一、选择题
1.5的相反数是( ▲ ).
A.
1 5236 B.1 523 C.5
D.5
32.下列运算正确的是( ▲ ).
A.a·aa B.aa C.aba6b3 D.a6a2a3
823.为迎接2014年青奥会,在未来两到三年时间内,一条长53公里,总面积约11000亩的鸀色长廊将串起南京的观音门、仙鹤门、沧波门等8座老城门遗址.数据11000用科学记数法可表示为( ▲ ). A.1110 B.1.110 C.1.110 D.0.1110
x+1>0,4.如图,不等式组 的解集在数轴上表示正确的是( ▲ ).
x-1≤0
3455
0 1 -1 0 1 -1 0 1 B. D. C.
5.如图,在12网格的两个格点上任意摆放黑、白两个棋子,且两棋子不在同一条格线上.其中恰好如
-1 -1 图示位置摆放的概率是( ▲ ). A.
0 1 A.
1 6 B.
11 C. 912 D.
1 186.如图,在扇形纸片AOB中,OA =10,AOB=36,OB在桌面内的直线l上.现将此扇形沿l按顺时针方向旋转(旋转过程中无滑动),当OA落在l上时,停止旋转.则点O所经过的路线长为( ▲ ). A. 12
(第5题图)
B.11 C.10 D.10555 A O B (第6题图)
l
二、填空题
7.数据3,5,5,1,1,1,1的众数是 ▲ . 8.分解因式x26x9的结果是 ▲ .
A 9.如图,已知AB∥CD,AEF80°,则DCF为 ▲ °.
F C A
E
(第9题图)
D B
C O D B 2
4
(第11题图)
(第12题图)
10.观察:a11,a213111111. ,a3,a4,…,则an ▲ (n为正整数)
35577911.如图,AB是⊙O直径,且AB=4cm,弦CD⊥AB,∠COB=45°,则CD为 ▲ cm. 12.如图,是水平放置的长方体,它的底面边长为2和4,左视图的面积为6,则该长方体的体积为 ▲ . 13.当分式
1与3的值相等时,x的值为 ▲ .
x2xk的图象都经过点A(1,1).则在第一象限内,当y1y2x14.如图,正比例函数y1x和反比例函数y2时,x的取值范围是 ▲ .
O (第14题图) y A(1,1) x A E F B D H G C
(第15题图)
15.如图,在梯形ABCD中,AD∥BC,点E、F、G、H是两腰上的点,AE=EF=FB,CG=GH=HD,且四边形EFGH
的面积为6cm2,则梯形ABCD的面积为 ▲ cm2.
16.一张矩形纸片经过折叠得到一个三角形(如图),则矩形的长与宽的比为 ▲ .
(第16题图)
三、解答题
17.(5分)计算:(13)0218.
a2b2b2+22,其中a=-2,b=1. 18.(5分)先化简,再求值:
a+ba-b
19.(6分)如图,在△ABC中,AB=AC,AD⊥BC,垂足为D,AE∥BC, DE∥AB.
证明:(1)AE=DC;(2)四边形ADCE为矩形.
20.(6分)某区为了解全区2800名九年级学生英语口语考试成绩的情况,从中随机抽取了部分学生的成
B
D
(第19题图)
A E
C
绩(满分24分,得分均为整数),制成下表: 分数段(x分) 人 数 (1)填空:
①本次抽样调查共抽取了 ▲ 名学生; ②学生成绩的中位数落在 ▲ 分数段;
③若用扇形统计图表示统计结果,则分数段为x≤16的人数所对应扇形的圆心角为 ▲ °; (2)如果将21分以上(含21分)定为优秀,请估计该区九年级考生成绩为优秀的人数.
21.(6分)某初级中学准备随机选出七、八、九三个年级各1名学生担任领操员.现已知这三个年级分别选送
一男、一女共6名学生为备选人.
(1)请你利用树状图或表格列出所有可能的选法; (2)求选出“两男一女”三名领操员的概率.
x≤16 10 17≤x≤18 15 19≤x≤20 35 21≤x≤22 112 23≤x≤24 128 22.(6分)受国际原油价格持续上涨影响,某市对出租车的收费标准进行调整.
车费y/元 16 15
调整前: 14
13 调整方案: 12 加收1元燃油附调整后: 11 .
加费,其它收费标准10
9 保持不变. 0 1 2 3 4 5 6 路程x/km
(第22题图)
(1)调整前出租车的起步价为 ▲ 元,超过3km收费 ▲ 元/km;
(2)求调整后的车费y(元)与行驶路程x(km)(x>3)之间的函数关系式,并在图中画出其函数图象.
23.(8分) 现有一张宽为12cm练习纸,相邻两条格线间的距离均为.调皮的小聪在纸的左上角用印章印
出一个矩形卡通图案,图案的顶点恰好在四条格线上(如图),测得∠α=32°.
(1)求矩形图案的面积;
(2)若小聪在第一个图案的右边以同样的方式继续盖印(如图),最多能印几个完整的图案
(参考数据:sin32°≈,cos32°≈,tan32°≈)
α …… 12cm (第23题图)
24.(8分)某手机专营店代理销售A、B两种型号手机.手机的进价、售价如下表:
(1)第一季度:用36000元购进 A、B两种型号的手机,全部售完后获利6300元,求第一季度购进A、
B两种型号手机的数量;
(2)第二季度:计划购进A、B两种型号手机共34部,且不超出第一季度的购机总费用,则A型号手
机最多能购多少部
25. (8分)如图,在△ABC中,AB=AC,点O为底边上的中点,以点O为圆心,1为半径的半圆与边AB
相切于点D.
A (1)判断直线AC与⊙O的位置关系,并说明理由;
(2)当∠A=60°时,求图中阴影部分的面积.
26.(9分)已知二次函数yx2xm的图象与x轴相交于A、B两点(A左B右),与y轴相交于
点C,顶点为D. (1)求m的取值范围;
(2)当点A的坐标为(3,0),求点B的坐标; (3)当BC⊥CD时,求m的值.
2型 号 进 价 售 价 A 1200元/部 1380元/部 B 1000元/部 1200元/部 D B O (第25题图)
C
27.(9分)
操作:小明准备制作棱长为1cm的正方体纸盒,现选用一些废弃的圆形纸片进行如下设计: C 说明:
B
方案一图形中的圆过点A、B、C;
方案二直角三角形的两直角边与
展开图左下角的正方形边重合,斜A
边经过两个正方形的顶点.
方案二 方案一
纸片被利用的面积
纸片利用率= ×100%
纸片的总面积
发现:(1)方案一中的点A、B恰好为该圆一直径的两个端点.
你认为小明的这个发现是否正确,请说明理由. (2)小明通过计算,发现方案一中纸片的利用率仅约为%.
请帮忙计算方案二的利用率,并写出求解过程.
探究:(3)小明感觉上面两个方案的利用率均偏低,又进行了新的设计(方案三),请直接写出方案
三的利用率.
说明:
方案三中的每条边均过其中两个
正方形的顶点.
方案三
28.(12分)如图,在Rt△ABC中,∠C=90°,AC=BC=4cm,点D为AC边上一点,且AD=3cm,动点E从
点A出发,以1cm/s的速度沿线段AB向终点B运动,运动时间为x s.作∠DEF=45°,与边BC相交于点F.设BF长为ycm. (1)当x= ▲ s时,DE⊥AB;
(2)求在点E运动过程中,y与x之间的函数关系式及点F运动路线的长; (3)当△BEF为等腰三角形时,求x的值.
C D F A E B (第28题图)
C D A B (第28题备用图)
参考答案
一、选择题(每小题2分,共计12分)
题号 答案 二、填空题
7.1 8.x3 9.100 10.
21 C 2 C 3 B 4 B 5 C 6 A 11 2n12n1 11.22
223
12.24 13.3 14.x>1 15.18 16.2︰3 (或 或3 )
3 三、解答题 17.(本题5分)
解:原式=1-2+32 ················································································································ 3分
=-1+32 ·················································································································· 5分 18.(本题5分)
(a2b)(ab)2b2解:原式 ·········································································· 2分
(ab)(ab)(ab)(ab)a2ab ········································································································· 3分 (ab)(ab)a ························································································································ 4分 ab-22
= 3 ·········································································· 5分
-2-1
A E
当a=-2,b=1时,原式=
19.(本题6分)
证明:
(1)在△ABC中,∵AB=AC,AD⊥BC, ∴BD=DC ········································································································································ 1分 ∵AE∥BC, DE∥AB, B C D ∴四边形ABDE为平行四边形 ···································································································· 2分 ∴BD=AE, ···································································································································· 3分 ∵BD=DC ∴AE = DC. ··································································································································· 4分 (2)
解法一:∵AE∥BC,AE = DC, ∴四边形ADCE为平行四边形. ································································································ 5分 又∵AD⊥BC, ∴∠ADC=90°,
∴四边形ADCE为矩形. ············································································································ 6分 解法二:
∵AE∥BC,AE = DC,
∴四边形ADCE为平行四边形 ···································································································· 5分 又∵四边形ABDE为平行四边形 ∴AB=DE.∵AB=AC,∴DE=AC. ∴四边形ADCE为矩形. ············································································································ 6分 20.(本题6分) 解法一:(1)用表格列出所有可能结果: 七年级 八年级 九年级 结果 男 男 男 (男,男,男) 男 男 女 (男,男,女) 男 女 男 (男,女,男) 男 女 女 (男,女,女) 女 女 女 (女,女,女)
女 女 男 (女,女,男)
女 男 女 (女,男,女)
女 男 男 (女,男,男) ······················································································································································· 3分
(2)从上表可知:共有8种结果,且每种结果都是等可能的,其中“两男一女”的结果有3种.所以,P(两男一女)=3
8 . ······································································································· 6分 解法二:(1)用树状图列出所有可能结果: 七年级 八年级 九年级 结果 男
男 (男,男,男) 男
女
(男,男,女) 男 (男,女,男) 女 (男,女,女) 开始
男 男 (女,男,男)
女
(女,男,女)
女
女
男 (女,女,男)
女 (女,女,女) ······················································································································································· 3分
(2)从上图可知:共有8种结果,且每种结果都是等可能的,其中“两男一女”的结果有3种.所以,P(两男一女)=3
8 . ······································································································· 6分 21.(本题6分)
(1)①300 ··································································································································· 1分
②21≤x≤22 ······················································································································· 3分 ③12 ····································································································································· 4分 (2)2800×112+128
300 =2240(人) ··························································································· 5分 答:该区所有学生中口语成绩为满分的人数约为2240人. ················································· 6分 22.(本题6分) 解:(1)9;; ······························································································································· 2分
5分5分
(2)y=10+(x-3)=+ ·········································································································· 5分
调整后的图像如图: 16 15 14 13 12 11 10 9 车费y/元 调整前: 调整后: 0 1 2 3 4 5 6路程 x/km
······················································································································································· 6分
23.(本题8分)
(1)如图,在Rt△BCE中,
CECE0.8∵sinα=BC ,∴BC = sinα = = ························································································· 2分
0.5∵矩形ABCD中,∴∠BCD=90°,∴∠BCE+∠FCD=90°, 又∵在Rt△BCE中,∴∠EBC+∠BCE=90°,∴∠FCD=32°.
FC1.6FC在Rt△FCD中,∵cos∠FCD=CD ,∴CD===2 ···················································· 4分
cos320.8∴橡皮的长和宽分别为2cm和. E Bα C
……
G H F D
A 12cm AD
(2)如图,在Rt△ADH中,易求得∠DAH=32°.∵cos∠DAH=AH , ∴AH=
AD1.6==2 ················································································································ 5分
cos320.8GH
在Rt△CGH中,∠GCH=32°.∵tan∠GCH=CG ,
∴GH=CG tan32°= × = ················································································································ 7分 又∵6×2+>12,5×2+<12,3×4+,∴最多能摆放5块橡皮. ··············································· 8分 24.(本题8分)
(1)解:设该专营店第一季度购进A、B两种型号手机的数量分别为x部和y部. ········ 1分
1200x+1000 y=36000,由题意可知: ··················································································· 3分
180x+200y=6300x=15,
解得:
y=18
答:该专营店本次购进A、B两种型号手机的数分别为15部和18部. ····························· 4分
(2)解:设第二季度购进A型号手机a部. ········································································· 5分 由题意可知:1200a+1000(34-a)≤36000,············································································· 6分 解得:a≤10 ································································································································· 7分 不等式的最大整数解为10
答:第二季度最多能购A型号手机10部. ············································································· 8分
A
25.(本题8分)
解:(1)直线AC与⊙O相切. ································································································· 1分 理由是:
连接OD,过点O作OE⊥AC,垂足为点E. ∵⊙O与边AB相切于点D,
B C O ·∴OD⊥AB. ································································································································· 2分
D E ∵AB=AC,点O为底边上的中点,
∴AO平分∠BAC ··························································································································· 3分 又∵OD⊥AB,OE⊥AC
∴OD= OE ······································································································································· 4分 ∴OE是⊙O的半径.
又∵OE⊥AC,∴直线AC与⊙O相切.····················································································· 5分 (2)∵AO平分∠BAC,且∠BAC=60°, ∴∠OAD=∠OAE=30°, ∴∠AOD=∠AOE=60°,
ODOD
在Rt△OAD中,∵tan∠OAD = AD ,∴AD= tan∠OAD =3,同理可得AE=3
11
∴S四边形ADOE =2 ×OD×AD×2=2 ×1×3×2=3 ······························································· 6分 120π×121又∵S扇形形ODE= 360 =3 π ····································································································· 7分 1
∴S阴影= S四边形ADOE -S扇形形ODE=3 -3 π. ·············································································· 8分 26.(本题9分)
解:(1)∵二次函数yx2xm的图象与x轴相交于A、B两点
∴b2-4ac>0,∴4+4m>0, ····································································································· 2分 解得:m>-1 ······························································································································ 3分 (2)解法一:
b2∵二次函数yx2xm的图象的对称轴为直线x=-2a =1 ···································· 4分 ∴根据抛物线的对称性得点B的坐标为(5,0) ··································································· 6分 解法二:
把x=-3,y=0代入yx2xm中得m=15 ··································································· 4分
22∴二次函数的表达式为yx2x15
令y=0得x2x150 ······································································································ 5分 解得x1=-3,x2=5
y ∴点B的坐标为(5,0) ··········································································································· 6分 D E
C (3)如图,过D作DE⊥y轴,垂足为E.∴∠DEC=∠COB=90°, 当BC⊥CD时,∠DCE +∠BCO=90°,
∵∠DEC=90°,∴∠DCE +∠EDC=90°,∴∠EDC=∠BCO.
B x A O ECED
∴△DEC∽△COB,∴OB =OC .····························································································· 7分 11
由题意得:OE=m+1,OC=m,DE=1,∴EC=1.∴ OB =m .
∴OB=m,∴B的坐标为(m,0). ························································································· 8分 将(m,0)代入yx2xm得:-m 2+2 m + m=0.
解得:m1=0(舍去), m2=3. ······························································································ 9分 27.(本题9分) 发现:(1)小明的这个发现正确. ··························································································· 1分 理由:解法一:如图一:连接AC、BC、AB,∵AC=BC=5 ,AB=10
∴AC2+BC2=AB2 ∴∠BAC=90°, ······················································· 2分 ∴AB为该圆的直径. ·············································································· 3分
解法二:如图二:连接AC、BC、AB.易证△AMC≌△BNC,∴∠ACM=∠CBN.
又∵∠BCN+∠CBN=90°,∴∠BCN+∠ACM=90°,即∠BAC=90°, ······· 2分 ∴AB为该圆的直径. ······················································································ 3分
A E N D F
H
M
C B 图一 图二 图三
(2)如图三:易证△ADE≌△EHF,∴AD=EH=1. ····························································· 4分 ADDE12
∵DE∥BC,∴△ADE∽△ACB,∴AC =CB ∴4 =CB ,∴BC=8. ···································· 5分 ∴S△ACB=16. ······························································································································· 6分 展开图的面积6∴该方案纸片利用率= ×100%=16 ×100%=% ········································· 7分
纸板的总面积180
探究:(3)361 ··························································································································· 9分 28.(本题12分)
2223
解:(1)2
2 ···························································································································· 2分
(2)∵在△ABC中,∠C=90°,AC=BC=4.
∴∠A=∠B=45°,AB=42 ,∴∠ADE+∠AED=135°;
又∵∠DEF=45°,∴∠BEF+∠AED=135°,∴∠ADE=∠BEF;
∴△ADE∽△BEF··························································································································· 4分 ADAE∴BE =BF , ∴
3x14
=y ,∴y=-3 x2+3
42 -x
2 x ················································································· 5分
14
∴y=-3 x2+3 18
2 x=-3 ( x-22 )2+3
8
∴当x=22 时,y有最大值=3 ···························································································· 6分 16
∴点F运动路程为3 cm ············································································································ 7分
C D F
A E B 第28题(1)(2)图
(3)这里有三种情况:
①如图,若EF=BF,则∠B=∠BEF;
又∵△ADE∽△BEF,∴∠A=∠ADE=45° 3
∴∠AED=90°,∴AE=DE=2 2 ,
2 s;
C
D
F
A
第28题(3)①图
E B
3
∵动点E的速度为1cm/s ,∴此时x=2 ②如图,若EF=BE,则∠B=∠EFB;
又∵△ADE∽△BEF,∴∠A=∠AED=45° ∴∠ADE=90°,∴AE=32 , ∵动点E的速度为1cm/s ∴此时x=32 s;
C
D
A
第28题(3)②图
C D
F
F
E B
A
第28题(3)③图
E B
③如图,若BF=BE,则∠FEB=∠EFB; 又∵△ADE∽△BEF,∴∠ADE=∠AED ∴AE=AD=3,
∵动点E的速度为1cm/s ∴此时x=3s;
3
综上所述,当△BEF为等腰三角形时,x的值为2
2 s或32 s或3s.
(注:求对一个结论得2分,求对两个结论得4分,求对三个结论得5分)
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