作EF⊥CO,垂足为点F,连接OD.因为点B的坐标为(-
| 20 |
| 3 |
所以AB=
| 20 |
| 3 |
根据折叠的性质,OE=OA=5,
根据勾股定理,OB=
52+(
|
| 25 |
| 3 |
∵△OEF∽△OBC,
∴
| EF |
| BC |
| OE |
| OB |
| EF |
| 5 |
| 5 | ||
|
解得:EF=3,
又∵点A的坐标为(0,5),
∴OF=
| OE2-EF2 |
| 52-32 |
∴E点坐标为(-4,3),
设解析式为y=
| k |
| x |
将(-4,3)代入解析式得k=-4×3=-12,
∴解析式为y=-
| 12 |
| x |
故选D.
| 20 |
| 3 |
A. y=| 12 |
| x |
| 6 |
| x |
| 6 |
| x |
| 12 |
| x |
作EF⊥CO,垂足为点F,连接OD.| 20 |
| 3 |
| 20 |
| 3 |
52+(
|
| 25 |
| 3 |
| EF |
| BC |
| OE |
| OB |
| EF |
| 5 |
| 5 | ||
|
| OE2-EF2 |
| 52-32 |
| k |
| x |
| 12 |
| x |