NationMaster - Encyclopedia: Modus tollendo tollens

The argument has two premises. The first premise is the conditional "if-then" statement, namely that P implies Q. The second premise is that Q is false. From these two premises, it can be logically concluded that P must be false. (Why? If P were true, then Q would be true, by premise 1, but it isn't, by premise 2.)

Consider an example:

If there is fire here, then there is oxygen here.

There is no oxygen here.

Therefore, there is no fire here.

Another example:

If Lizzy was the murderer, then she owns an axe.

Lizzy does not own an axe.

Therefore, Lizzy was not the murderer.

Just suppose that the premises are both true. If Lizzy was the murderer, then she really must have owned an axe; and it is a fact that Lizzy does not own an axe. What follows? That she was not the murderer.

It is important to note that when an argument is valid, if the premises are true, the conclusion must follow. Suppose we decide that it is not the case that: if Lizzy was the murderer, then she would have to have owned an axe; Perhaps we have found that she borrowed someone's. This means that the first premise is false. But notice that it does not mean the argument is invalid, since it remains the case that, if the premises are true (and in this case they are not), the conclusion would follow, even though in this particular case the premise is false. An argument can be valid even though it has a false premise. Such an argument usually reaches a false conclusion.

If an argument is modus tollens and both its premises are true, then it is sound.

One or both premises are false.

Therefore, the argument is unsound.

(Of course this particular argument applied to itself would be a paradox)

Modus tollens became somewhat legendary when it was used by Karl Popper in his proposed response to the problem of induction, Falsificationism.

20th WCP: Modus Ponens, Modus Tollens, and Likeness (3275 words)
	Modus Ponens (MP) and Modus Tollens (MT) are taught as basic rules of inference related to conditional statements in introductory logic courses.
	Modus Ponens (MP) and Modus Tollens (MT) are considered as basic rules of inference, and we teach them in introductory logic courses, related to conditional statements.
	The Alleged Counterexamples to Modus Ponens and Modus Tollens

Disjunctive syllogism - Wikipedia, the free encyclopedia (354 words)
	A disjunctive syllogism, also known as modus tollendo ponens (literally: mode which, by denying, affirms) is a valid, simple argument form:
	Unlike modus ponendo ponens and modus tollendo tollens, with which it should not be confused, modus tollendo ponens is often not made an explicit rule or axiom of logical systems, as the above arguments can be proven with a (slightly devious) combination of reductio ad absurdum and disjunction elimination.
	Modus tollendo ponens should also not be confused with modus ponendo tollens.

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