学 海 无 涯 例:当a?0时,如a?6则a?6?6,故此时a的绝对值是它本身 当a?0时,a?0,故此时a的绝对值是零 当a?0时,如a??6则a??6?6??(?6),故此时a的绝对值是它的相反数 ?综合起来一个数的绝对值要分三种情况,即 当a?0?a?a??0当a?0 ??a当a?0?这种分析方法涌透了数学的分类讨论思想. 问:(1)请仿照例中的分类讨论的方法,分析二次根式a2的各种展开的情况. (2)猜想a2与a的大小关系. 25.(9分)如图,在△ABC中?ACB?90,D是AB的中点,以DC为直径的O交△ABC的三边,交点分别是G,F,E点.GE,CD的交点为M,且ME?46,MD:CO?2:5. (1)求证:?GEF??A. (2)求O的直径CD的长. (3)若cos?B?0.6,以C为坐标原点,CA,CB所在的直线分别为X轴和Y轴,建立平面直角坐标系,求直线AB的函数表达式. B G F M O C E 第25题图 A D 学 海 无 涯 2008年凉山州初中毕业、高中阶段招生统一考试 数学参考答案及评分标准 一、选择题(每小题3分,共30分) 1~5:CDCBC 6~10:BBADA 二、填空题(每小题3分,共12分) 11.a(b?a)或a(a?b) 2212.甲 13.x??4 14.47 三、(15题18分,16、17各6分,共30分) 15.解答下列各题(每小题6分,共18分) (1)计算: ?1?解:?2?(tan60?1)?3?????(??)0?2?3 ?2?2?2??4?(3?1)3?4?1?2?3 ····································································· 3分 ??4?3?3?4?1?2?3 ··········································································· 5分 ············································································································ 6分 ?2 ·(2)解: 1?x2?1? ?1????x?2?2x?4x?1x2?1?? ···························································································· 1分 x?22x?4?x?12(x?2)? ···················································································· 3分 x?2(x?1)(x?1)2 ········································································································ 4分 x?121当x?3时,原式?············································· 6分 ? ·3?12① ?(3)解:①众数为9,中位数为8 ······································· 2分 ②平均分?25% 5?10?8?9?4?8?3?7?8.75分 ······················ 4分 2024% 40% 第15-3题图 ③圆心角度数?(1?25%?40%?20%)?360?54 ··············· 6分 16.(6分) 顶点a 边数b 区域c 第1排从左至右为:12 18 7 ··············································· 1分 第3排从左至右为:20 30 11 ············································· 2分 第4排从左至右为:24 36 13 ············································· 3分 学 海 无 涯 规律:b?a?c?1或各种正确的等式 ································································· 6分 17.(6分) 四、(18题6分、19题6分,共12分) 18.(6分) (1)添加条件:BE?DF或?BAE??DAF或?BAF??DAE等 ······················ 1分 (2)证明: 四边形ABCD是菱形 ································································································· 2分 ?AB?AD ······································································ 3分 ?B??D ·A 在△ABE和△ADF中 C 第18题图 ······················································································ 5分 ?△ABE≌△ADF ·································································································· 6分 ?AE?AF ·注:其它合理的推理参照评分. 19.(6分) (1) 1 2 3 1 (2,1) 2 3 (2,3) (1,2) (1,3) ?AB?AD???B??D ?BE?DF?B F D (3,1) (3,2) 开始 1 2 3 1 2 3 1 3 2 ?能组成的两位数有21,31,12,32,13,23 ············································································· 3分 能组成的两位数有21,31,12,32,13,23 ························································· 5分 (2)P(学号12)?1. ························································································ 6分 6学 海 无 涯 五、(20题8分、21题8分,共16分) 20.(8分) (1)设A,B两处粮仓原有存粮x,y吨 ?x?y?450?根据题意得:??································································· 2分 3??2? ·1?x?1?y????5?5?????解得:??x?270 ?y?18035答:A,B两处粮仓原有存粮分别是270,180吨. ··············································· 3分 (2)A粮仓支援C粮仓的粮食是?270?162(吨) 2B粮仓支援C粮仓的粮食是?180?72(吨) 5······································ 4分 A,B两粮仓合计共支援C粮仓粮食为162?72?234吨 ·234?200 ?此次调拨能满足C粮仓需求. ········································································ 5分 (3)根据题意知: ?A?26,AB?180千米,?ACB?90 ························································· 6分 在Rt△ABC中, BC,?BC?ABsin?BAC?180?0.44?79.2 ······························ 7分 AB此车最多可行驶4?35?140(千米)?2?79.2 ?小王途中须加油才能安全回到B地. ······························································· 8分 sin?BAC?(若用时间比较,可参考评分) 21.(8分) ①由题意得y与x之间的函数关系式y?x?30(1≤x≤160,且x整数) ············· 2分 (不写取值范围不扣分) ②由题意得P与x之间的函数关系式P?(x?30)(1000?3x)??3x?910x?30000 ·· 4分 ③由题意得W?(?3x?910x?30000)?30?1000?310x 22??3(x?100)2?30000 ·················································································· 6分 ?当?100时,W最大?30000 ·········································································· 7分 100天?160天 ?存放100天后出售这批野生菌可获得最大利润30000元. ···································· 8分 (用抛物线的顶点坐标公式求最值可参照给分) 六、(22题3分、23题3分,共6分) 学 海 无 涯 22.(3分) 83cm2 43cm ······················································································ 3分 23.(3分)7或8 ··························································································· 3分 七、(24小题5分,25小题9分,共14分) 24.(5分) (1)写出类似例的文字描述 ············································································· 2分 当a?0?a?a2??0当a?0 ····················································································· 4分 ??a当a?0?(2)a?a ······························································································ 5分 25.(9分) (1)连接DF 2CD是圆直径,??CFD?90,即DF?BC ?ACB?90,?DF∥AC. ······································································ 1分 ······················ 2分 ??BDF??A.在O中?BDF??GEF,??GEF??A. ·(2)D是Rt△ABC斜边AB的中点,?DC?DA,??DCA??A, 又由(1)知?GEF??A,??DCA??GEF. 又?OME??EMC,?············································· 3分 △OME与△EMC相似 ·OMME2 ?ME?OM?MC ·································································· 4分 ??MEMC又ME?46,?OM?MC?(46)2?96 ································ 5分 MD:CO?2:5,?OM:MD?3:2,?OM:MC?3:8·设OM?3x,MC?8x,?3x?8x?96,?x?2 ?直径CD?10x?20. ················································································· 6分 (3)Rt△ABC斜边上中线CD?20,?AB?40 BC在Rt△ABC中cos?B?0.6?,?BC?24,?AC?32 ·························· 7分 ABB 设直线AB的函数表达式为y?kx?b, G 0),B(0,24) 根据题意得A(32,3??0?k?b?24?k?? 解得???4 32?k?b?0???b?24F M O C E D A 3?直线AB的函数解析式为y??x?24(其他方法参照评分) ····························· 9分 4 第25题图
四川省凉山州初中毕业、高中阶段招生统一考试试卷及参考答案.doc
