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Quantitative Methods. Varsha Varde. Quantitative Methods. Sampling Techniques. Sampling. The Process of Obtaining Information About a Whole by Examining Only a Part Whole = Population Part = Sample Everyday Life Concept
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Quantitative Methods Varsha Varde
Quantitative Methods Sampling Techniques
Sampling • The Process of Obtaining Information About a Whole by Examining Only a Part • Whole = Population Part = Sample • Everyday Life Concept • Example: Physician makes diagnosis on the basis of the findings of a small sample of blood Auditors use sampling to draw conclusions about large volumes of transactions Market researchers use sample of customers to determine market potential Sample Inspection is done to accept or reject a lot ? Varsha Varde
Why Sampling • Population too large to be studied in full • Sampling is Cheaper & Quicker as compared to Census • Necessary in destructive testing- • Census not feasible-testing of medicines Varsha Varde
Purpose of Sampling • To Estimate Value of a Population Parameter (Mean, Variance, Proportions etc.) on the basis of Value of the Corresponding Sample Statistic. • More Representative the Sample, More Accurate is the Estimate. • Bigger the Sample, Better the Estimate. • Bigger the Sample, Greater is Cost & Time Varsha Varde
Terminology • Population: Entire group of people, events, or objects of interest in context of research • Element: A single member of the population • Population Frame: List of all elements in the population from which a sample is drawn • Example: List of all students in a college, list of all ent. events in Mumbai in June 2010, list of all songs sung by Lata Mangeshkar • Population Parameters: Proportion, Mean & Variance. Varsha Varde
Terminology • Sample: A subset of population selected for data collection in the research study • Subject: A single member of the sample • Sampling: Process of selecting sufficient number of elements from the population • Sampling saves time & cost of research • Sample Statistics: Sample proportion, Sample mean (central tendency) & sample variance (dispersion). Varsha Varde
Concept of Sampling Error • Difference between the Actual Value of the Characteristic of Population and the Value Estimated from the Sample. • The Art & Science of Sampling is to Apply Appropriate Techniques to Minimize this Risk, i.e. Minimizing Sampling Error. Varsha Varde
Statistical Assurance Statistical Assurance About Minimum Sampling Error (Risk) is Provided by Two Parameters: • Precision: Quantum of Admissible Error • Reliability or Confidence Level: The Probability that the Sample Estimate Will Be In Fact Within the Stipulated Range of Precision Varsha Varde
Concept of Precision • Quantum of Admissible Error. Ideally Zero. • Cannot be Zero Unless Sample is 100%. • Precision Should be as small as possible Varsha Varde
Concept of Precision • Precision (i.e. Error or Risk in Statistics) Decreases as Sample Size Increases. • But, Cost & Time of Estimation Increases as Sample Size Increases. • This is an Issue of Resource Allocation. • Hence, You as Manager, Strike a Balance and Decide Optimal Level of Precision. • Note: Precision is Management Decision. Varsha Varde
Reliability or Confidence Level • It is the Probability that the Sample Estimate Will Be In Fact Within the Range of Precision Set by You. • This Prob Has to be Very High: 90%, 95%,99%. • 100% Impossible Unless Sample is 100%. • In Any Sampling Scenario, You Must First Set Precision and Confidence Level. • They will determine Required Sample Size Varsha Varde
Sample Size • How Big Should Be My Sample? • Sample Size Depends Upon the Sampling Technique Selected for the Purpose. • Therefore, First We Must Know About the Various Sampling Techniques. Varsha Varde
Sampling Techniques A Statistical /Probability Sample Should Be: • Selected Objectively so that Inferences Drawn from it are Reliable, • Free from Personal Biases, • Giving Equal or Known Chance of Selection to Every Unit of the Population. So, Sample Must Be Drawn Scientifically. Varsha Varde
Statistical Sampling Techniques • Many Techniques Available. • Selection of the Right One Depends Upon: - Nature of the Population, - Cost Budget, - Time Constraint, - Precision & Confidence Required • Hence, Selection Falls in Your Domain. Varsha Varde
Simple Random Sampling • Most Widely Used for Ease and Low Cost • Equal Probability of Selection to All Units in Population • Random Number Tables (RNT) Available • Internationally Tested for Randomness Varsha Varde
Random Number Table Varsha Varde
Simple Random Sampling Steps • Assign Sequential Numbers to All Units • Open Any Page of RNT. Start Anywhere • From This Starting Point Proceed Vertically Downwards and Select As Many Numbers As Required Varsha Varde
Random Number Table Varde Varde Varsha Varde 20
Example • Quality Controller wishes to select a random sample of 25 drums from the lot numbered from 312 to 9233. • Drums are already numbered • Largest Number: 9233. Hence 4-digit Nos. • Randomly select the starting point: 7383 • Hence, First Sample is Drum No. 7383 • Next No. is 6546. feasible. Accept it. • Next No. is 9895. Infeasible. Discard it. Varsha Varde
Random Sample of 25 Drums Varsha Varde
Systematic Sampling • Use When Pop is Already Arranged in an Order. • Example: Vouchers, Employee No., Batch No. • Variation of SRS. Faster. Speeds Up Sampling. • Does Not Use Random Number Tables. • Compute Skip Interval k = Ratio of Pop Size to Sample Size. • Randomly Select a Starting Number < k. • Then Systematically Selects Every kth Number. • Widely Used for Ease and Lower Cost. Varsha Varde
Example • Internal Auditor wishes to select a sample of 50 accounts receivable out of 520 such accounts in a sales office. • She opts for Systematic Sampling. • Skip Interval k = 520 / 50 = 10.4 • Suppose Her Random no. below 10 is 7. • Sample: Acct Nos. 7, 17, 27, 37,……, 497 Varsha Varde
Stratified Sampling • Example: 520 accounts receivable from 4 product divisions: Agro-Chemical (323), Leather (54), Textile(22), Plastic (121). • Sample of 50: 32, 5, 2 & 11 respectively • Population Discernibly Heterogeneous • Divide It into Several Parts (Called Strata) • Each Stratum Homogeneous Within Itself • Draw a Simple Random or Systematic Sample from Each Stratum. Varsha Varde
Cluster Sampling • Example: Hosiery Crates ( Each Crate Contains Full Assortment of Sizes), Bldgs in Apt Complex • Population Discernibly Heterogeneous • Divide It into Several Clusters • Each Cluster Heterogeneous Within Itself • Draw SRS or Systematic Sample of Clusters • Study Each Sampled Cluster Fully. • Use When Population is Inherently Divided into Heterogeneous Clusters. • Convenient. Saves Cost & Time. Varsha Varde
Multi-Stage Sampling • Samples are Drawn from Samples • Example: Select 4 Out of 25 Working Days, and Select Ten Sacks of Finished Product from Each Selected Day’s Output • This is 2-Stage Sampling. • In Complex Situations, This Process Can Go On for 3, 4 or Even More Stages. Varsha Varde
Determining Sample Size Factors Influencing Sample Size: • Precision (Your Decision) • Confidence Level (Your Decision) • Sampling Technique (Your Decision) • Population Size (Known to You) • Pop Parameter to be Estimated (KtY) • Dispersion in Population (Known to You) Varsha Varde
Determining Sample Size Effect of Factors Influencing Sample Size • Lower Precision – Bigger Sample • Higher Confidence – Bigger Sample • Wider Dispersion in Pop – Bigger Sample • Ironically, Population Size Affects Sample Size Only Marginally Varsha Varde
Probability Sampling • Example: A sample of 100 TVs to be drawn from 10,000 TVs produced in June 2010 • Each TV has 100 ÷ 10,000 = 0.01 i.e. 1% chance of being chosen • Sampling Design tells researcher precisely how to pick up 100 TVs Varsha Varde
1: Simple Random Sampling • Two lucky numbers to be drawn out of 100 tokens. Put all 100 tokens in a basket. Stir well. Close eyes and pick up two tokens • For larger population, assign serial numbers to each element. Use a standard table of random numbers. Select the required number of elements one after other • But, enlisting large p pulations is tedious. Varsha Varde
A Case Study HR Director of a software firm with 1926 engineers wants to find out desirability of changing the current 10 – 6 working hours to flexitime along with its benefits & drawbacks perceived by the engineers before the next board meeting She would pick up a few engineers randomly & ask them appropriate questions. Varsha Varde
2: Systematic Sampling • A sample of 50 cars to be selected from 10,000 cars produced in 2009 • 10,000 ÷ 50 = 200. Select every 200th car • More precisely, select a random number between 1 and 200, say 30. Select 30th car • Starting from 30th car, select every 200th car: 30, 230, 430, 630, 830, 1030, 1230, 1430… Varsha Varde
A Case Study Maruti Suzuki Ltd. wants to check response of prospective buyers to the new features introduced in its small car segment From the dealers alphabetical list, the Company selects every 50th dealer & sends a senior marketing manager to talk to them. Varsha Varde
3: Stratified Random Sampling • If population contains identifiable subgroups of elements, researcher must provide proper representation to each subgroup • Ex.: Population: All students of a college • Identifiable Subgroups: males / females; arts/ science / commerce; brilliant / average / poor • Lata M. songs: By language, solo / duet etc. Varsha Varde
.3: Stratified Random Sampling • Process: Divide the population into mutually exclusive identifiable subgroups (strata) • Draw a simple random sample (or systematic sample) from each stratum • Size of sample from each stratum directly proportional to size of the stratum • Homogeneity within each stratum • Heterogeneity between strata. Varsha Varde
Study of Absenteeism (2% sample) Varsha Varde
.3: Stratified Random Sampling • Stratified random sampling involves dividing population into strata • Hence, it needs higher time and cost • But, it provides desired precision with smaller sample than sampling from non-stratified population Varsha Varde
4: Cluster Sampling • Used when population consists of several groups of elements in such a manner that: • Groups are similar to each other and • Each group (CLUSTERS) is heterogeneous • So, population has inter-group homogeneity and intra-group heterogeneity • Exactly opposite of stratified population • Process: Select a few clusters randomly. Varsha Varde
.4: Cluster Sampling Examples • Complex of many identical buildings. We can select 5 out of 50 buildings • A Mgmt Inst: 2000 students per year. 50 per batch. 40 batches run concurrently. Each has some active, some ordinary & some passive students, and 75% boys, 25% girls. Choose 4 batches and talk to all 200 students without disturbing other 36 batches. Varsha Varde
.4: Cluster Sampling Examples • A truckload of mangoes in 4 dozen boxes. Each box has upper layer of top quality fruits. Quality & size drops layer by layer. • Thus, homogeneity between boxes & heterogeneity within each box. • Draw a random or systematic sample of a few boxes, open them and study them. • No need to open other boxes from the truck. Varsha Varde
.4: Cluster Sampling • Convenient • Sample size smaller • Less time and cost • But, restrictive in application: You don’t frequently get such populations. Varsha Varde
A Case Study • Under a community health program for tribals, it was necessary to discover their current state of nutrition, health & beliefs • Since adivasi padas are located at long distances from each other in tribal areas, a few adivasi padas were selected at random and all residents from infants to old ones were checked. Varsha Varde