1. THE FOUR FIGURES OF THE SYLLOGISM.By a figure of a syllogism is meant some particular arrangement of the three terms in the two premises. The conclusion is eliminated from this discussion, because in it the arrangement of the terms is constant, the major term always being used as the predicate of the conclusion and the minor as the subject. Using the symbols M, G and S, we find that there are four possible arrangements and, therefore, but four figures. These may be represented as follows:
No matter what the syllogism, if it is to be proved “logical,” it should be made to fit one of the four figure-types. To be sure, it may fit the figure without being logical, but it cannot be strictly logical without fitting the figure. The following valid syllogisms conform to the four figures as will be seen by the symbolized terms: First figure: All M S ? S M — G S — M S — G Second figure: All G No S ? No S G — M S — M S — G Third figure: All M All M ? Some who S M — G M — S S — G Fourth figure: Some G All who are M ? Some S G — M M — S S — G Here, then, are the types that represent all the syllogisms which mediate inference may use. Logic recognizes no other. Since every successful student of logic must be familiar with the four figures, the following may be used as a suggestive aid to reproducing the figures at will: First. It is easy for any one to remember this syllogism: All men are mortal, Socrates is a man, ? Socrates is mortal. In fact, it comes down to us from the time of Aristotle, and is therefore a patriot of many generations to whom the faithful should touch their hats. Let us, then, be ready to reproduce this syllogism with automatic precision, since it will enable us to know at once the position of the terms in the first figure. Second. Converting the terms of the major premise of the first figure gives the second figure, as, e.g.:
Third. Converting the terms of the minor premise of the first figure gives the third figure, as, e.g.:
Fourth. Converting the terms of both the major and minor premises of the first figure gives the fourth, as, e.g.:
To summarize: The second, third and fourth figures may be derived from the first. Converting the major premise of the first figure gives the second figure; converting the minor premise gives the third figure; and converting both premises gives the fourth figure. 2. THE MOODS OF THE SYLLOGISM.By the mood of a syllogism is meant some particular arrangement of the propositions which compose the syllogisms. “Mood” stands for an arrangement of the propositions, while “figure” represents an arrangement of the terms in any syllogism. Combining any three of the four logical propositions gives a mood, as, e.g., (1) E are moods. The first one has an E proposition for the major premise, an A for the minor and an E for the conclusion. This syllogism represents the first mood given above: E No men are trees, A All Americans are men, E ? No Americans are trees. It would not be difficult to determine by actual experiment, just how many moods could be formed, and of these, how many would admit of valid conclusions. It may be seen that there are sixty-four permutations of the four logical propositions, taken three at a time. These are in part:
And so the permutations could be continued. Substituting E for the major premise of the above group would give another group of sixteen, while a like substitution of I and O would result in two more groups, sixteen in each. 3. TESTING THE VALIDITY OF THE MOODS.In order to put the moods to good use, it is necessary to ascertain which ones yield a valid conclusion in any figure. If each were valid in all of the four figures, there would be 256. But it is obvious that such is not the case. Referring to the sixteen permutations given above, we find that the “negative-conclusion” rule makes invalid 2, 4, 5, 7, 10, 12, 13 and 15; whereas the rule for particulars throws out 9 and 14. This leaves the following as the probable valid moods in one or more of the figures: 1, 3, 6, 8, 11, 16. But to be certain of this the investigation must be continued. The mood A
As an A proposition distributes its subject only, we underscore the subject of each proposition in all the figures. (This underscoring is a simple way to indicate distribution.) We now find that the mood is valid in the first figure, because the middle term is distributed at least once; Let us try AII in the four figures:
We underscore the subject of the A proposition in each of the four figures. As I distributes neither subject nor predicate, no other term should be underscored. It is now evident that A In a like manner all the other moods might be tested. Logicians, who have done this, have found 24 to be valid. Five of these have weakened conclusions; i.e., a particular conclusion when it could just as well be universal. A A All trees grow, E No sticks are trees, O ? Some sticks do not grow. This conclusion is true, since “some” means “some at least.” Yet the conclusion is weak, because there is nothing to interfere with the broader and stronger conclusion that, “No sticks grow.” There are, therefore, only 19 valid and serviceable moods. These are as follows:
Of these nineteen moods it is not much of a tax to remember that A 4. SPECIAL CANONS OF THE FOUR FIGURES.As a deductive exercise in clear, logical thought, the indirect proof involved in establishing certain principles underlying the four figures, is of immense value. On no account should this section be omitted. The mere fact that it appears to be a difficult section is proof positive that the student is in need of just such exercises. Canons of the first figure. (1) The minor premise must be affirmative. (2) The major premise must be universal. Problem: The minor premise must be affirmative. Data: Given the form of the first figure, which is, M — G S — M S — G Proof: (1)If the minor premise is not affirmative then it must be negative; because affirmative and negative propositions, being contradictory in nature, admit of no middle ground. (2) If the minor premise is negative, the conclusion must be negative; for the reason that a negative premise necessitates a negative conclusion. (3) If the conclusion is negative then its predicate, G, must be distributed; since all negatives distribute their predicates. (4) If the predicate of the conclusion, which is the major term, is distributed, then it must be distributed in the premise where it occurs, which is the major premise; for any term which is distributed in the conclusion must be distributed in the premise where it occurs. (5) If the major term, which is the predicate of the major premise, is distributed, then the major premise must be negative; because only negatives distribute their predicates. (6) The result of this argument, then, gives two negative premises, and we know from rule3 that a conclusion from two negatives is untenable. (7) Since the minor premise cannot be negative, it must be affirmative. Problem: To prove that the major premise must be universal. Data: Given the form of the first figure: M — G S — M S — G Proof: (1) The predicate of the minor premise, M, which is the middle term, is undistributed; because no affirmative proposition distributes its predicate. (2) The middle term must be distributed in the major premise; since in any syllogism the middle term must be distributed at least once. (3) As the middle term, M, used as the subject of the major premise, must be distributed, then the major premise must be universal; because only universals distribute their subjects. Epitome. In the first figure, the minor premise must be affirmative, since making it negative necessitates making the major premise negative also; the major premise must be universal in order to distribute the middle term at least once. Special canons of the second figure. (1) One premise must be negative. (2) The major premise must be universal. Problem: To prove that one premise must be negative. Data: Given the form of the second figure: G — M S — M S — G Proof: (1) The middle term, M, is the predicate of both premises. (2) The middle term must be distributed at least once, according to rule3. (3) Hence one premise must be negative; since only negatives distribute their predicates. Problem: To prove that the major premise must be universal. Data: Given the form of the second figure: G — M S — M S — G Proof: (1) As one premise must be negative, it follows that the conclusion must be negative according to rule6. (2) If the conclusion is negative, then its predicate, G, the major term, must be distributed; since all negatives distribute their predicates. (3) When distributed in the conclusion, the major term, G, must also be distributed in the major premise, where it is used as the subject. See rule4. (4) Hence the major premise must be universal; for only universals distribute their subjects. Epitome. In the second figure one premise must be negative in order to distribute the middle term at least once; and the major premise must be universal that the major term, which is distributed in the conclusion, may be distributed in the premise where it occurs. Canons of the third figure. (1) The minor premise must be affirmative. (2) The conclusion must be particular. Problem: To prove that the minor premise must be affirmative. Data: Given the form of the third figure, which is, M — G M — S S — G Proof: (1) Suppose the minor premise were negative, then the conclusion would have to be negative, and this would distribute the predicate G. (2) A distributed predicate would necessitate its being distributed in the major premise. (3) But G, being the conclusion of the major premise, could be distributed only by a negative proposition. (4) This would result in two negatives; therefore no conclusion could be drawn, if the minor premise were negative. Problem: To prove that the conclusion must be particular. Data: Given the form of the third figure: M — G M — S S — G Proof: (1) The minor term, which is the predicate of the affirmative minor premise, is undistributed; because no affirmative distributes its predicate. (2) If undistributed in the premise, then the minor (3) The conclusion must, then, be particular; since all universals distribute their subjects. Epitome. In the third figure, unless the minor premise be affirmative, there can be no conclusion; since a negative minor would necessitate a negative major. An affirmative minor compels a particular conclusion, in order that the minor term, in the conclusion, may remain undistributed. Canons of the fourth figure. (1) If the major premise is affirmative, the minor premise must be universal. (2) If the minor premise is affirmative, the conclusion must be particular. (3) If either premise is negative, the major must be universal. Problem: To prove that if the major is affirmative, the minor must be universal. Data: Given the form of the fourth figure: G — M M — S S — G Proof: (1) If the major premise is affirmative, then its predicate which is the middle term, M, is undistributed; for no affirmative distributes its predicate. (2) The middle term must then be distributed in the “minor” according to rule3. (3) Then the “minor” must be universal; since only universals distribute their subjects. Problem: To prove that if the minor is affirmative, the conclusion must be particular. Data: Given the form of the fourth figure: G — M M — S S — G Proof: (1) If the minor premise be affirmative, then S, its predicate, must be undistributed; because no affirmative distributes its predicate. (2) Since S is undistributed in the minor premise, it must remain undistributed in the conclusion where it is used as the subject. Problem: To prove that if either premise is negative, the major must be universal. Data: Given the form of the fourth figure: G — M M — S S — G Proof: (1) If one of the premises is negative, then the conclusion must be negative according to rule6. (2) If the conclusion is negative, then the predicate, G, must be distributed. (3) If G is distributed in the conclusion, it must be distributed in the major premise. (4) The major premise must be universal; as G is used as its subject, and only universals distribute their subjects. Epitome. In the fourth figure, if the “major” is affirmative, the “minor” must be universal in order to distribute the middle term. If the minor is affirmative, the conclusion must be particular; otherwise the fallacy of illicit minor would result. If either premise is negative, the major must be universal to avoid the fallacy of illicit major. 5. SPECIAL CANONS RELATED.After a particular mood has been tested in the regular way, it has been intimated that the student may refer to the tabulated list of valid moods to ascertain, with a certainty, the validity of his reasoning. This is equivalent to referring to the answers in arithmetic; for if the student is unable to find the mood in the figure in which he has proved it valid, then he knows that he has made some mistake in his reasoning. Asecond check, though not absolute, is to recall the special canons of section four. If, for example, our reasoning has led us to believe that A A few suggestions relative to memorizing the special canons may not be out of place. The two canons of the first figure must be committed, and then it may be remembered that the second figure is the negative figure of logic. Other figures may yield a negative conclusion, but the second must yield a negative conclusion. Since a negative conclusion necessitates a negative premise, it follows that the second figure must always appear with The third figure is the particular figure of logic. Other figures may yield particular conclusions, but the third must do so. This helps us to remember the canon that the conclusion of the third figure must be particular. The other canon which relates to the minor premise is the same as the “minor premise” canon of the first figure. The canons of the fourth figure are in reality a summary of the canons of the other three figures. 6. MNEMONIC LINES.As a device for remembering the 19 valid moods, the logicians of an earlier day originated a combination of coined words which, though rather unscientific, may be easily committed to memory. Since, however, it is of much more value to test the moods by means of the general rules of the syllogism than it is to try to remember these moods, the mnemonic lines are of slight value. They are treated here merely as an item of historical interest. (1) Barbara, Celarent, Darii, Ferioque prioris; (2) Cesare, Camestres, Festino, Baroko, secundÆ; (3) Tertia, Darapti, Disamis, Datisi, Felapton, Bokardo, Ferison, habet; Quarta insuper addit (4) Bramantip, Camenes, Dimaris, Fesapo, Fresison. The only letters in these lines which mean nothing are l, n, r, t and small b and d; all the others have a signification. For example, the vowels of the italicized The first figure was called by Aristotle the perfect figure, whereas the second and third were the imperfect figures. The fourth figure was given no place in the works of Aristotle; its discovery is credited to Galen, a celebrated teacher of medicine of the second century. According to Aristotle, the first figure is the most serviceable and the most convincing and, therefore, as a final test of their validity, the moods of the other figures should be changed to the first. This process in logic is termed Reduction. In this reduction of the imperfect figures to the perfect, the capital letters of the artificial words, together with s, p, m, and k, have a definite meaning. The capital letters indicate that certain moods of the imperfect figures can be reduced to the corresponding moods of the first figure; e.g., Festino (eio) of the second figure, Felapton (eao) of the third figure, and Fesapo (eao) of the fourth figure may all be reduced to Ferio (eio) of the first figure. This is known because F (1) Given: A syllogism in Darapti A A All M A All M I ? Some S The symbols indicate that the mood is A Problem: To reduce A Process: D, being the initial letter of Darapti, suggests that its mood must be reduced to one indicated by a word of the first figure whose initial letter is D. This mood is in Darii, or is A The p in Darapti indicates that the proposition represented by the preceding vowel must be converted by limitation. This proposition is the minor premise; converting it by limitation gives: “Some sympathetic persons are true teachers.” As there are no other significant letters the reduction is complete and we have this: A All M I Some S I ? Some S The symbolization indicates that the mood is A (2) Given: A syllogism in CamestresA A All G E No S E ? No S The symbols show that the mood is AEE of the second figure or in Camestres. Judging from the initial letter C, the mood in Camestres must be reduced to the mood in Celarent E The letter m between a and e indicates that the major and minor premises of the given syllogism must be interchanged. The letters following both e’s suggest that the minor premise and the conclusion of the syllogism must be converted simply. This is the resulting syllogism: E No M A All S E ? No S Here, then, is the E According to the ancient theory, reduction is necessary as a matter of final and absolute proof that the conclusion The first figure. The first figure is known as the perfect figure; because it is the only one which proves all of the four logical propositions. Recalling the moods of the first figure makes this evident:
It is likewise the more natural figure; because it is the only one which uses both the subject and predicate of the conclusion in the same relative places as they appear in the premises. Symbolizing the figure makes this apparent: M — G S — M S — G The first figure, being the only figure which proves a “universal affirmation” (A), is used most by the scientist; as the object of science is to establish universal affirmative truths. The second figure. As the second figure conditions negative conclusions only, it is called the figure of disproof, or the exclusive The third figure. The third figure admits of particular conclusions only, and in consequence is of little value to the scientist. The fourth figure. This figure is so nearly like the first that it is of little value; in fact, it may be changed to the first by simply interchanging the major and minor premises. Some authorities refuse to recognize the fourth figure. 8. OUTLINE.FIGURES AND MOODS OF THE SYLLOGISM. (1) The four figures of the syllogism. Definition—symbolization. Illustrations—device for remembering. (2) The moods of the syllogism. Twenty-four valid. (3) Testing the validity of the moods. Application of the general rules of the syllogism. Weakened conclusion—five. Nineteen useful moods. A thought exercise. (4) Special canons of the four figures. Proof of the two canons of the first figure. Proof of the two canons of the second figure. Proof of the two canons of the third figure. Proof of the three canons of the fourth figure. (5) Special canons related. Used as checks. (6) Mnemonic lines. Their use explained. Reduction. (7) Relative value of the four figures. 9. SUMMARY.(1) By a syllogistic figure is meant some particular arrangement of the three terms in the two premises. This arrangement yields four figures which are designated by the position of the middle term. To be logical, any syllogism must conform to one of the four figures. The first figure is suggested by the position of the terms of the “Socrates is mortal” syllogism. The second is derived by converting the major premise of the first; while the third figure results from converting the minor premise of the first, and the fourth by converting both major and minor of the first. (2) By a mood of a syllogism is meant some particular arrangement of the propositions which compose it. There are 64 moods but only 24 are valid. (3) The validity of the various moods may be tested by applying to them the rules of the syllogism. No mood is valid if it violates any one of the eight rules. A “weakened conclusion” is a particular conclusion which could just as well be universal. Of the 24 valid moods five have weakened conclusions. This leaves but 19 useful moods. Testing the validity of the various moods in the four figures is a most valuable thought exercise. (4) The deductive exercise involved in establishing certain In the first figure it may be proved (1)that the minor premise must be affirmative; since making it negative necessitates making the major premise negative, and no conclusion can be drawn from two negatives; (2)that the major premise must be universal in order to distribute the middle term at least once. In the second figure it may be proved (1)that one premise must be negative in order to distribute the middle term; (2)that the major premise must be universal in order to distribute its subject, which is distributed in the negative conclusion where it appears as the predicate. In the third figure it may be proved (1)that the minor premise must be affirmative in order to prevent the “two negative” fallacy; (2)that an affirmative minor necessitates a particular conclusion, because the minor term in the conclusion must remain undistributed. In the fourth figure it may be proved (1)that if the major is affirmative, the minor must be universal in order to distribute the middle term; (2)that if the minor is affirmative, the conclusion must be particular in order to avoid committing the fallacy of illicit minor; (3)that if either premise is negative, the major must be universal to avoid the fallacy of illicit major. (5) A knowledge of the special canons is helpful in that it may be used to check fallacious reasoning. (6) Certain mnemonic lines were used by the Schoolmen as an aid in recalling the nineteen valid moods, and also as a suggestive device to aid in the process known as Reduction. The process of reduction is merely a matter of changing to the first figure the moods of the other figures. This process is no longer thought to be necessary. (7) The first figure, called the perfect figure, is the one used most by scientists, as it is the only figure which proves a universal affirmative truth. The second figure is the negative, or figure of disproof, and is used mainly for the purpose of eliminating all the conditions of the inquiry save one. The third figure serves a purpose in affording an easy way to contradict a universal assertion; this is the figure of particulars. The fourth figure, because it so closely resembles the first, is of little value. 10. ILLUSTRATIVE EXERCISES.Question 1a. By making use of the rules for negatives and particulars, test the validity of the following moods: O Answer: The first mood has the negative O as its major premise, and the affirmative A as its conclusion; the mood is thus invalid; because a negative premise necessitates a negative conclusion according to rule6. The second mood contains the particular proposition I as its minor premise, and thus should have a particular conclusion according to rule8. But the conclusion A is universal and, therefore, the mood is invalid. The premises of the third mood are universal and the conclusion particular. The mood, however, is valid, because rule8 does not work both ways, as does rule6. When a universal can just as well be drawn, then the particular becomes a weakened conclusion. (1b) Using the rules for negatives and particulars, test the validity of the following: A (2a) Paying no regard to “figure,” derive as many conclusions as possible from the following sets of premises: E Answer: E A (2b) From the following sets of premises derive as many conclusions as possible paying no attention to figure: E (3a) Making use of all the general rules of the syllogism, test the validity of the following mood in all the figures: A Answer:
An underscored symbol indicates a distributed term. Since Adistributes its subject, the subjects of both premises are underscored in all the figures. No term is underscored in the conclusions; since I distributes neither term. In the first figure the middle term is distributed in the major premise, and no term is distributed in the conclusion. Since both premises are affirmative, the rules for negatives are not applicable; and as a particular may be drawn from two universals, if there is no violation of the rules for distribution, this mood seems to be valid in the first figure. It is, however, a weakened conclusion; since an A could just as well be drawn. The mood is invalid in the second figure because of undistributed middle, but valid in both the third and fourth; since in both cases the middle term is distributed at least once. (3b) Determine the validity of the attending moods in all the figures giving reasons: I 11. REVIEW QUESTIONS.(1) Define a logical figure and illustrate by means of some ordinary syllogistic argument. (2) Symbolize the four figures and give suggestions for remembering them. (3) Write syllogisms which illustrate each of the four figures. (4) Define mood as it is used in logic. Illustrate. (5) How many moods are valid? (6) Explain by illustration a “weakened conclusion.” (7) Test the validity of A (8) Independent of all helps, prove the truth of the canons of the first figure. (9) In a similar way prove the canons of the second, third and fourth figures. (10) So far as testing arguments is concerned, what use may be made of the special canons of the syllogism? (11) Offer a few suggestions for remembering the special canons. (12) Why did Aristotle attach so much importance to reduction in logic? (13) Justify calling the first figure the “perfect figure,” and the others the “imperfect figures.” (14) Treat of the relative value of the four figures. (15) Show by illustration that the second figure is the exclusive figure. (16) Test the following moods in all the figures: E A 12. QUESTIONS FOR ORIGINAL THOUGHT AND INVESTIGATION.(1) Give an illustration of a syllogism in the fourth figure which might just as well be written in the first figure. (2) May a syllogism, which is invalid in the fourth figure, be made valid by writing it in the form of the first figure? Prove it. (3) Show why it is impossible to apply all the rules of the *** (4) Show the difference between a direct and an indirect proof. (5) Show that A (6) The third figure is known as the figure of particular conclusions. Why should not the second canon of that figure be, “One premise must be particular” rather than “The conclusion must be particular?” (7) Show that there is some ground for thinking that, as a final test, moods in the other figures should be reduced to the first. (8) Illustrate the fact that the second figure is the figure of disproof; whereas the third is the figure of contradictions. (9) “To be logical a syllogism must conform to one of the four figures, but this does not mean, necessarily, that all arguments must conform to some figure.” Explain this. |