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江苏数学高考命题的 研究和预测. 主讲 吴 锷 [email protected] 2012.5.21. 1 、 2011 年江苏数学高考的特点 ① 重视对基础知识 、 基本技能和基本思想方法的考查 。 ② 解答题中容易题考查教材最基础的知识和最基本的数学方法和技能,难题的比例减小,难度降低,得分率上升 。 ③ 重点内容 ,重点知识 在解答中 均衡 考查。 2 、 2011 年高考数学试卷得到社会和管理部门的广泛认可. 填空题着重考查基础知识和基本技能,同时体现对数学能力不同层次的要求。. - PowerPoint PPT Presentation
Citation preview
1201122011
160
14
58
911
1214
15
16
17
18
19
20
18
16
10.21
2.02
11.2
11.18
9.2
7.39
3.18
2.2
91.2
0.9
0.8
0.68
0.13
0.8
0.8
0.66
0.47
0.2
0.14
0.57
10734103
1458911 1214
151617181920
2011
Sheet1
2008()2009()2010()2011()
1
2
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4
5
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21(B)
21(C)
22
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Sheet2
2008200920102011
451151511410
()81410391015511141528111220
()17203020162016171930
()15451013107910
()151415141723241514
()5131025105
()1514
()10514585135
()191617232419162016
()115125
()1916
()81210
()16222416141614162224
()9595
()18161816
()12513565
()221018161816
()2610561034105610
()2210
75757545
35152535
23102310
22180221802218022180
Sheet3
20082009201020112008200920102011
14.50%14.50%14.50%29%52.70%52.70%52.70%106%
418%418%418%627%4022%3117%3117%5028%
29%29%418%313.60%1911%1911%3419%2413.30%
29%14.50%14.50%14.50%106%52.70%147.77%52.70%
29%313.60%29%29%2112%2916.10%2112%2112%
14.50%14.50%14.50%00%52.70%168.88%52.70%00%
29%313.60%14.50%29%2413%2413.30%147.77%2413%
313.60%313.60%313.60%14.50%2614.40%3117.00%2614.40%168.88%
218%29%313.60%29%106%106%2011.10%106%
313.60%29%29%313.60%2011.10%106%106%2011.10%
22222222180180180180
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2009
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2011
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0.0450.180.090.0450.1360.0450.1360.1360.090.09
0.0450.180.180.0450.090.0450.0450.1360.1360.09
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2009
2010
2011
540191021524261020
0.0270.220.1050.0550.11660.0270.1330.1440.060.111
531195291624311010
0.0270.1720.110.0270.1610.08880.1330.170.060.06
531341421514262010
0.0270.170.18880.07770.11660.0270.07770.1440.1110.055
105024521024161020
0.0550.27770.1330.0270.1200.1330.08880.060.111
12
2012: ()
1
2
3Ceq \f(x2,4)eq \f(y2,m)1(m0)2________
4
n
_____
5
EMBED Equation.DSMT4
lm
lm lm
lm
_1234567907.unknown
_1397643359.unknown
_1397881880.unknown
_1397881945.unknown
_1397881969.unknown
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_1234567906.unknown
_1234567904.unknown
_1234567901.unknown
_1234567902.unknown
_1234567899.unknown
15
2abcA{12345}aa5________
3f(x)sin xxRg(x)f(x)eq \b\lc\(\rc\)(\a\vs4\al\co1(\f(,4)0))[0,2]f(x)g(x)x
4
5
1
________
6ABCEFACAB
t
t
7
.
3
9
7
3
3
2
1
0
8
9
9
8
_1396120073.unknown
_1397900380.unknown
_1397900633.unknown
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1
EMBED Equation.DSMT4
2, A, B, CO, COBAO D
mn
BAD
3
m1
f(x)
f(0)=0x=0
01
_1397737262.unknown
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_1234567979.unknown
2012
1ABCABCabc
1A
2
BCAM
1
A
2AMBC
ABM
ACM
2
1
2
3a(sinx,1)b(1cosx)f(x)abf(x)f(x)
1F(x)f(x)f(x)f 2(x)
2f(x)2f(x)eq \f(1sin2x,cos2xsinxcosx)
4 ABCABCabc
1A
2
BC
_1397978442.unknown
_1397978814.unknown
_1397979209.unknown
_1397979520.unknown
_1397979778.unknown
_1397979907.unknown
_1397979944.unknown
_1397979815.unknown
_1397979763.unknown
_1397979313.unknown
_1397979349.unknown
_1397979239.unknown
_1397978923.unknown
_1397979024.unknown
_1397978869.unknown
_1397978552.unknown
_1397978672.unknown
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_1397978590.unknown
_1397978538.unknown
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_1397978502.unknown
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1ABDEABCACBCAC=BCABDEBDAEBDBAAE=2BDOMCEAB
1OD//ABC
2EMNONABDEN
2PABCDABCDBAD60QAD
1PAPDPQBPAD
2MPCPMtPCtPAMQB
3ABCDAB2BC EQ \r(,2) ECDBEACMCBEBE
ABDE
1BE
2F
DF
3E
4
HYPERLINK "http://www.shulihua.net"
EMBED Equation.3
.
1
2
3
E
AE
BE
CE
OE
ME
DE
A
B
C
D
F
A
B
C
D
F
E
_1234567985.unknown
_1234567989.unknown
_1234567994.unknown
_1234567996.unknown
_1392112740.unknown
_1392112793.unknown
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_1392112773.unknown
_1234567997.unknown
_1234567995.unknown
_1234567991.unknown
_1234567993.unknown
_1234567990.unknown
_1234567987.unknown
_1234567988.unknown
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_1234567984.unknown
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_1234567978.unknown
1A4520
B20A
A
C
1v/
2A20E
1
20
/
21ABC
BCAEF
FE
2ABC
AB2BC1
1ABBCCADEFEFAB,
,DEFDEF SDEF
2ABBCCADEFDEFDEFDEF
3ABAaB4aACABC1 kmACDBDDBDC
S
1S
2DAS
41012.7
xR(x)
R(x)eq \b\lc\{\rc\ (\a\vs4\al\co1(10.8\f(1,30)x2 (010) ))
(1)W()x()
(2)()
_1397883463.unknown
_1397883835.unknown
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1
ABFC1
1PC1APF
APOP
2MNC1C2yBNBM2MN
1
APF
APOP
2BMkBN2k
BM
BN
MN
MN
MN
ADC2xB
1AC2CBC
2MNC1C2yDNDM4MN
1FC1ACDF
2DMN
3MDNMN
4ACBC
5e
2
PPAPB
1
OPF2
2
3A(1,2)l1x2y70B(2,0)lAMNQMNll1P
(1)A
(2)MN2eq \r(19)l
(3)eq \o(BQ,\s\up6())eq \o(BP,\s\up6())
4C
Fx2y0
1
2MCxABMAMB
5
1
2
PQPQ
EMBED Equation.DSMT4
EMBED Equation.DSMT4
EMBED Equation.DSMT4
EMBED Equation.DSMT4
EMBED Equation.3
EMBED Equation.3
EMBED Equation.DSMT4
EMBED Equation.DSMT4
EMBED Equation.DSMT4
EMBED Equation.3 EMBED Equation.3
_1386323164.unknown
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1
1
2
m
t
1
2
m
*
1
*
2
1
2
3
1
2
_1394630265.unknown
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1
n
1
2
S13
n
1
2
2
S13
k
2
.
1
2
.
3
1
2
3
4
.
1
2
1
3
(
1
2
)
.
5P1(x1y1)P2(x2y2)Pn(xnyn)nPny3xeq \f(13,4)Pneq \f(5,2)1{xn}
(1)Pn
(2)c1c2c3cnxncnPnDn(0n21)cnDnkn
eq \f(1,k1k2)eq \f(1,k2k3)eq \f(1,kn1kn)
(3)Seq \b\lc\{\rc\}(\a\vs4\al\co1(x|x2xnnN*))T{y|y4ynnN*}{an}anSTa1ST265