logic Logic is the study of correct reasoning. It includes both formal and informal logic. Formal logic is the study of deductively valid inferences or logical truths. It examines how conclusions follow from premises based on the structure o ...

, (

Latin Latin ( or ) is a classical language belonging to the Italic languages, Italic branch of the Indo-European languages. Latin was originally spoken by the Latins (Italic tribe), Latins in Latium (now known as Lazio), the lower Tiber area aroun ...

for "reduction to absurdity"), also known as (

for "argument to absurdity") or ''apagogical argument'', is the form of argument that attempts to establish a claim by showing that the opposite scenario would lead to absurdity or contradiction. This argument form traces back to

Ancient Greek philosophy Ancient Greek philosophy arose in the 6th century BC. Philosophy was used to make sense of the world using reason. It dealt with a wide variety of subjects, including astronomy, epistemology, mathematics, political philosophy, ethics, metaphysics ...

and has been used throughout history in both formal mathematical and philosophical reasoning, as well as in debate. In mathematics, the technique is called ''

proof by contradiction In logic, proof by contradiction is a form of proof that establishes the truth or the validity of a proposition by showing that assuming the proposition to be false leads to a contradiction. Although it is quite freely used in mathematical pr ...

''. In formal logic, this technique is captured by an axiom for "Reductio ad Absurdum", normally given the abbreviation RAA, which is expressible in

propositional logic The propositional calculus is a branch of logic. It is also called propositional logic, statement logic, sentential calculus, sentential logic, or sometimes zeroth-order logic. Sometimes, it is called ''first-order'' propositional logic to contra ...

. This axiom is the introduction rule for negation (see '' negation introduction'').

Examples

The "absurd" conclusion of a ''reductio ad absurdum'' argument can take a range of forms, as these examples show: * The Earth cannot be flat; otherwise, since the Earth is assumed to be finite in extent, we would find people falling off the edge. * There is no smallest positive

rational number In mathematics, a rational number is a number that can be expressed as the quotient or fraction of two integers, a numerator and a non-zero denominator . For example, is a rational number, as is every integer (for example, The set of all ...

. If there were, then would also be a rational number, it would be positive, and we would have . This contradicts the hypothetical minimality of among positive rational numbers, so we conclude that there is no such smallest positive rational number. The first example argues that denial of the premise would result in a ridiculous conclusion, against the evidence of our senses (

empirical evidence Empirical evidence is evidence obtained through sense experience or experimental procedure. It is of central importance to the sciences and plays a role in various other fields, like epistemology and law. There is no general agreement on how the ...

). The second example is a mathematical

(also known as an indirect proof), which argues that the denial of the premise would result in a logical contradiction (there is a "smallest" number and yet there is a number smaller than it).

Greek philosophy

''Reductio ad absurdum'' was used throughout

Greek philosophy Ancient Greek philosophy arose in the 6th century BC. Philosophy was used to make sense of the world using reason. It dealt with a wide variety of subjects, including astronomy, epistemology, mathematics, political philosophy, ethics, metaphysic ...

. The earliest example of a argument can be found in a satirical poem attributed to Xenophanes of Colophon (c. 570 – c. 475 BCE). Criticizing

Homer Homer (; , ; possibly born ) was an Ancient Greece, Ancient Greek poet who is credited as the author of the ''Iliad'' and the ''Odyssey'', two epic poems that are foundational works of ancient Greek literature. Despite doubts about his autho ...

's attribution of human faults to the gods, Xenophanes states that humans also believe that the gods' bodies have human form. But if horses and oxen could draw, they would draw the gods with horse and ox bodies. The gods cannot have both forms, so this is a contradiction. Therefore, the attribution of other human characteristics to the gods, such as human faults, is also false. Greek mathematicians proved fundamental propositions using ''reductio ad absurdum''. Euclid of Alexandria (mid-4th – mid-3rd centuries BCE) and

Archimedes of Syracuse Archimedes of Syracuse ( ; ) was an Ancient Greek mathematician, physicist, engineer, astronomer, and inventor from the ancient city of Syracuse in Sicily. Although few details of his life are known, based on his surviving work, he is consi ...

(c. 287 – c. 212 BCE) are two very early examples. The earlier dialogues of

Plato Plato ( ; Greek language, Greek: , ; born BC, died 348/347 BC) was an ancient Greek philosopher of the Classical Greece, Classical period who is considered a foundational thinker in Western philosophy and an innovator of the writte ...

(424–348 BCE), relating the discourses of

Socrates Socrates (; ; – 399 BC) was a Ancient Greek philosophy, Greek philosopher from Classical Athens, Athens who is credited as the founder of Western philosophy and as among the first moral philosophers of the Ethics, ethical tradition ...

, raised the use of arguments to a formal dialectical method (), also called the

Socratic method The Socratic method (also known as the method of Elenchus or Socratic debate) is a form of argumentative dialogue between individuals based on asking and answering questions. Socratic dialogues feature in many of the works of the ancient Greek ...

. Typically, Socrates' opponent would make what would seem to be an innocuous assertion. In response, Socrates, via a step-by-step train of reasoning, bringing in other background assumptions, would make the person admit that the assertion resulted in an absurd or contradictory conclusion, forcing him to abandon his assertion and adopt a position of

aporia In philosophy, an aporia () is a conundrum or state of puzzlement. In rhetoric, it is a declaration of doubt, made for rhetorical purpose and often feigned. The notion of an aporia is principally found in ancient Greek philosophy, but it also p ...

. The technique was also a focus of the work of

Aristotle Aristotle (; 384–322 BC) was an Ancient Greek philosophy, Ancient Greek philosopher and polymath. His writings cover a broad range of subjects spanning the natural sciences, philosophy, linguistics, economics, politics, psychology, a ...

(384–322 BCE), particularly in his '' Prior Analytics'' where he referred to it as demonstration to the impossible (, 62b). Another example of this technique is found in the sorites paradox, where it was argued that if 1,000,000 grains of sand formed a heap, and removing one grain from a heap left it a heap, then a single grain of sand (or even no grains) forms a heap.

Buddhist philosophy

Much of

Madhyamaka Madhyamaka ("middle way" or "centrism"; ; ; Tibetic languages, Tibetan: དབུ་མ་པ་ ; ''dbu ma pa''), otherwise known as Śūnyavāda ("the Śūnyatā, emptiness doctrine") and Niḥsvabhāvavāda ("the no Svabhava, ''svabhāva'' d ...

Buddhist philosophy Buddhist philosophy is the ancient Indian Indian philosophy, philosophical system that developed within the religio-philosophical tradition of Buddhism. It comprises all the Philosophy, philosophical investigations and Buddhist logico-episte ...

centers on showing how various essentialist ideas have absurd conclusions through ''reductio ad absurdum'' arguments (known as ''prasaṅga'', "consequence" in Sanskrit). In the

Mūlamadhyamakakārikā The ''Mūlamadhyamakakārikā'' (), abbreviated as ''MMK'', is the foundational text of the Madhyamaka school of Mahāyāna Buddhist philosophy. It was composed by the Indian philosopher Nāgārjuna (around roughly 150 CE).Siderits and Katsura ...

, Nāgārjuna's ''reductio ad absurdum'' arguments are used to show that any theory of substance or essence was unsustainable and therefore, phenomena (''dharmas'') such as change, causality, and sense perception were empty (''sunya'') of any essential existence. Nāgārjuna's main goal is often seen by scholars as refuting the essentialism of certain Buddhist

Abhidharma The Abhidharma are a collection of Buddhist texts dating from the 3rd century BCE onwards, which contain detailed scholastic presentations of doctrinal material appearing in the canonical Buddhist scriptures and commentaries. It also refers t ...

schools (mainly ''Vaibhasika'') which posited theories of '' svabhava'' (essential nature) and also the Hindu Nyāya and Vaiśeṣika schools which posited a theory of ontological substances (''dravyatas'').Wasler, Joseph. ''Nagarjuna in Context.'' New York: Columibia University Press. 2005, pgs. 225-263.

Example from Nāgārjuna's Mūlamadhyamakakārikā

In 13:5, Nagarjuna wishes to demonstrate consequences of the presumption that things essentially, or inherently, exist, pointing out that if a "young man" exists in himself then it follows he cannot grow old (because he would no longer be a "young man"). As we attempt to separate the man from his properties (youth), we find that everything is subject to momentary change, and are left with nothing beyond the merely arbitrary convention that such entities as "young man" depend upon.

13:5

: A thing itself does not change. : Something different does not change. : Because a young man does not grow old. : And because an old man does not grow old either.

Principle of non-contradiction

Aristotle clarified the connection between contradiction and falsity in his

principle of non-contradiction In logic, the law of noncontradiction (LNC; also known as the law of contradiction, principle of non-contradiction (PNC), or the principle of contradiction) states that for any given proposition, the proposition and its negation cannot both be s ...

, which states that a proposition cannot be both true and false. That is, a proposition

Q

and its negation

\lnot Q

(not-''Q'') cannot both be true. Therefore, if a proposition and its negation can both be derived logically from a premise, it can be concluded that the premise is false. This technique, known as indirect proof or

, has formed the basis of arguments in formal fields such as

and mathematics.

References

Sources

* * * Pasti, Mary. Reductio Ad Absurdum: An Exercise in the Study of Population Change. United States, Cornell University, Jan., 1977. * Daigle, Robert W.. The Reductio Ad Absurdum Argument Prior to Aristotle. N.p., San Jose State University, 1991.

External links

* * {{DEFAULTSORT:Reductio Ad Absurdum Latin logical phrases Latin philosophical phrases Theorems in propositional logic Madhyamaka Arguments Pyrrhonism Greek philosophy Buddhist philosophical concepts