2012年中考数学压轴题100题精选(71-80题)答案
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2012年中考数学压轴题100题精选(71-80题)答案 【071】解:(1)由题意得129302baabcc,解得23432abc ∴此抛物线的解析式为224233yxx 3分 (2)连结AC、BC.因为BC的长度一定,所以PBC△周长最小,就是使PCPB最小.B点关于对称轴的对称点是A点,AC与对称轴1x的交点即为所求的点P.
设直线AC的表达式为ykxb
则302kbb, 解得232kb ∴此直线的表达式为223yx.……5分 把1x代入得43y∴P点的坐标为413, ············································· 6分 (3)S存在最大值······································································································ 7分 理由:∵DEPC∥,即DEAC∥.
∴OEDOAC△∽△.∴ODOEOCOA,即223mOE.
∴333322OEmAEOEm,, 方法一: 连结OPOEDPOEPODOEDPDOESSSSSS△△△△四边形
=13411332132223222mmmm =23342mm ········································································································· 8分 ∵304,∴当1m时,333424S最大 ················································ 9分
(第24题图) O A C x
y B E
P D 方法二: OACOEDAEPPCDSSSSS△△△△ =1131341323212222232mmmm
=22333314244mmm ········································································· 8分 ∵304,∴当1m时,34S最大 ·································································· 9分 【072】解:(1)①2AB,842OA,4OC,S梯形OABC=12 ②当42t时,直角梯形OABC被直线l扫过的面积=直角梯形OABC面积-直角三角开DOE面积 2112(4)2(4)842Stttt
(2) 存在 ,123458(12,4),(4,4),(,4),(4,4),(8,4)3PPPPP 对于第(2)题我们提供如下详细解答(评分无此要求).下面提供参考解法二: ① 以点D为直角顶点,作1PPx轴
RtODE在中,2OEOD,设2ODbOEb,.1RtODERtPPD,(图示阴影)
4b,28b,在上面二图中分别可得到P点的生标为P(-12,4)、P(-4,4)E点在0点
与A点之间不可能; ② 以点E为直角顶点 同理在②二图中分别可得P点的生标为P(-83,4)、P(8,4)E点在0点下方不可能. ③ 以点P为直角顶点
同理在③二图中分别可得P点的生标为P(-4,4)(与①情形二重合舍去)、P(4,4), E点在A点下方不可能.
综上可得P点的生标共5个解,分别为P(-12,4)、P(-4,4)、P(-83,4)、 P(8,4)、P(4,4).
下面提供参考解法二: 以直角进行分类进行讨论(分三类): 第一类如上解法⑴中所示图22PDEyxb为直角:设直线:,D此时(-b,o),E(O,2b) 的中点坐标为b(-,b)2,直线DE的中垂线方程:1()22bybx,令4y得3(8,4)2bP.由
已知可得2PEDE即222232(8)(42)42bbbb化简得2332640bb解得 121883bbPP3b,将之代入(-8,4)(4,4)、2 2(4,4)P; 第二类如上解法②中所示图22EDEyxb为直角:设直线:,D此时(-b,o),E(O,2b) ,直线PE的方程:122yxb,令4y得(48,4)Pb.由已知可得PEDE即2222(48)(42)4bbbb化简得22(28)bb解之得 ,
123443bbPP,将之代入(4b-8,4)(8,4)、4
8(,4)3P
第三类如上解法③中所示图22DDEyxb为直角:设直线:,D此时(-b,o),E(O,2b) ,直线PD的方程:1()2yxb,令4y得(8,4)Pb.由已知可得PDDE即2222844bb解得12544bbPP,将之代入(-b-8,4)(-12,4)、
6(4,4)P(6(4,4)P与2P重合舍去).
综上可得P点的生标共5个解,分别为P(-12,4)、P(-4,4)、P(-83,4)、 P(8,4)、P(4,4). 事实上,我们可以得到更一般的结论: 如果得出ABaOCb、、OAh、设bakh,则P点的情形如下
直角分类情形 1k 1k
P为直角 1(,)Phh 1(,)Phh
2(,)Phh
E为直角 3(,)1hkPhk
2(,)2hPh
4(,)1hkPhk
D为直角 5((1),)Phkh 3(0,)Ph
6((1),)Phkh 4(2,)Phh
【073】(1)∵∠A、∠C所对的圆弧相同,∴∠A=∠C. ∴Rt△APD∽Rt△CPB,∴APPDCPPB,∴PA·PB=PC·PD;………………………3分 (2)∵F为BC的中点,△BPC为Rt△,∴FP=FC,∴∠C=∠CPF. 又∠C=∠A,∠DPE=∠CPF,∴∠A=∠DPE.∵∠A+∠D=90°, ∴∠DPE+∠D=90°.∴EF⊥AD. (3)作OM⊥AB于M,ON⊥CD于N,同垂径定理:
∴OM2=(25)2-42=4,ON2=(25)2-32=11 又易证四边形MONP是矩形, ∴OP=2215OMON O
y
x C D B A D1
O1 O2 O3 P
60°
(第22题答图) l 【074】(1)解:由题意得|4||8|12OA, A点坐标为(120),.在RtAOC△中,60OAC°,
tan12tan60123OCOAOAC° C点的坐标为(0123),.
设直线l的解析式为ykxb,由l过AC、两点,得123012bkb
解得1233bk直线l的解析式为:3123yx. (2)如图,设2O⊙平移t秒后到3O⊙处与1O⊙第一次外切于点P, 3O⊙与x轴相切于1D点,连接1331OOOD,.则13138513OOOPPO
31ODx⊥轴,315OD,
在131RtOOD△中,222211133113512ODOOOD. ········································· 6分 1141317ODOOOD,111117125DDODOD,
551t(秒)2O⊙平移的时间为5秒. ······································································ 8分
【075】解:(1)对称轴是直线:1x, 点A的坐标是(3,0). ···································································· 2分 (说明:每写对1个给1分,“直线”两字没写不扣分)
(2)如图11,连接AC、AD,过D作轴 yDM于点M, 解法一:利用AOCCMD△∽△ ∵点A、D、C的坐标分别是A (3,0),D(1,ba)、C(0,b),
∴AO=3,MD=1.由MDOCCMAO得13ba∴03ab ···················································· 3分
又∵baa)1(2)1(02∴由0303baab 得31ba ∴函数解析式为:322xxy ····················································································· 6分