2014年张静中学广东省数学测试题及答案三

  • 格式:doc
  • 大小:324.50 KB
  • 文档页数:7

2014年张静中学广东省数学测试题及答案三 说明:全卷共 4 页,考试时间为 100 分钟,满分 120 分.

一、选择题(本大题10小题,每小题3分,共30分)在每小题列出的四个选项中,只有一个是正确的,请把答题卡上对应题目所选的选项涂黑.

1. -2的倒数是( ▲ ) A.-12 B.2 C.-2 D.12

2. 今年我市参加中考的人数大约有91300人,将91300用科学记数法表示为( ▲ ) A.913×102 B.91.3×103 C.9.13×104 D.0.913×103 3. 某市5月上旬的最高气温如下(单位:℃):28、29、31、29、33,对这组数据,下列说法错误的是( ▲ ) A.平均数是30 B.中位数是31 C.众数是29 D.中位数是29 4. 将如图所示的Rt△ACB绕直角边AC旋转一周,所得几何体的主视图(正视图)是( ▲ )

A. B. C. D. 5. 一个等腰三角形两边的长分别为4和9,那么这个三角形的周长是( ▲ ) A.13 B.17 C.22 D.17或22 6. 已知:0ba,则下列不等式成立的是( ▲ ) A.0ab B.0ba C.0ba D.0ba

7. 如图,在△ABC中,∠C=90°,AB=13,BC=5,则sin A的值是( ▲ ) A. 135 B. 1312 C.125 D. 513

8. 下列计算正确的是( ▲ ) A.326aaa B.523)(aa C.525 D.283 9. 在同一平面直角坐标系中,若一次函数3xy与53xy图象交点坐标为( ▲ ) A.(-1,4) B.(-1,2) C.(2,-1) D.(2,1)

10. 如图.在菱形ABCD中,对角线AC, BD交于点O,下列说法错误..的是( ▲ )

题号 一 二 三 四 五 总分 17 18 19 20 21 22 23 24 25

得分

ABCDOA.AB∥DC B.AC=BD C.AC⊥BD D.OA=OC 二、填空题(本大题6小题,每小题4分,共24分)请将下列各题的正确答案填写在答题卡相应的位置上. 11. 若x-1在实数范围内有意义,则x的取值范围是___▲___. 12.计算:4322aaa=___▲___. 13. 已知地球表面陆地面积与海洋面积的比约为3:7.如果宇宙中飞来一块陨石落在地球上,则落在陆地上的概率是___▲___. 14. 如图,△ABC是⊙O的内接三角形,AB为⊙O的直径,点D为⊙O上一点, 若∠CAB=55°,则∠ADC的大小为___▲___(度).

15. 在△ABC中,点D、E分别在AB、AC上,∠ADE=∠C,如果AE=2,△ADE的面积为4,△ABC的面积为9,那么AB的长为 ▲ . 16. 某县2011年农民人均年收入为7 800元,计划到2013年,农民人均年收入达到9 100元.设人

均年收入的平均增长率为x,则可列方程 ▲ . 三、解答题(一)(本大题3小题,每小题5分,共15分) 17. 计算: 102)21()2013(1)2(

18. 解不等式组2132(1)4xxxx,并把解集在数轴上表示出来.

19. 如图,在亚丁湾一海域执行护航任务的我海军某军舰由东向西行驶.在航行到B处时,发现灯塔A在我军舰的正北方向500米处;当该军舰从B处向正西方向行驶至达C处时,发现灯塔A

第14题第15题图

北东A在我军舰的北偏东60°的方向.求该军舰行驶的路程.(计算过程和结果均不取近似值) 四、解答题(二)(本大题3小题,每小题8分,共24分) 20. 如图所示,在△ABC中,∠ABC=∠ACB. (1)尺规作图:过顶点A作△ABC的角平分线AD; (不写作法,保留作图痕迹) (2)在AD上任取一点E,连接BE、CE. 求证:△ABE≌△ACE.

21. 某校为了了解本校八年级学生课外阅读的喜欢,随机抽取了该校八年级部分学生进行问卷调查(每人只选一种书籍)。图8是整理数据后绘制的两幅不完整的统计图,请你根据图中提供的信息,解答下列问题:

图8 (1)这次活动一共调查了_________名学生; (2)在扇形统计图中,“其他”所在扇形圆心角等于_________度; (3)补全条形统计图; (4)若该年级有600人,请你估计该年级喜欢“科普常识”的学生人数约是_________人。

22. 已知一次函数bkxy的图象与反比例函数xy8的图象交于A、B两点,且点A的横坐标和点B的纵坐标都是-2,

x y

O A

B

人数 100 80 60 40

漫画 科普常识 其他

种类 小说

0

20

80 40 20

40% 小 说 30%

科普常识

漫画 其他 10m 20m 6m

M

N

图1 A B D

C

C′

G G

图2 A

B D

C

E C′

N M

求:(1)一次函数的解析式; (2)△ABO的面积。

五、解答题(三)(本大题3小题,每小题9分,共27分) 23. 已知抛物线12xxy (1)求抛物线12xxy的顶点坐标、对称轴 (2)抛物线12xxy与x轴的交点为(m,0),求代数式20122mm的值

24. 如图1,一张矩形纸片ABCD,其中AD=8cm,AB=6cm,先沿对角线BD对折,点C落在点C′的位置,BC′交AD于点G。 (1)求证:AG=C′G;

(2)如图2,再折叠一次,使点D与点A重合,得折痕EN,EN交AD于点M, 求EM的长。

25. 一座拱桥的轮廓是抛物线型,拱高6 m,跨度20 m,相邻两支柱间的距离均为5 m. (1)将抛物线放在所给的直角坐标系中(如右图所示),其表达式是caxy2的形式. 请根据所给的数据求出ca,的值. (2)求支柱MN的长度. (3)拱桥下地平面是双向行车道(正中间是一条宽2 m的隔离带),其中的一条行车道能否 并排行驶宽2 m、高3 m的三辆汽车(汽车间的间隔忽略不计)?请说说你的理由.

参考答案和评分标准 一、ACBDC DADDB

(第25题图) O x A B

C y 人数 100 80 60 40

漫画 科普常识 其他 种类 小说 0 20

80 40 60

20

21题图

二、11、1x 12、a2 13、103 14、35 15、3 16、9100)1(78002x 三、解答题(一)(本大题3小题,每小题5分,共15分) 17.解:原式=2112 ································································································· 4分 =0 ······················································································································ 5分

18.解:2132(1)4xxxx①②, ∵解不等式①得:x>-1, ··············································································· 1分 解不等式②得:x≤2, ···················································································· 3分 ∴不等式组的解集为:-1<x≤2, ·································································· 4分

在数轴上表示不等式组的解集为:. ·················· 5分 19.解:由题意可知,在Rt△ABC中,AB=500m,∠ACB=90°-60°=30°, ················· 1分 ∵tan∠ACB=BCAB, ··························································································· 2分

∴BC=350030tan500tan0ACBAB(m), ········································· 4分 答:该军舰行驶的路程为3500米. ···························································· 5分 四、解答题(二)(本大题3小题,每小题8分,共24分) 20.(1)解:如图所示: ····································································································· 3分 (2)证明:∵AD是△ABC的角平分线, ∴∠BAD=∠CAD, ········································································································ 4分 ∵∠ABC=∠ACB, ∴AB=AC, ··················································································································· 5分 ∵在△ABE和△ACE中

, ······································································································ 7分 ∴△ABE≌△ACE(SAS). ························································································· 8分 21、(1)200; ·················································································································· 2分 (2)36; ···················································································································· 4分 (3)如图; ·················································································································· 6分 (4)180 ······················································································································ 8分