(3)BF?23或43 . . …………………..(5分) 23.(1)解:
当y?0时,?x2?2x?8?0
y?x1??2,x2?4
点A在x轴负半轴上
?A(-2,0),OA=2
点A在一次函数y??x?b的图象上
?2?b?0
PxADOECB?b??2 ..........................................(1分) ?一次函数表达式为y??x?2
设直线AB交y轴于点E,则E(0,-2), OE=OA=2 PC?x轴交AB于点C
?PC//y轴
??AEO??ACP=45o ?sin?ACP?sin45??(2)解:
点P在二次函数y??x?2x?8图象上且横坐标为m
22.......................................................(2分) 2?P(m, ?m2?2m?8),
PC⊥x轴且点C在一次函数y??x?2的图象上
?C(m,-m-2)..........................................................(3分) ?PC=?m2?3m?10..........................................................(4分)
PD⊥AB于点D
PD2 ?PC2?在Rt△CDP中,sin?ACP??PD=?2232m?m?52..........................................................(5分) 22(3)m的值为-1和2 ..........................................................(7分)
24. (1)ED?=MF; ..........................................................(1分)
(2)ED?与MF的相等关系依然成立
证明:连接DE、DF、DD?
D、E、F分别是AB、AC、BC的中点
?DE//BC,DE=
11BC,DF//AC,DF=AC 22DA?四边形DFCE为平行四边形
△ABC是等边三角形
?BC=AC,∠C=60o
B
ED'MFC
?DE=DF,∠EDF=∠C=60o...................(2分) MD=MD?,?DMD?=60o..................(3分) ?△DMD?是等边三角形 ??MDD??60?,MD?DD? ??MDD???EDF
?MDF??MDD???FDD? ?EDD???EDF??FDD?
??MDF??EDD? ..........................................................(4分)
?△DD?E≌△DMF(SAS)
?ED?=MF ..........................................................(5分) (3)ED?与MF的相等关系依然成立....................................................(6分)
画出正确图形 ..............................................(7分)
D'
BDAEFCMy25.(1)解:连接AC
A为半圆的圆心,OB=8 ?AC?AO?4 ?COA?60?
? △AOC为等边三角形
CPD?C(2,2xOQAB3)......................................(1分)
易知A(4,0),B(8,0)
?二次函数图象的对称轴为x=6
将点A(4,0),C(2,23)分别代入y?a(x?6)2?k解得:a?3 6?y?323(x?6)2?...........................................................................(2分) 63(2)P(1,3). ..........................................................................(4分) (3)连接BC、 DB,延长DB、PQ交于点E
?OP?t,OQ?2t ?OC?4,OB?8
yOPOQ ?OCOB??POQ??COB ??△OPQ∽△OCB ?∠OPQ=∠OCB ?OB为半圆的直径
OCPDxQABE
?∠OCB=90o ?∠OPQ=90o
在Rt△OPQ中,PQ=3t ..........................................................................(5分) 连接CD
?点D是点C关于二次函数图象对称轴的对称点
?CD∥OB
?C(2,23)且对称轴为x=6 ?D(10,23)
?CD=OB=8
?四边形OCDB为平行四边形 ?OC∥DB
?∠DEP=∠OPQ=90o
在Rt△BEQ中,∠BQE=?OQP?30o,BQ?8?2t
? BE?4?t
?DE?8?t ............................................(6分)
113t?(8?t) ?S△DPQ=PQ?DE?223(t?4)2?83. ............................................(7分) 即y??2?当t =4时,△DPQ的面积的最大值为 83............................................(8分)