00 Öx+Ö-x = 0
01
01/k∙F(kx+b)
0√2-1
0x=n, nÎZ
0p/2+2pn<x<3p/2+2pn
/cosx<0/
0pk/2, kÎZ /sinx×cosx=0/
02pn<x<p+2pn
/sinx>0/
A-b)
00a¹2πn, nÎz
00= ï=sin ï
00 қ.
{tgx>0sinx<0
002pn, nÎz
{sinx£0tgx³0
00-p/2+2pn<x<2pn
{sinx<0cosx>0
00p/2+2pn£x£p+2pn,
{sinx³0cosx£0
002pn<x<p/2+2pn,
{sinx>0cosx>0
00(2pn; p/2+2pn)
{tgx>0sinx>0
00logaxP=plogax;
loga(xy)=logax+logay;
loga (x/y)=logax-logay
000440040.. (4;4;6) (1)
000440040.. (0;0;6) (1)
00080992506141,6.
002211[0;2]
00231521220307
00254352.. -2;-1;3
0034120(-2)2+(-1,5)2=6,25
004240-10;10
0051701252,8
00550084...5x3+8x2+9x-1
01p/4+2pn<x<p/2+2pn
01000128160x≤3
0112/3
011ү қ.
01100099,1
0110001000,1
Ln4
0112=-2+3
0112424,2
01211/90
012=1/2
012(-p/2+2pn; -p/3+2pn]
È[p/3+2pn; p/2+2pn)
01202xln2
012050503
012122323
01242=-2+3
01250251916259/8.
0125180 - 1.
012542328x=6
012832086..0,5.
013263131/60.
013263131/6
01331×1/4
013400518160,0115
0145-21
01603031..30.
017400518.. 0,0147.
01822423330,
0192=7+1
022; -2
021 | π/20∫cosdx |
02-1
02=Ö
02π/2
021[-1;0)È(0;1]
021230,14
021515080.
022√2/4
Ouml;2-1
02212(-¥; -3]È[7; +¥)
022220041-2<<2
022233004[0,5;1]
02231211(-1;0]È(1;3]
022353258b5
022412p/3+2pn,
02260(12;14)
Ouml;
023(-Ö3;Ö3)
0232/3
02302223x-2y=9
02302222(x-1,5)2+(y-1)2=9,75
02303arcctg0,3+pn£
x<p/2+pn, {tgx>0,23ctgx
02306x-4y=5
0235442; -5; -1
02374345005..1
.
025045150
0251125571170,35
02514252641
0252(-∞;-1/2)
02528-4.
02531621402..(-; 5/3)
02532162
02822[0;8]
028220[0;8]
0301515 - 0,03.
030203021
030303021
03122361(-1;3)È(6;+∞)
031231y=-1
03132090200; -3
Yen;)
0326
03202p/3
033(2;3;5)
03220,35
032321(-∞;1)
03249=2
033(2; 3; 5)
033201129/40
033281026
0333710..4810/27.
03340-3
0345-25
03506010,105
035060180,105
|
|
03510337>4.
03521= 2,35.
03564-9
0361x>1
036240-3
041/√2
041II ә IV
04101751[2,5;3)
04167
0418283340
04220,7.
04221=2
0423Î(-¥;1]È[3;+¥)
04241= -2
042525521
042560(0,75;+∞)
0451345
04513-20 y=-0,4x+5
052
052/5
05=(0,5)
051-p+4p, ÎZ
05120040 /ғ.
0512003400 /ғ,
1200 /ғ.
051416012525/24
0520
0520π+2π, ÎZ;
π/3+2πn, nÎZ.
052034,5
05205200.
Yen;; 2)
05225×1/3
052233214-1/3
052261/2
0524205...2
052516(- 4; -1)
05260x>14
05260540-2
Cosx
053022
Yen;)
05328 - 2
Yen;)
05390180090225
0539273
Ouml;5
054211[-2;1)È(1;2]
055225
05555
0563525=-1,92
0564026
0566187/330
05701535=-0,3; q=0,25
05815 - 1.
05837/12
.
0602351
060235051
061411501..25.
0624/3
062518202121211,25
0625921227...3;-5/2.
063(1;4)
06322+2+6-4-12=0
064364,8
069528138=2,3
077/9
072300;7/10
0727671
07321(2/3; 0,9)
0751241210ү қ.
0751603815...7.
0752523=(-1)5/2arcsin
Ö3/3-5+5p/2
0758125480ү қ
08-0,18
08231=1,5
083354,4
08544270 ң.
10 /D...×BD/
1-1/2
12 |1+ sina|
12, 3, 4, 5
15
1(-1;0)
1(1;0) / =lnx /
1[0; +¥) Ö> -1
1[2;∞) y=√x+1/√x
-1)
14Ö3/27
Cosx)
Cosa
1cosx/2Ösinx+1
11/sinβ
Tg(1-x)
f(x)=lncos(1-x)
11+tg2x
1+tg(-x)/ctg(-x)
1g(x)=x2-1.
1(√3-1)/4 ||
| ctgβ-cosβ-1/sinβ |
1 қ.
(lgcosx=1)
.
1√-1 / -1
1)-1;1 )қ
)[-∞;0] [ 0; ∞ ]
1 / +1
1x<1,x>1 y =x/x-1
1x≥1 y=√x∙√x-1
1x³1, x¹πn, x¹n,
1≤0,≥1
1-2/2 +
1(-¥; -1] U[1; +¥)
12p |y=sin(x+1)|
P
(π+arccos(-1)=-x
11/2π (ң ұ)
11/√π (өң )
1p/4+pn, nÎZ
1p/4 ctg x=1
1p+2pn; p/2+2pk;
(1+cosx=sinx+sinxcosx)
1(pn, p/4+pn]
ctgx³1
1(-p/2+pn, p/4+pn]
½tgx£1½
1-p/2+pn<£p/4+pn
½tgx£1½
1p+2pn, cosx= -1
1-p/2+2pn£x<p/2+2pn,
½y=Öcosx/1-sinx½
1-p/2+2pn<x£p/2+2pn,
½y=Öcosx/sinx+1½
12pn, p/2+2pn
sinx+cosx+sinxcosx=1
12pn<x£p+2pn,
y=Ösinx/cosx-1
10(0;1)
10(-1;0)
10(0;1/10)
101
10-1 (√x+1≤0)
10-p/2 (arcsin(-1)+arctg0)
|
|
1015
102πn, nÎZ; π/2(4k-1),
N.
1020p (ң
ұғ)
105 (ң )
1050 2
.
105Ö2 (қғ)
.
10a-b / 10 b.
10 .
10(-∞;-1)U[0; +∞)
101/2n+1
10<-1, >1
10 xn+1=xn+10
10p/2+2pn; nÎZ
10000008606
10000150,001:1000
1000100100019.
10011=0,1,2=100
100102513∙1/3
.
1001501100
10020210
1003101
100420100002380
1005= -4-4
1005284.
100584
10065 -2970.
100811212750
.
1010(0;1)
10100,1
10103√1/2
10103π/2
, 2450
1010111222...2
Ouml;3
101020,1; 1000.
1010413.
10110205/
101129319∙4/17
1011293519∙41/60
10114551∙7/11
10128
1012010Ö3 / 3
.
1012101299-1;1
Ouml;2
Ouml;3
1012832
1013120 2
10131312.
1013701200.
10156
.
101510,5
101511120750,1
101515-1/3; 5/3
10164,8
101721115122
10172118144 2
101721181512 3
101721201680 3
15
102(-2;5)
102(x-1)2+y2=4
X-5
102(-1)2+2=4.
10212 2
Lg2
102002030016 %.
10204010230
10204351011
102068900
10210-3p/40-pn/2; nÎZ
10210ү қ.
10213111
102135210225-2,5
1021523(5a-b) (2a+3c)
1022223
Ouml;6
102251425.. -1/2; 1/2
10231(-∞;-5]È(-1;2]
10235133131,6
102425408 2
10242690
P
.
102660
10272952721900 3
10282 %.
10381
103- π/3
103p/6
1030200 2.
1030(-∞;-10]U(3;+∞)
1030485/sin480
Ouml;3
10305690
1031133113√3
10320618,9
10321321721/7
10323024/
10323514
103242=-5
10336 2079
Ouml;3
1035252060 /ғ;
80 /ғ.
103625140,04 ң .
1036403421610(b+4)/b
103862+3
1041:250
104050105
10413313
10421248,4
1045125Ö2/3p
10451040π 3
1052
10525 2
105Ö2(Ö3+1)/4
1050511/3
1050511
1050701/8
1051229503
105151516...2
105195135-Ö2/2
10529
105212
1052183 /ғ.
1052562n=10.
105265 ү
1054341/10
10570=2-1,4
105750.
10591254
1060180π
;
.
10658(5;8)U (13;+∞)
107-1/8
10712131073131/3
10731213..1/3
.
10896p 3
10803180,5
108080-1
1083119,2
10835-3
10835(1;2)
1085609 ғ.
110 Ö+1=1
11Ö5 / 5
11(1/2; 1) /1->1
11[0;1] ||+|-1|£1
11[0;1] ||+|-1|=1
11(-∞;0)U(2;+∞)
11(-∞;-1)U(-1;∞)
11(-∞;0]
11(0;1)
-
11- /
11ln(x+1)+1
11ү қ.
11-sin2α (cosα-1)(1+cosα)
|
|
11cos2α
11-sin2l
11sin2
½ (1-cosx) (1+cosx)½
11cos2l
111/sinα
|1 / tgα +sinα/1+cosα |
Sina
(1-cosa) (1+cosa)/sina
111/1-2
111/2-1 f(x)=lnÖ1-x/1+x
11-2 / (-1)2
11p/4+pn<x<p/2+pn
{sinx>-1tgx>1
11-π/2+2πn,nÎZ,2πk
1101
=1/, =1, =, =0
110(-¥;-1)U[0;1)
.
1101223p/4
1101319
Ordm;.
11041150
1105126,3,3/2,...
1110
11125
1110p/2+2pn,
1110+2-1=0
1110=-1/2∙+1/2
1110152:3
11116
11114Ö / 1-
Sina
11111ү қ.
111110614564
11111089/13
111111-1
111111arctgÖ2
11111111
11111115111..300
1111114561112,5.
11111150610
Ouml;2
11111250(4;3);(4;-3)
11112114
Ouml;38
11112123135/ (+5)
11113-Ö5; Ö5
11114511130 2(4+Ö2)
Ouml;3
111160145 2(4+Ö3)
.
.
11120; 0; 0; 0; 0
11121.
1112-π/4+πn, πn, nÎz
1112111411..7/16
1112131215
111225321249...33,36
Ouml;30
1112312
111241336..2,32
11124211-/2-1
11131; 2; 1
11131513
111321; 1; 1
Ordm;; 2,5.
111811514.. 1/3
11215/8.
1121<<2
Yen;;1)
112(-¥;-1)È(-1;1)
È(1;¥)
112(68;68;44)
112n=2n-1
11201/2
11212,5;2
1121300
1121121/cos2α
11211211214,5
Y
112123134..9/10.
112142/3
1121751581,5.
11222/3
11228 2
11220(0; 1/2)
11221221-3
1122201314200,4.
112213140,001.
11222 tg2a.
1122213... 0,4
112231(-1; 2; 3)
112234783.
11234
11231111
112311322(-¥; -1/5)
11232143120
Ouml;2
11233020
11233723q=5, b3=300;
/ q = -6, b3 = 432
.
11237680;370;750
11238370;680;750
11248
11241252101.
11254-3+7=0
1130 ( ұ)
1131
113 (0:1)
113(0;3]
113(-∞;3)
11319
11311(-¥;1)È(1;¥)
11311126-3
1131231..- 1/6
1131311- 1
1132Öm-Ön / m
113201515..9/20
1132350
11331248
1133232
11341213
113836.
114115116..21/2.
1143(+4)2+(-3)2=25
114310125..-0,7
114758.
11502-2,24.
Ouml;x
1154301010 360
115489040 /ғ,
50 /ғ.
1160215 2
116141271118/17.
11621213,5
1162135×1/3
116515297.
11671228.
116837d=3
.
1171777
1172349221474,5.
11733373/7
11812427
120 (cosa=1)
122 ә 1/2
12-3 tga=1 ә
tga(a-b)=-2
12(-2; 1)
12[1;5)
121,5
124 |=1+cos∙π/2∙x|
12√7
Ouml;2
.
12ү қ
|
|
121/3; 1/4; 1/5; 1/6
12(2,5; 0)
Yen;)
12(-∞;-2]U(-1;+∞)
12(-∞;+∞)
1236(Ö2+1) p
1236Ö3 c2
12288p 3
12192√3 3
Sina
12-300 | arcsin (-1/2)|
12300 | arcsin 1/2 |
12600 arccos(1/2)
12120º arccos(-1/2)
12Ö3-1/1+Ö3
Ouml;3
Ouml;3.
12<-0,5>1,5
12<1; >2
12>2
12x≠-1;x≠0
y=1+x / x2+x+X
12x¹-2
12Î(3; 7)
12=1/2
12d1 +d2
12 -2Ö2-+
Cosx
12sin2α
12sinx×½cosx½
Sin2x
(f(x)=-1/2lnctgx)
12sinα+cosα
Times;tga
1-ctga×tga / tga+ctga
12(-1)np/6+pn; nÎz
ctgx+sinx/1+cosx=2
12π/2+2πn; 6π+2π
12-p/3+2pk£x£+π/3+2pn,
nÎz y=√cosx-1/2
12-p/4+pn; nÎz
12-p/4+pn,p/2+2pn,2pn,
12p/4+pn£x£arctg2+pn,
(1£tgx£2p)
12(p/6+2pk; 5p/6+2pk)
sinx>1/2
12(p/6+2pn; 5p/6+2pn)...
12 -p/6 arcsin(-1/2)
12(2p/3+2pk; 4p/3+2pk),
cos<-1/2
120 -1/2
120ү қ
Ö+1+Ö+2=0
12080; 100
1201000
120a3 / 6
120√2 / 48 3
120 x2Ö3/3
120÷÷>1
120x<0, x>2
1202p/3+2pn; nÎz
Pn,
120p/2+2pn<x<3p/2+2pn
120[p/2+2pn; 2p/3+2pn)
È (4p/3+2pn....]
U(-1;0)
1200(-1;-2)
1200410p/3
120105
12011011151138,8 %.
12012320;40;60.
120147
120232223
1203219
1204010π/3
120406072 ә 48.
120423016
1205 қ
120562,5 ә 57,5.
120501248 /ғ,
36 /ғ.
1205552
12061,28
12060,81 2.
1206660362 1,94.
120725a1=1: d=4
12075160
121g(x)=2(x+1)
121Ö+1+ln||+
Yen;;1)
Yen;;-1) U (-1;1)
U (1; +¥)
121(-∞;-1)U(0;+∞)
121(-¥;-2)U[-1;+¥)
1210p/2(1+4), ÎZ
Ouml;2
1210242046n=10,q=2
1210348 c3
12103060 2.
12110(-11; 12)
X
121162434
12120,25
12121
12121/sin2a
12122 / a2-b2
12122b/ 42-b2
12121/4
12121/5
1212360
P
1212tg2a
1212(pn;p/3+2pk)n,
1212(-p/4+pn/2+pk;
p/4+pn/2-pk)n,
1212p/6+2pn£x<p/3+2pn
{sin³1/2cos>1/2
1212(-p/6+2pn; p/6+2pn)U
(5p/6+2pn; 7p/6+2pn), nÎZ
1212[p/3+2pn; 2p/3+2pn)
È (4p/3+2pn.....]
12125p/6+2pn<x<
5p/3+2pn {sinx<1/2cosx<1/2
121200; -2
121205p/6(61), ÎZ
12121π/4
1212101/11
121211100
1212121
121212121/2 /1/2
121212205(1/2; -1)
12121301300
1212143/4
1212193 /ғ.
Ouml;15 c.
1212220
12123-1/5
12123(-4;3)
12123212
1212323d= -0,2
121234-1; 4.
1212381(5;4)
Yen;;-2)U(2;4)
1212539
1212701100
1212772128.
12131/7
12138 logx1/2= - 1/3
P
Yen;)
1213121334--1/4
121316-1/9
12133224-9,6
.
121412/3
12141117
.
12143084 2
121431124/15
12152/5
1215(10; -5)
12150781/1250
1215105 - 3
121610
C.
1216252880 3
121790
121857
121853613×1/3.
122 0 1-sin2a-cos2a
122 3 ½-12½/>2
122(-1; 0,5)
Cos2a
122(-¥; 1/2)
122-2/3+2 -sinx
122[p/6+pn; 5p/6+pn]
122π/2 (4n+1), nÎZ; π;
122pn;p/2+2pn; nÎz
122 қ
12200
12200; -5/6
.
1220151440 2
1221-1/2
1221(p/2+2pn; p/2+pk)n,
.
1221054
1221111/y2n+1
12212 cos2a
122122245(-5;-5);(7;1)
122123524571 ә 4
1221322
1221417
1222(m-n+1)(n-m+1)
1222cos2a
12222cos2α.
1222 tg2a
12222+3(b-a)+22....
12220(5;5)
12220p/2+pn, nÎZ;p/4+pk,
12221(1;2]
12222b-1/ ab
1222212-1
Ln2
12222318-1<x<1
|
|
122253021229,25
12225303132-26,875
1222632622(2ab-c)(6ab-3ac+1)
122284[-6;-4) È (2;4]
1223(0;3), (4/3;1/3)
1223<-3; -3<<1; >1
12230p/4+pn,
12231432-2 (AB×D)
12231432-14
(CB+DA)(BDBC)
12231432-10 (DA×CB)
1223421>2,5
12234331348
1224AB=i+6j
12246 ә 54
1224124x=4
P
1226022601-1
1226454
1234×1/2
123300; 600; 900
123[-1;3]
123(Ö2-Ö3) (Ö3+2)
123(-3; -2/3]
123 / ү.
| =123 |
1230450
1230(0;0), (Ö2;Ö2)
1230[1;2] U (3;+∞)
123083-Ö3+3/20
123110101011n+2p
123112120,99
12311232 2; 3 2.
123121×3/8
Ouml;3
1231250,25.
12314(-∞;-3)U(1/3;1)
U(3;+∞)
123156
123158
12315 қ.
123161713616
123161713661216
12322
12320,5
1232288 3
1232(p/6+2pn; p/3+2pn)È
[2p/3+2pn; 5p/6+2pn)
1232[-π/6+2πn; π/3+2πn)È
(2π/3+2πn;7π/6+2πn]
12320π/4+π/2
12321224ү қ.
12321425
12322ctg2λ
Cosa
123223133.
123233(5Ö2-6+3Ö6-4Ö3)
123231(0;0;0)
123231253,6
12323232
1232654
12329(1;0)
1233 - 4
12342√x+2+4cos(3-x/4)+C
1234D()=(0;+¥) 2)=1;
Yen;)....
12340123401010,01106.
12344[-24;0]
123460,8
1235162
123511 / (3-5)2
123501752075/6
123514334..10/17
12386922/3
123891
P
1244(1+-2)3(1-2)
124[-p/4; p/4]
12401080
1240-4≤≤1; x≥2
1241 қ
1241203,1
K,
1242242436-2/+6
12424026
124242162-2/4(+2)
1242424336-2/+6
12433.
1243-21;22
1243(Ö2-4Ö3)(Ö3+Ö2)
1243005=1-
124304513[9;∞)
1243123(3/4; 2)
1243220[-3;-1] È[1;+ ¥)
Ouml;2
124353
12436-24
12440500.
124420321900
1245300
124533444...1.
124533444..6/7 ()
12495227/20
1250,8
12527
1252; 7; 12; 17; 22
1251030
1251065 2
1251131214151.
125122162641145132.
1251242(0; +∞)
1252132
125224234(-4;0,5)
12522511/625;5
125240(-3; -Ö5)È(Ö5; 3)
12525701..-2; -1.
125314
125315004053-0,2.
1253221/2
125521225041∙1/3
1258253210.
126 4 ү
126(-5; 0)
Ouml;3; 18; 24
Ouml;3
1263018 2
126486-728
12665
12703;4
1270010501020
1271013 (2,5;4)
1272456(-1; -2)
12737<x<15
Ouml;3
12735-0,5; 0; 0,5
12754251..24
.
128(-¥; -3/2)
12822024..4,5.
12824402- 4; -2; 2; 4
12831318..Ö2ab(a+b)
(ab-1)
128560;15
Ouml;2
129091921791
1293027
13 қ
134; -2 |-1|=3
1310
13-3
139:1
13(0;-5/3)
13(-2;4)
134; -2
136Ö5
132√2/3
131/3 sin(arcsin1/3)
13-4/9 (a=1/3 )
133sin3xe1-cos3x
1302
1304π
| y=√x,x=1,x=3,y=0 |
130500, 500, 800
130(-∞;-3)È(1;+∞)
13001
1300100<≤300
Ouml;3
, 3
1303235×5/12
130452Ö2/Ö6+Ö2;...
13075235121
M
13100013/100
131027302425... 8
13113
13111015101511124
)
B
131134131443
1311350=-7
Yen;)
131265π 2
1312156 2
131225π c2
1312(1; 10]
13121/2-+1
13121(-1;1/2)
131220162
131222221 π2
131222222
x2+y2+z2+2x-6y-2z-10=0
131232(0;1) È(1;2) È(2;3)
1312521230-1/3; 1,5
1312850 2
13131200
13131290.
1313413276
)
1314153/5 ()
; 11,2;
13141584
13141528 2
131415842
13154121... 5
.
1316913.
131721771
P
132-17
132127
1323,5
132-1; -1×2/3
132-6; 6
1323, 5, 7, 9, 11
132{1; 3}
132(0; 9]
132x=1π/6+2πk,kÎ Z.
132√a+3+2/a-1
1322p+6pn, nÎZ
1321/cos2α
1321 / sin2 α
|1+ctg(p+a) tg (3p/2-a)|
1321/3 tgx+
1320(0; 0) (Ö2; Ö2)
1320D қғң
ұғ 12
1321(3/2;2)
1321(-1;2]
13212-2-3=0
1321211
132135132x>3
Egrave;(2;3)
1322113..(-∞;-1]È[0;0,8]
13222223[4; 4,5)
1322412..2.
13232∙1/27
132312
13239(1;2)
1324231(-3;1/3)U(3/2;+∞)
132451413
132462439(1;3)
P
13253331{2;-9}
132568[12;+∞)
132613127x<-2
132631321..16.
1327203
1327121 ( ү)
1327S5 =121
1327501-40
1329575(1/2; 3)
1333,5; 0,5
133a2+6a+10
133p/6+pn£x<p/2+pn,nÎ
133p/16+pn/2£x£
3p/16+pn/2
1331(2;2)
133122-cosx/3 +sinx/2+C
133161/3+1
133237
13323931010,5
133322..2(+)/2++2
133252500
13328112122-6
1334(-4/3;∞)
133411<-7
133431323-3, 25
13352(1;Ö3)U(9;+¥)
133652
1337(2;1), (-1;-2)
1337851231/6
Yen;;5)
1340[3;7)
1341111751560,25
1341223134231201=0;
2=-1,5
13418120
13427896
1343101231126
135-1
1358
13560p 2
1350323320[3; 5]
13528
, 90
135210225 -Ö2/4
Ouml;6
13522(-2; 2,5)
135225019
1352323114/15
135240210.. -3/4∙√6
1353813
Ouml;6; -2; -6
1372150(-¥; -13)È(15; +¥)
1361,5
136248(1/3-6)23
136383x<-2
13633931/2
1365(3;2); (2;3)
1365(-5;-1);(5;1)
13671/3∙ln|x|-7x6/7+C
137126
137122; 1; 4; -5.
1371281337-2,25
13713[-2;3]
1372(-2; 7)
1372150(-¥;-13)U(15;+¥)
13752411... 2,7
138(0;8)
138420
1386101260 ң
1386450026..38
139-2.
1391518139..13200
1395-1
13981133.
142/3
141∙2/3
1463
143≤x≤5
14n=3n-2
14=5-3
Sin4x
14-1/2Ö (Ö-4)2
14 5, 5, 6.
142/2-1/4sin4x+C
140200;900;700
140(400;400;1000)
140πn, nÎZ
140010035500;600;300.
14010501=10; d=10
140125 80 ә 60
;60
1402Ö15/4
14052440
Ordm;.
14105152
1410702101
141104
141102203..1/25
1411413750
14121/16
14121118.
1412131424.
14127232{8;10}
14130313
14144/162-1
14141632414Ö-1/
141813d= -1
X--
1423
142180
142(-2;2)
X- .
142-1/4∙x-5/4-2/x
142710 1090
1420(p/6+pn;5p/6+pn)
1420024 π
142122
14213513132-31
1422p/2n, nÎZ,p/4(4+1)
1422p/4 (2+1), ÎZ
14221142212
142211621422-15
14221422192/3
142257127
14230-1/2;3/7
142314
1423322-1/2m8n4.
14236013; -25
142426 ә 8
14252 c ә 7
112 .
1429232(2x+6x2+5)/4x2-9
143484
143- 4372
143 (0;3)
14314xln14+3e3x
.
14321∙2/3
1432-(4Ö3+Ö2) (Ö3+2)
143230008102... 26
1434-80
143511424..11/60
14380(-3,8; 1,4)
Egrave;(1;2)
14424
144010
14413361576.. (2;5,5]
C
1442142016 3
1442331221(-∞;0]
1442393;0
P
144382-2,4
144433[0;1]È[3; ¥)
14449322 / 7b
14488400 2
14497 %.
14496403202400 ң
.
14524 2
1451(-¥;3)È(3;+¥)
Yen;; 4,5)
14520 қ
145223..-5,22-2,6+1,4
1453141616544
145337172-9
145602558
146730
14740 %.
14712111 / 7+1
1471314725...220
1478Ð=30
1481731641arccos 3/5
1482014216{-1; 62/39}
14927(-∞;1]
149552 /ғ.
.
1532,25 %.
Ouml;6
Ouml;3
152<x<5
156=5
P
15(8;+∞)
15[0;16]
15Ö3-1/ 2Ö2
15(1-√3)/2√2∙(15ab+5b2)
15[-1; 5 ]
15015p 2
Yen;)
1500166400 2.
1500201600515.
1501512
150150cos α
1502125 2
15020200
.
Cos1, sin1, sin(-5)
1510250
15107-1/8
15115111,5
1511515112
15122/5
15126
151211023n=10,q=1/2
151261223
15133110121-33/2(3+1)
1513612317
1513913204 /ғ.
15146/25.
1514181321/220
15145610520,8.
1515arccos1/5+2pn<x
<p-arcsin1/5+2pn, {sin>1/5cosx<1/5
151513p/4+pk, kÎZ
151515 tg 150
151518[1/8;+∞)
1515212 /ғ.
15152412,5
15178
.
1518216
Ouml;5
152[-5;-2) U [3;∞)
152012
152017AD қғ
ұғ 12
15210322201100
152108212-5a/4b
1521281350.
15216(2;3)
Ouml;2
152262153313,2
.
15245.
15241820
15255
15261523(3;+∞)
15262203.
15271512516×1/9
1529524(-3;5]
Ordm;
, 5,625 .
1535- 3/5x4
Yen;)
1536-1.
153623017.
153729,6.
1541420 /ғ
154231100177
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