Đề thi và đáp án học sinh giỏi cấp tỉnh 2014 2015

Gqi Qr vd Qz lAn luqt li hinh chi6u vudng g6c cria Pr, Pz l6n dulng thing OrOz.. Dulng theng AQr cdt Or tAi ili6m thf hai M1, Dulng thing AQ2 cit Oz tai diem thri hai M2.. Chimg minh rin

so GrAo DUC vA nAo rAo rAv NII.IH

xY rnr cHeN rrec sINH ctor Lop 12 THpr voNG rixn

NAna Hoc zot4 - 2ors

NSi,y thit 24 th6ng 9 nf,m 2014

MOn: TOAN ru6i thi th* nh6t

Thli gian: 180 phft (khong k6 thdi gian giao dA)

of cnixn rrnlc

pi tnt gim c6 0I trang, thi sinh khdng phdi chdp di vdo giAy thi)

Bii 1 6 aiam)

Cho c6c s6 duong x,y, zthoi mdn tli6u kiQn x + y * z=1.

Chimg minh ,ing e - , L- * -=-l- + -;-]- < 3

3xz +y +z 3y' +z+x 3z' + x + y

Beri 2 6 aieml

Cho hdm siS f thoe m6n di6u ki0n f(x) +2f (xy)= f(x +Zxy),Vx e i , Vy e i

Chimgminhreng f(x+y)=f(x)+f(y),Vxe 1 ,Vye i

BAri 3 6 arcm1

Cho hai dudng trdn (O1), (O) cilt nhau tpi hai tti€m A, B vi PrP2 h mgt ti6p tuy6n chung cira hai ttuimg trdn d6 (P1 thuQc (Or), Pz thuQc (Oz)) Gqi Qr vd Qz lAn luqt li hinh

chi6u vudng g6c cria Pr, Pz l6n dulng thing OrOz Dulng theng AQr cdt (Or) tAi ili6m thf hai M1, Dulng thing AQ2 cit (Oz) tai diem thri hai M2 Chimg minh reng ba cli6m M1, M2, B thing hang.

Bifi 4 6 aiaml

BCn trong hinh vudng c6 diQn tich bAng 6, d[t ba da gi6c c6 diQn tich cung b[ng 3.

Chimg minh ring vdi ba da gi6c dE d{t trong hinh vu6ng, ludn tim dugc hai da gi6c mi

di€n tfch phin chung cria chring kh6ng nh6 hon l.

.{

- HET

-so GIAo Drrc vADAo rAo rAyNIi\H

xi, rnr cHeN Hec srNH cror Lop tz rHpr voNG riNn

NAvr Hgc zot4 -zots

i\gny thi: 25 thfng 9 nIm 2AL4

Mdn thi: TOAX -Budi thi thfr hai

Thbi gian: 180 phrit (khdng kA thdi gian giao dA)

DE CHINHTHTIC

@A SOm cd 0l trang, thi sinh kh\ng phai chdp di vdo gidy tht)

Bni 1 (5 diAm)

Giai h0 phuo-ng trinh

Bei 2 (5 dihm)

Cho day sO (",) th6a mdn:

Tim limxn

Bii 3 (5 diem)

' *n= n2xn+r * (+" * Z)XnXn*, Vn ) 1, n e N

Chring minh ring vdi n nguy6n ducrng vi n > 3 thi phuong trinh 4xn + (x+1)2 =yz

kh6ng c6 nghiQm nguy6n duong (x; y).

Bli 4 6 adml

Cho tam gi6c ABC c6 ba g6c A, B, C deu nhgn vd AB > AC Ggi D, E, F hn luqt ld chdn c6c ducrng cao cta tam gifucABC vE ttr A, B, C xuiSng c4nh di5i diQn.Ducrng thlng

EF cfu BC t4i P, dudng thang qua D vd song song vdi ef c6t c6c dudng tfrang AC va Ae

tuong img tpi Q vn R Gqi M ld trung ei6m cpnh BC Chr?ng minh ring b6n Oi6* P, Q, R,

M ctng thuQc mQt dudng trdn

I

H6t

I"'(3y+s 5)=64

L"V (y'+ 3y + 3) = 12 +5 lx

(l

J*'=5

Lt" +r)

{/ri,

SO GIAO DUC VA DAO TAO TAY NINH

xi Tm CHQN HQC SINH cror LOP 12 THPT voNG riNn

NAvt Hec 2or4 -zors

TTUONG oAN cnAu rm vrON roAN - su6r rnr rrrtl NnAr

trang I

Bili 2 = f(x +2xY)'Vx e lR'' VY

Chrfrng minh rlng f(x + y) = f(x) + f(y), Vx e R, Vy e IR '

R

€

= f(2x)

Vdi x*0,dflt x-u; y= v

thi 2u f(u + v) - f(u) + f(v), Vu * 0, Vv e R (1)

V6i x =0 thi f(x+y) =f(y)=f(0)+f(y) =f(x)+f(v), Vv e]R' (2)

i;(1) vd (2) suy ra: f(x + y) - f(x) + f(y), Vx e R, Vy e IR

Bili 3

Q diam)

Cho hai tlulng trdn (O1), (Oz) cit nhau t4i hai Oi6m A, B vi PlP2li mQt fi6p tuy6n chung cira hai dudng trdn d6 (P1 thuQc (Or), Pz thuQc (Or).Ggi Qr vi Qz

fa" foqt n trintr chi6u vu6ng g6c cria Pr, Pz l6n tlulng tneng OrOz.Dudng

tning AQr cit (Or) t+i aiOr" tfr1i hai M1, Dulngtneng AQz cit (O2) tli aiam

thrri hai M2 Chrfrng minh ring ba di6m Mr, Mz, B thing hing.

(hl)

(h2)

trang 2

1.,

(

I

trang 3

trang 4

so cIAo DUC YADAo rAo rAvNIi\H

xV rHr cHeN Hgc sINH cr6r Lop 12 rHpr voNG riNn

NAna Hec zor4 -zots

i\giy thi: 25 thfng 9 nlm 20L4

M6; thi: ToAll - Buoi thi thfr hai

Thli gian: 180 ph fit (kh6rg kA thdi gian giao ai)

DE CHINHTHTTC

@A gom cd 0I trang, thi sinh kh1ng phai chdp di vdo gidy tht)

Bei L (5 diem)

Giei h0 phuong trinh

Bili2 (5 diAm)

Cho day sO (*,) th6a mdn:

Tim limxn

Bei 3 (5 diem)

' *n = r2Xn*r + ( 4n+2)XnXn+1 Vn > 1, n e N

Chrlng minh rang vdi n nguy6n duong vd n > 3 thi phucrng trinh 4xn + (x+l)2 =y2

kh6ng c6 nghiQm nguy6n ducrng (x; y).

Bni 4 6 aidml

Cho tam girlc ABC c6 ba g6c A, B, C ddu nhgn vd AB > AC Ggi D, B, F lan luqt ld chdn c6c dudmg cao cta tam gifucABC ve tt A, B, C xuiSng c4nh e16i diQn.Duong thing

EF cat BC tai P, dudng tfring qua D vi song song v6i EF c6t c6c dudng thing AC vd AB

tuong img t4i Q vi R Gqi M ld trung eiem cpnh BC Chrlng minh ring b6n AiCm P, Q, R,

M ctng thu$c mQt dudng trdn

,

oo HCt

[*'(3v + s 5):64

L*V $'+ 3y + 3) : l2+5 lx

(1

J"'=5 Lr'+1)

SO GIAo DUC VA DAo TAo TAv NINH

KY THI CHQN HQC jsrNu cror Lop 12 THpr voNc riNu

NAM HQC 2014 -201s

HrroNG nAN csAvr rur vroN roAN - BUor rur rntruar

Bni 1

Q diem)

CACH GIAI

+ 5lx

0 phucrng trinh

= 0, h.6 ph"""g

hQ tuong duong

h

x

6

Giei

Vd'i

Dod

I.'(ry + ss) = 64

L*y (y'+ 3y + 3) = lZ

f_ 64

llv+5s-:-uoir I ' *3

[r'+3 y2 +3y - 9+51x

DAt

t-C0ngth.o;cffiipt,"ffic.iir,ethi.;6'

y3 +3y2 +6y+ 55 - 13 +3t+51

€> (y+1)3 +3(y +1)+ 51 - t3 +3t + 51 (*)

"ry." y+l =T*'

(Ho[c tii5n a6i (*) e (y+l-rl[fr+1)2 +(y+l)t *r, t ] = o di5 suy ra

y+1=t)

Vdi y=t-1 thi t3 -3t-52=0<>t-4<+x=1 Suy ray- 3.

Vfly hQ d5 cho c6 nghiQrn (1;3)

A

),thi co hQ:

x

lZv+ 55 = t3

1,0

0r5

1r0

1r0

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Bni 2

Q diem)

Dtng phuong ph6p quy n4p chring minh duoc: Xn ) 0, Vn > l, n e N

Bi6n ooi d6n (n + 1)' - d +4n+2

Xn+l xn

DAt yn - a -2 thi yr =3

xn va (r, * t)' (yn*, n2)- n'(y, +z)+ 4niz

=+ (n * l)'yn+r - n'y n

n2

*Yn+r =-=,Yn

(n+l)

(" - 1)' n'

It' (r, * l)' (n- l)'"'22 rt-

(rr*0-Ft J

\r

Jn )

n-Do d6 I _

I7

Y

./n

xn

n'

3+2n2

1r0

Cho dfry s6 (*, )

Tim lirn;n.

thda miin:

lr

J*' =5

Lt,,+r) '*n-n2Xn*r +(4n+Z) xnXr+r Vnzl, ne N

v0y Iimxn I

2

Bei 3

Q diem)

chri'ng minh ring vrfi n nguyGn duong vi n > 3 thi phuorng trinh

4x' + (x +l)2 = y2 khdng c6 nghiQm nguyOn duons i*, v) "

Gi6 st v6i n nguyCn ducmg vi n.) 3, phucmg trinh d6 cho c6 nghiQm

nguyOndu<rng (x;y)- Khi d6: 4xn = y, -(*+1)2 =(y_*_1)(V+x+t)

Vi y-x-l vd yj*+l cirngchEnho6c16;4x".hEnrren y_x_l vd

y+x+l cirngch5n

Eat y-x-l=2a thi y+x+l-2(a+x+l), suyra xn =a(a+x+l)

Do (a,a +I + 1) ; I n0n ton tai citc so nguyen u, v sao cho

a-un, a+x+1-vnrx-uv

Do n>3 n6n

uv+l = x+l = vn -un =(v_u)(vn-l *rn-2, + +.rn-l) > l+uv +u2 .

v6 lf vfly phucrng trinh dd cho kh6ng c6 nghiQm nguyEn ducrng.

trang 2

,? ^1

,'fi|)L i) / = < .t'>

f-B+

a(-

-Pd

BAi 4

(5 di€rn)

I

-l I

cho tam gif,c ABC c6 ba g6c A, B, c tldu nhgn vi AB > AC Gqi D, E, r B" luqt lir chffn cfc dud'ng cao ciia tam gi{c ABC vE tri A, B, C xuiing-cirnh tISi djgr

Pf.ls thr_ng EF c_it tiC tgi P, d'u'd'ng thirng qua D vi song song vrii EF crt cic dud'ng thrng AC vir AB tuo'ng ri.ng tqri e vn R Ggi rvr re truig di6;

c?nh BC chring minh rrng b6n tli6,r F, qln, Nr cnng thuQc mQt rludng trdn.

Gqi M la trung di6m BC

Do BEe = gFC = 900 non b6n di0m B, c, E, F cirng thuQc mQt dudrng

trdn Suy ra PB.PC = PE.PF

BOn di€m D, E, F, ivi cung thuQc duong trdn Euler cta tam gi6c ABC n€n

PE.PF = PD.PM

Do hai tarn giacAEF va ABC dong dang; QR / IEF n6n

- - -^- -^

RBC - AEF = cQR suy ratu gi6c ceBRnQi ti6p

Do d6 DQ.DR - DB.DC (2)

E[t MB=MC -a; MD-d; Mp=p

Khid6: PB=p+a; DB=a+d; pC-p-a; CD =a-d; Dp=p_d

Thay vdo (1) thi dugc: (p + a)(p - a) = (p - d)p Suy ra a2 = dp

= (a+dXa-d):6;t;

+DB.DC _DP.DM (3)

Tt (2) vA (3) suy ra: DQ.DR - DP"DM

VOy P, Q, R, M cirng thuQc mOt dudng trdn

,

HGt eooooo

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