| Pascal线上的调和共轭点与对合对应点 |
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| 引用本文: | 孙炳泰. Pascal线上的调和共轭点与对合对应点[J]. 曲阜师范大学学报, 1995, 21(2): 65-66 |
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| 作者姓名: | 孙炳泰 |
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| 作者单位: | 济宁师专数学系 |
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| 摘 要: | 本文用综合法论证了Pascal定理由非退化二阶由线的内接简单六点形退化为四点形时,Pascal线上有调和共轭点偶与对合对应点偶。
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| 关 键 词: | Pascal定理 调和共轭 对合对应 |
HARMONIC CONJUGATE POINTS AND INVOLUTIVE CORRESPONDING POINTS ON PASCAL LINE |
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| Sun Bingtai. HARMONIC CONJUGATE POINTS AND INVOLUTIVE CORRESPONDING POINTS ON PASCAL LINE[J]. Journal of Qufu Normal University(Natural Science), 1995, 21(2): 65-66 |
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| Authors: | Sun Bingtai |
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| Abstract: | The following result is proved by using synthetic method: If a simple in-scribed six-point graph in a non-degenerate quadratic curve degenerates to a quadrangle inPascal theorem. then there exists harmonic conjugate point pairs and involutive correspond-ing point pairs on Pascal Line. |
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| Keywords: | Pascal theorem complefe quadrangle harmonic conjugnte involutivecorrelation |
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