数学2009山西省对口升学考试数学试题真题
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2009年山西省初中毕业学业考试试卷数 学一、选择题(每小题2分,共20分)1.比较大小:2- 3-(填“>”、“=”或“<“). 2.山西有着丰富的旅游资源,如五台山、平遥古城、乔家大院等著名景点,吸引了众多的海内外游客,2008年全省旅游总收入739.3亿元,这个数据用科学记数法可表示为 .3.请你写出一个有一根为1的一元二次方程: .4= .5.如图所示,A 、B 、C 、D 是圆上的点,17040A ∠=∠=°,°,则C ∠= 度. 6.李师傅随机抽查了本单位今年四月份里6天的日用水量(单位:吨)结果如下:7,8,8,7,6,6,根据这些数据,估计四月份本单位用水总量为 吨.7.如图,ABC △与A B C '''△是位似图形,且顶点都在格点上,则位似中心的坐标是 .8.如图,ABCD Y的对角线AC 、BD 相交于点O ,点E 是CD 的中点,ABD △的周长为16cm ,则DOE △的周长是 cm .9.若反比例函数的表达式为3y x=,则当1x <-时,y 的取值范围是 .10.下列图案是晋商大院窗格的一部分,其中“○”代表窗纸上所贴的剪纸,则第n 个图中所贴剪纸“○”的个数为 .ABCD 1(第5题) A C D B E O (第8题)(1)(2)(3)…… ……二、选择题(在下列各小题中,均给出四个备选答案,其中只有一个正确答案,请将正确答案的字母号填入下表相应的空格内,每小题3分,共24分)11.下列计算正确的是( )A .623a a a ÷= B .()122--= C .()236326x x x -=-· D .()0π31-=12.反比例函数ky x=的图象经过点()23-,,那么k 的值是( )A .32-B .23- C .6- D .613.不等式组21318x x --⎧⎨->≥的解集在数轴上可表示为( )AB C D14.解分式方程11222x x x-+=--,可知方程( ) A .解为2x = B .解为4x = C .解为3x = D .无解15.如图是由几个相同的小正方体搭成的几何体的三视图,则搭成这个几何体的小正方体的个数是( )A .5B .6C .7D .816.如图,AB 是O ⊙的直径,AD 是O ⊙的切线,点C 在O ⊙上,BC OD ∥,23AB OD ==,,则BC 的长为( )A .23B .32C D主视图左视图 俯视图(第15题)AB CDO(第16题)mnnn(2)(1) (第17题)17.如图(1),把一个长为m 、宽为n 的长方形(m n >)沿虚线剪开,拼接成图(2),成为在一角去掉一个小正方形后的一个大正方形,则去掉的小正方形的边长为( )A .2m n -B .m n -C .2mD .2n18.如图,在Rt ABC △中,90ACB ∠=°,3BC =,4AC =,AB 的垂直平分线DE 交BC 的延长线于点E ,则CE 的长为( )A .32 B .76 C .256D .2三、解答题(本题共76分)19.(每小题4分,共12分)(1)计算:()()()2312x x x +---(2)化简:222242x x x x +---(3)解方程:2230x x --=20.(本题6分)已知每个网格中小正方形的边长都是1,图1中的阴影图案是由三段以格点为圆心,半径分别为1和2的圆弧围成.(1)填空:图1中阴影部分的面积是 (结果保留π);(2)请你在图2中以图1为基本图案,借助轴对称、平移或旋转设计一个完整的花边图案(要求至少含有两种图形变换).21.(本题8分)根据山西省统计信息网公布的数据,绘制了山西省2004~2008固定电话和移动电话年末用户条形统计图如下:ADBEC(第18题)(第20题 图1)(第20题 图2)万户(1)填空:2004~2008移动电话年末用户的极差是 万户,固定电话年末用户的中位数是 万户; (2)你还能从图中获取哪些信息?请写出两条. 22.(本题8分)某商场为了吸引顾客,设计了一种促销活动:在一个不透明的箱子里放有4个相同的小球,球上分别标有“0元”、“10元”、“20元”和“30元”的字样.规定:顾客在本商场同一日内,每消费满200元,就可以在箱子里先后摸出两个球(第一次摸出后不放回).商场根据两小球所标金额的和返还相应价格的购物券,可以重新在本商场消费.某顾客刚好消费200元. (1)该顾客至少可得到 元购物券,至多可得到 元购物券;(2)请你用画树状图或列表的方法,求出该顾客所获得购物券的金额不低于30元的概率.23.(本题8分)有一水库大坝的横截面是梯形ABCD ,AD BC EF ∥,为水库的水面,点E 在DC 上,某课题小组在老师的带领下想测量水的深度,他们测得背水坡AB 的长为12米,迎水坡上DE 的长为2米,135120BAD ADC ∠=∠=°,°,求水深.(精确到0.11.73==)24.(本题8分)某批发市场批发甲、乙两种水果,根据以往经验和市场行情,预计夏季某一段时间内,甲种水果的销售利润y 甲(万元)与进货量x (吨)近似满足函数关系0.3y x =甲;乙种水果的销售利润y 乙(万元)与进货量x (吨)近似满足函数关系2y ax bx =+乙(其中0a a b ≠,,为常数),且进货量x 为1吨时,销售利润y 乙为1.4万元;进货量x 为2吨时,销售利润y 乙为2.6万元.(第23题)(1)求y 乙(万元)与x (吨)之间的函数关系式.(2)如果市场准备进甲、乙两种水果共10吨,设乙种水果的进货量为t 吨,请你写出这两种水果所获得的销售利润之和W (万元)与t (吨)之间的函数关系式.并求出这两种水果各进多少吨时获得的销售利润之和最大,最大利润是多少?25.(本题12分)在ABC △中,2120AB BC ABC ==∠=,°,将ABC △绕点B 顺时针旋转角α(0<°α90)<°得A BC A B 111△,交AC 于点E ,11A C 分别交AC BC 、于D F 、两点.(1)如图1,观察并猜想,在旋转过程中,线段1EA 与FC 有怎样的数量关系?并证明你的结论;(2)如图2,当α30=°时,试判断四边形1BC DA 的形状,并说明理由;(3)在(2)的情况下,求ED 的长.26.(本题14分)如图,已知直线128:33l y x =+与直线2:216l y x =-+相交于点C l l 12,、分别交x 轴于A B 、两点.矩形DEFG 的顶点D E 、分别在直线12l l 、上,顶点F G 、都在x 轴上,且点G 与点B 重合.(1)求ABC △的面积;(2)求矩形DEFG 的边DE 与EF 的长;(3)若矩形DEFG 从原点出发,沿x 轴的反方向以每秒1个单位长度的速度平移,设移动时间为(012)t t ≤≤秒,矩形DEFG 与ABC △重叠部分的面积为S ,求S 关于t 的函数关系式,并写出相应的t 的取值范围.ADBECF1A1CADBECF1A1C(第25题 图1)(第25题 图2)2009年山西省初中毕业学业考试试卷数 学一、选择题(每小题2分,共20分)1.> 2.107.39310⨯ 3.答案不唯一,如21x = 4 5.306.210 7.(9,0) 8.8 9.30y -<< 10.32n +二、选择题(在下列各小题中,均给出四个备选答案,其中只有一个正确答案,请将正确三、解答题(本题共76分)19.(1)解:原式=()226932x x x x ++--+ ·························································· (2分) =226932x x x x ++-+- ····························································· (3分) =97x +. ·················································································· (4分)(2)解:原式=()()()22222x x x x x +-+-- ································································· (2分) =222x x x --- ············································································· (3分) =1. ··························································································· (4分)(3)解:移项,得223x x -=,配方,得()214x -=, ············································· (2分)∴12x -=±,∴1213x x =-=,. ···························································· (4分) (注:此题还可用公式法,分解因式法求解,请参照给分)20.解:(1)π2-; ··························································································· (2分)(2)答案不唯一,以下提供三种图案.(注:如果花边图案中四个图案均与基本图案相同,则本小题只给2分;未画满四个“田”字格的,每缺1个扣1分.)21.(1)935.7,859.0; ························································································ (4分)(2)解:①2004~2008移动电话年末用户逐年递增.②2008年末固定电话用户达803.0万户. ··············································· (8分) (注:答案不唯一,只要符合数据特征即可得分) 22.解:(1)10,50; ························································································· (2分) (2)解:解法一(树状图):·················································································································· (6分)从上图可以看出,共有12种可能结果,其中大于或等于30元共有8种可能结果,因此P (不低于30元)=82123=.······························································ (8分)解法二(列表法):··········································································································· (6分)(以下过程同“解法一”) ········································································· (8分)23.解:分别过A D 、作AM BC ⊥于M DG BC ⊥,于G .过E 作EH DG ⊥于H ,则四边形AMGD 为矩形.,135120AD BC BAD ADC ∠=∠=Q ∥°,°. 0 10 20 30 1020 30 10 2030 10 3040 0 10 30 20 2030 50 20 30 10 503040 第一次 第二次 和(第20题 图2) ···································(6分) (第23题)∴456030B DCG GDC ∠=∠=∠=°,°,°.在Rt ABM △中,sin 122AM ABB ==⨯=·∴DG = ······························································································ (3分)在Rt DHE △中,cos 22DH DEEDH =∠=⨯=· ······································ (6分)∴ 1.41 1.73HG DG DH =-=⨯-6≈6.7. ······································· (7分)答:水深约为6.7米. ···················································································· (8分)(其它解法可参照给分)24.解:(1)由题意,得: 1.442 2.6a b a b +=⎧⎨+=⎩,.解得0.11.5a b =-⎧⎨=⎩,.········································· (2分)∴20.1 1.5y x x =-+乙. ········································································· (3分)(2)()()20.3100.1 1.5W y y t t t =+=-+-+乙甲.∴20.1 1.23W t t =-++. ······································································· (5分) ()20.16 6.6W t =--+.∴6t =时,W 有最大值为6.6. ························· (7分)∴1064-=(吨).答:甲、乙两种水果的进货量分别为4吨和6吨时,获得的销售利润之和最大,最大利润是6.6万元. ········································································· (8分)25.解:(1)1EA FC =. ······················································································· (1分)证明:(证法一)AB BC A C =∴∠=∠Q ,.由旋转可知,111AB BC A C ABE C BF =∠=∠∠=∠,,,∴ABE C BF 1△≌△. ··················································· (3分)∴BE BF =,又1BA BC =Q ,∴1BA BE BC BF -=-.即1EA FC =. ······························ (4分)(证法二)AB BC A C =∴∠=∠Q ,.由旋转可知,11A C A B CB ∠=∠,=,而1EBC FBA ∠=∠,∴1A BF CBE △≌△. ··················································· (3分)A DBE C F1A1CG∴BE BF =,∴1BA BE BC BF -=-,即1EA FC =. ······························································· (4分)(2)四边形1BC DA 是菱形. ····································································· (5分)证明:111130A ABA AC AB ∠=∠=∴Q °,∥,同理AC BC 1∥.∴四边形1BC DA 是平行四边形. ················································· (7分)又1AB BC =Q ,∴四边形1BC DA 是菱形. ····································· (8分)(3)(解法一)过点E 作EG AB ⊥于点G ,则1AG BG ==.在Rt AEG △中,1cos cos30AG AE A ===°……(10分)由(2)知四边形1BC DA 是菱形,∴2AD AB ==,∴2ED AD AE =-= ················································ (12分)(解法二)12030ABC ABE ∠=∠=Q °,°,∴90EBC ∠=°.在Rt EBC △中,tan 2tan 30BE BC C ==⨯=·°112EA BA BE ∴=-= ·············································· (10分)11111AC AB A DE A A DE A ∴∠=∠∴∠=∠Q ∥,..∴12ED EA ==-······················································· (12分)(其它解法可参照给分)26.(1)解:由28033x +=,得4x A =-∴.点坐标为()40-,.由2160x -+=,得8x B =∴.点坐标为()80,.∴()8412AB =--=.········································································ (2分)由2833216y x y x ⎧=+⎪⎨⎪=-+⎩,.解得56x y =⎧⎨=⎩,.∴C 点的坐标为()56,. ······························· (3分)∴111263622ABC C S AB y ==⨯⨯=△·.·················································· (4分) (2)解:∵点D 在1l 上且2888833D B D x x y ==∴=⨯+=,.∴D 点坐标为()88,. ·········································································· (5分)又∵点E 在2l 上且821684E D E E y y x x ==∴-+=∴=,..∴E 点坐标为()48,. ·········································································· (6分)∴8448OE EF =-==,. ································································ (7分)(3)解法一:①当03t <≤时,如图1,矩形DEFG 与ABC △重叠部分为五边形CHFGR (0t =时,为四边形CHFG ).过C 作CM AB ⊥于M ,则Rt Rt RGB CMB △∽△.∴BG RG BM CM =,即36t RG=,∴2RG t =. Rt Rt AFH AMC Q △∽△,∴()()11236288223ABC BRG AFH S S S S t t t t =--=-⨯⨯--⨯-△△△.即241644333S t t =-++.·························································· (10分)(图3)(图1)(图2)。
山西省中等职业学校对口升学考试数学试题本试卷分选择题和非选择题两部分。
满分100分,考试时间为90分钟。
选择题一、单项选择题(本大题共10小题,每小题3分,共计30分)1.设集合P={1、2、3、4},Q={x ||x |≤2,x ∈R }则P ∩Q 等于( ) A 、{1、2} B 、{3、4} C 、{1} D 、{-1、-2、0、1、2}2.已知数列 ,12,7,5,3,1-n 则53是它的( )A.第22项B. 第23项C. 第24项D. 第28项 3.[]0)(log log log 543=a ,则 =a ( ) 5 B.25 C. 125 D.625 4.设向量a =(2,-1),b=(x,3)且a⊥b则x=( )A.21B.3C.23D.-25.下列四组函数中,表示同一函数的是( ) A .2)1(与1-=-=x y x yB .11与1--=-=x x y x yC .2lg 2与lg 4x y x y ==D .100lg与2lg xx y =-=6.函数x x ycos 4sin 3+=的最小正周期为( )A. πB. π2C. 2πD.5π7.若函数2()32(1)f x x a x b =+-+在(,1]-∞上为减函数,则 ( )A .2-=aB .2=aC .2-≥aD .2-≤a8.在ABC ∆中,已知222c bc b a ++=,则A ∠的度数为( )3π B. 6π C. 32πD. 3π或32π9.已知直线b a ,是异面直线,直线c a//,那么c 与b 位置关系是( )A.一定相交B.一定异面C.平行或重合D.相交或异面10.顶点在原点,对换称轴是x 轴,焦点在直线3x-4y-12=0上的抛物线方程是( ) A.x y162= B. x y 122= C.x y 16-2= D. x y 12-2=非选择题二、填空题(本大题共8小题,每空4分,共计32分。
山西省对口升学考试数学试题含答案山西省2011年对口升学考试数学试题本试卷分选择题和非选择题两部分。
满分100分,考试时间90分钟。
答卷前先填写密封线内的项目和座位号。
选择题注意事项:1、选择题答案必须填涂在答题卡上,写在试卷上的一律不计分。
2、答题前,考生务必将自己的姓名、准考证号、考试科目涂写在答题卡上。
3、考生必须按规定要求正确涂卡,否则后果自负。
一、单项选择题(本大题共12个小题,每小题 3 分,共计 36 分) 1、设,, ,,, ,那么( )A,x|x,5B,x|x,10B. C. D. A.A:B,AA:B,RA:B,BA:B,,2、若a=,,,b=,,,且已知a?b ,则y= ( ) 4,26,yA. B. C.3 D. 12 ,12,3223、的最小正周期为 ( ) y,cosx,sinx,A. B. C. D. ,2,4,21114、等比数列前8项和为( ) ,,,??248511255255255A. B. C. D. 256128512512,,,,5、已知数据满足,则x的值为( ) x,1,0,2,2,1,0A. 1B. ,1C. 0D. 2 6、有A、B、C、D、E五人排成一排,其中A正好排在中间的概率为( )1111A. B. C. D. 104522,,7、若不等式的解集为x|x,,1或x,2 ,则( ) a,b,x,ax,b,0A. 3B. 1C.D. ,1 ,3008、在中,已知,,,则 ( ) ,ABCa,4b,A,45B,604A. B. C. D. 262362239、设,则下列不等式中不正确的是( ) a,b,c,1ccabA. B.logb,logc C. D.logc,logc c,ca,baaba,,10、过点3,,2且与直线平行的直线方程为( ) 4x,y,1,01/6A. B. C. D. 4x,y,14,04x,y,10,04x,y,14,0x,4y,5,011、在空间中,下列命题中正确的是( )A.如果两条直线都平行于平面,那么? ; ,aa,bbB.如果直线?平面,那么直线就平行于平面内的任何一条直线; a,a,C.如果平面?平面,那么平面内的任何一条直线都平行于平面; ,,,,D.如果两个平面都与直线平行,那么平面?平面。