Analogy of the divided line

The Analogy of the Divided Line (or Allegory of the Divided Line; Greek: γραμμὴ δίχα τετμημένη) is presented by the Greek philosopher Plato in the Republic (509d–511e). It is written as a dialogue between Glaucon and Socrates, in which the latter further elaborates upon the immediately preceding Analogy of the Sun at the former's request. Socrates asks Glaucon to not only envision this unequally bisected line but to imagine further bisecting each of the two segments. Socrates explains that the four resulting segments represent four separate 'affections' (παθήματα) of the psyche. The lower two sections are said to represent the visible while the higher two are said to represent the intelligible. These affections are described in succession as corresponding to increasing levels of reality and truth from conjecture (εἰκασία) to belief (πίστις) to thought (διάνοια) and finally to understanding (νόησις). Furthermore this Analogy not only elaborates a theory of the psyche but also presents metaphysical and epistemological views.

This analogy is immediately followed by the Analogy of the Cave at 514a. Socrates returns once more to the elements of the divided line (533d-534a) as he summarizes his dialectic.

Description

In The Republic (509d–510a), Plato describes the Divided Line this way:

Now take a line which has been cut into two unequal parts, and divide each of them again in the same proportion,[2] and suppose the two main divisions to answer, one to the visible and the other to the intelligible, and then compare the subdivisions in respect of their clearness and want of clearness, and you will find that the first section in the sphere of the visible consists of images. And by images I mean, in the first place, shadows, and in the second place, reflections in water and in solid, smooth and polished bodies and the like: Do you understand?

Yes, I understand.

Imagine, now, the other section, of which this is only the resemblance, to include the animals which we see, and everything that grows or is made.[3]

The visible world

Thus AB represents shadows and reflections of physical things, and BC the physical things themselves. These correspond to two kinds of knowledge, the illusion (εἰκασία eikasia) of our ordinary, everyday experience, and belief (πίστις pistis) about discrete physical objects which cast their shadows.[4] In the Timaeus, the category of illusion includes all the "opinions of which the minds of ordinary people are full," while the natural sciences are included in the category of belief.[4]

The intelligible world

According to some translations,[2] the segment CE, representing the intelligible world, is divided into the same ratio as AC, giving the subdivisions CD and DE (it can be readily verified that CD must have the same length as BC:[5]

There are two subdivisions, in the lower of which the soul uses the figures given by the former division as images; the enquiry can only be hypothetical, and instead of going upwards to a principle descends to the other end; in the higher of the two, the soul passes out of hypotheses, and goes up to a principle which is above hypotheses, making no use of images as in the former case, but proceeding only in and through the ideas themselves (510b).[3]

Plato describes CD, the "lower" of these, as involving mathematical reasoning (διάνοια dianoia),[4] where abstract mathematical objects such as geometric lines are discussed. Such objects are outside the physical world (and are not to be confused with the drawings of those lines, which fall within the physical world BC). However, they are less important to Plato than the subjects of philosophical understanding (νόησις noesis), the "higher" of these two subdivisions (DE):

And when I speak of the other division of the intelligible, you will understand me to speak of that other sort of knowledge which reason herself attains by the power of dialectic, using the hypotheses not as first principles, but only as hypotheses — that is to say, as steps and points of departure into a world which is above hypotheses, in order that she may soar beyond them to the first principle of the whole (511b).[3]

Plato here is using the familiar relationship between ordinary objects and their shadows or reflections in order to illustrate the relationship between the physical world as a whole and the world of Ideas (Forms) as a whole. The former is made up of a series of passing reflections of the latter, which is eternal, more real and "true." Moreover, the knowledge that we have of the Ideas – when indeed we do have it – is of a higher order than knowledge of the mere physical world. In particular, knowledge of the forms leads to a knowledge of the Idea (Form) of the Good.[1]

Tabular summary of the Divided Line

Segment Type of knowledge or opinion Affection of the psyche Type of object Method of the psyche or eye Relative truth and reality
DE Noesis (νόησις) Knowledge (Understanding): understanding of only the Intelligible (νοητόν) Only Ideas, which are all given existence and truth by the Good itself (τὸ αὐτὸ ἀγαθόν) The Psyche examines all hypotheses by the Dialectic making no use of likenesses, always moving towards a First Principle Highest
CD Dianoia (διάνοια) Knowledge (Thought): thought that recognizes but is not only of the Intelligible Some Ideas, specifically those of Geometry and Number The Psyche assumes hypotheses while making use of likenesses, always moving towards final conclusions High
BC Pistis (πίστις) Opinion (Belief): belief concerning visible things visible things (ὁρατά) The eye makes probable predictions upon observing visible things low
AB Eikasia (εἰκασία) Opinion (Imagination): conjectures concerning likenesses likenesses of visible things (εἰκόνες) The eye makes guesses upon observing likenesses of visible things lowest

Metaphysical importance

The Allegory of the Divided Line is the cornerstone of Plato's metaphysical framework. This structure, well hidden in the middle of the Republic, a complex, multi-layered dialogue, illustrates the grand picture of Plato's metaphysics, epistemology, and ethics, all in one. It is not enough for the philosopher to understand the Ideas (Forms), he must also understand the relation of Ideas to all four levels of the structure to be able to know anything at all.[6][7][8] In the Republic, the philosopher must understand the Idea of Justice to live a just life or to organize and govern a just state.[9]

The Divided Line also serves as our guide for most past and future metaphysics. The lowest level, which represents "the world of becoming and passing away" (Republic, 508d), is the metaphysical model for a Heraclitean philosophy of constant flux and for Protagorean philosophy of appearance and opinion. The second level, a world of fixed physical objects,[10][11] also became Aristotle's metaphysical model. The third level might be a Pythagorean level of mathematics. The fourth level is Plato's ideal Parmenidean reality, the world of highest level Ideas.

Epistemological meaning

Plato holds a very strict notion of knowledge. For example, he does not accept expertise about a subject, nor direct perception (see Theaetetus), nor true belief about the physical world (the Meno) as knowledge. It is not enough for the philosopher to understand the Ideas (Forms), he must also understand the relation of Ideas to all four levels of the structure to be able to know anything at all.[12] For this reason, in most of the "earlier Socratic" dialogues, Socrates denies knowledge both to himself and others.

For the first level, "the world of becoming and passing away," Plato expressly denies the possibility of knowledge.[13] Constant change never stays the same, therefore, properties of objects must refer to different Ideas at different times. Note that for knowledge to be possible, which Plato believed, the other three levels must be unchanging. The third and fourth level, mathematics and Ideas, are already eternal and unchanging. However, to ensure that the second level objective, physical world is also unchanging, Plato, in the Republic, Book 4[14] introduces empirically derived[15][16][17] axiomatic restrictions that prohibit both motion and shifting perspectives.[10][18]

See also

Notes

  1. 1 2 "divided line," The Cambridge Dictionary of Philosophy, 2nd edition, Cambridge University Press, 1999, ISBN 0-521-63722-8.
  2. 1 2 Older Greek texts do not differentiate unequal from an equal (ανίσα, αν ίσα)
  3. 1 2 3 Plato, The Republic, Book 6, translated by Benjamin Jowett, online
  4. 1 2 3 Desmond Lee and Rachana Kamtekar, The Republic, Notes to Book 6, Penguin, 1987, ISBN 0-14-044914-0.
  5. Let the length of AE be equal to \scriptstyle 1 and that of AC equal to \scriptstyle x, where \scriptstyle 0 < x < 1 (following Socrates, however, \scriptstyle 0 < x < 1/2; insofar as the equality of the lengths of BC and CD is concerned, the latter restriction is of no significance). The length of CE is thus equal to \scriptstyle 1-x. It follows that the length of BC must be equal to \scriptstyle x - x \times x \equiv (1-x)\times x, which is seen to be equal to the length of CD.
  6. Gail Fine, Knowledge and Belief in Republic V-VII, in G. Fine (ed.) Plato I (1990), also in S. Everson (ed.) Cambridge Companions to Ancient Thought I: Epistemology (Cambridge University Press: New York, 1990), pp. 85-115.
  7. Nicholas Denyer, Sun and line: the role of the Good, in G. R. F. Ferrari (ed.) The Cambridge Companion to Plato's Republic (Cambridge University Press: New York, 2007), pp. 284–309.
  8. Republic 520c: "For once habituated ... you will know what each of the ‘idols’ is and whereof it is a semblance, because you have seen the reality of the beautiful, the just and the good."
  9. Rachel G.K. Singpurwalla, Plato’s Defense of Justice in the Republic "justice is a virtue appropriate to both cities and individuals, and the nature or form of justice is the same in both (Republic, 435a)."
  10. 1 2 James Danaher, The Laws of Thought "The restrictions Plato places on the laws of thought (i.e., "in the same respect," and "at the same time,") are an attempt to isolate the object of thought by removing it from all other time but the present and all respects but one."
  11. Cratylus 439d-e "For if it is ever in the same state, then obviously at that time it is not changing (Plato's realism); and if it is always in the same state and is always the same, how can it ever change or move without relinquishing its own form (Aristotle's realism)"
  12. Republic 520c "For once habituated you will discern them infinitely better than the dwellers there, and you will know what each of the ‘idols’ is and whereof it is a semblance, because you have seen the reality of the beautiful, the just and the good."
  13. Cratylus 439d-e "How, then, can that which is never in the same state be anything? ... nor can it be known by anyone."
  14. Republic 4.436b "It is obvious that the same thing will never do or suffer opposites in the same respect in relation to the same thing and at the same time"
  15. Republic 4.437a "let us proceed on the hypothesis that this is so, with the understanding that, if it ever appear otherwise, everything that results from the assumption shall be invalidated"
  16. Also see the Timaeus 29c on empirical "likelihood"
  17. It is interesting to note that modern logical analysis claims to prove that the potentially falsifiable "empirical content of a theory is exactly captured by ... axiomatization ... that uses axioms which are universal negations of conjunctions of atomic formulas" (C. Chambers, The Axiomatic Structure of Empirical Content)
  18. Plato's Principle of Non-Contradiction (Republic, 4.436b) for the objective, physical world is presented with three axiomatic restrictions: The same thing ... cannot act or be acted upon ... in contrary ways ... (1) in the same part (2) in relation to the same thing (3) at the same time.

External links

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