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Posterior Analytics
The Posterior Analytics (Ancient Greek: Ἀναλυτικὰ Ὕστερα; Latin: Analytica Posteriora) is a text from Aristotle's Organon that deals with demonstration, definition, and scientific knowledge. The demonstration is distinguished as a syllogism productive of scientific knowledge, while the definition marked as the statement of a thing's nature, ... a statement of the meaning of the name, or of an equivalent nominal formula.
In the Prior Analytics, syllogistic logic is considered in its formal aspect; in the Posterior it is considered in respect of its matter. The "form" of a syllogism lies in the necessary connection between the premises and the conclusion. Even where there is no fault in the form, there may be in the matter, i.e. the propositions of which it is composed, which may be true or false, probable or improbable.
When the premises are certain, true, and primary, and the conclusion formally follows from them, this is demonstration, and produces scientific knowledge of a thing. Such syllogisms are called apodeictical, and are dealt with in the two books of the Posterior Analytics. When the premises are not certain, such a syllogism is called dialectical, and these are dealt with in the eight books of the Topics. A syllogism which seems to be perfect both in matter and form, but which is not, is called sophistical, and these are dealt with in the book On Sophistical Refutations.
The contents of the Posterior Analytics may be summarised as follows:
In the second book, Aristotle starts with a remarkable statement, the kinds of things determine the kinds of questions, which are four:
Or in a more literal translation (Owen): 1. that a thing is, 2. why it is, 3. if it is, 4. what it is.
The last of these questions was called by Aristotle, in Greek, the "what it is" of a thing. Scholastic logicians translated this into Latin as "quiddity" (quidditas). This quiddity cannot be demonstrated, but must be fixed by a definition. He deals with definition, and how a correct definition should be made. As an example, he gives a definition of the number three, defining it to be the first odd prime number.
Maintaining that "to know a thing's nature is to know the reason why it is" and "we possess scientific knowledge of a thing only when we know its cause", Aristotle posited four major sorts of cause as the most sought-after middle terms of demonstration: the definable form; an antecedent which necessitates a consequent; the efficient cause; the final cause.
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Posterior Analytics
The Posterior Analytics (Ancient Greek: Ἀναλυτικὰ Ὕστερα; Latin: Analytica Posteriora) is a text from Aristotle's Organon that deals with demonstration, definition, and scientific knowledge. The demonstration is distinguished as a syllogism productive of scientific knowledge, while the definition marked as the statement of a thing's nature, ... a statement of the meaning of the name, or of an equivalent nominal formula.
In the Prior Analytics, syllogistic logic is considered in its formal aspect; in the Posterior it is considered in respect of its matter. The "form" of a syllogism lies in the necessary connection between the premises and the conclusion. Even where there is no fault in the form, there may be in the matter, i.e. the propositions of which it is composed, which may be true or false, probable or improbable.
When the premises are certain, true, and primary, and the conclusion formally follows from them, this is demonstration, and produces scientific knowledge of a thing. Such syllogisms are called apodeictical, and are dealt with in the two books of the Posterior Analytics. When the premises are not certain, such a syllogism is called dialectical, and these are dealt with in the eight books of the Topics. A syllogism which seems to be perfect both in matter and form, but which is not, is called sophistical, and these are dealt with in the book On Sophistical Refutations.
The contents of the Posterior Analytics may be summarised as follows:
In the second book, Aristotle starts with a remarkable statement, the kinds of things determine the kinds of questions, which are four:
Or in a more literal translation (Owen): 1. that a thing is, 2. why it is, 3. if it is, 4. what it is.
The last of these questions was called by Aristotle, in Greek, the "what it is" of a thing. Scholastic logicians translated this into Latin as "quiddity" (quidditas). This quiddity cannot be demonstrated, but must be fixed by a definition. He deals with definition, and how a correct definition should be made. As an example, he gives a definition of the number three, defining it to be the first odd prime number.
Maintaining that "to know a thing's nature is to know the reason why it is" and "we possess scientific knowledge of a thing only when we know its cause", Aristotle posited four major sorts of cause as the most sought-after middle terms of demonstration: the definable form; an antecedent which necessitates a consequent; the efficient cause; the final cause.