principal: syllogisms part ii
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Principal: Syllogisms Part II. Week 1 ENG 1005: Writing about Social Justice. In answer to the question: why are the rules the rules…. The “if you were an alien” explanation… - PowerPoint PPT PresentationTRANSCRIPT
Principal: SyllogismsPart IIWeek 1 ENG 1005: Writing about Social Justice
In answer to the question: why are the rules the rules… The “if you were an alien” explanation… Aristotle described the syllogism as ““a discourse in which certain (specific)
things, having been supposed something different from the things supposed, results of necessity because these things are so.”
Confusing, right? Essentially: syllogisms are like a common language. The rule were not so much invented as discovered, but they are universally true, meaning, the rules of logic—like physics or math—work anywhere in the universe. And, they are a way to mitigate uncertainty. They offer clarification and something as close to “proof” as human beings will ever get.
Further, syllogism are a way to see that a claim-with-reason (thesis) depends for logical completeness on an assumption–usually the major premise–which often needs to be supported in your argument.
Formulating the major premise of each claim-with-reason is a way of reminding yourself of the assumptions your audience must grant if your argument is to be persuasive.
In answer to “What are the rules of syllogisms, really” (1) If you have a negative conclusion, you must have at least
one negative premise. And, if you have a positive conclusion you must have two positive premises.
You can not have two negative premise in any one syllogism. If BOTH premises are universal, the conclusion cannot be
particular. If a term is distributed in the conclusion, it must be distributed
in the premise where it appears. The “middle term” must appear once in each premise, but not
in the conclusion. The subject term must appear once in one premise and once in
the conclusion. The predicate term must appear once in one premise and once
in the conclusion.
All A are B No B are C No A are C
Some A are not BNo A are X Some B are X
VALID
INVALID
All A are B No B are C No A are C
VALID
Some A are not BNo A are X Some B are X INVALID
RULE 1: Neg conclusion = at least 1 neg premise
All A are B All B are C All A are C
Some A are not B Some C are not B Some A are not C INVALIDVALID
RULE 2: Cannot have two neg premises
All R are S All C are R All C are S
No P are YNo P are W Some Y are not W INVALIDINVALID
RULE 3: Two universal = univ. conclusion All S are F
All L are F All S are L INVALID
RULE 4: If term is distributed in concl, must be distributed in the premise where it appears
How would you convert this thesis statement?
Women should be barred from combat units because the United States needs a strong army.
Student Thesis
An example of everyday use:Major Premise: Persons who lack the strength and endurance
for combat duty should be barred from combat units.Minor Premise: Women are persons who lack the strength
and endurance for combat duty.Therefore: Women should be barred from combat units.
A
BC
A
C B
Women should be barred from combat units because the United States needs a strong army.
Student Thesis
But we’re not there yet…And logic is imperfect… Formal logic helps you appreciate the structure but this kind of “formal
logic” only deals with the structure of an argument, not with the truth of its premises.
So, unless a properly structured argument also has true premises, we can conclude nothing about the truth of its claim.
That’s why Jon-Luke’s head was exploding in class Tuesday.Consider the following argument:
The blood of insects can be used to lubricate lawn-mower engines.Vampires are insects._____________________
Therefore, the blood of vampires can be used to lubricate lawn-mower engines.
Logic that’s Illogical? Because their premises are untrue, this argument is ludicrous but valid
structurally. Main concern of writers is to show the truth of the premises, so formal logic is of
limited value. And yet, you can’t argue any position if you start with an invalid claim. So
getting the syllogism or enthymeme right is kinda important! Incidentally, Sir Francis Bacon rejected the Aristotelian syllogism and deductive
reasoning, asserting it was fallible and illogical. System of argumentation dominated Western philosophical thought through the
17th Century; in the 19th Century, modifications to syllogism were incorporated. Rhetoric then—the appeals especially (logos, ethos, pathos, kairos)—works
alongside classic logic like style. Once you state your claim, how you arrange “the available means” results in persuasion. But you can’t build a persuasive argument on the back of a weak or invalid claim.
Using Venn Diagrams Since a categorical syllogism has three terms, you can use a Venn diagram of
three intersecting circles to solve for validity. Each circle represents one of the three premises/terms in a categorical syllogism. So, take out paper/pen and drawn this:
Diagramming Syllogisms In order to use a Venn diagram to test a syllogism, the
diagram must be filled in to reflect the contents of the premises.
Shading an area means that that area is empty. First, diagram the premise sentences independently.Then see whether the conclusion has naturally been
diagramed. If so, the argument is valid. If not, then it is not.
Consider the following argument…All Greeks are mortal. (All M are P)All Athenians are Greek. (All S are M)So, all Athenians are mortal. (All S are P)
Remember: it matters not which letters you use to represent the terms in a class.
So, draw an image that looks like this:
Diagram…Diagram each of the premises. When doing this, act as if there are
only 2 relevant circles. Begin with the first premise
(frequently the premise involving the major term, sometimes called the major premise).
In our example you need to diagram the proposition "All M are P". Ignoring for a moment the circle representing the minor term, your diagram sho8uld look like this:
Following the standard conventions we get:
Next, diagram the second premise:
"All S are M"--
Now, if we overlap the diagrams of the premises we get a diagram of the argument, and we are ready to determine whether the argument is valid or not.
Does this diagram express the informational content of the conclusion of the argument?
Yes, all of the S's that remain are in region 5, and everything in region 5 is an S, an M, and a P. Since all the S's are in region 5, all the S's are P's and the argument is VALID.
In-Class ExerciseBreak into groups of two and diagram the following
two syllogisms.SYLLOGISM 1:
All mathematicians are rational. (All P are M)All philosophers are rational. (All S are M)SO, all philosophers are mathematicians. (All S are P)
SYLLOGISM 2:All philosophers are logical.Some physicists are logical.So, some philosophers are physicists.
AnswerAll mathematicians are
rational. (All P are M)All philosophers are rational. (All S are M)_____________SO, all philosophers are mathematicians. (All S are P)
Beginning with the first premise we get:
Adding the second premise we get:
Does this diagram express the informational content of the conclusion "All S are P"? NO.
Region 4 of the diagram is not shaded (not empty) so it is possible that there is an S that is not a P.
Accordingly, the argument is NOT VALID.
Answer:
Next example:All philosophers are logical.Some physicists are logical.__________________________So, some philosophers are physicists.
Answer: In the following diagram, the
bar that crosses from region 5 into region 6 indicates that the argument is NOT VALID.
All that we can be certain of is that there is either an SPM (region 5) or a PM non-S (region 6), but we don't know which. Since we don't know which, the conclusion does not follow logically from the premises.
HomeworkComplete the assignment sheet found on the website, which
covers identifying arguments, premises, and conclusions.AND revise your argumentative essays based on your peer
feedback. As you’re doing so, start to rethink your thesis/arguments. Can
you convert your thesis statement into a syllogism? If so, what does this buy you argumentatively?