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1 " A philosophical thought is not supposed to be impervious to all criticism; this is the error Whitehead describes of turning philosophy into geometry, and it is useful primarily as a way of gaining short-term triumphs in personal arguments that no one else cares (or even knows) about anyway. A good philosophical thought will always be subject to criticisms (as Heidegger’s or Whitehead’s best insights all are) but they are of such elegance and depth that they change the terms of debate, and function as a sort of “obligatory passage point” (Latour’s term) in the discussions that follow.Or in other words, the reason Being and Time is still such a classic, with hundreds of thousands or millions of readers almost a century later, is not because Heidegger made “fewer mistakes” than others of his generation. Mistakes need to be cleaned up, but that is not the primary engine of personal or collective intellectual progress. "
― Graham Harman
2 " Racism is a stubborn whitehead on the face of society. "
― Stefan Emunds
3 " You've a perfect right to call me as impractical as a dormouse, and to feel I'm out of touch with life. But this is the point where we simply can't see eye to eye. We've nothing whatever in common. Don't you see. . . it's not an accident that's drawn me from Blake to Whitehead, it's a certain line of thought which is fundamental to my whole approach. You see, there's something about them both. . . They trusted the universe. You say I don't know what the modern world's like, but that's obviously untrue. Anyone who's spent a week in London knows just what it's like. . . if you mean neurosis and boredom and the rest of it. And I do read a modern novel occasionally, in spite of what you say. I've read Joyce and Sartre and Beckett and the rest, and every atom in me rejects what they say. They strike me as liars and fools. I don't think they're dishonest so much as hopelessly tired and defeated." Lewis had lit his pipe. He did it as if Reade were speaking to someone else. Now he said, smiling faintly, " I don't think we're discussing modern literature." Reade had an impulse to call the debater's trick, but he repressed it. Instead he said quietly, " We're discussing modern life, and you brought up the subject. And I'm trying to explain why I don't think that murders and wars prove your point. I'm writing about Whitehead because his fundamental intuition of the universe is the same as my own. I believe like Whitehead that the universe is a single organism that somehow takes account of us. I don't believe that modern man is a stranded fragment of life in an empty universe. I've an instinct that tells me that there's a purpose, and that I can understand that purpose more deeply by trusting my instinct. I can't believe the world is meaningless. I don't expect life to explode in my face at any moment. When I walk back to my cottage, I don't feel like a meaningless fragment of life walking over a lot of dead hills. I feel a part of the landscape, as if it's somehow aware of me, and friendly. "
4 " Mathematically speaking, the probable (that in 6,000,000,000 throws with a regular six-sided die the die will come up proximately 1 ,000,000,000 times) and the improbable (that in six throws with the same die the one will come approximately up six times) are not different in kind, but only in frequency, whereby the more frequent appears a priori more probable.But the occasional occurrence of the improbable does not imply the intervention of a higher power, something in the nature of a miracle, as the layman is so ready to assume. The term " probability" includes improbability at the extreme limits of probability, and when the improbable does occur this is no cause for surprise, bewilderment or mystification. Cf. Ernst Mally's Probability and Law, Hans Reichenbach The theory Probability, Whitehead and Russell's Principia Mathematica, von Mises' Probability, Statistics and Truth "
5 " In the Principia Mathematica, Bertrand Russell and Alfred Whitehead attempted to give a rigorous foundation to mathematics using formal logic as their basis. They began with what they considered to be axioms, and used those to derive theorems of increasing complexity. By page 362, they had established enough to prove " 1 + 1 = 2. "