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Introduction to Data Analysis. Sampling. Today’s lecture. Sampling (A&F 2) Why sample? Random sampling. Other sampling methods. Stata stuff in Lab. Sampling introduction. Last week we were talking about populations (albeit in some cases small ones, such as my friends).
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Introduction to Data Analysis. Sampling
Today’s lecture • Sampling (A&F 2) • Why sample? • Random sampling. • Other sampling methods. • Stata stuff in Lab
Sampling introduction • Last week we were talking about populations (albeit in some cases small ones, such as my friends). • Often when we see numbers used they are not numbers relating to a population, but a sample of that population. • Newspapers report the percentage of the electorate thinking Tony Blair is trustworthy, but this is really the percentage of their sample (say 1000 people) that they asked about Blair’s trustworthiness.
Samples and populations • For that statistic from the newspaper’s sample to be useful, the sample has to be ‘representative’. • i.e. the % saying Blair is trustworthy in newspaper’s survey (the sample of 1000 people) needs to be similar to the % in electorate (the population of 40 million people). • An intuitively obvious way of doing this is to pick 1000 people at random. • For the survey, metaphorically (or literally with a big hat) put every elector’s name into a hat and pull out 1000 names. • For a random sample of people in a large classroom, I could sample every 10th person along each row.
Why sample? • Cost. • We could ask all 40 million people that are eligible to vote in Britain. This would prove somewhat expensive. • The last British census cost £220 million… • Speed. • Equally the last British census took 5 years to process the data… • Impossibility. • Consuming every bottle of wine from a vineyard to assess its quality leaves no wine to sell…
Why random? • Random sampling allows us to apply probability theory to our samples. • This means that we can assess how likely it is (given how big our sample is) that our sample is representative. • Deal with this in more detail later on. • Intuitively, non-random sampling doesn’t seem a very good idea. • Who’s heard of Alf Landon?
Alf vs. FDR • In 1936 the Literary Digest magazine predicted that the Republican Presidential candidate (Landon) would beat FDR. • The LD sent 10 million questionnaires out, of the 2 ½ million that were sent back, a large majority claimed to be voting Republican at the election. • The LD wanted to estimate the % of voters for each candidate (the parameter), and used the proportion from their sample (the statistic) to estimate this. • But, FDR won…
Why did the LD get it wrong? • LD’s sample was large, but unrepresentative. • They did not send questionnaires to randomly selected people, but rather lists of people with club memberships, lists of car /telephone owners. • These people were wealthier and therefore more likely to vote Republican; the sample was not representative of the US electorate as a whole. • The LD’s sampling frame was not the population (the electorate), but a wealthy subset of the population.
Non-probability sampling • The moral being… • If we don’t sample randomly, and instead use non-probability sampling, then we are likely to get sample statistics that are not similar to the population. • e.g. Newspapers and TV regularly invite readers/ viewers to ring up and ‘register their opinion’. • Scottish Daily Mirror ran a poll on who should be the new 1st Minister in 2001. One of Jack McConnell’s fellow MSPs rang up 169 times to indicate he should take the position… • If the Daily Mail and Independent hold phone in-polls on the same issue, the results will be different as the samples are different to one another in a non-random way (social class, ideology, etc.).
Experimental designs • Randomness is also useful in experimental sciences, just as with observational data. • If we are giving one set of subjects a treatment and one group nothing, then ideally we would randomly select who is in each group. • e.g. psychiatrists studying a drug for manic depressives, would give the drug to one group and a placebo to the other. • Their results are no good if the groups are initially different (say by age, sex, etc.). • Random selection into a group makes these differences unlikely, and allows us to test how likely it is that the drug has a real effect.
Simple random sampling (SRS) • ‘Names out of a hat’ sampling. Select the n of the sample that we want, and then randomly pick that n of observations from the population. • Each member of the population is equally likely to be sampled. • e.g. if I wanted a sample from the room, then I might give everyone a number, and then use a table of random numbers to pick out 10 people. Any method that picks people randomly is acceptable.
Problems with SRS • A random sample may not include enough of a particular interesting group for analysis. • Interested in experiences of racism, 100 random people will on average include 85 whites, and an individual sample will potentially have even fewer (maybe even zero) non-whites. • Can be costly and difficult. • A random sample of 50 school-children might include 49 in England and Wales, and one in the Orkney’s. • A complete list of every school-child might be possible to obtain, but what of every person living in Britain. A list of the population of interest is not always available.
Solutions (1) • Stratified random sampling. • Two stages: classify population members into groups, then select by SRS within those groups. • e.g. ‘over-sample’ non-whites for our racism study. • Once we had divided the population by race, we would SRS within those racial groups. • Might take 50 whites and 50 non-whites for our sample if we were interested in comparing experiences of racism.
Solutions (2) • Cluster random sampling. • If population members are naturally clustered, then we SRS those clusters and then SRS the population members within those clusters. • Pupils in schools are naturally grouped by school. • We may not have a list of every school-child, but we do have a list of every school. • Again two stages. We randomly pick 5 schools, and then randomly pick 10 children in each school.
One further problem • This is not to say that all problems with random sampling are soluble. • Non-response. • Not all members of our chosen sample may respond, particularly when sanctions are nil and incentives are low (or in fact usually negative…). • This can matter if non-response is non-random. If certain types of people tend to respond and others do not.
Non-response • In 1992 opinion polls predicted a Labour victory, yet the Conservatives were returned by a large majority of votes (if not seats). • One of the (many) factors that may have caused this bias in the pollswas that Conservative voters were less likely to respond to surveys than other voters. • If the members of the sample that choose to not respond are different to those that do then we have a biased sample. More on bias later on. • Ultimately, tricky to deal with. Some more on this later this semester.
Sampling – a summary • Sampling is a easy way of collecting information about a population. • SRS means everyone in the population of interest has the same chance of being selected. • We often use slightly different methods to SRS to overcome certain problems. • Random sampling allows us to estimate the probability of the sample being similar to the population.
