【答案】(1)
, D (
,
);(2)△ABC是直角三角形,證明見解析;
(3)M(
�,0).
【解析】(1)∵點(diǎn)A(-1,0)在拋物線y=
x2 + bx-2上�,
∴
× (-1 )2 + b× (-1)–2 = 0,
解得b =
��,
∴ 拋物線的解析式為y=
x2-
x-2.
y= ( x2 -3x- 4 ) =
(x-)2-
,
∴頂點(diǎn)D的坐標(biāo)為 (
, -
).
(2)當(dāng)x = 0時(shí)y = -2,
∴C(0�����,-2),OC = 2�。
當(dāng)y = 0時(shí), 
x2-
x-2 = 0�,
∴x1 =-1, x2 = 4,
∴B (4,0)
∴OA = 1, OB = 4, AB = 5.
∵AB2 = 25, AC2 = OA2 + OC2 = 5, BC2 = OC2 + OB2 = 20,
∴AC2 +BC2 = AB2.
∴△ABC是直角三角形.
(3)作出點(diǎn)C關(guān)于x軸的對(duì)稱點(diǎn)C′�����,則C′(0�,2),OC′=2���,連接C′D交x軸于點(diǎn)M,根據(jù)軸對(duì)稱性及兩點(diǎn)之間線段最短可知��,MC + MD的值最小及△DCM的周長(zhǎng)最小
設(shè)拋物線的對(duì)稱軸交x軸于點(diǎn)E.
∵ED∥y軸, ∴∠OC′M=∠EDM,∠C′OM=∠DEM
∴△C′OM∽△DEM.
∴
∴
����, ∴m =
.
所以M的坐標(biāo)為(,0)
