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Logic 4. Aristotle’s Square of Opposition “How Statements Compare”. Statements can have a variety of relationships. Statements can be related these ways:. Equivalence Contradiction Independence Implication Sub-implication Contrary Sub-contrary. 1. Equivalence.
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Logic 4 Aristotle’s Square of Opposition “How Statements Compare”
Statements can be related these ways: • Equivalence • Contradiction • Independence • Implication • Sub-implication • Contrary • Sub-contrary
1. Equivalence • When the 1st statement is true, the 2nd is true. • When the 1st statement is false, the 2nd is false. • The statements say the same thing, or are “equivalent.”
Examples of Equivalence • No ENG11H students are lying teenagers. (E) • No lying teenagers are ENG11H students. (E) • No mendacious humans between 13 and 19 are students taking ENG11H. (E)
2. Contradiction • If we know the 1st statement is true, the 2nd must be false. • If we know the 1st statement is false, the 2nd must be true.
Examples of Contradiction • No ENG11H students are liars. (E) • Some ENG11H students are liars. (I) • If the 1st is false, the 2nd must be true. If the 1st is true, the 2nd must be false.
Examples of Contradiction • All ENG11H students are liars. (A) • Some ENG11H students are not liars. (O) • So…A and O are contradictory. So are E and I.
3. Independence • The 1st statement tells us nothing about the 2nd statement’s truth or falsehood. • All girls are liars. • All boys are liars.
4. Implication • From the truth of one statement, we can imply the truth of a second.
Examples of Implication • All girls are liars. (A) • Some girls are liars. (I) • No girls are liars. (E) • Some girls are not liars. (O)
Dangers of Implication! • However, if the 1st statement is false, we can’t assume the 2nd. • All girls are liars. (A) FALSE • Some girls are liars. (I) Maybe some, maybe none!
Implication • So… A implies I when A is true. • And…E implies O when E is true.
5. Sub-Implication(implication in reverse) • From the falsehood of a statement, we can imply the falsehood of a 2nd statement. • Some teenagers are liars. (I) FALSE • All teenagers are liars. (A) also FALSE • Some teenagers are not mature. (O) FALSE • No teenagers are mature. (E) FALSE
Sub-implication • So…I implies A when I is FALSE. • And…O implies E when O is FALSE.
6. Contrariety“contrary-ness” • Two statements are contrary when they both can’t be true, but both can be false. • No boys are liars. (E) • All boys are liars. (A)
Contrariety • But…if it’s false that no boys are liars (E), we can’t assume that all boys are liars (A). • So, A and E are contrary.
7. Sub-Contrariety • Two statements are subcontrary when they can both be true, but they can’t both be false. • Some girls are polite. (I) • Some girls are not polite. (O)
Sub-contrariety • So, I and O are sub-contrary.
Exercise #1 • Let’s assume it is true that all S is P. • What other statements can we infer? • It is true that some S is P (I). (Implication) • It is false that some S is not P (O). (Contradiction) • It is false that no S is P (E). (Contrary)
Exercise #2 • It is false that some Shakespeare plays have four acts. (I) • What can we infer? • It is false that all Shakespeare plays have four acts. (A) (sub-implication) • It is true that no Shakespeare plays have four acts. (E) (contradiction) • It is true that some Shakespeare plays do not have four acts. (O) (sub-contrary)
Exercise #3 • It is true that some children are not fit. (O) • What can we infer? • It is false that all children are fit. (E) contradiction • We can’t infer the truth or falsehood of an I statement (Some children are fit), because it may also be the case that all/none of the children are fit. • We can’t infer the truth or falsehood of an E statement (No children are fit).
