题目:
(2010·海门市二模)如图,矩形ABCD中,AB=4,AD=8,P是对角线AC上一动点,连接PD,过点P作PE⊥PD交线段BC
于E,设AP=x.(1)求PD:PE的值;
(2)设DE2=y,试求出y与x的函数关系式,并求x取何值时,y有最小值;
(3)当△PCD为等腰三角形时,求AP的长.
答案
解:(1)过P作MN⊥BC交BC、AD于N、M,则MN∥CD.∴
| AP |
| AC |
| AM |
| AD |
| PM |
| CD |
∴PM=
| ||
| 5 |
2
| ||
| 5 |
∴PN=4-
| ||
| 5 |
2
| ||
| 5 |
∵∠MPD+∠MDP=∠MPD+∠NPE=90°,
∴∠MDP=∠NPE.
又∵∠DMP=∠PNE=90°,
∴△DMP∽△PNE.(3分)
∴
| DM |
| PN |
| PD |
| PE |
| PM |
| NE |
8-
| ||||
4-
|
∴PD:PE=2:1;
(2)∵PM=
| ||
| 5 |
∴NE=
| ||
| 10 |
∵CN=DM=8-
2
| ||
| 5 |
| ||
| 10 |
∴CE=8-
| ||
| 2 |
∵DE2=CD2+CE2,
∴y=
| 5 |
| 4 |
| 5 |
当DP⊥AC时y有最小值,可求AP=
16
| ||
| 5 |
16
| ||
| 5 |
(3)当PD=PC时,则AP=2
| 5 |
当CP=CD时,则AP=4
| 5 |
当DP=DC时,则AP=
12
| ||
| 5 |
解:(1)过P作MN⊥BC交BC、AD于N、M,则MN∥CD.∴
| AP |
| AC |
| AM |
| AD |
| PM |
| CD |
∴PM=
| ||
| 5 |
2
| ||
| 5 |
∴PN=4-
| ||
| 5 |
2
| ||
| 5 |
∵∠MPD+∠MDP=∠MPD+∠NPE=90°,
∴∠MDP=∠NPE.
又∵∠DMP=∠PNE=90°,
∴△DMP∽△PNE.(3分)
∴
| DM |
| PN |
| PD |
| PE |
| PM |
| NE |
8-
| ||||
4-
|
∴PD:PE=2:1;
(2)∵PM=
| ||
| 5 |
∴NE=
| ||
| 10 |
∵CN=DM=8-
2
| ||
| 5 |
| ||
| 10 |
∴CE=8-
| ||
| 2 |
∵DE2=CD2+CE2,
∴y=
| 5 |
| 4 |
| 5 |
当DP⊥AC时y有最小值,可求AP=
16
| ||
| 5 |
16
| ||
| 5 |
(3)当PD=PC时,则AP=2
| 5 |
当CP=CD时,则AP=4
| 5 |
当DP=DC时,则AP=
12
| ||
| 5 |
(2012·贵阳)已知二次函数y=ax2+bx+c(a<0)的图象如图所示,当-5≤x≤0时,下列说法正确的是( )