A statistical syllogism (or proportional syllogism or direct inference) is a non- deductive

syllogism A syllogism ( grc-gre, συλλογισμός, ''syllogismos'', 'conclusion, inference') is a kind of logical argument that applies deductive reasoning to arrive at a conclusion based on two propositions that are asserted or assumed to be tru ...

. It argues, using

inductive reasoning Inductive reasoning is a method of reasoning in which a general principle is derived from a body of observations. It consists of making broad generalizations based on specific observations. Inductive reasoning is distinct from ''deductive'' re ...

, from a generalization true for the most part to a particular case.

Introduction

Statistical Statistics (from German: '' Statistik'', "description of a state, a country") is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data. In applying statistics to a scientific, industr ...

syllogisms may use qualifying words like "most", "frequently", "almost never", "rarely", etc., or may have a statistical generalization as one or both of their premises. ''For example:'' #Almost all people are taller than 26 inches #Gareth is a person #Therefore, Gareth is taller than 26 inches Premise 1 (the major premise) is a

generalization A generalization is a form of abstraction whereby common properties of specific instances are formulated as general concepts or claims. Generalizations posit the existence of a domain or set of elements, as well as one or more common character ...

, and the argument attempts to draw a conclusion from that generalization. In contrast to a deductive syllogism, the premises logically support or confirm the conclusion rather than strictly implying it: it is possible for the premises to be true and the conclusion false, but it is not likely. ''General form:'' #X proportion of F are G #I is an F #I is a G In the abstract form above, F is called the "reference class" and G is the "attribute class" and I is the individual object. So, in the earlier example, "(things that are) taller than 26 inches" is the attribute class and "people" is the reference class. Unlike many other forms of syllogism, a statistical syllogism is inductive, so when evaluating this kind of argument it is important to consider how strong or weak it is, along with the other rules of induction (as opposed to deduction). In the above example, if 99% of people are taller than 26 inches, then the probability of the conclusion being true is 99%. Two ''

dicto simpliciter ''Secundum quid'' (also called ''secundum quid et simpliciter'', meaning " hat is truein a certain respect and hat is trueabsolutely") is a type of informal fallacy that occurs when the arguer fails to recognize the difference between rules of th ...

'' fallacies can occur in statistical syllogisms. They are "

accident An accident is an unintended, normally unwanted event that was not directly caused by humans. The term ''accident'' implies that nobody should be blamed, but the event may have been caused by unrecognized or unaddressed risks. Most researche ...

" and " converse accident".

Faulty generalization A faulty generalization is an informal fallacy wherein a conclusion is drawn about all or many instances of a phenomenon on the basis of one or a few instances of that phenomenon. It is similar to a proof by example in mathematics. It is an examp ...

fallacies can also affect any argument premise that uses a generalization. A problem with applying the statistical syllogism in real cases is the

reference class problem In statistics, the reference class problem is the problem of deciding what class to use when calculating the probability applicable to a particular case. For example, to estimate the probability of an aircraft crashing, we could refer to the fr ...

: given that a particular case I is a member of very many reference classes F, in which the proportion of attribute G may differ widely, how should one decide which class to use in applying the statistical syllogism? The importance of the statistical syllogism was urged by Henry E. Kyburg, Jr., who argued that all statements of probability could be traced to a direct inference. For example, when taking off in an airplane, our confidence (but not certainty) that we will land safely is based on our knowledge that the vast majority of flights do land safely. The widespread use of confidence intervals in

statistics Statistics (from German: '' Statistik'', "description of a state, a country") is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data. In applying statistics to a scientific, indust ...

is often justified using a statistical syllogism, in such words as "''Were this procedure to be repeated on multiple samples, the calculated confidence interval (which would differ for each sample) would encompass the true population parameter 90% of the time."'' The inference from what would mostly happen in multiple samples to the confidence we should have in the particular sample involves a statistical syllogism. One person who argues that statistical syllogism is more of a probability is Donald Williams.

History

Ancient writers on logic and rhetoric approved arguments from "what happens for the most part". For example,

Aristotle Aristotle (; grc-gre, Ἀριστοτέλης ''Aristotélēs'', ; 384–322 BC) was a Greek philosopher and polymath during the Classical period in Ancient Greece. Taught by Plato, he was the founder of the Peripatetic school of ...

writes "that which people know to happen or not to happen, or to be or not to be, mostly in a particular way, is likely, for example, that the envious are malevolent or that those who are loved are affectionate." The ancient Jewish law of the

Talmud The Talmud (; he, , Talmūḏ) is the central text of Rabbinic Judaism and the primary source of Jewish religious law ('' halakha'') and Jewish theology. Until the advent of modernity, in nearly all Jewish communities, the Talmud was the ce ...

used a "follow the majority" rule to resolve cases of doubt. From the invention of

insurance Insurance is a means of protection from financial loss in which, in exchange for a fee, a party agrees to compensate another party in the event of a certain loss, damage, or injury. It is a form of risk management, primarily used to hedge ...

in the 14th century, insurance rates were based on estimates (often intuitive) of the frequencies of the events insured against, which involves an implicit use of a statistical syllogism. John Venn pointed out in 1876 that this leads to a

of deciding in what class containing the individual case to take frequencies in. He writes, “It is obvious that every single thing or event has an indefinite number of properties or attributes observable in it, and might therefore be considered as belonging to an indefinite number of different classes of things”, leading to problems with how to assign probabilities to a single case, for example the probability that John Smith, a consumptive Englishman aged fifty, will live to sixty-one. In the 20th century,

clinical trials Clinical trials are prospective biomedical or behavioral research studies on human participants designed to answer specific questions about biomedical or behavioral interventions, including new treatments (such as novel vaccines, drugs, dieta ...

were designed to find the proportion of cases of disease cured by a drug, in order that the drug can be applied confidently to an individual patient with the disease.

Problem of induction

The statistical syllogism was used by

Donald Cary Williams Donald Cary Williams (28 May 1899 – 16 January 1983), usually cited as D. C. Williams, was an American philosopher and a professor at both the University of California Los Angeles (from 1930 to 1938) and at Harvard University (from 1939 to 1967 ...

and

David Stove David Charles Stove (15 September 1927 – 2 June 1994) was an Australian philosopher. Philosophy His work in philosophy of science included criticisms of David Hume's Inductive scepticism. He offered a positive response to the problem of i ...

in their attempt to give a logical solution to the

problem of induction First formulated by David Hume, the problem of induction questions our reasons for believing that the future will resemble the past, or more broadly it questions predictions about unobserved things based on previous observations. This inferen ...

. They put forward the argument, which has the form of a statistical syllogism: #The great majority of large samples of a population approximately match the population (in proportion) #This is a large sample from a population #Therefore, this sample approximately matches the population If the population is, say, a large number of balls which are black or white but in an unknown proportion, and one takes a large sample and finds they are all white, then it is likely, using this statistical syllogism, that the population is all or nearly all white. That is an example of inductive reasoning.

Legal examples

Statistical syllogisms may be used as legal evidence but it is usually believed that a legal decision should not be based solely on them. For example, in L. Jonathan Cohen's "gatecrasher paradox", 499 tickets to a rodeo have been sold and 1000 people are observed in the stands. The rodeo operator sues a random attendee for non-payment of the entrance fee. The statistical syllogism: #501 of the 1000 attendees have not paid #The defendant is an attendee #Therefore, on the balance of probabilities the defendant has not paid is a strong one, but it is felt to be unjust to burden a defendant with membership of a class, without evidence that bears directly on the defendant.L. J. Cohen, (1981
Subjective probability and the paradox of the gatecrasher
''Arizona State Law Journal'', p. 627.

Introduction

History

Problem of induction

Legal examples

See also

References

Further reading