Board logo

subject: Sampling And Sampling Distributions Help [print this page]


Introduction to sampling and sampling distributions help:

Sampling distribution of a statistic is the imaginary probability distribution of the statistic which is effortless to value and is worn in inferential or inductive statistics. A statistic is a possibility variable because its value depends on experiential example values which will modify from model to model. Thus reason of sampling distributions of a value is basically a arithmetic problem. Let us see about the topic sampling distributions help given some example problems in the below articles.

Example Problems for Sampling Distributions Help:

Let us see about the topic sampling distributions help in the given sample example problems with solved answers,

Example 1:

Find the mean and sampling distribution of the given values means of 500 random samples of size n =66 are drawn from a population of N = 1800which is normally distributed with mean = 23. 4 and sampling distribution of mean of 0.050, if sampling is done (a) with replacement and (b) without replacement.

Solution:

a. with replacement:

'barx' = = 23.40

s 'barx' = 'sigma'/ '(sqrt(n))' = '0.050/ (sqrt(66))' = 0.00615

b. without replacement:

'barx' = = 23.40

s 'barx' = 'sigma/ (sqrt(n))' '(sqrt(N-n)/(N-1))'

= '0.050/ (sqrt(66))' '(sqrt((1800 - 66)/(1800 -1)))'

= 0.00603

s 'barx''~~' 0.6

Example: 2

Sampling distribution of differences and sums, Let U1= {5 , 10 , 12} U2 = { 6,11). Find (a) U1 (b) U2 (c) U1 + U2 .

Solution:

(a). U1 = '(5+ 10+12)/3' ='27/3' = 9

(b). U2 = '(6+ 11)/2' = '17/2' = 8.5

(c) Population consisting of the sums of any member of U1 and any member of U2 is

5+6=11, 10+ 6=16, 12+6=18

5+11=16, 10 + 11 = 21, 12 + 11 = 23

= U1 + U2 = {10, 15, 17, 15, 20, 22}

U1 + U2 = '(10+15+17+15+20+22)/ 6'

= 16.5

= 6 + 16.5 = U1 + U2

Extra Sampling Distributions Help Problems

Let us see about the topic sampling distributions help in the given sample example problems with solved answers,

Example 1:

Find the mean and sampling distribution of the given values means of 500 random samples of size n =76 are drawn from a population of N = 1900 which is normally distributed with mean = 23. 4 and sampling distribution of mean of 0.050, if sampling is done (a) with replacement and (b) without replacement.

Solution:

a. with replacement:

'barx' = = 23.40

s 'barx' = 'sigma'/ '(sqrt(n))' = '0.050/ (sqrt(76))' = 0.0057

b. without replacement:

'barx' = = 23.40

s 'barx' = 'sigma/ (sqrt(n))' '(sqrt(N-n)/(N-1))'

= '0.050/ (sqrt(76))' '(sqrt((1900 - 76)/(1900 -1)))'

= 0.00558

s 'barx''~~' 0.55

Example: 2

Sampling distribution of differences and sums, Let U1= 6 , 11 , 13 U2 = { 7,12). Find (a) U1 (b) U2 (c) U1 + U2 .

Solution:

(a). U1 = '(6+ 11+13)/3' ='30/3' = 10

(b). U2 = '(7+ 11)/2' = '18/2' = 9

(c) Population consisting of the sums of any member of U1 and any member of U2 is

6+7=13, 11+ 7=18, 13+7=20

6+12=18, 11 + 12 = 23, 13 + 12 = 25

= U1 + U2 = {13,18,20,18,23,25}

U1 + U2 = '(13+18+20+18+23+25)/ 6'

= 19.5

= 6 + 19.5 = U1 + U2

by: Omkar Nayak




welcome to loan (http://www.yloan.com/) Powered by Discuz! 5.5.0