30153015730415730415●cos(π/30)
301535●100π
3018●1093,5π ³
302●15 c²
Sin2 xdx
302●4 (y=x³, y=0 x=2)
302●30
302●√3 |π/3 ∫ 0 dx/cos²x|
2 )
)
3020●56 ( 30% 20%)
3020●0,22 ²
3020●2 |3sin 0+2cos 0|
3020●20%
3020●136 (1 8 )
3020● 9º ( 20% )
30202428●2340
3020307031930●67
3021●10² ( )
30210●x=5π/12+πn; n*Z
3021132171831●9;4
()
3022●484√3/3 ² ( )
3022122●(0;3,5),(0;3), (21,21)
3023●(3; 1,5) |+3>0 2x<0|
3023●3√3/2 ( ∆ )
30230●x>3 |log3 0,2/x+3<0|
30230●x<3 |log3 0,2/x+3>0.|
302333●π/3+πn<x≤2π/3+πn,n*Z
|{ctg(xπ/3)≥0 ctg(2x+π/3)≥√3/3|
3024●16; 16;22 ( ∆)
3025●300cm²
3025●300c² ( ∆)
, 200
Mr; 200 mr
Cm
302525●24 (h ∆ )
3027●10% ( % )
30271●(3; 27)
3027225●x=7/12
30292●45π ³
30292●450cm²
303●4832√3²
303●2√3 ( ∆)
303●36
303●√3
. ( )
303●1
303●1 ( , )
303●√3/2
303●25/
303●1/3. |π/3 ∫ 0 sin(x+π/3)dx.|
303●15=(-∞;-5)U(1/2;∞)
303●(2; 3,5)
Sin
3030●sinα {cos(30+α)-cos(30α)
3030●1/2(√3/2+sin2) |sin(30+x)cos(30x)|
3030● 9%
3030142●π/6+π,*Z
303030●5
303060●30√3
3031●25 /
30311●6 |√30√30+=1|
303159●1 | tg 30 tg31. tg59 |
30320●96
30320205040530●7
303215●(∞;-5)U(1/2;+∞)
30323●0,5 ³ ( )
3034●36
)
3036●2√2
3036●arcsin 3/4 ( <B)
303630●540 ² ( )
3039●100π
304●(32√3+48) ² ( ∆)
304●y=4√2+3π√2/83√2/2x |=sin3x 0=π/4|
|
|
)
304●48+32√3cm² ( ∆)
3040●140º;10º
( )
3040●50º ( ∆)
3040●70º ( ∆)
30402●240
( )
30403602●9000 ²
304100●4.
304262●12³
304262122●12 ³
304226122●12dm³
304296308292●4√3
3045●L³√2/8 ( )
3045●1/√2 (/)
3045●√2
3045●3√2/8
305●1/64. {³√√x=0,5
)
3050●(1)+1π/18+π/3...
( , )
305148234●y<x<z
3055●35
.
; 80
8 ( )
30593●n=5, b1=48.
306●12
306●12 6√3. ( )
.)
306●6 | <A=30, BC=6 |
)
3060245●1/4 |sin 30ºcos60ºsin²45º|
3060245●5/4 |cos30sin60º+cos²45º|
30604845●2410.
306090●1√3 / 2.
()
30743512305●19/75.
)
3075●123/40
30751514125326●1,225
308●lg√3cm²
308●16√3² ( )
3081800●120.
3084●5π ²
X
3096●arcsin 3/4
309898●2240
31●1/3(x+1) |f(x)=ln³√x+1|
31●1<x<3 |f(x)=lg(3x)+lg(x1)|
31●2 |3 ∫ 1dx |
31●2
31●x²/2+6/11x
31●x3/2x²+C (y=3x+1)
31●π/6+2π/3; k*Z
31●π/3+2π; k*Z | cos(xπ/3)=1. |
31●πn, n*Z
31● (x-1)(x2+x+1)
31●(∞;4)U(2;+∞)
31●\\\\4XXXX2////x |+3|≤1|
31●α=arctg(1/3ln3)
31●175
31●α=arctg(1/3ln3) |y=log3x, y=1|
31●(1)k+1π/6+π/3+kπ,k*Z |sinx√3cos x=1|
31●(1)k π/6π/6+kπ |cosx+√3sinx=1|
31●π/6+πn/3<x≤π/12+πn/3,n*Z |tg3x≤1|
31●(∞; ∞)
31●[1/3; 0,5)
31●[1/3; 0,5) {√31<√
31●(0; 3] {3/≥1
31●1 (√3-=1-)
31●103.
31●4, 7, 10, 13, 16 |xn=3n+1|
31●450
31●x3 / 2x2+C
31●(³+3²+1) |f(x)=(x³+1)ex|
31●π/3+2πk,k*Z
31●π/6+2πk, k*Z |sin(x+π/3)=1|
31●π/6+πn/3<x≤π/12+πn/3,n*Z {tg3x≤1
31●π/6+2π/3k |sin3x=1|
31●πn,n*Z
31●2/2+6/11 11/6+2/33/2+
31●(∞;4) |+3|>1
31● { |3|<1
31●(x1)(x²+x+1)
31●=1/3 (+3=1)
31●13π/12 arctg√3+arct(1)
310●y=10
310●π/6+π, n*Z {√3tgx+1=0
|
|
310●(1)n arcsin 1/3+πn; n*Z (3sinx1=0)
310●282,6
310●√103
310● IV d=() |d=ctg310|
310●(1; 2] |log3(x1)≤0|
3100●x=3º20+60º, *z
31002831553●4³√2/25
31001●23/14π |y=x³+1, y=0, x=0, x=1|
31012●2 3/4
. ( )
3102●arctg 3/7
U(1;2)
3102112●17.
3102210●[0;3]U[7;+∞)
310224100●(2;4);(10; 0).
31023102●3m2n
310241●(1/3; 0) |{lg(3x+1)<0 lg(24x)<1|
31025●y=3x+1 | (3; 10) (2; 5)|
3103102●0
31032●(1;2)
310322●1/√10.
310360●{120,180} {sinx/√3=1+cosx [0; 360].
3105●32; 3
310540●2
31074●17
3108●3√2
3108●3³√4
311●1
311●x=1 |y=3x+1/x+1|
311●9
311●4. {loga 3√a/b, logab=11
311●a³+3a²+3a
311●(∞;1]U(1;∞) |x+3/x1≥1|
31100●(∞;3)U(1;10) |(+3)(1)(10)<0|
311113311●30
31112●1/+b
31112●(9;3)
31113●3
311143313●3/2.
3112●=1/3
3112●3π/4 |arctg(√3)+arctg(1)+arccos(1/2)|
31120●1/2
31120●10
31120●10 {a3+a11=20
31120●2/3
31120●1/2 f(x)=k/k3, g(x)=1/1+t², f[g(0)]
31121●2 2/3 | 3 ∫ 1 (1/x²+1)dx|
3112172●10
)
31123372●q=5, 3=300 q= 6, 3=432
3112541●20
31129●(4;1)
3113●. {a√3:(1/) 1√3
311306301●9828
31132●[1;7] |3+√11=√32|
3114●(4;+∞) |=3lg(x1)1/√x4|
3115●(∞;5)U(5;+∞)
3116●496.
311622112●0,6.
3117131●4,5
31172●8 |√3+1√17=2|
3117212195250●3
312●=π/3+π
312●(π/9+2πn/3; 5π/9+2πn/3)
312●/9+2/3πk, k Î Z.
312●7/(+2)² |y=3x1/x+2|
312●x=π/3+πk, k*z {log3tgx=1/2
312●x=2π/3+kπ;kπ,k*Z |cos(x+π/3)=1/2|
312●(1/3; 1) {|3x1|<2
312●[1/3; 1] |31|≤2
312●(3x+1)³/9+c ∫(3x+1)²dx
312●2π+6πn, n*Z
312●2π+6πk |cosx/3=1/2|
312●4π+120πk,k*Z
312●π/9+2/3πk,k*Z
312●3 | 3xyz=1 xyz=2} x+y+z |
312●4
312●=2+1/3 (y=3x1/2)
312●=π/3+π,*Z
312●4/41/+
312●(∞; 12)
312●(0; 6]
312●(0; 6] {3/x≥1/2
312●(π/3+2πn/3; 5π/9+2πn/3) n*Z
312●2+6n n*Z
312●1/3≤≤1 |31|≤2
312●[5;1) |x3/x+1≥2|
312●6 ( ¼ )
312● |3(+1)2|=
3120●2460
3120●18 1/7π
3121●(1;1)
U(1;2)
31210●(1;2) |logx 3x1/x²+1>0|
31210●0; 2/3
31212●6 1/2
31212●(1)² |x³(x1)x²(x1)/x²|
B
312131211312●1/2
3121312111312●1/6
312133517●0
3121422621●1/2
31218587●(4;4)
3122●1/a+b
3122●x>1
31220●(2;3] 1 (3)(+1)²/2≤0
31220●2/3k k*Z
31221367●35.
|
|
312214356●9
3122161●8/3
31221921●3√2.
31222341324●<1/5
31222367●35.
312231●x<1/5
312231324●x<1/5
312232●3√5.
312235●=1
3122812144612●+12/+3
3123●6/ln2+3ln3 |3 ∫ 1 (2+3/) dx|
3123●25π/18+2πn≤x<3π/2+2πn,n*Z |{sin3x>1/2 tg≥√3|
3123●3(√2+2√6)/4
3123072●6
3123163305●0,5
3123163305●0,57
3123225●2.
3123312●1
3123312●{13}
31236●3/6
3124●(1/3; 1)
3124●[1,5; 2] |3≤12x≤4|
3124●y=103x
3124●1 1/9. |(31)²+4º|
312400211400111●1800
Ln3)
312423●4
31243●6/ln2+4ln3+6 |3 ∫ 1(2x+4/x+3) dx|
3125●3,04
A-4
312512242121●x²+1
312512461●3
312525●π5
31252525●p5 |p³125/p²+5p+25|
312532●27
31253600086●25ab²c².
312548●q=2 {
b8)
312548189●6
3125488●384
312548189●6
31256900273●50²b³/3c
3127●3
Ordm;
3127110●1; 1/3; 3
3128●[-7;4]
3128012800513●4.
3128230001612●20a²bc4
312825●, n=29
3128252253●112; n=29
313●1 |√3+1=√+3|
313●√3/3
313●(∞; 1/9)
313●(∞;1/9] |3≥1/3|
X-1
313●20 |3 ∫ 1 x³ dx|
313●32/(1+3)2
313●√3 |tgα+tg(π/3α)/1tgαtg(π/3α|
313●y=x1
313●=1
3130●(0; 1)U (3; ∞)
3130●20 | y=x³, x=1, x=3, y=0|
3130351318223●5/8.
3131●=√1(³2/3)³ |³√1+x+ ³√1x=a|
3131●(∞;5)U(1;+∞) | 3/1+|x+3|<1 |
3131●1/3(e3x+1sin(3x+1))+C
313100175035●5/6.
313119●3.
31312●[5;+∞) |³√1+√x+³√1√x=2|
3131224●(0;3)
3131233456●3,5
3131307●1
3131415●84³
313156●1,5.
313156217●0,7.
31319195412●16
Ordm;
( )
3132●25π/18+2πn≤x<3π/2+2πn,
31321●1/a(a+1)
313212200●2,6
313223133130●π/6
313224●3
31326322905●x=29, y=20
31323●6
3132319●(∞; 4/3)
313232●1.
3132537●2,5.
313261323226●2
31326322905●(2;1)
313264●4
3133●1/2(1/2x4+³√x²)+C
3133●9(x³+1/x³)²(x²1/x4)
31330●2πk/3
31331●3
313312●3900
31331333●2√3
3133132120●2
31332●24/ln3+3ln3+4 |3 ∫ 1(3x+3/x+2) dx|
31332227●(1;1)
313323233●1/3;9
31333●8/3.
313323233●1/3; 9
31333333●(2;3)
|
|
31333333●{1; 2; 3}
31341●1
3135●6
31350●8
3136●18.
313632227●(1;1)
3136552511●6,5.
31390●(1; 1 1/9)
31398054455152010023123241221862914000225●1.
314●1
314●65
3140251524●1
314181●20
3142●331+4+2cosx+C
314213●3/2√21
31421622112411●1
31426142213●2/3
3144●a16/3,b4/3
3145502170●1 5/8
314589●13
314612●0,5
31467663●49
315●[6;+∞) |y=3|x1|+5|
315●1 |tg(315º)|
315●x>5
315●1
315●2π/3
3152●15
31525●4/5. (3 1/5 25% )
315315●3
31531714136●49/9
31532●2
3154●14 |f(x)=3x1/x5 =4|
3154●16x10y+31=0
315405●0,5. |sin 315ºcos 405º|
31548●60/
315494154921314113425411340282228●4,9
315533●(3;4)
3156011560●2
316●3/x+1 (f(x)=3ln x+1/6)
3162●3<x≤4
316207●2
3162037●2
31624●≤4; ≥4
31624512●2,3
31624614●0,5
316281536●0; 1/2
3163●6
31632227●(1;1)
31634●2
3163924312232932●1/3a+2
3164●(4)
3165●(x-3)²+(y-1)²=25
3165023●2
31659316●3, 3/2, 3/4
317●b5 2/3
317●2460
3171114●4.
31733173●2
3174●1/2
317788●1/2
318●=4+1/√3+2π/9
12 ( )
318010405080●4.
318124●(1; 100)
3182●27²()
31820●1=5, 5 = 405.
318211213730485●1,25.
318212●1 1/4
31821236●3/+6
318240●27cm²
318245●27 (S ∆)
318245●27² ( ∆)
Y
318314310●2
3184●52
318414216●52
31843314323163●52.
31851621●2 (3=18;5=162. 1)
31851626●486
31864216121●5
319●(2; 1/9) (=3 =1/9)
319●13,5
31925●15
3193●9
319303020307●67
31975●7125
32●1 (lg3xlgy/lgz+lgy=logyz x² xy=?)
32●0,5. |cos(arcsin(√3/2))|
32●1. |3(x1)²|
32●1+1/x2 | x3/2x |
32●9x²6xy+y² (3xy)²
32●[1,5; +∞) { =|32|
32●[2;1]
32●[5;1] |3cosα2|
32● 4√2 { 32 )
32●15/(2+3); 10/(2+3)
Cm
32●1,2,3 f(x)=log3(x+2)
32●3xln3+2/x³ {y=3xx2.
32●3/x². |f(x)=32x/x.|
32●3x4+2 (g(x)=x3+2x)
32●y>0, x>0 (y=x 3/2)
32●60; 40/
32●[3;+∞)
32●π/6+2πn,n*Z |cosx=√3/2|
32●1/3³√x²+1/2√x+2 | y(x)=³√x+√x+2x |
X4
32●3 {y=log3(x2)
32●7 | =3√+2|
32●√15/√2+√3; √10/√2+√3 ( ∆ )
32●30
32●32,4π ( =3, =²)
32●{3; 1; 2}
32●3n+2 ( )
32●3π ³
32●(500/6+20n; 50/6+20n) n*Z
32●60
32●7+4√3/8² ( )
32●√3/2 |x=π/3 f(x)=cos²x|
32●9π ³
V )
32●9²6+² |3()²|
32●a2x(ax1) {a3xa2x
32●a³√3/6 ( )
32● |√x+3=2|
1 8 )
32●1/2
32●8
32●8 |= B(π/3; 2π). |
32●(1)kπ/3+πk, k*Z |sinx=√3/2|
32●(1)n+1π/3+πn,n*Z |sinx=√3/2.|
2-)
32●4
32●(1;5) { |3|<2
|
|
32●[1;∞) |√+3>2|
32●6,25
32●5 (a→=3, b→=2, a→+b→,a→b→)
)
32●(2;∞)
32●(π/6+2πn; 11π/6+2πn),n*Z |cosx<√3/2|
32●[4π/3+2πn; π/3+2πn],n*Z |sinx≤√3/2|
32●1/xln3 ((x)=log32x)
32●(log32; +∞) |3>2|
32●32- / ln(3x2-x)
32●3x²+2xlnx+x |h(x)=x³+x²lnx|
32●32x ln2+ex(cosx+sinx) |f(x)=32x+exsinx|
32●5/6 |√a³√a²=ay. |
32●6-1 / 32-
( )
32●9π c³
( )
32●(9;+∞) |log3x>2|
5 )
32●I, II III |f(x)=log3(x+2)|
32●π/6+2πn n*Z
32●π/6+2πk,kπ |√3tgx=2sinx|
32●³√3/6 ( )
32●0;5
32●1.9m³
32●1/x ln³
32●3 ( y=3sin2x)
32●30
32●30 (arccos √3/2)
32●60 {arccos √3/2.
32●60 {arcsin(√3/2).
32●60 {arcsin(√3/2).
32●150º |arccos √3/2|
32●3x² sin {2x+2x³=cos2x
32●6x-1/3x²-x
32●6/5x²√x+4/3x√x+C
32● |√+3=2|
32●x=2 2 |=3/+2|
32●π/6 |arccos√3/2|
32●y>2 (y=3x+2)
32● (∞;1/2]; [1/2; +∞) |()=3²|
320●√45(2)
12.
.
320●(2;+∞) {3/2≤0
320●0; π√3 {y=√3x+sin2x, [0;π]
N
320●π/2+πn;n*Z | 3cosxsin2x=0 |
320●(∞;3] |(x3)√2x≤0|
320●π/2+πn; nz |3cosxsin2x=0|
320●π/2+πn; π/4+πn/2;n*Z |cos3x+sinx sin2x=0|
320●π/3+2πn≤x<π/2+2πn, {sinx≥√3/2 tgx≥0
320●π/2+πn; (1)+1 π/3+π; , n*Z
320●[0;9)
3200●y=3\2x+ln2
32003235●3a+2b
32011●5 1/3π |y=√3xx², y=0, x=1, x=1|
32012●a=7 b=3
32012122●3.
32016●2√10/25; 2√10/25.
3202●π/3
.
3202160●[3;4)
32021602512503●6/5
3203●3√3
( )
( )
32040●25 %.
Ke
3204420●21.
32045●2 √+3+√20=√45
3205●2 ( (t=3) 20,5)
3205●(0; 1) {y=(log3xlog2x)0,5
320505●(-1)ⁿ+¹ π/3+2πn; n*Z
320530552●1/16; 2.
320545280●13√5
3206●x²+y²+6x4y12=0 ( )
3208●60; 69; 79
32080●2. |√320/√80|
32081510●60; 69; 79.
32080●4 |√320/√80|
321●xmin=1,5
321●(∞;+∞)
321●(∞; 2/3] (|x3|≥2x+1)
K
321●0
321●2 |+3|=2+1
321●2+log3x f(x)=3x2 f1(x)
321●3/5
321●3√13 ² ( )
321●π1/5
321●π/6+kπ/2 |√3ctg2x=1|
321●7/12 {=³,=²,=1
3210●(-3;-1)U(1;∞)
3210●6x+5/√x
3210●(1/2;∞) |3/21>0|
3210●(∞;1/2)U(1/2;+∞) |y(x)=3x/2x+1, y(x)<0|
32100●36
321022●(1/2;2)
3210232●(1/2; 2)
321024●y=4.
321030●sin 1/3 |3arcsin²x10arcsinx+3=0|
321030●sin3; sin1/3
321032●(1/2;2)
3210325●(2;1)
32104●(11;8)√185
32109●(2;1)
32109●1;2 |3x²+x=10lg9|
321094210316104●840.
Ordm; ( ABC)
Ordm;
32111●0 |tg(3π/21)sin(π1)+cos(π+1)|
)
321112●(1;+∞) {32-13 -1>2
32112●1/16
321121233112●0,7.
321122●4
32112332●1
3212●7/3
3212●=3 |log3(2x+1)=2|
3212●3 (log3(2x1)<2)
3212●(0;1)
3212●6
3212●=3
3212●=3 {log3(2x+1)=2
3212●=5
6 )
3212●72 |y=ctg³2x π/12|
32121●+1
32121●1/2²+
32121●4/3 x/1-x
32121●5π/12
321211●1/√10
3212131●13/6
32121314312223●√521
321216421●4,5; 1
32122●2,5
3212213●30
32122131●1/3; 4.
321222●3a-2/2a²
32122323432●(1;2)
32124323●√113
32128244●a+2
3213●[0;1)U(1;3]
3213●x*(3;0)U(0;3)
321302125●π/4
321311●1.
321312●(1;+∞)
32132●416
32132137●416
3213223●1.
)
321322478217●(3;∞)
3213231●2
3213233102350●5
32133●5/12
321332●π
321350●1
32135135●2a/a²1
321361321●1
3214●85. |x³+x²+x+1, =4|
3214●(-1;-√3; 3+2√
32141●5
3214160●2; 2 2/3
321431●Ø |{log3(x2)>1 log4(x+3)<1|
321435●7
3214832302225●2.
3215●1/2 5√ |(32)1/5|
3215●17 ( )
3215●²+²+6412=0
32150●(∞;0]U[5;+∞).
321518●3(+3)(+2)
3215235131251374●[1,3; 2,5]
3216● (x-1)(x+7)
3216●0,8
32160140100●4 32sin160sin140sin100
32162414●1/3
)
3217●1,7 {32|x1,7|
3218●3 1/3;2 |+3|+21|=8
3218●549
3218●1=3 1/3; 2
3218●1=3 1/3; 2=2 |+3|+|21|=8
3218●x=3*1/3 x=2
3218●4π/3 |y=cos(3/2x18º)|
32180● |3²+18=0|
32181510●60; 69; 79
N
321827●3(a-3)²
3219●(∞;1)
32192●1/3a²b²c²
32193●748.
322●(0;1]U[2;3)
322●2/3 |√3x2<√x+2|
322●64π ². { )
X3-2x)(3x2-2)
322●(a²2a1) (³2²)
322●2 1/9; 11
322●(1)n+13π/4+3πn,n*Z |sin(x/3)=√2/2|
322●3√2/8 {f(x)=sin³ x/2, f(π/2).
322●3/2ctg2x+C | y(x)=3/sin²2x |
322●(4;+∞) log(x3)(x+2)>log(x+2)
2
322●1/2e4(e21) |3 ∫ 2 e2xdx|
322●1/4 |√=3/√+2√+2|
322●max=1
322●(2;1)
322●1 9 | y=3|x| [2; 2] |
322●2 {3sin²α +cos2α
3-2)(32-2)
322●3√2/8
322●6. |=(-3)²2|
322●512 (log3(log2x)=2 x=?)
.
Cos2
322●x>0
322●1/a+b
322●6
322●2/3 {√3x2<√x+2
322●0
322●π/2n n*Z
322●π/2k,k*Z |sinx+sin3x=2sin2x|
322●π/4+πn,n*Z cosx=cos3x+2sin2x
322●cos² α
322●9x²+12x+4 |(3x+2)²|
322● | f(x)=3cosxx²x2sinx |
3220●3
( )
..
3220●π/4(2n+1),π/2(4k+1),k,n*Z
3221●π/3+πn≤x≤π+πn, n*Z |√3sin2x+cos2x≤1|
3221●2<x<2.
3221●[1/3; ∞) |y=3x²2x+1 |
32210●{1;1/3} |3²2+1=0|
32210●π/4+π/2n, n*Z
32211●8
32212●4
32212●(2;1),(2;5)
322122●3a-2/2a²
322129●2
32213122213222●0.
3221314●0.8
3221535135171234●[1.3; 2.5]
32219225●1/8; 8.
3222●2 |=3sin²x+2cos²x|
3222●π/2+πn;n*Z π/6+π,k*Z
3222π/12 |a=arcsin √3/2 b=arcsin(√2/2)?|
3222●(-∞;-3]U[1;2) {y=√32xx²/x2
32220●4;16
322211●0
322212●141
3222122●3.
-2
32222●²/
A
322222●1/2
32222202●4.
3222223●22/13
322221342●2,3,4
3222214●3/16
3222214●7/5
322223132●4√5
U(4;8)
32223●tg |sin(3/2π+α)ctg(π/2α)+sin(πα)+ctg(3π/2α)|
32223●8 1/3 |3 ∫ 2(2x²3)dx|
322231●π
322239●(0;7)
322250415●73,2.
32225223331●47
3222622●60.
3223●(a²+b²)(ab)
3223●2x³+5/2x²6x+C f(x)=(3x2)(2x+3)
3223●6 {y=3/2x+ (2;3)
3223●30
3223●²-6³
3223●[3;5] |=3+2sin² 3x|
3223●3√3
3223●x²y6x³
3223●y≠0, y≠0,25
3223●(ba)(3+ab).
)m
32230●(2/3; 1,5)
32230●(2/3; 1,5) |(32)(23)>0.|
32231●√³+1+
3223175●2
322310722●x=25, y=16
322313123●25/3
322316●√6
32232●tg α
32232128227●8
322322780125120●6,25.
32232323●3√6/2
32232325●(8;2)
32233●[1;∞)
322332132●[-1;∞)
32233626●6,2
322341332●5.
3223439●(2; 2)
32235521●(0;-1)
X-2y)(x-2y-1)
322360●5
322360●5 | log3(x2)/x²36>0 |
322360●7 (log(x-2)/x236>0)
32238●3b³√a²b²
3223827●27/26.
3224●F(x)=x3/3+2x2-7
3224●818/b8c4 (3a²/b²c)4
3224●(2;+∞) |=32lg(2x+4)|
.
32242439●x²+5x+6/6.
322427132●10.
32244641●1
3225●[0;1]
3225●2
32251●b=7
32251●7 (=3+ =2²5+1)
32250●1 2/3;1
322505643930●80
32256200●x(2y+3)/x+1
32251●b=-7
3225251●7,75
32253260●1
3225544●(1;1)
32261434●x<0
322651●2
X
3227●1
3227●x>1 (3x+2>27)
32271●(3; 3,5)U(4; +∞)
3227233630●√3;√3
3227233630● |3m²27/m2m/m+3+36m/m3=0|
32272532225●5
3227329●(2; 1)
322888●√3.
322918●a2
32292●3b/mn
32299●a=2,b=3.
323●3/2ctg2x+C
323●3/²
323●0 |f(x)=x³/x²3|
323●1
323●2 (y=2/3x+3)
323●[2; 1] | a→{m+3;m;2} 3 |
323●ctg3x+C
323●16π | 32π/3 |
323●24 | 3(2)³ |
323●25
Sin2(2-3x)
323●0; 1
323●2√2cm ( ∆)
323●50,24
Sin2 (2-3) cos(2-3)
323●F(x)=x4/8-sin3x/3+C
323●π/2,*Z |sinx+sin3x=2sin2x|
323●≥3 | =3+2/3 |
3230●π/3+2πn; n*Z (3tg x/2+√3=0)
323010●60 /, 40 /.
3231●(1; 1√5/2; 1+√5/2)
323112●<5/3
323180●1 |3x²+3x+18>0|
3232●4 |cosα+3sin²α+3cos²α|
3232●π/2. |arccos√3/2arcsin(√3/2).|
3232●[π/3+2πn; π/3+2πn]U
[2π/3+2πn;4π/3+2πn],n*Z |√3/2≤sint≤√3/2|
3232●²6+7=0
3232● |=³√2³√+2|
3232●6
32320●{2π/2+2kπ,π+2kπ,k*Z}
.
3232103232322●3/2;1
32321212121221212●+b
323213●87
323222●2 ³ ( )
323222●6cm³
323222322●2/a+b
32322232222●2/a+b
32322296●(3;1),(3;1)
323223●2;1
32322313●3
323232●6 3+/2 3+/2 3+/2...
323232●0
3232323210322●2/3
323234●[π/6+π/2; π/4+π/2], *Z
323234●1/3√48
323234326●7x²/(2x1)(2y+3)
3232343216●3x²/(2x1)(2y+3)
32323682●27a²
32324●9a4b6/m8
32324●(∞;1) |3+23<24|
32325●4
32325●<1,5; >3,3
3233●√3/6
32330●3
32331●1 3/26
323316●20
3233216●9.
32332●2;1;3;3
32332●16
323323●0 |ctg(π3)cos(π/2+3)+sin(3π/2+3)|
323324422229393●1/6
3233337●3
32334059●6π
323360●3
3234●(1;2)
3234●3/20
32340440●(3;4].
32342●94b6/m8
32342●[14/11;∞)
323420218●8
323423●(15; 16)
32343●π/2
323436●1.
32343638310434649412415●9/8
3234820●13
323511●(∞; 2/3) |{3<2 3x+5<11|
32351335●2
323521311●1,2
3235231●1,2
32352311●1,2.
32353266●0,5.
3235381●1.
3236●4 |√3√2=36|
3236●19 |3√23√=6|
)
)
3236108●4,5.
323624●[1; 2)
3236946●2²/(32)(2+3)
3237530●(1;1)
3239●27b³
3239●(3;6);(10;7) |{+=3 ²=39|
32390●2
32390●x<1 | 3+23x9x>0 |
323927●(a²3a+9)(a+3+x)
323932318●3
32396183275322354●0,4
, 8 ( )
324●96√3².
324●(3;∞){4} |f(x)=logx3(x²4)|
324●4 |g(x)=√x3(x+2), g(4)=?|
324●4(3+xx²)³(12x) |f(x)=(3+xx²)4|
324●2 (=3+b B(2;4). b)
324●2/3
324●3/x+4. |3x/x²+4x|