练习册

  • 练习册
  • 试题
    26.如图16.在平面直角坐标系中.直线与轴交于点.与轴交于点.抛物线经过三点. (1)求过三点抛物线的解析式并求出顶点的坐标, (2)在抛物线上是否存在点.使为直角三角形.若存在.直接写出点坐标,若不存在.请说明理由, (3)试探究在直线上是否存在一点.使得的周长最小.若存在.求出点的坐标,若不存在.请说明理由. 解:(1)直线与轴交于点.与轴交于点. .························································································· 1分 点都在抛物线上. 抛物线的解析式为························································ 3分 顶点······························································································· 4分 (2)存在··············································································································· 5分 ············································································································· 7分 ············································································································ 9分 (3)存在·············································································································· 10分 理由: 解法一: 延长到点.使.连接交直线于点.则点就是所求的点. ····················································································· 11分 过点作于点. 点在抛物线上. 在中.. .. 在中.. ..··············································· 12分 设直线的解析式为 解得 ································································································ 13分 解得 在直线上存在点.使得的周长最小.此时.··· 14分 解法二: 过点作的垂线交轴于点.则点为点关于直线的对称点.连接交于点.则点即为所求.················································································ 11分 过点作轴于点.则.. . 同方法一可求得. 在中...可求得. 为线段的垂直平分线.可证得为等边三角形. 垂直平分. 即点为点关于的对称点.············································· 12分 设直线的解析式为.由题意得 解得 ································································································ 13分 解得 在直线上存在点.使得的周长最小.此时.··· 14分 查看更多

     

    题目列表(包括答案和解析)


    同步练习册答案