CT Test 2
Two Criterias
-Formal -Truth
Syllogism
A deductive argument made up of three statements -two premises and a conclusion.
Invalid
A deductive argument that fails to provide such support
Valid
A deductive argument that succeeds in providing such decisive logical support
Sound
A deductively valid argument that has true premises
Hypothetical syllogism
All three statements are conditional and the argument is valid. If p, then q. If q, then r. Therefore, if p, then r.
Denying the consequent (modus tollens)
Always valid if the premises are true, the conclusion must be true. If p, then q. Not q. Therefore, not p.
Weak
An inductive argument that fails to provide such support
Strong
An inductive argument that succeeds in providing probable -but not conclusive- logical support for its conclusion
Truth-preserving
Because of the guarantee of truth in the conclusion deductively valid arguments are
The terms valid and invalid apply to what types of arguments?
Deductive
Symbolized version example
Either we light the fire or we will freeze. We will not light the fire. Therefore, we will freeze.
Hypothetical Syllogism example
If Ajax steals the money, he will go to jail. If Ajax goes to jail, his family will suffer. Therefore, if Ajax steals the money, his family will suffer.
Affirming the antecedent (modus ponens) example
If Spot barks, a burglar is in the house. Spot is barking. Therefore, a burglar is in the house.
Denying the consequent (modus tollens) example
If it's raining, the park is closed. The park is not closed. Therefore, it's not raining.
Affirming the consequent example
If the cat is on the mat, she is asleep. She is asleep. Therefore, she is on the mat.
Denying the antecedent example
If the cat is on the mat, she is asleep. She is not on the mat. Therefore, she is not asleep.
Deductive argument
Intended to provide logically conclusive support for its conclusion
Inductive argument
Intended to provide probable -not conclusive- support for its conclusion
Bachelors are unmarried. George is a bachelor. He has never taken a wife.
Invalid
Affirming the consequent
Invalid If p, then q. Q. Therefore, p.
Denying the antecedent
Invalid If p, then q. Not p. Therefore, not q.
Is it possible for a valid argument to have true premises and a false conclusion?
No
Independent premise
Offers support to a conclusion without the help of any other premises.
Any senator who is caught misusing campaign funds should resign his seat. Senator Greed should resign.
Senator Greed was caught misusing campaign funds. (implicit premises that makes the argument valid)
Ethel graduated from Yale. If she graduated from Yale, she probably has a superior intellect. She has a superior intellect.
Step 1: Conclusion: She has a superior intellect. -Premises: Ethel graduated from Yale. If she graduated from Yale, she probably has a superior intellect. Step 2: Not deductively valid. Step 3: Inductively strong. Step 4: Does not apply.
Antecedent
The first statement in a conditional premise (the if part)
Consequent
The second statement (the then part)
Dependent premise
They do depend on each other to jointly provide support to a conclusion.
If CNN reports that war has started in Iraq, then war has started in Iraq. CNN has reported exactly that. War must have started.
Valid
Disjunctive syllogism
Valid and extremely simple. Either p or q. Not p. Therefore, q.
Affirming the antecedent (modus ponens)
Valid if the premises are true, the conclusion absolutely must be true. If p, then q. P. Therefore, q.
Cogent
When inductively strong arguments have true premises (good inductive arguments are cogent, bad inductive arguments are not)
