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    Given those three fixed positions, the position of B is u... — Carmelics
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    Supports→The cross-ratio of four collinear points P, Q, R, S is uniquely determined

    Given those three fixed positions, the position of B is uniquely determined

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    The cross-ratio equals AB·CD / AD·CB, which equals x when AB has length xThe cross-ratio of four collinear points P, Q, R, S is uniquely determinedThe four points can be mapped onto points A, B, C, D on the real line with A at ...

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    Related propositions within the same area of thought.
    Each of these positions departs from Descartes in varying degrees.71%Sensations of position do not have independently describable content71%An inconsistent original position makes it hard to measure the extent ...71%Therefore 'aRb' would express three distinct propositions.70%

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    SEP: epistemology-geometry
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    Klein’s insight, following von Staudt, was that an exactly similar argument involving quadruples of collinear points can be used to define cross-ratio in projective geometry. The projective group preserves straight lines, and any ordered triple of collinear points can be mapped to any ordered triple of collinear points, and the map that sends a given ordered triple of distinct points to another ordered triple of distinct points is unique, but there is no transformation in the group that can map

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