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e) dasaSveb mniSvnelobaTa simravles gansazRvravs sistema:Z][]\2x–6≥03–x≥0, x=3, romelic gantolebas ar akmayofilebs.v) dasaSveb mniSvnelobaTa simravlea [4; +∞). x-is am mniSvnelobebisTvis √x ≥2,√ x+5 ≥3; marcxena mxare ki naklebia 5-ze.am savarjiSoebze muSaobisas moswvales uviTardeba kvlevisa da analizis unari,alternatiuli gzebidan racionaluri gzis moZiebis unari. garkveulwilad, am tipisamocanebiT jamdeba mravali sakiTxis codna _ masSi integrirebulia algebris,analizisa da geometriis sakiTxebi.12 a) mocemuli gantolebis tolfasi gantolebaa:|x+4|=(x–4)(x+4),saidanacZ][]\x+4≥0x+4=(x-4)(x+4)anZ][]\x+4
MA+MB=5√2 , TviT AB monakveTis sigrZec _ AB=5√2 , amrigad M∈AB.Tu AB wrfis gantolebaa y=kx+b, maSinZ][]\2=k⋅0+b–3=–5k+b, saidanac b=2, k=1.y=x+2 wrfis abscisaTa RerZTan gadakveTis wertilia (–2;0). pasuxi: x=–2.II xerxi. aviyvanoT mocemuli gantoleba kvadratSi: √x 2 +10x+34 2 =(5√2 –√x 2 +4) 2 .gamartivebis Semdeg gantoleba CavweroT ase: √ 2(x 2 +4) =2–x,misi kvadratSi ayvaniT miviRebT: x=–2.b) mocemul tolobas SeiZleba aseTi geometriuli warmodgena davukavSiroT:I da III sakoordinato kuTxeebis biseqtrisaze (y=x wrfeze) mdebare M wertilidanA(1;6) da B(4;2) wertilebamde manZilebis jami 5-ia. vipovoT yvela aseTi wertili.Tu AB wrfis gantolebaa y=kx+b, maSinZ][]\6=k+b2=4k+b, saidanac k= – 4 3 , b=22 3 .radgan AB=5, MA+MB=5, amitom M aris AB da y=x wrfeebis gadakveTis wertili:Z][]\y=x,y= – 4 3 x+22 3 , saidanac x=22 7 .II xerxi. mocemuli gantoleba aviyvanoT kvadratSi.√2x 2 –14x+37 2 =(5–√2x 2 –12x+20 ) 2 ,5√2x 2 –12x+20 =x+4,kvlav kvadratSi ayvaniT miiReba: (7x–22) 2 =0, x= 22 7 .x-is es mniSvneloba mocemuli gantolebis fesvia.g) utoloba ase gadavweroT:√(x–3) 2 +1+√(x–2) 2 +4 ≤√10 .am utolobas SeiZleba aseTi geometriuli warmodgena davukavSiroT: x RerZzemdebare M(x;0) wertilidan A(3;1) da B(2;–2) wertilebamde manZilebis jami ar aRemateba√10 -s. MA+M≤AB, vpoulobT AB monakveTis sigrZes _ AB=√10 . am ori pirobidangamomdinareobs: MA+MB≤√10 . maSin M Zevs AB monakveTze _ M aris AB wrfisa dax RerZis gadakveTis wertili. AB wrfis gantolebaa y=3x-8. es wrfe x RerZs kveTswertilSi, romlis koordinatebia:y=0, x= 8 3 .II xerxi. √(x–2) 2 +4≤√10 –√(x–3) 2 +1 , (*)fesvqveSa gamosaxulebebi nebismieri x-isTvis dadebiTia. ganvixilavT x-is immniSvnelobebs, romlebisTvisac √10 ≥ √x 2 –6x+10, anu x 2 –6x≤0, x∈[0;6].(*) utolobis kvadratSi ayvaniT miviRebTx 2 –4x+8≤10–2√10(x 2 –6x+10)√10(x 2 –6x+10)≤6–x, am utolobis orive mxare arauaryofiTia (gavixsenoT, rom ganixilebax∈[0;6]). kvadratSi ayvaniT miviRebT: (3x-8) 2 ≤0saidanac x= 8 3 . cxadia, 8 3 ∈[0;6].pasuxi: 8 3 .61
Page 1:
guram gogiSvili, Teimuraz vefxvaZei
Page 7 and 8:
Sesavaliwigni Seicavs meTodikur rek
Page 9: iuli faqtebis, terminebis warmoSobi
Page 12 and 13: მიმართულება:
Page 14 and 15: Sinaarsisa da miznebis rukaTemebis
Page 16 and 17: geometriuli figurebi.veqtorebi sivr
Page 19 and 20: Sefasebis sistemas da gakveTilebis
Page 21: jgufuri muSaobisTvis amocanebi SeiZ
Page 24 and 25: • 10 ქულა უნდა
Page 26 and 27: SevTavazoT moswavleebs A da B simra
Page 28 and 29: yuradRebiT gavarCioT me-4 magaliTi
Page 30 and 31: sasurvelia moswavleebs SeaxsenoT fo
Page 32 and 33: sanimuSo gakveTili #5aqtivoba: xdom
Page 35 and 36: sadac I igivuri funqciaa. misi gana
Page 37: mniSvnelovania kavSiri veqtorebze m
Page 41 and 42: d) mocemuli utoloba tolfasia x(x+5)
Page 43 and 44: d) mocemulis tolfasi utolobaa:2x+3x
Page 45 and 46: pasuxi: (-∞; -3)∪(3;+ ∞).|x|
Page 47 and 48: pirobiT, rom arSiis farTobi ar iyos
Page 49 and 50: 15 a) mocemulis tolfasi sistemaaZ]
Page 51 and 52: Tu 0≤-a
Page 53 and 54: sinjvis xerxi. cxrilSi CavweroT yve
Page 55 and 56: 3 pirobiT, parabolis Stoebi qveviT
Page 57 and 58: SearCieT swori pasuxi:sakontrolo we
Page 59: gantolebis yvela fesvi miRebulis fe
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