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| 三角形的九点二次曲线 | |
| 引用本文: | 王奇志,王洪志,王东生,王春华.三角形的九点二次曲线[J].数学的实践与认识,2006,36(2):270-277. |
| 作者姓名: | 王奇志 王洪志 王东生 王春华 |
| 作者单位: | 1. 北京交通大学计算机与信息技术学院,北京,100044 2. 沈阳炼焦煤气有限公司,沈阳,110026 3. 沈阳市装备制造工程学校,沈阳,110024 4. 东北大学,沈阳,110004 |
| 摘 要: | 在任意三角形内,三边中点,三高的垂足,以及连接顶点与垂心的三线段的中点,都在同一圆上,此圆即为三角形九点圆.三角形的九点圆是欧氏几何中著名的优美定理,被称为欧拉圆和费尔巴哈圆.本文试图把垂心改换为平面内的任意点,相应地把三条高线改换为过每个顶点各一条的共点直线组时,则将把三角形的九点圆有趣地推广为三角形的九点二次曲线.并具体讨论在不同的区域内得到的九点二次曲线. |
| 关 键 词: | 九点圆 九点椭圆 九点双曲线 九点二次曲线 欧拉线 |
| 修稿时间: | 2005年5月13日 |
The Nine Point Conic to a Triangle |
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| WANG Qi-zhi,WANG Hong-zhi,WANG Dong-sheng,WANG Chun-hua.The Nine Point Conic to a Triangle[J].Mathematics in Practice and Theory,2006,36(2):270-277. | |
| Authors: | WANG Qi-zhi WANG Hong-zhi WANG Dong-sheng WANG Chun-hua |
| Abstract: | In any triangle,the midpoints of three the sides,perpendicular feet,and the midpoints between the orthocenter(the point where the three altitudes meet) and each of the three vertices,these nine points all lie on a circle.The circle is called Nine Point Circle,and is also called the Euler′s Circle or the Feuerbach Cricle.The Nine Point Circle to a triangle is a famous beautiful theorem in Euclidean Geometry.In this paper,if the orthocenter is changed into any point in the plane,and the three altitudes are changed into the con-point lines through the three vertexes of triangle,the Nine Point Circle theorem is generalized to nine-point conic theorem. |
| Keywords: | nine-point circle nine-point ellipse nine-point hyperbola nine-point conic (euler′s) line |
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