Module Five
Which of the following is a correct application of the equivalence rule commutation?
(A ν B) • C \ C • (A ν B)
Which of the following is a correct application of the equivalence rule distribution
A ν (B • C) \ (A ν B) • (A ν C)
Which of the following arguments is an instance of modus ponens?
C • B, (C • B) → (D ν E) \ D ν E
A proof that employs reductio ad absurdum is a direct proof.
False
A single line in a proof may constitute more than one application of a rule or rules of inference.
False
Implicational rules of inference may, within truth-functional logic, be validly applied to parts of compound statements or lines in a proof.
False
The rule of conjunction indicates that if we have a conjunction, you may validly infer either conjunct.
False
The rule of modus ponens indicates that if we have a conditional statement and the affirmation of its consequent, we may validly infer its antecedent.
False
The rule of modus tollens indicates that if we have a conditional and then denial of its antecedent, we may validly infer the denial of its consequent.
False
A proof is a series of steps that show how the premises lead, by way of valid rules of inference, to the conclusion.
True
An indirect proof is a proof that makes use of assumptions.
True
Hypothetical syllogism is an implicational rule.
True
If an assumption for a conditional proof has been discharged, it cannot be used in subsequent lines of the proof.
True
The basic principle underlying reductio ad absurdum is that whatever implies a contradiction is false.
True
To discharge an assumption is to quit using it in our proof.
True
We can apply equivalence rules to parts of lines in a proof as well as to entire lines.
True
Which of the following is a correct application (or are correct applications) of the rule Contraposition to ~L → ~M?
both M → L and ~~M → ~~L
A theorem is a statement that
can be proven independently of any premises
p → q, p \ q is the implicational rule
modus ponens
Which of the following states the implicational rule constructive dilemma?
p ν q, p → r, q → s \ r ν s
Which of the following states the implicational rule hypothetical syllogism?
p → q, q → r \ p → r
Which of the following states the implicational rule conjunction?
p, q \ p • q
The basic idea behind conditional proof is that
we can prove a conditional true by assuming that its antecedent is true and showing that its consequent can be derived from that assumption
The guiding principle of reductio ad absurdum is that
whatever implies a contradiction is false
Which of the following is a correct replacement for (D • C) → ~(A ⋁ B) using material implication?
~(D • C) ν ~(A ⋁ B)
