2010年辽宁省大连市数学中考真题(word版含答案)

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大连市2010年初中毕业升学考试数学一、选择题(本题共8小题,每小题3分,共24分。

在每小题给出的四个选项中,只有一个选项正确)1. 2-的绝对值等于( ) A. 12-B. 12C. 2-D.2 2.下列运算正确的是( )A. 236a a a ⨯= B. 44()a a -= C. 235a a a += D. 235()a a = 3.下列四个几何体中,其左视图为圆的是( )4.)A.1和2B.2和3C.3和4D.4和55.已知两圆半径分别为4和7,圆心距为3,那么这两个圆的位置关系是( ) A.内含 B.内切 C.相交 D.外切6.在一个不透明的盒子里,装有10个红球和5个蓝球,它们除颜色不同外,其余均相同,从中随机摸出一个球,它为蓝球的概率是( ) A.23 B. 12 C. 13 D. 157.如图1,35A ∠=︒,90B C ∠=∠=︒,则D ∠的度数是( ) A.35︒ B.45︒ C.55︒ D.65︒BCA.B.C.D.8.如图2,反比例函数11k y x=和正比例函数22y k x =的图象都经过点(1,2)A -,若12y y >,则x 的取值范围是( )A. 10x -<<B. 11x -<<C. 1x <-或01x <<D. 10x -<<或1x > 二、填空题(本题共9小题,每小题3分,共27分) 9. 5-的相反数是10.不等式35x +>的解集为11.为了参加市中学生篮球比赛,某校篮球队准备购买10双运动鞋,尺码(单位:厘米)如下:25 25 27 25.5 25.5 25.5 26.5 25.5 26 26则这10双运动鞋尺码的众数是 12.方程211xx =-的解是 13.如图3,AB CD ∥,160∠=︒,FG 平分EFD ∠,则2∠= ︒14.如图4,正方形ABCD 的边长为2,E F G H 、、、分别为各边中点,EG FH 、相交于点O ,以O 为圆心、OE 为半径画圆,则图中阴影部分的面积为 15.抛掷一个质地均匀的骰子,向上的面的点数是6的概率为ABC16.图5是一张长9cm 、宽5cm 的矩形纸板,将纸板四个角各剪去一个同样的正方形,可制成底面积是12 cm 2的一个无盖长方体纸盒,设剪去的正方形边长为x cm ,则可列出关于x 的方程为17.如图6,直线l:y =x 轴、y 轴分别相交于点A 、B ,AOB △与△ACB 关于直线l 对称,则点C 的坐标为三、解答题(本题共3小题,每小题12分,共36分)18.如图7,点A B C D 、、、在同一条直线上,AB DC AE DF AE DF ==,∥,,求证:EC FB =.图5图7AECDFB19.先化简,再求值:21(1)121a a a a -÷+++,其中1a =.20.某品牌电器生产商为了了解某市顾客对其商品售后服务的满意度,随机调查了部分使用该品牌电器的顾客,将调查结果按非常满意、基本满意、说不清楚、不满意四个选项进行统计,并绘制成不完整的统计图(如图8、图9),根据图中所给信息解答下列问题: (1)此次调查的顾客总数是 人,其中对此品牌电器售后服务“非常满意” 的顾客有 ____人,“不满意”的顾客有 人;(2)对此品牌电器售后服务“说不清楚”和“不满意”的顾客各占此次调查人数的百分比; (3)该市约有6万人使用此品牌电器,请你估计对此品牌电器售后服务非常满意的顾客的人数四、解答题(本题共3小题,其中21、22题各9分,23题10分,共28分)21.如图10,△ABC 内接于O ⊙,AB 是O ⊙的直径,点D 在AB 的延长线上,30A D ∠=∠=︒图8选项满意 满意 说不 清楚不满意图9(1) 判断DC 是否为O ⊙的切线,并说明理由; (2)证明:AOC DBC △≌△.22.如图11,一艘海轮位于灯塔C 的北偏东30︒方向,距离灯塔80海里的A 处,海轮沿正南方向匀速航行一段时间后,到达位于灯塔C 的东南方向上的B 处 (1)求灯塔C 到航线AB 的距离;(2)若海轮的速度为20海里/时,求海轮从A 处到B 处所用的时间(结果精确到0.1小时)1.41≈1.73≈)23.如图12,∠ABC =90︒,CD AB ⊥,垂足为D ,点E 在AC 上,BE 交CD 于点G ,EF ⊥BE 交AB 于点F ,若AC =mBC ,CE kEA =,探索线段EF 与EG 的数量关系,并证明你的结论说明:如果你反复探索没有解决问题,可以选取(1)或(2)中的条件,选(1)中的条件完成解答满分为7分;选(2)中的条件完成解答满分为5分. (1) m =1(如图13) (2) m =1,k =1(如图14)AC C C五、解答题(本题共3小题,其中24题11分,25、26题各12分,共35分)24.如图15,在△ABC 中,AB AC ==5,BC =6,动点P 从点A 出发沿AB 向点B 移动,(点P 与点A B 、不重合),作PD BC ∥交AC 于点D ,在DC 上取点E ,以DE D P 、为邻边作PFED ,使点F 到PD 的距离16FH PD =,连接BF ,设AP x = (1)△ABC 的面积等于(2)设△PBF 的面积为y ,求y 与x 的函数关系,并求y 的最大值; (3)当BP BF =时,求x 的值25.某物流公司的甲、乙两辆货车分别从A B 、两地同时相向而行,并以各自的速度匀速行驶,途经配货站C ,甲车先到达C 地,并在C 地用1小时配货,然后按原速度开往B 地,乙车从B 地直达A 地,图16是甲、乙两车间的距离y (千米)与乙车出发时间x (时)的函数的部分图象(1)A B 、两地的距离是 千米,甲车出发 小时到达C 地; (2)求乙车出发2小时后直至到达A 地的过程中,y 与x 的函数关系式及x 的取值范围,图15AD CP BFHE并在图16中补全函数图象;(3)乙车出发多长时间,两车相距150千米?26.如图17,抛物线f :2(0)y ax bx c a =++>与y 轴相交于点C ,直线1l 经过点C 且平行于x 轴,将1l 向上平移t 个单位得到直线2l ,设1l 与抛物线F 的交点为C D 、,2l 与抛物线F 的交点为A B 、,连接AC BC 、 (1)当12a =,32b =-,1c =,2t =时,探究△ABC 的形状,并说明理由; (2)若△ABC 为直角三角形,求t 的值(用含a 的式子表示);(3)在(2)的条件下,若点A 关于y 轴的对称点A '恰好在抛物线f 的对称轴上,连接A C ',BD ,求四边形A CDB '的面积(用含a 的式子表示)大连市2010年初中毕业升学考试数学参考答案及评分标准一、选择题(本题共8小题,每小题3分,共24分.在每小题给出的四个选项中,只有一个选项正确)1.D2.B3.A4.C5.B6.C7.A8.D二、填空题(本题共9小题,每小题3分,共27分)9. 5 10.2x > 11. 25.5 12.1x =- 13. 30 14.2π 15.1616.(92)(52)12x x --= 17.322⎛ ⎝⎭,三、解答题(本题共3小题,每小题12分,共36分)18.证明AB DC = AB BC DC BC ∴+=+ 即AC DB = ··························································································································· 3分AE DF ∥ A D ∴∠=∠ ································································ 6分 在AEC △和DFB △中AE DF A D AC DB =⎧⎪∠=∠⎨⎪=⎩AEC DFB ∴△≌△ ············································································································ 10分 EC FB ∴= ·························································································································· 12分19.解:原式=2(1)1121a aa a a +-÷+++ ··················································································· 3分=21(1)a aa a ÷++ ···················································································································· 6分 =2(1)1a a a a+⨯+ ····················································································································· 9分 =1a + ···································································································································· 11分当1a =时,原式=1)1+=·········································································· 12分 20.解:(1)400,104,16; ·································································································· 3分 (2)80+400×100%=20% ······································································································ 6分 150%26%20%4%---= ································································································· 8分 答:“说不清楚”和“不满意”的顾客各占此次调查人数的20%和4% ······························ 9分 (3)6×26%=1.56 ················································································································ 11分 答:对此品牌电器售后服务非常满意的顾客约有1.56万人 ··············································· 12分ABCEDF四、解答题(本题共3小题,其中21、22题各9分,23题10分,共28分)21.(1)结论:DC O 是⊙的切线 ························································································ 1分 证明:OA OC =30ACO A ∴∠=∠=︒ ············································································································ 2分 60COB ∴∠=︒ ······················································································································ 3分 30D ∠=︒90OCD ∴∠=︒ ····················································································································· 4分 OC CD ∴⊥DC O ∴是⊙的切线. ············································································································ 5分(2)证明:60OB OC COB =∠=︒, COB ∴△为等边三角形 ········································································································· 6分 60OBC ∴∠=︒ 30D ∠=︒30DCB ACO ∴∠=︒=∠ ····································································································· 7分A D ∠=∠ AC DC ∴= ··························································································································· 8分 AOC DBC ∴△≌△ ············································································································· 9分 22.解:(1)作CD AB ⊥于D ······························································································· 1分 由题意知30A ∠=︒ ················································································································ 2分在Rt ACD △中,11804022CD AC ==⨯= ······································································ 3分答:灯塔C 到航线AB 的距离为40海里. ············································································· 4分(2)在Rt ACD △中,2AD AC ==······································· 5分 由题意知45B ∠=︒ ················································································································ 6分 在Rt BCD △中,BD CD ==40 ··························································································· 7分40AB AD DB ∴=+=A∴所需时间为402 5.520=≈ ········································································· 8分 答:海轮从A 处到B 处所用的时间约为5.5小时 ································································· 9分23.结论:1mEF EG k =········································································································· 1分 证明:作EM AB ⊥于M ,EN CD ⊥于N . CD AB ⊥∴四边形EMDN 为矩形 ········································································································ 2分 90MEN MEG GEN EN MD ∴∠=∠+∠=︒=,EF BE ⊥90FEG MEG FEM ∴∠=∠+∠=︒FEM GEN ∴∠=∠··············································································································· 3分 90FME GNE ∠=∠=︒ EFM EGN ∴△∽△ ············································································································· 4分 EF EM EG EN∴= ························································································································· 5分 90A A AME ACB ∠=∠∠=∠=︒, AEM ABC ∴△∽△ ············································································································· 6分 AM EM AC BC∴= ························································································································ 7分 BC AMEM AM AC m ∴==· ····································································································· 8分90AME ADC ∠=∠=︒ EM CD ∴∥ 1AM AE MD EC k ∴== ·················································································································· 9分 1mEF AM EG m MD k ∴==1· 即1mEF EG k = ··················································································································· 10分 选择(1)结论:1EF EG k= ······························································································· 1分证明:作EM AB ⊥于M ,EN CD ⊥于N .CD AB ⊥∴四边形EMDN 为矩形 ········································································································ 2分 GE BF DCN M A GE BF DCN M A。