Sampling
Sampling is to select a group of people among a
large population to estimate the characteristics of the whole lot.
Why Use Statistical Sampling?
By: Harold Jennings & Robert Schauer
We all
know that taxpayer’s business records are often voluminous. The tax that is due
is most often determined at the transaction level
requiring
the auditor tolook at the source record to make a proper audit determination as
to whether an error in reporting exists. A taxpayer could have hundreds,
thousands, or even millions of transactions in any tax reporting period. Tax
auditors typically audit tax periods that extend into the years, so it is often
quite impractical to audit every business transaction. But if the auditor did
so, that is giving equal and complete coverage to each transaction within the
scope of the audit, than the auditor has done a detailed audit. In a detailed
audit, the auditor will compute a total error amount for all audited
transactions. This total error could equal zero (no change audit) or could
represent a net tax overpayment or underpayment. If a detailed audit is
possible and practical, it is always the preferred method of determining total
error. But sifting through all transactions is not going to be practical in
many audit cases, so the auditor must decide between two alternatives. The
auditor could ignore certain business transactions (no audit of certain
transactions). Or, the auditor could take a sample and presume that the audited
sample results, if projected to the population, will be relatively accurate.
(Oftentimes, the auditor will do both). Note that if a sample is projected, the
detailed audit is the standard by which we should judge any sample results. We
should be able to use a sample projection if we can prove with enough
confidence, that the difference between the sample projection and the true
total error, had a detailed audit been performed, is relatively small. But how
can this possible if a detailed examination is never performed? The key to
proving the accuracy of the sample lies in how the sample is taken from the
population. Within the profession, auditors can take samples in a variety of
different ways. But in essence, all different sampling methods can be reduced
to two kinds of sampling. To do a statistical sample, the auditor must take a
probability sample. A probability sample is any sample where all population
units have a chance at selection - and this chance of selection is known, but
not necessarily equal. Anything other than a probability sample is a judgmental
sample, the other basic form of sampling. Probability samples include simple
random samples, where all members of the sampled population have equal chance
of being selected into the sample. Or more commonly, auditors will use
stratified random samples. In a stratified random sample, the population is
divided into groups, or strata. Within each stratum, all stratum units have an
equal chance at being selected into the sample. But across the strata, the
chances for selection for all population units differ across the strata, but
the probability of selection for any unit in a stratified population is known.
Finally, in judgmental sampling, the probability of selection is not known for
any of the units, and includes block sampling that is common in auditing. The
auditor can use the audit results of a probability sample (ether a simple
random or a stratified random sample), and objectively prove, using probability
theory, the accuracy of the sample. That is, the projected
results can be compared to a detailed audit with some degree of confidence, had
one been done. In any other type of sampling other than probability sampling,
accuracy cannot be objectively measured. In all other types of sampling,
accuracy of the projected sample results is a matter of subjective judgment
(hence the name judgmental sampling). Therefore, if objective proof of the
accuracy of the sample is a concern, then the auditor should be using
probability sampling. But there are other concerns as well. These include
efficiency and accuracy. With regard to accuracy, we would like to use a sample
of the smallest size to give us the accuracy we desire. In most cases, this is
going to be from a probability sample. Block samples tend to be less accurate
for any given sample size, when compared to probability samples. This often has
to do with the fact that the probability sample will come from the entire
population, and a block sample will only come from one (or a few) portions of
the population (there are other statistical reasons for this as well, which we
will not discuss here). But on the other hand, convenience often enters into
the picture, and auditors opt to take a block sample in any case. But the price
that is paid is that the sample results will likely not be as accurate given
the number of units to be audited, and no objective statement of accuracy can
be made about the projected sample results. We believe, as auditors, that
accuracy is always of the utmost concern, and therefore, statistical sampling,
when possible, should be the preferred method of sampling. To that end, the
Multistate Tax Commission offers a course in statistical sampling for tax
auditors. The Commission also invites others, including those in private
practice, to take the training if there is interest. Please visit www.MTC.gov for fee schedules, class times,
and registration information.
Two types of sampling:
Probability
sampling
·
Simple random: it is done among
equal probability/ by unequal probability. It works very good with homogenous
population.
·
Systematic: Fixed probability.
·
Cluster sampling: different
type of people gathering at one place
·
Stratified sampling: to pick up
a sample from an area where everything is same.
Why Probability Sampling?
·
Probability sampling,
where a small randomly selected sample of the population can be used to
estimate the distribution of an attitude or opinion in the entire population
with statistical confidence, provides the foundation for survey research and
political polling. The basis of probability-based random sampling is that every
member of the population must have a known, non-zero chance of being selected.
Probability sampling provides the means by which the margin of sampling error
can be calculated and the level of confidence in survey estimates reported.
Sampling error results from collecting data from some rather than all members
of the population and is highly dependent on the size of the sample.
Non
probability sampling
·
Convenience Sampling - This
technique is considered easiest, cheapest and least time consuming.
·
Consecutive Sampling - This
non-probability sampling technique can be considered as the best of all
non-probability samples because it includes all subjects that are available
that makes the sample a better representation of the entire population.
·
Quota Sampling -
Quota
sampling is a non-probability sampling technique wherein the
researcher ensures equal or proportionate representation of subjects depending
on which trait is considered as basis of the quota.
·
Judgmental Sampling - In
this type of sampling, subjects are chosen to be part of the sample with a
specific purpose in mind
·
Snowball Sampling - In
this type of sampling, the researcher asks the initial subject
When to Use Non-Probability Sampling?
▪
This type of sampling can be used when demonstrating
that a particular trait exists in the population.
▪
It can be used when randomization is impossible like
when the population is almost limitless.
▪
It can be used when the research does not aim to
generate results that will be used to create generalizations
pertaining to the entire population.
▪
It is also useful when the researcher has limited
budget, time and workforce.
▪
This technique can also be used in an initial study
which will be carried out again using a randomized, probability sampling.
Sampling techniques: Advantages and disadvantages
|
Technique
|
Descriptions
|
Advantages
|
Disadvantages
|
|
Simple
random
|
Random
sample from whole population
|
Highly
representative if all subjects participate; the ideal
|
Not
possible without complete list of population members; potentially
uneconomical to achieve; can be disruptive to isolate members from a group;
time-scale may be too long, data/sample could change
|
|
Stratified
random
|
Random
sample from identifiable groups (strata), subgroups, etc.
|
Can
ensure that specific groups are represented, even proportionally, in the
sample(s) (e.g., by gender), by selecting individuals from strata list
|
More
complex, requires greater effort than simple random; strata must be carefully
defined
|
|
Cluster
|
Random
samples of successive clusters of subjects (e.g., by institution) until small
groups are chosen as units
|
Possible
to select randomly when no single list of population members exists, but
local lists do; data collected on groups may avoid introduction of
confounding by isolating members
|
Clusters
in a level must be equivalent and some natural ones are not for essential
characteristics (e.g., geographic: numbers equal, but unemployment rates
differ)
|
|
Stage
|
Combination
of cluster (randomly selecting clusters) and random or stratified random sampling
of individuals
|
Can
make up probability sample by random at stages and within groups; possible to
select random sample when population lists are very localized
|
Complex,
combines limitations of cluster and stratified random sampling
|
|
Purposive
|
Hand-pick
subjects on the basis of specific characteristics
|
Ensures
balance of group sizes when multiple groups are to be selected
|
Samples
are not easily defensible as being representative of populations due to
potential subjectivity of researcher
|
|
Quota
|
Select
individuals as they come to fill a quota by characteristics proportional to
populations
|
Ensures
selection of adequate numbers of subjects with appropriate characteristics
|
Not
possible to prove that the sample is representative of designated population
|
|
Snowball
|
Subjects
with desired traits or characteristics give names of further appropriate
subjects
|
Possible
to include members of groups where no lists or identifiable clusters even
exist (e.g., drug abusers, criminals)
|
No
way of knowing whether the sample is representative of the population
|
|
Volunteer,
accidental, convenience
|
Either
asking for volunteers, or the consequence of not all those selected finally
participating, or a set of subjects who just happen to be available
|
Inexpensive
way of ensuring sufficient numbers of a study
|
Can
be highly unrepresentative
|
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