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Two Major Types of Sampling Methods. uses some form of random selection requires that each unit have a known (often equal) probability of being selected selection is systematic or haphazard, but not random. Probability Sampling. Non-Probability Sampling. Sampling and representativeness.
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Two Major Types of Sampling Methods uses some form of random selection requires that each unit have a known (often equal) probability of being selected selection is systematic or haphazard, but not random Probability Sampling Non-Probability Sampling
Sampling and representativeness Sampling Population Sample Target Population Target Population Sampling Population Sample
Statistical Terms in Sampling Variable
Statistical Terms in Sampling Variable 1 2 3 4 5 responsibility
Statistical Terms in Sampling Variable 1 2 3 4 5 responsibility Statistic
Statistical Terms in Sampling Variable 1 2 3 4 5 responsibility Statistic Average = 3.72 sample
Statistical Terms in Sampling Variable 1 2 3 4 5 responsibility Statistic Average = 3.72 sample Parameter
Statistical Terms in Sampling Variable 1 2 3 4 5 responsibility Statistic Average = 3.72 sample Parameter Average = 3.75 population
Sampling Error The population has a mean of 3.75... 1 5 0 1 0 0 frequency 5 0 0 3 . 0 3 . 5 4 . 0 4 . 5 responsibility
Sampling Error The population has a mean of 3.75... 1 5 0 ...and a standard deviation of .25 1 0 0 frequency 5 0 0 3 . 0 3 . 5 4 . 0 4 . 5 This means that... responsibility
Sampling Error The population has a mean of 3.75... 1 5 0 ...and a standard deviation of .25 1 0 0 frequency 5 0 0 3 . 0 3 . 5 4 . 0 4 . 5 This means that... responsibility about 68% of cases fall between 3.5 - 4.0
Sampling Error The population has a mean of 3.75... 1 5 0 ...and a standard deviation of .25 1 0 0 frequency 5 0 0 3 . 0 3 . 5 4 . 0 4 . 5 This means that... responsibility about 64% of cases fall between 3.5 - 4.0 about 95% of cases fall between 3.25 - 4.25
Sampling Error The population has a mean of 3.75... 1 5 0 ...and a standard deviation of .25 1 0 0 frequency 5 0 0 3 . 0 3 . 5 4 . 0 4 . 5 This means that... responsibility about 64% of cases fall between 3.5 - 4.0 about 95% of cases fall between 3.25 - 4.25 about 99% of cases fall between 3.0 - 4.5
Types of Probability Sampling Designs • Simple Random Sampling • Stratified Sampling • Systematic Sampling • Cluster (Area) Sampling • Multistage Sampling
Simple Random Sampling • Need a list of all eligible persons in the population • Every person has equal chance (equal probability) to be selected in the sample • can sample with or without replacement • Rarely used in actual surveys • Difficult • Expensive • Excessive travel time (different location of subjects) • Excessive local introduction and organization time
Simple Random Sampling Example: • A random sample of nursing students of KUMS • A random sample of diabetic patients registered at Bahonar clinic
Simple Random Sampling List of Residents
Simple Random Sampling List of Students Random Subsample
Stratified Random Sampling • sometimes called "proportional" or "quota" random sampling • Objective - population of N units divided into non-overlapping strata N1, N2, N3, ... Ni such that N1 + N2 + ... + Ni = N, then do simple random sample of n/N in each strata
Stratified random sample: The population is divided into multiple strata based on common characteristics e.g.; • Residence (Urban or rural) • Tribe, ethnicity or race • Family income (poor, moderate, or wealthy)
Stratified Random Sampling List of Residents
Stratified Random Sampling List of students Nursing medical Pharmacy Strata
Stratified Random Sampling List of Residents surgical medical Non-clinical Strata Random Subsamples
Systematic Random Sampling Procedure: • number units in population from 1 to N • decide on the n that you want or need • N/n=k the interval size • randomly select a number from 1 to k • then take every kth unit
Systematic Sampling: Similar Procedure: • List all persons in the population • Define selection interval: = (Sampled population)/(Sample size) = N/n = An integer for ease of field use
Systematic Sampling:(continued) • Select a random starting point (first person in the sample) • Next selection = the random start + the random interval • And so on and so forth…
Systematic Random Sampling • Assumes that the population is randomly ordered • Advantages - easy; may be more precise than simple random sample • Example - students study
Systematic Random Sampling 1 26 51 76 2 27 52 77 3 28 53 78 4 29 54 79 5 30 55 80 6 31 56 81 7 32 57 82 8 33 58 83 9 34 59 84 10 35 60 85 11 36 61 86 12 37 62 87 13 38 63 88 14 39 64 89 15 40 65 90 16 41 66 91 17 42 67 92 18 43 68 93 19 44 69 94 20 45 70 95 21 46 71 96 22 47 72 97 23 48 73 98 24 49 74 99 25 50 75 100 N = 100
Systematic Random Sampling 1 26 51 76 2 27 52 77 3 28 53 78 4 29 54 79 5 30 55 80 6 31 56 81 7 32 57 82 8 33 58 83 9 34 59 84 10 35 60 85 11 36 61 86 12 37 62 87 13 38 63 88 14 39 64 89 15 40 65 90 16 41 66 91 17 42 67 92 18 43 68 93 19 44 69 94 20 45 70 95 21 46 71 96 22 47 72 97 23 48 73 98 24 49 74 99 25 50 75 100 N = 100 want n = 20
Systematic Random Sampling 1 26 51 76 2 27 52 77 3 28 53 78 4 29 54 79 5 30 55 80 6 31 56 81 7 32 57 82 8 33 58 83 9 34 59 84 10 35 60 85 11 36 61 86 12 37 62 87 13 38 63 88 14 39 64 89 15 40 65 90 16 41 66 91 17 42 67 92 18 43 68 93 19 44 69 94 20 45 70 95 21 46 71 96 22 47 72 97 23 48 73 98 24 49 74 99 25 50 75 100 N = 100 want n = 20 N/n = 5
Systematic Random Sampling 1 26 51 76 2 27 52 77 3 28 53 78 4 29 54 79 5 30 55 80 6 31 56 81 7 32 57 82 8 33 58 83 9 34 59 84 10 35 60 85 11 36 61 86 12 37 62 87 13 38 63 88 14 39 64 89 15 40 65 90 16 41 66 91 17 42 67 92 18 43 68 93 19 44 69 94 20 45 70 95 21 46 71 96 22 47 72 97 23 48 73 98 24 49 74 99 25 50 75 100 N = 100 want n = 20 N/n = 5 select a random number from 1-5: chose 4
Systematic Random Sampling 1 26 51 76 2 27 52 77 3 28 53 78 429 54 79 5 30 55 80 6 31 56 81 7 32 57 82 8 33 58 83 934 59 84 10 35 60 85 11 36 61 86 12 37 62 87 13 38 63 88 1439 64 89 15 40 65 90 16 41 66 91 17 42 67 92 18 43 68 93 1944 69 94 20 45 70 95 21 46 71 96 22 47 72 97 23 48 73 98 244974 99 25 50 75 100 N = 100 want n = 20 N/n = 5 select a random number from 1-5: chose 4 start with #4 and take every 5th unit
Cluster Sampling • The population is first divided into clusters • A cluster is a small-scale version of the population (i.e. heterogeneous group reflecting the variance in the population. • Take a simple random sample of the clusters. • All elements within each sampled (chosen) cluster form the sample. • Generally requires a larger total sample size than simple or stratified random sampling.
Cluster (area) Random Sampling • Advantages - administratively useful, especially when you have a wide geographic area to cover • Examples - randomly sample from city blocks and measure all homes in selected blocks
Example: Cluster sampling Section 1 Section 2 Section 3 Section 5 Section 4
TWO STAGE CLUSTER SAMPLING (WITH RANDOM SAMPLING AT SECOND STAGE)
Multi-Stage Sampling • Cluster (area) random sampling can be multi-stage • Any combinations of single-stage methods
Types of Probability Sampling Designs • Simple Random Sampling • Stratified Sampling • Systematic Sampling • Cluster (Area) Sampling • Multistage Sampling
Major Issues • Likely to misrepresent the population • May be difficult or impossible to detect this misrepresentation
Types of Nonprobability Samples • Accidental, haphazard, convenience • Modal Instance • Purposive • Expert • Quota • Snowball • Heterogeneity sampling
