【答案】拋物線的解析式為y=
.拋物線的對(duì)稱軸為x=1�;(2)
;(3)(0�,6)或P(0,﹣
).
【解析】試題分析:(1)根據(jù)代入法求出函數(shù)的解析式�,然后根據(jù)對(duì)稱軸的關(guān)系式求出對(duì)稱軸;
(2)過(guò)點(diǎn)F作FM⊥x軸�,垂足為M����,設(shè)E(0��,t)���,則OE=t���,然后根據(jù)題意得到用t表示的F點(diǎn)的坐標(biāo),代入解析式可求得t的值��,然后根據(jù)∠FAB的余切值���;
(3)由C點(diǎn)的坐標(biāo)求出D點(diǎn)的坐標(biāo)���,然后根據(jù)∠DAB的余切值求出∠DAB=∠BAF,然后分情況討論:①當(dāng)點(diǎn)P在AF的上方和②當(dāng)點(diǎn)P在AF的下方�,求出P點(diǎn)的坐標(biāo).
試題解析:(1)把C(0,﹣3)代入得:c=﹣3�,
∴拋物線的解析式為y=
+bx﹣3.
將A(﹣2,0)代入得:
×(﹣2)2﹣2b﹣3=0��,解得b=﹣
�,
∴拋物線的解析式為y=
x2﹣x﹣3.
∴拋物線的對(duì)稱軸為x=﹣
=1.
(2)過(guò)點(diǎn)F作FM⊥x軸�,垂足為M.
設(shè)E(0�����,t)�����,則OE=t.
∵
��,
∴
=
=
.
∴F(6�,4t).
將點(diǎn)F(6,4t)代入y=x2﹣x﹣3得:×62﹣×6﹣3=0��,解得t=
.
∴cot∠FAB=
=
.
(3)∵拋物線的對(duì)稱軸為x=1���,C(0,﹣3)��,點(diǎn)D是點(diǎn)C關(guān)于拋物線對(duì)稱軸的對(duì)稱點(diǎn)��,
∴D(2�����,﹣3).
∴cot∠DAB=,
∴∠FAB=∠DAB.
如下圖所示:
當(dāng)點(diǎn)P在AF的上方時(shí)����,∠PFA=∠DAB=∠FAB,
∴PF∥AB��,
∴yp=yF=6.
由(1)可知:F(6����,4t),t=
.
∴F(6�,6).
∴點(diǎn)P的坐標(biāo)為(0,6).
當(dāng)點(diǎn)P在AF的下方時(shí)����,如下圖所示:
設(shè)FP與x軸交點(diǎn)為G(m,0)�����,則∠PFA=∠FAB�����,可得到FG=AG���,
∴(6﹣m)2+62=(m+2)2�����,解得:m=
�,
∴G(,0).
設(shè)PF的解析式為y=kx+b�����,將點(diǎn)F和點(diǎn)G的坐標(biāo)代入得:
��,
解得:k=
���,b=﹣
.
∴P(0���,﹣).
綜上所述,點(diǎn)P的坐標(biāo)為(0�����,6)或P(0�,﹣).
