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    No transformation in the projective group can map an arbi... — Carmelics
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    Supports→Cross-ratio can be defined intrinsically in projective geometry using quadruples of collinear points

    No transformation in the projective group can map an arbitrary quadruple of collinear points onto an arbitrary such quadruple

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    Any ordered triple of distinct collinear points can be mapped uniquely to any ot...Because quadruples of collinear points are not freely transitive under the proje...Cross-ratio can be defined intrinsically in projective geometry using quadruples...

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    The projective group preserves straight lines

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    Because quadruples of collinear points are not freely transitive under...81%The cross-ratio of collinear point quadruples is an invariant of the p...80%Cross-ratio can be defined intrinsically in projective geometry using ...76%Congruence is defined entirely in terms of the transformations availab...74%

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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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