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www.VNMATH.com TRNG THPT CHUYN VNH PHC K THI TH I HC LN 1 NM HC 2013-2014
Mn: Ton 12. Khi A, A1, B.
Thi gian lm bi: 180 pht (Khng k thi gian giao )
A.PHN CHUNG CHO TT C TH SINH (8,0 im)Cu 1. (2,5 im). Chohms 3 2y mx ( 2m 1)x m 1 ( Cm ) .
1) Khostsbinthinvvthcahmskhi m 1 .2) Tmttcccgitrcathams m 0 saochotiptuyncathtigiaoimcanvi
trctungtovihaitrctomttamgiccdintchbng4.Cu 2. (1,25 im) . Giiphngtrnh:
3 33 1 3 cos 2x 3 1 3 sin 2x 8 sin x cos x 3 sin x cos x 3 3 3 .
Cu 3. (1,25 im) .Giihphngtrnh: 2 1 xx y
x y x, y
5y 1 x y 1
.
Cu 4. (1,0 im). Tnhgiihn:3 4
x 2
x 6 7x 2L lim
x 2
Cu 5. (1,0 im). Chohnhchp S.ABCD cylhnhvungvicnh 2a ,mtbn SAB nm
trongmtphngvunggcvimtphng ABCD v SA a ,SB a 3 .Hytnhthtchcahnhchp S.ABCD vkhongcchgiahaingthng AC v SB theo a .Cu 6. (1,0 im).Xtccsthcdng , ,a b c thomn 7ab bc ca abc .Tmgitrnhnht
cabiuthc:4 5 6
2 2 2
8 1 108 1 16 1a b cP
a b c
B. PHN RING(2,0 im). Th sinh ch c lm mt trong hai phn (phn 1 hoc 2)1.Theo chng trnh Chun Cu 7A. (1,0 im).TrongmtphngvihtrctoOxy ,chohnhbnhhnh ABCD c A 2;0
,B 3;0 vdintchbng 4 .Bitrnggiaoimcahaingcho AC v BD nmtrnngthng y x ,hytmtocaccnh C,D.
Cu 8A (1,0im).Tnhtng: 2 1 2 2 2 3 2 20131 2013 2013 2013 2013S 1 .C 2 .C 3 .C 2013 .C
2.Theo chng trnh nng cao. Cu 7B (2,0 im).TrongmtphngvihtaOxychotamgic ABC cngcaokt B vphngictrongkt A lnltcphngtrnh: 3x 4 y 10 0 v x y 1 0 .Bitrngim
M 0;2 nmtrnngthng AB v MC 2 ,tmtoccnhcatamgic.
Cu 8 B (1,0 im). Tnhtng:0 1 2 20132013 2013 2013 2013
2
C C C CS
1 2 3 2014
----------HT----------
Th sinh khng c s dng ti liu. Cn b coi thi khng gii thch g thm.
H v tn th sinh:; S bo danh:
chnh thc(thigm01trang)
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SGD-TVNHPHC THI KHSCL LN I NM HC 2013 2014 TRNGTHPTCHUYN HNG DN CHM TON 12 A,B,A1 Hng dn chung.
- Mimtbitoncthcnhiucchgii,trongHDCnychtrnhbyslcmtcch
gii.Hcsinhcthgiitheonhiucchkhcnhau,nuvchoktqung,gimkho
vnchoimtiacaphn.
- Cu(Hnhhckhnggian),nuhcsinhvhnhsaihockhngvhnhchnhcabiton,
thkhngchoim;cu(Hnhhcgiitch)khngnhtthitphivhnh.
- imtonbichmchititn0.25,khnglmtrn.
- HDCnyc04trang.
Cu Ni dung trnh by im
1. Khi 31:y x 3 2m x
+TX:
+Sbinthin: 23 3 3 1 1 , 0 1y x x x y x 0.25
0 1 1y x x suyrahmsngbintrncckhong ; 1 , 1; ;
0 1 1y x suyrahmsnghchbintrn 1;1 .
Hmstcciti 1, 1 4;cdx y y hmstcctiuti 1, 1 0.ctx y y 0.25
3 3
2 3 2 3
3 2 3 2lim lim 1 ; lim lim 1x x x x
y x y xx x x x
y
y'
x
0
4 +
++
+
00
1 1
0.25
+th
0. 50
1
2. th 3( ) : (2 1) 1mC y mx m x m cttrctungti (0; 1)M m . 0.25
- GiaoOx: 2;0 , 1;0
;
- GiaoOy: 0;2
;
- imun: 0;2I
suyra
thtxngqua 0;2I
4
2
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23 (2 1) y 0 2 1y mx m m T,khi 0,m tiptuyn mt ca ( )mC tiMcphngtrnh
(2 1) 1y m x m 0.25
Do ( )mt tovihaitrctamttamgiccdintchbng4nntach
2
11
22
11 8 1 8 2 1
2 1
mm
mm m m
m
0. 50
Giih,thuc 7 56m v 9 72. ichiuiukinvktlun 0.25
+rng 2 3sin 2 1 (sin cos ) ;sin 3 4sin 3sinx x x x x x v 3cos3 4 cos 3cosx x x
nnphngtrnhcvitvdng
(sin cos )( 3 sin 3 cos 3 ) 0x x x x
0. 5
+Giiphngtrnh sin cos 0x x tachnghim ,4
x k k
0.25
+Giiphngtrnh 3 sin 3 cos3 0x x tachnghim ,6
x
0.25
2
+Ktlunnghim 0.25
iukin1
0,5
x y
Tphngtrnhthnhtcahsuyrahoc 2y x hoc 1xy 0.25
+Nu 1xy th 0x y vphngtrnhthhaitrthnh1
5 1 1yy
Phngtrnhnytngngvi 22
15 1
2 1 2 5
yy y y
y y y
Do 1y nnhphngtrnhnyvnghim.
0. 5
3
+Nu 2 ,y x thayvophngtrnhthhai,tac 25 1 1 | |x x x .
Giiphngtrnh,c ( ; ) (1;1), ( 2;2), ( 7 41;7 41)x y
Ktlunnghim
0.5
3 4 3 4x 2 x 2
x 6 2 7 x 2 2 x 6 2 7 x 2 2L lim lim
x 2 x 2 x 2
0.25
4x 2 2 33x 6 8 7 x 2 16
L limx 2 7x 2 2 7x 2 4x 2 x 6 2 x 6 4
0.25
4
4x 2 2 331 7 1 7 13
L lim12 32 967x 2 2 7x 2 4x 6 2 x 6 4
0.5
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M
OB
A
C
D
S
H
+Tgithitsuyratamgic SAB vungtiSv3
2
aSH (HlhnhchiucaA trnAB).
T,do SAB ABCD nn3
.
1 2
3 3S ABCD
aV SH AB AD (.v.t.t)
0.25
5
+DoABCDlhnhvung,nn1
2ABC ADC ABCDS S S suyra
3
. .
1
2 3S ABC S ABCD
aV V (.v.t.t)
M .1
; sin ;6
S ABCV AC SB d AC SB AC SB nn
32 3;
sin ;
ad AC SB
AC SB AC SB
0.25
+GiO,Mtheothtltrungim , .AC SD Khi ; ;AC SB OA OM
p dng nh l c-sin cho tam gic AOM tnh c 6
cos4
AOM suy ra
10
sin ; sin4
AC SB AOM
0.25
Vy 2
;5
ad AC SB (.v..d) 0.25
Ch : Vibitonny(phntnhkhongcch),cnhiucchgii,chnghnhcsinhcthsdngvect,tahaydngonvunggcchung.Nucchgiingvchoktqung,gimkhovnchoimtiacaphn.CchgiitrongbitonnysdngktqucaBitp6(tr.26)SGKHnhhc12(CCT)
6 Vitligithitvdng
1 1 17
a b c 0.25
pdngbtngthcAM-GM,tac
2
2
3 3
2 2 2
4
2 2
1 18 4," "
2 2
2 2 2 154 54 10," "
9 9 9 3
1 1 116 3," "
4 4 2
A a aa
B b b bb b b
C c cc c
0.5
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T,vi
2 2 2
1 1 1
2 3 2D
a b c ,theobtngthcCauchyBunhiacopsky-Schwarz,th
21 1 1 1 1 1
4 10 3 24," " ,2 3 2 2 3
P A B C D a c ba b c
KL
0.25
GiIlgiaoimhaingchocahnhbnhhnh,thth ;I a a vialsthcno.
Suyra 2 2;2 , 2 3;2 .C a a D a a 0.25
T,dodintchcahnhbnhhnhbng4nn 2 4 2.a a 0.25
Vi 2 : 2;4 , 1;4a C D ;vi 2 : 6; 4 , 7; 4a C D 0.25
7a
Ktlun 0.25
Tnhtng: 2 1 2 2 2 3 2 20131 2013 2013 2013 2013S 1 .C 2 .C 3 .C 2013 .C
Shngtngqutcatngl 2 k kk 2013 2013a k C k. k 1 1 C k 1,2,...,2013 0.25
k kk 2013 2013
2013! 2013!a k. k 1 C kC k. k 1 k. k 1,2,...,2013
k ! 2013 k ! k ! 2013 k !
0.25
k 2 k 1k 2011 2012a 2012 2013C 2013C k 1,2,...,2013
0.25
8a
0 1 2011 0 1 20121 2011 2011 2011 2012 2012 2012S 2012 2013 C C C 2013 C C C
2011 2012 2011 2012 20111S 2012 2013 1 1 2013 1 1 2012 2013 2 2013 2 2013 2014 2
0.25
: 3 4 10 0, : 1 0b ah x y x y
+Do 0;2M AB nnim 1;1N ixngviMqua a nmtrn .AC 0.25
+SuyraAlgiaoimcangthngdquaN,vunggcvi bh vngthng .a T
4;5 .A 0.25
+BlgiaoimcangthngAMvi .bh T1
3;4
B
0.25
7b
+Do 2MC nn C lgiaoimcangtrntmMbnknh 2 vingthngd.
Suyra 1;1C hoc33 31
;25 25
C
0.25
Tnhtng:0 1 2 20132013 2013 2013 2013
2
C C C CS
1 2 3 2014
Shngtngqutcatnglk2013
k
Ca k 0,1,2,...,2013
k 1
0.25
k2013
k
C 2013! 1 2014!a k 0,1,2,...,2013
k 1 k 1 k ! 2013 k ! 2014 k 1 ! 2013 k !
0.25
Vytack 12014
k
Ca k 0,1,2,...,2013
2014
0.25
8b
2014
20141 2 2014 02 2014 2014 2014 2014
1 1 2 1S C C C 1 1 C
2014 2014 2014
0.25
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