribution with and d. f.

Applications: The sampling distribution of could be used:

·  To find the probabilities about

·  To find the confidence interval for

·  To test the hypothesis

Example 1: (Page 229, No.9) If and represent the variances of independent random samples of size = 25 and = 31, taken from normal populations with variances = 10 and = 15, respectively, find .

Solution: We know,

1

1

0.05

0 1.89

1

Looking F-table for = 24 and = 30 at = 0.05 we found = 0.05

= 0.05

Example 2: In the above example, find a value such that

= 0.01

Solution:

1

1

= 0.01

= 0.01

= 0.01

= 24, = 30

0.01

0 1.5

1

Looking F-table for = 24 and = 30 at = 0.01 we get

1.5 = 2.47

= 1.647

NOTE: Since F-distribution is also used for finding confidence interval and hypothesis testing, sometimes we need to find lower tail as well as upper tail values of F.

1

0.95

Lower-tail value: Its cuts off a large area to the right.

0.05

Upper-tail value: Its cuts off a small area to the right.

1

The F-table gives only upper-tail values. The lower-tail values are computed as

Hence,

Similarly,

Example: Find (i) with = 19 and = 20

(ii) with = 28 and = 12

Solution:

(i)

= 0.4639

(ii)

= 0.3448

1