2018年漳州市初中毕业暨高中阶段招生考试
数学参考答案及评分标准
一、选择题(共10题,每题3分,满分30分) 题号 答案 1 B 2 D 3 A 4 D 5 A 6 B 7 B 8 C 9 A 10 C 二、填空题(共6小题,每题4分,满分24分) 11.2 12.120 13.2018 14.增大 15.21 16.4
三、解答题(10大题,满分共96分) 17.解:原式=2?1?3 ··················································································· 6分 =0. ············································································································ 8分 18.解:情况一:
2121x?2x?1?x2?4x?1 ····················································· 2分 22=x?6x ······································································································ 5分 =x(x?6). ·································································································· 8分 情况二:
2121x?2x?1?x2?2x ····································································· 2分 22=x?1 ········································································································· 5分 =(x?1)(x?1). ···························································································· 8分 情况三:
2121x?4x?1?x2?2x ····································································· 2分 22=x?2x?1 ·································································································· 5分 =(x?1)2. ··································································································· 8分
A D
19.证明:四边形ABCD是等腰梯形, ?AB?DC,?B??C. ································· 4分 E为BC的中点, ?BE?EC. ·················································· 6分 B C E
(第19题) ?△ABE≌△DCE. ······································· 8分 20.(1)吉.(符合要求就给分) ······································································· 3分
(2)有多种画法,只要符合要求就给分. ··························································· 8分 C 21.(1)证明:连结OC, ································· 1分
AC?CD,?D?30°, 2 ??A??D?30° ············································ 2分
1 OA?OC, A D O B ??2??A?30°, ··········································3分
(第21题) ??1?60°,
??OCD?90°. ·························································································· 4分 ?CD是⊙O的切线. ····················································································· 5分 (2)?1?60°,
nπR60?π?3??π. ··································································· 7分 ?BC的长=180180答:BC的长为π. ························································································ 8分
y 22.(1)?1?x?3. ········································ 2分
y?x2?1
1 2(2)解:设y?x?1,则y是x的二次函数.
a?1?0,?抛物线开口向上. ··························· 3分
又
当y?0时,x?1?0,解得x1??1,x2?1. 4分
2?1 ?1 1 x ··· 6分 ?由此得抛物线y?x2?1的大致图象如图所示. ·
(第22题) 观察函数图象可知:当x??1或x?1时,y?0. ··············································· 7分
?x2?1?0的解集是:x??1或x?1. ···························································· 8分
23.(1)解法一:设甲种消毒液购买x瓶,则乙种消毒液购买(100?x)瓶. ·············· 1分 依题意,得6x?9(100?x)?780.
解得:x?40. ····························································································· 3分
. ····································································· 4分 ?100?x?100?40?60(瓶)
答:甲种消毒液购买40瓶,乙种消毒液购买60瓶. ············································· 5分 解法二:设甲种消毒液购买x瓶,乙种消毒液购买y瓶. ······································· 1分 依题意,得??x?y?100, ············································································· 3分
?6x?9y?780.解得:??x?40, ····························································································· 4分
y?60.?答:甲种消毒液购买40瓶,乙种消毒液购买60瓶. ············································· 5分 (2)设再次购买甲种消毒液y瓶,刚购买乙种消毒液2y瓶. ································· 6分 依题意,得6y?9?2y≤1200. ······································································ 8分 解得:y≤50. ···························································································· 9分 答:甲种消毒液最多再购买50瓶. ·································································· 10分
(,2)?26.(1)B(4,0),C0. ····································································· 2分
123x?x?2. ······················································································· 4分 22(2)△ABC是直角三角形. ··········································································· 5分
123证明:令y?0,则x?x?2?0.
22y??x1??1,x2?4.
?A(?1,0). ································································································· 6分
解法一:?AB?5,AC?5,BC?25. ······················································ 7分
?AC2?BC2?5?20?25?AB2.
?△ABC是直角三角形. ················································································ 8分
COAO1,CO?2,BO?4,??? 解法二:AO?1BOOC2?AOC??COB?90°, ?△AOC∽△COB. ···················································································· 7分 ??ACO??CBO.
?CBO??BCO?90°,
??ACO??BCO?90°.即?ACB?90°. ?△ABC是直角三角形. ················································································ 8分
(3)能.①当矩形两个顶点在AB上时,如图1,CO交GF于H.
GF∥AB,
?△CGF∽△CAB. GFCH??. ················································ 9分 ABCO2解法一:设GF?x,则DE?x,CH?x,
52DG?OH?OC?CH?2?x.
5y D A O F G H C 图1
E B x 2?2??S矩形DEFG?x·?2?x???x2?2x
5?5?2?5?5=??x???. ····················································································· 10分
5?2?25时,S最大. 25?DE?,DG?1.
2△ADG∽△AOC,
当x?2
?ADDG11?,?AD?,?OD?,OE?2. AOOC22?1?0). ··············································································· 11分 ?D??,0?,E(2,?2?10?5x. 210?5x555?S矩形DEFG?x·??x2?5x??(x?1)2?. ···································· 10分
2222?当x?1时,S最大.
5?DG?1,DE?.
2△ADG∽△AOC, ADDG11??,?AD?,?OD?,OE?2. AOOC22解法二:设DG?x,则DE?GF??1?0). ··············································································· 11分 ?D??,0?,E(2,?2?y ②当矩形一个顶点在AB上时,F与C重合,如图2, DG∥BC,
?△AGD∽△ACB. GDAG??. BCAF解法一:设GD?x,?AC?5,BC?25,
D O A G C 图2
B G x ?GF?AC?AG?5?x. 2x?1?·?5????x2?5x ?S矩形DEFG?x2?2?1x?5=?2??25?.···················································································· 12分 2当x?5时,S最大.
?GD?5,AG?53522,?AD?AG?GD?.?OD?
222?3?································································································ 13分 ?D?,0? ·2??解法二:设
DE?,
AC?5,
BC?25,?GC?x,
AG?5?x.?GD?25?2x.
?S矩形DEFG?x·25?2x??2x2?25x
???5?5=?2?x?····················································································· 12分 ? ·???2?2?2?当x?5时,S最大, 253522.?AD?AG?GD?.?OD?.
222?GD?5,AG??3?································································································ 13分 0? ·?D?,2??综上所述:当矩形两个顶点在AB上时,坐标分别为??,(2,0); 0?,
?1??2?当矩形一个顶点在AB上时,坐标为?,······················································ 14分 0? ·
?3??2?