北京市密云县2020中考第一次模拟试题数学doc初中数学

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北京市密云县2020中考第一次模拟试题数学doc 初中数学数 学 试 卷学校 姓名 准考证号考生须 知 1.本试卷共4页,共六道大题,25道小题,总分值120分.考试时刻120分钟. 2.在试卷和答题卡上认真填写学校名称、姓名和准考证号. 3.试题答案一律填涂或书写在答题卡上,在试卷上作答无效. 4.在答题卡上,选择题、作图题用2B 铅笔作答,其他试题用黑色字迹签字笔作答.5.考试终止后,请将本试卷、答题卡和草稿纸一并交回.一、选择题〔此题共32分,每题4分〕以下各题均有四个选项,其中只有一个..是符合题意的. 1.3-的绝对值等于A .3B .31C .31-D . 3-2.国家体育场场〝鸟巢〞的座席数是91000个,那个数用科学记数法表示应为A .31091.0⨯B .3101.9⨯C .91310⨯D .4101.9⨯3.如下图的几何体是由一些小立方块搭成的,那么那个几何体的俯视图是4.假设两圆的半径分不是1cm 和5cm ,圆心距为6cm ,那么这两圆的位置关系是A .内切B .相交C .外切D .外离5.众志成城,抗旱救灾.某小组7名同学积极捐水支援贵州旱区某中学,他们捐水的数额分不是〔单位:瓶〕:50,20,50,30,50,25,35.这组数据的众数和中位数分不是 A .50,20B .50,30C .50,35D .35,506.有5张写有数字的卡片〔如图1〕,它们的背面都相同,现将它们背面朝上〔如图2〕,从中翻开任意一张是数字2的概率是A .15 B .25C .23D .12A .B .C.D .7.一个多边形的内角和是外角和的2倍,那么那个多边形的边数为A .4B .5C .6D .78.下面是按一定规律排列的一列数:第1个数:11122-⎛⎫-+ ⎪⎝⎭; 第2个数:2311(1)(1)1113234⎛⎫⎛⎫---⎛⎫-+++ ⎪⎪ ⎪⎝⎭⎝⎭⎝⎭; 第3个数:234511(1)(1)(1)(1)11111423456⎛⎫⎛⎫⎛⎫⎛⎫-----⎛⎫-+++++ ⎪⎪⎪⎪ ⎪⎝⎭⎝⎭⎝⎭⎝⎭⎝⎭; ……第n 个数:232111(1)(1)(1)111112342n n n -⎛⎫⎛⎫⎛⎫----⎛⎫-++++ ⎪⎪⎪ ⎪+⎝⎭⎝⎭⎝⎭⎝⎭.那么,在第10个数、第11个数、第12个数、第13个数中,最大的数是 A .第10个数 B .第11个数 C .第12个数 D .第13个数二、填空题〔此题共16分,每题4分〕91x -x 的取值范畴是 .10.分解因式:32a ab -= . 11.如图,在ABC △中,D E ,分不是AB AC ,的中点, 假设2cm DE =,那么BC = cm .12.正六边形的边长为1cm ,分不以它的三个不相邻的顶点为圆心, 1cm 长为半径画弧〔如图〕,那么所得到的三条弧的长度之和 为 cm 〔结果保留π〕.CAEDB三、解答题〔此题共35分,每题5分〕1310182sin 45(2)3-⎛⎫+-π- ⎪⎝⎭.14.解不等式5122(43)x x --≤,并把它的解集在数轴上表示出来.15.化简:2211x x x x+-÷ .16.:如图:在正方形ABCD 中,E 、F 分不是AB 、AD 上的点,且AE =AF . 求证:CE =CF .17.一次函数3y kx =-的图象通过点M 〔-2,1〕,求此图象与x 轴、y 轴的交点坐标.18.如图,在四边形ABCD 中,AC 平分∠BAD ,10CD B C ==,21AB =,9AD =.求AC 的长.19.如图,等腰三角形ABC 中,AC =BC =6,AB =8.以BC 为直径作⊙O 交AB 于点D ,交AC 于点G ,DF ⊥AC ,垂足为F ,交CB 的延长线于点E .〔1〕求证:直线EF 是⊙O 的切线; 〔2〕求sin ∠E 的值.四、解答题〔此题共11分,第20题5分,第21题6分〕A图①A图②F E20.列方程或方程组解应用题:某体育用品商场推测某品牌运动服能够畅销,就用32000元购进了一批这种运动服,上市后专门快脱销,商场又用68000元购进第二批这种运动服,所购数量是第一批购进数量的2倍,但每套进价多了10元.该商场两次共购进这种运动服多少套?21.为了比较市场上甲、乙两种电子钟每日走时误差的情形,从这两种电子钟中,各随机抽取10台进行(1) 运算甲、乙两种电子钟走时误差的平均数; (2) 运算甲、乙两种电子钟走时误差的方差;(3)依照体会,走时稳固性较好的电子钟质量更优.假设两种类型的电子钟价格相同, 请咨询:你用哪种电子钟?什么缘故?五、解答题〔此题共4分〕 22.〔1〕观看与发觉:在一次数学课堂上,老师把三角形纸片ABC 〔AB >AC 〕沿过A 点的直线折叠,使得AC 落在AB 边上,折痕为AD ,展开纸片〔如图①〕;再次折叠该三角形纸片,使点A 和点D 重合,折痕为EF ,展平纸片后得到AEF △〔如图②〕.有同学讲现在的AEF △是等腰三角形,你同意吗?请讲明理由. 〔2〕实践与运用将矩形纸片ABCD 沿过点B 的直线折叠,使点A 落在BC 边上的点F 处,折痕为BE 〔如图③〕;再沿过点E 的直线折叠,使点D 落在BE 上的点D '处,折痕为E G 〔如图④〕;再展平纸片〔如图⑤〕.试咨询:图⑤中α∠的大小是多少?〔直截了当回答,不用讲明理由〕.六、解答题〔此题共22分,第23题7分,第24题7分,第25题8分〕 ED C FB A图③ ED C AB F GC 'D 'ADEC B G α图④ 图⑤23.:如图,正比例函数y ax =的图象与反比例函数ky x=的图象交于点()32A ,. 〔1〕试确定上述正比例函数和反比例函数的表达式;〔2〕依照图象回答,在第一象限内,当x 取何值时,反比例函数的值大于正比例函数的值?〔3〕()M m n ,是反比例函数图象上的一动点,其中03m <<,过点M 作直线MB x ∥轴,交y 轴于点B ;过点A 作直线AC y ∥轴交x 轴于点C ,交直线MB 于点D .当四边形OADM 的面积为6时,请判定线段BM 与DM 的大小关系,并讲明理由.245Rt △ABC 〔C ∠是直角〕放在平面直角坐标系中的第二象限, 使顶点A 在y 轴上, 顶点B 在抛物线22y ax ax =+-上,顶点C 在x 轴 上,坐标为〔1-,0〕.〔1〕点A 的坐标为 ,点B 的坐标为 ;〔2〕抛物线的关系式为 ,其顶点坐标为 ;〔3〕将三角板ABC 绕顶点A 逆时针方向旋转90°,到达AB C ''△的位置.请判定点B '、C '是否在〔2〕中的抛物线上,并讲明理由.25.如图,在梯形ABCD 中,3510AD BC AD DC BC ===∥,,,,梯形的高为4.动点M 从B 点动身沿线段BC 以每秒2个单位长度的速度向终点C 运动;动点N 同时从C 点动身沿线段CD 以每秒1个单位长度的速度向终点D 运动.设运动的时刻为t 〔秒〕.〔1〕当MN AB ∥时,求t 的值;〔2〕试探究:t 为何值时,MNC △为等腰三角形.2018年密云县初中毕业考试数学试卷答案参考及评分标准阅卷须知:1.为便于阅卷,本试卷答案中有关解答题的推导步骤写得较为详细,阅卷时,只要考生将要紧过程正确写出即可.2.假设考生的解法与给出的解法不同,正确者可参照评分参考给分. 3.评分参考中所注分数,表示考生正确做到这一步应得的累加分数.一、选择题〔此题共32分,每题4分〕题 号 1 2 3 4 5 6 7 8 答 案ADDCCBCA二、填空题〔此题共16分,每题4分〕题 号 91011 12 答 案1x ≥()()a a b a b +-42π三、解答题〔此题共35分,每题5分〕 13.〔本小题总分值5分〕1012sin 45(2π)3-⎛⎫+-- ⎪⎝⎭2132=⨯+- ······································································· 4分 2=. ······················································································ 5分14.〔本小题总分值5分〕解:去括号,得51286x x --≤. ······························································ 1分移项,得58612x x --+≤. ······························································· 2分 合并,得36x -≤. ··········································································· 3分 系数化为1,得2x -≥. ···································································· 4分 不等式的解集在数轴上表示如图:·················································································································· 5分 15.〔本小题总分值5分〕解:原式21(1)(1)x x x x x +=+- ···································································· 3分1x x =-. ·················································································· 5分 16.〔本小题总分值5分〕证明:在正方形ABCD 中,知AB =AD =DC =BC ,∠B =∠D =90O .-------------------------------------------------2分 ∵ AE =AF , ∴ AB -AE =AD -AF .即 BE =DF . ···················································································· 3分 在△BCE 和△DCF 中,⎪⎩⎪⎨⎧=∠=∠=DC.BC D,B ,DF BE ∴ △BCE ≌△DCF . ·············································································· 4分 ∴ CE =CF . ························································································ 5分 17.〔本小题总分值5分〕解:∵ 一次函数3y kx =-的图象通过点(21)M -,,∴ 231k --=. ··············································································· 1分 解得 2k =-. ·················································································· 2分 ∴ 此一次函数的解析式为23y x =--. ··········································································· 3分 令0y =,可得32x =-. ∴ 一次函数的图象与x 轴的交点坐标为302⎛⎫- ⎪⎝⎭,. ·································· 4分令0x =,可得3y =-.∴ 一次函数的图象与y 轴的交点坐标为(03)-,. ···································· 5分 18.〔本小题总分值5分〕解:如图,∵ AC 平分∠BAD ,∴ 把△ADC 沿AC 翻折得△AEC ,∴ AE =AD =9,CE=CD =10=BC .------------------------------------------------------2分 作CF ⊥AB 于点F .∴ EF =FB =21BE =21〔AB -AE 〕=6.------------------------3分 在Rt △BFC 〔或Rt △EFC 〕中,由勾股定理得 CF =8.----------------------------4分在Rt △AFC 中,由勾股定理得 AC =17.∴ AC 的长为17. -------------------------------------------------------------------------5分19. 〔本小题总分值5分〕〔1〕证明:如图,连结OD ,那么 OD OB =.∴ CBA ODB ∠=∠.∵ AC =BC , ∴ CBA A ∠=∠. ∴ ODB A ∠=∠.∵ OD ∥AC ,∴ ODE CFE ∠=∠. ∵ DF AC ⊥于F ,∴ 90CFE ∠=.∴90ODE ∠=.∴ OD EF ⊥.∴ EF 是⊙O 的切线. ------------------------------------------------------------3分( 2 ) 连结BG ,∵BC 是直径, ∴∠BGC =90=∠CFE . ∴ BG ∥EF .∴ GBC E ∠=∠.设 CG x =,那么 6AG AC CG x =-=-. 在R t △BGA 中,222228(6)BG AB AG x =-=--.在R t △BGC 中, 222226BG BC CG x =-=-. ∴ 22228(6)6x x --=-.解得 23x =.即 23CG =. 在R t △BGC 中,1sin 9GC GBC BC ∠== . ∴ sin ∠E 19=. --------------------------------------------- --------------------------------5分 四、解答题〔此题共11分,第20题5分,第21题6分〕 20.〔本小题总分值5分〕解:设商场第一次购进x 套运动服,由题意得:6800032000102x x-=. ······················································ 3分 解那个方程,得200x =. 经检验,200x =是所列方程的根.22200200600x x +=⨯+=.答:商场两次共购进这种运动服600套. ······················································ 5分 21.〔本小题总分值6分〕解:〔1〕甲种电子钟走时误差的平均数是:1(1344222112)010--++-+--+=;乙种电子钟走时误差的平均数是:1(4312212221)010--+-+-+-+=. ∴ 两种电子钟走时误差的平均数差不多上0秒. --------------------------------- 2分 〔2〕2222211[(10)(30)(20)]606()1010S s =-+--++-=⨯=甲; 2222211[(40)(30)(10)]6 4.8()1010S s =-+--++-=⨯=乙.∴ 甲乙两种电子钟走时误差的方差分不是6s 2和4.8s 2.---------------------------4分〔3〕我会用乙种电子钟,因为平均水平相同,且甲的方差比乙的大,讲明乙的稳固性更好,故乙种电子钟的质量更优.-----------------------------------------6分五、解答题〔此题共4分〕 22.〔本小题总分值4分〕解:〔1〕同意.如图,设AD 与EF 交于点M ,由折叠知,∠BAD =∠CAD ,∠AME =∠AMF =90O . ------------------------------1分∴ 依照三角形内角和定理得∠AEF =∠AFE . ------------------------------------2分∴ △AEF 是等腰三角形. ······························································· 3分〔2〕图⑤中α∠的大小是22.5o . ·························································· 4分六、解答题〔此题共22分,第23题7分,第24题7分,第25题8分〕 23.〔本小题总分值7分〕解:〔1〕将()32A ,分不代入ky y ax x==,中, 得2323k a ==,, ∴ 263k a ==,.∴ 反比例函数的表达式为:6y x=; 正比例函数的表达式为23y x =. ··············································· 2分 〔2〕观看图象得,在第一象限内,当03x <<时,反比例函数的值大于正比例函数的值.--------------------------------------------4分 〔3〕BM DM =.理由:∵ 132OMB OAC S S k ==⨯=△△,∴ 63312OMB OAC OBDC OADM S S S S =++=++=△△矩形四边形.即 12OC OB =. ∵ 3OC =,∴ 4OB =. 即 4n =.∴ 632m n ==. ∴ 3333222MB MD ==-=,.∴MB MD =. ········································································ 7分24.〔本小题总分值7分〕解:〔1〕A 〔0,2〕, B 〔3-,1〕. ····························································· 2分〔2〕解析式为211222y x x =+-; ······················································ 3分 顶点为〔11728--,〕. ······························································· 4分 〔3〕如图,过点B '作B M y '⊥轴于点M ,过点B 作BN y ⊥轴于点N ,过点C '作C P y '⊥ 轴于点P .在Rt △AB ′M 与Rt △BAN 中,∵ AB =AB ′, ∠AB ′M =∠BAN =90°-∠B ′AM , ∴ Rt △AB ′M ≌Rt △BAN .∴ B ′M =AN =1,AM =BN =3, ∴ B ′〔1,1-〕. 同理△AC ′P ≌△CAO ,C ′P =OA =2,AP =OC =1, 可得点C ′〔2,1〕; 将点B ′、C ′的坐标代入211222y x x =+-, 可知点B ′、C ′在抛物线上. ························································· 7分 〔事实上,点P 与点N 重合〕25.〔本小题总分值8分〕解:〔1〕如图①,过D 作DG AB ∥交BC 于G 点,那么四边形ADGB 是平行四边形.∵ MN AB ∥,∴ MN DG ∥. ∴ 3BG AD ==. ∴ 1037GC =-=.由题意知,当M 、N 运动到t 秒时,102CN t CM t ==-,.∵DG MN∥,∴MNC GDC△∽△.∴CN CMCD CG=.即10257t t-=.解得,5017t=.··········································································· 5分〔3〕分三种情形讨论:①当NC MC=时,如图②,即102t t=-.∴103t=. ············································································ 6分②当MN NC=时,如图③,过N作NE MC⊥于E,DH BC⊥于H.那么()11102522EC MC t t==-=-,4DH=.∴3CH=.∵90C C DHC NEC=∠=∠=︒∠∠,,∴NEC DHC△∽△.∴NC ECDC HC=.即553t t-=.∴258t=. ············································································ 7分③当MN MC=时,如图④,过M作MF CN⊥于F点.那么1122FC NC t==.∵90C C MFC DHC=∠=∠=︒∠∠,,∴MFC DHC△∽△.∴FC MCHC DC=.即1102235t t-=.∴6017t=.--------------------------------------------------------------------------8分综上所述,当103t=、258t=或6017t=时,MNC△为等腰三角形.。