18. 解:(1)點(diǎn)在軸上························································································· 1分
理由如下:
連接,如圖所示,在中,,,
,
由題意可知:
點(diǎn)在軸上,點(diǎn)在軸上.············································································ 3分
(2)過(guò)點(diǎn)作軸于點(diǎn)
,
在中,,
點(diǎn)在第一象限,
點(diǎn)的坐標(biāo)為····························································································· 5分
由(1)知,點(diǎn)在軸的正半軸上
點(diǎn)的坐標(biāo)為
點(diǎn)的坐標(biāo)為······························································································· 6分
拋物線經(jīng)過(guò)點(diǎn),
由題意,將,代入中得
解得
所求拋物線表達(dá)式為:·························································· 9分
(3)存在符合條件的點(diǎn),點(diǎn).············································································ 10分
理由如下:矩形的面積
以為頂點(diǎn)的平行四邊形面積為.
由題意可知為此平行四邊形一邊,
又
邊上的高為2······································································································ 11分
依題意設(shè)點(diǎn)的坐標(biāo)為
點(diǎn)在拋物線上
解得,,
,
以為頂點(diǎn)的四邊形是平行四邊形,
,,
當(dāng)點(diǎn)的坐標(biāo)為時(shí),
點(diǎn)的坐標(biāo)分別為,;
當(dāng)點(diǎn)的坐標(biāo)為時(shí),
點(diǎn)的坐標(biāo)分別為,.·················································· 14分
(以上答案僅供參考,如有其它做法,可參照給分)
17. 解:(1)直線與軸交于點(diǎn),與軸交于點(diǎn).
,······························································································· 1分
點(diǎn)都在拋物線上,
拋物線的解析式為······························································ 3分
頂點(diǎn)····································································································· 4分
(2)存在····················································································································· 5分
··················································································································· 7分
·················································································································· 9分
(3)存在···················································································································· 10分
理由:
解法一:
延長(zhǎng)到點(diǎn),使,連接交直線于點(diǎn),則點(diǎn)就是所求的點(diǎn).
··························································································· 11分
過(guò)點(diǎn)作于點(diǎn).
點(diǎn)在拋物線上,
在中,,
,,
在中,,
,,····················································· 12分
設(shè)直線的解析式為
解得
······································································································ 13分
解得
在直線上存在點(diǎn),使得的周長(zhǎng)最小,此時(shí).········· 14分
解法二:
過(guò)點(diǎn)作的垂線交軸于點(diǎn),則點(diǎn)為點(diǎn)關(guān)于直線的對(duì)稱點(diǎn).連接交于點(diǎn),則點(diǎn)即為所求.···················································································· 11分
過(guò)點(diǎn)作軸于點(diǎn),則,.
,
同方法一可求得.
在中,,,可求得,
為線段的垂直平分線,可證得為等邊三角形,
垂直平分.
即點(diǎn)為點(diǎn)關(guān)于的對(duì)稱點(diǎn).··················································· 12分
設(shè)直線的解析式為,由題意得
解得
······································································································ 13分
解得
在直線上存在點(diǎn),使得的周長(zhǎng)最小,此時(shí). 1
16.
解:(1),.
(2)當(dāng)時(shí),過(guò)點(diǎn)作,交于,如圖1,
則,,
,.
(3)①能與平行.
若,如圖2,則,
即,,而,
.
②不能與垂直.
若,延長(zhǎng)交于,如圖3,
則.
.
.
又,,
,
,而,
不存在.
15. 解:(1)解法1:根據(jù)題意可得:A(-1,0),B(3,0);
則設(shè)拋物線的解析式為(a≠0)
又點(diǎn)D(0,-3)在拋物線上,∴a(0+1)(0-3)=-3,解之得:a=1
∴y=x2-2x-3···································································································· 3分
自變量范圍:-1≤x≤3···················································································· 4分
解法2:設(shè)拋物線的解析式為(a≠0)
根據(jù)題意可知,A(-1,0),B(3,0),D(0,-3)三點(diǎn)都在拋物線上
∴,解之得:
∴y=x2-2x-3··············································································· 3分
自變量范圍:-1≤x≤3······························································ 4分
(2)設(shè)經(jīng)過(guò)點(diǎn)C“蛋圓”的切線CE交x軸于點(diǎn)E,連結(jié)CM,
在Rt△MOC中,∵OM=1,CM=2,∴∠CMO=60°,OC=
在Rt△MCE中,∵OC=2,∠CMO=60°,∴ME=4
∴點(diǎn)C、E的坐標(biāo)分別為(0,),(-3,0) ·················································· 6分
∴切線CE的解析式為··························································· 8分
(3)設(shè)過(guò)點(diǎn)D(0,-3),“蛋圓”切線的解析式為:y=kx-3(k≠0) ·························· 9分
由題意可知方程組只有一組解
即有兩個(gè)相等實(shí)根,∴k=-2············································· 11分
∴過(guò)點(diǎn)D“蛋圓”切線的解析式y=-2x-3····················································· 12分
14. 解:(1)由題意可知,.
解,得 m=3. ………………………………3分
∴ A(3,4),B(6,2);
∴ k=4×3=12. ……………………………4分
(2)存在兩種情況,如圖:
①當(dāng)M點(diǎn)在x軸的正半軸上,N點(diǎn)在y軸的正半軸
上時(shí),設(shè)M1點(diǎn)坐標(biāo)為(x1,0),N1點(diǎn)坐標(biāo)為(0,y1).
∵ 四邊形AN1M1B為平行四邊形,
∴ 線段N1M1可看作由線段AB向左平移3個(gè)單位,
再向下平移2個(gè)單位得到的(也可看作向下平移2個(gè)單位,再向左平移3個(gè)單位得到的).
由(1)知A點(diǎn)坐標(biāo)為(3,4),B點(diǎn)坐標(biāo)為(6,2),
∴ N1點(diǎn)坐標(biāo)為(0,4-2),即N1(0,2); ………………………………5分
M1點(diǎn)坐標(biāo)為(6-3,0),即M1(3,0). ………………………………6分
設(shè)直線M1N1的函數(shù)表達(dá)式為,把x=3,y=0代入,解得.
∴ 直線M1N1的函數(shù)表達(dá)式為. ……………………………………8分
②當(dāng)M點(diǎn)在x軸的負(fù)半軸上,N點(diǎn)在y軸的負(fù)半軸上時(shí),設(shè)M2點(diǎn)坐標(biāo)為(x2,0),N2點(diǎn)坐標(biāo)為(0,y2).
∵ AB∥N1M1,AB∥M2N2,AB=N1M1,AB=M2N2,
∴ N1M1∥M2N2,N1M1=M2N2.
∴ 線段M2N2與線段N1M1關(guān)于原點(diǎn)O成中心對(duì)稱.
∴ M2點(diǎn)坐標(biāo)為(-3,0),N2點(diǎn)坐標(biāo)為(0,-2). ………………………9分
設(shè)直線M2N2的函數(shù)表達(dá)式為,把x=-3,y=0代入,解得,
∴ 直線M2N2的函數(shù)表達(dá)式為.
所以,直線MN的函數(shù)表達(dá)式為或. ………………11分
(3)選做題:(9,2),(4,5). ………………………………………………2分
13. 解:(1)分別過(guò)D,C兩點(diǎn)作DG⊥AB于點(diǎn)G,CH⊥AB于點(diǎn)H. ……………1分
∵ AB∥CD,
∴ DG=CH,DG∥CH.
∴ 四邊形DGHC為矩形,GH=CD=1.
∵ DG=CH,AD=BC,∠AGD=∠BHC=90°,
∴ △AGD≌△BHC(HL).
∴ AG=BH==3. ………2分
∵ 在Rt△AGD中,AG=3,AD=5,
∴ DG=4.
∴ . ………………………………………………3分
(2)∵ MN∥AB,ME⊥AB,NF⊥AB,
∴ ME=NF,ME∥NF.
∴ 四邊形MEFN為矩形.
∵ AB∥CD,AD=BC,
∴ ∠A=∠B.
∵ ME=NF,∠MEA=∠NFB=90°,
∴ △MEA≌△NFB(AAS).
∴ AE=BF. ……………………4分
設(shè)AE=x,則EF=7-2x. ……………5分
∵ ∠A=∠A,∠MEA=∠DGA=90°,
∴ △MEA∽△DGA.
∴ .
∴ ME=. …………………………………………………………6分
∴ . ……………………8分
當(dāng)x=時(shí),ME=<4,∴四邊形MEFN面積的最大值為.……………9分
(3)能. ……………………………………………………………………10分
由(2)可知,設(shè)AE=x,則EF=7-2x,ME=.
若四邊形MEFN為正方形,則ME=EF.
即 7-2x.解,得 . ……………………………………………11分
∴ EF=<4.
∴ 四邊形MEFN能為正方形,其面積為.
12. 解:(1).····················································································· 3分
(2)相等,比值為.················· 5分(無(wú)“相等”不扣分有“相等”,比值錯(cuò)給1分)
(3)設(shè),
在矩形中,,
,
,
,
,
.···································································································· 6分
同理.
,
,
.······························································································· 7分
,
,······························································································ 8分
解得.
即.······································································································ 9分
(4),·············································································································· 10分
. 12分
11. 解:(1)設(shè)地經(jīng)杭州灣跨海大橋到寧波港的路程為千米,
由題意得,································································································ 2分
解得.
地經(jīng)杭州灣跨海大橋到寧波港的路程為180千米.················································· 4分
(2)(元),
該車貨物從地經(jīng)杭州灣跨海大橋到寧波港的運(yùn)輸費(fèi)用為380元.···························· 6分
(3)設(shè)這批貨物有車,
由題意得,···························································· 8分
整理得,
解得,(不合題意,舍去),································································ 9分
這批貨物有8車.···································································································· 10分
10.
9.
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