Matematika
Test _Amaliy matematika 2
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#1
Funksiya hosilasini toping: ๐(๐ฅ) = 4๐2.
- 8
- 0
- 4e
- 8x
Javobni ko'rish
0
#2
Agar f(x) = 8 boโlsa, quyidagini toping: fโฒ(x) =?
- 2
- 8
- 1
- 0
Javobni ko'rish
0
#3
Funksiya hosilasini toping: ๐(๐ฅ) = 4๐ฅ2 โ2
- 0
- 8x
- 4xโ2
- 8
Javobni ko'rish
8x
#4
Agar ๐(๐ฅ) = 4๐ฅ3 โ2๐ฅ+ 1 boโlsa, quyidagini toping: fโฒ(1) =?
- 14
- 10
- 12xโ2
- 3
Javobni ko'rish
10
#5
Agar ๐(๐ฅ) = ๐ฅ3 + 2๐ฅ boโlsa, quyidagini toping: fโฒ(1) =?
- 0
- 3๐ฅ2 + 2๐ฅ
- 5
- 3
Javobni ko'rish
5
#6
Agar f(x) = sin x+ 4 boโlsa, quyidagini toping: fโฒ(x) =?
- 4
- cosx
- 0
- sinx
Javobni ko'rish
cosx
#7
Agar f(x) = sin xโcosx boโlsa, quyidagini toping: fโฒ(x) =?
- 2 sinx
- cosx+ sin x
- 2 cosx
- 0
Javobni ko'rish
cosx+ sin x
#8
Agar f(x) = 4ยทcosx boโlsa, quyidagini toping: fโฒ(ฯ/4) =?
- 0
- 1
- โ2โ2
- โ4 sinx
Javobni ko'rish
โ2โ2
#9
Agar f(x) =โsinx+ 7 boโlsa, quyidagini toping: fโฒ(ฯ/3) =?
- 0
- โโ3/2
- โ2/2
- โ1/2
Javobni ko'rish
โ1/2
#10
Agar f(x) = cos xโ2x boโlsa, quyidagini toping: fโฒ(ฯ/6) =?
- 0
- โ3/2โฯ/3
- โ5/2
- โ3/2
Javobni ko'rish
โ5/2
#11
Funksiya hosilasini toping: f(x) = 5x.
- 5๐ฅ๐๐5
- 1
- 5๐ฅ
- 5๐ฅ
Javobni ko'rish
5๐ฅ๐๐5
#12
Funksiya hosilasini toping: ๐(๐ฅ) = ๐๐ฅ.
- ๐๐ฅ
- 1
- ๐๐ฅ
- 0
Javobni ko'rish
๐๐ฅ
#13
Agar ๐(๐ฅ) = ๐ฅ3 + 3๐ฅ boโlsa, quyidagini toping: fโฒ(x) =?
- 3๐ฅ
- 32 + 3๐ฅ
- 3๐ฅ2 + 3๐ฅ๐๐3
- 3๐ฅ
Javobni ko'rish
3๐ฅ2 + 3๐ฅ๐๐3
#14
Agar ๐(๐ฅ) = ๐๐ฅ+ 3๐ฅ2 + 7๐ฅ boโlsa, quyidagini toping: fโฒ(0) =?
- ๐๐ฅ+ 6๐ฅ+ 7
- 1
- 0
- 8
Javobni ko'rish
8
#15
Agar ๐(๐ฅ) = 7๐ฅ boโlsa, quyidagini toping: fโฒ(0) =?
- 7๐ฅ๐๐7
- 0
- ln7
- 7๐ฅ
Javobni ko'rish
ln7
#16
Agar ๐(๐ฅ) = 3๐ฅ boโlsa, quyidagini toping: fโฒ(1) =?
- 1
- 3ln3
- 0
- ln3
Javobni ko'rish
3ln3
#17
Agar ๐(๐ฅ) = 3๐ฅ2 + sin30๐ boโlsa, quyidagini toping: fโฒ(1) =?
- 7
- 0
- 5
- 6
Javobni ko'rish
6
#18
Agar ๐(๐ฅ) = 2๐ฅ4 + 3๐ฅ2 boโlsa, quyidagini toping: fโฒ(x) =?
- 8๐ฅ3 + 6๐ฅ
- 8๐ฅ3 โ6๐ฅ
- 14๐ฅ
- 8๐ฅ4 + 6๐ฅ3
Javobni ko'rish
8๐ฅ3 + 6๐ฅ
#19
Agar ๐(๐ฅ) = 2๐ฅ3 + 3๐ฅโ7 boโlsa, quyidagini toping: fโฒ(x) =?
- 2๐ฅ2 โ4๐ฅ
- 2๐ฅ+ 4
- 6๐ฅ2 + 3
- 6๐ฅ+ 5
Javobni ko'rish
6๐ฅ2 + 3
#20
Agar ๐(๐ฅ) = ๐ฅโ8 boโlsa, quyidagini toping: fโฒ(x) =?
- ๐โฒ(๐ฅ) = โ8๐ฅ
- ๐โฒ(๐ฅ) = โ8๐ฅโ7
- ๐โฒ(๐ฅ) = 8๐ฅ7
- ๐โฒ(๐ฅ) = โ8๐ฅโ9
Javobni ko'rish
๐โฒ(๐ฅ) = โ8๐ฅโ9
#21
Agar ๐(๐ฅ) = ๐ฅโ3 + ๐ฅโ2 boโlsa, quyidagini toping: fโฒ(x) =?
- ๐โฒ(๐ฅ) = โ3๐ฅโ4 โ2๐ฅโ3
- ๐โฒ(๐ฅ) = ๐ฅโ4 โ๐ฅโ3
- ๐โฒ(๐ฅ) = โ3๐ฅโ2 + 2๐ฅโ1
- ๐โฒ(๐ฅ) = ๐ฅโ2 โ๐ฅโ1
Javobni ko'rish
๐โฒ(๐ฅ) = โ3๐ฅโ4 โ2๐ฅโ3
#22
Agar f(x) = 2 sin xยทcosx boโlsa, quyidagini toping: fโฒ(ฯ/2) =?
- 2
- 0
- 1
- 1
Javobni ko'rish
2
#23
Agar ๐(๐ฅ) = 2๐ฅ2 + 1 boโlsa, quyidagini toping: fโฒ(ฯ/4) =?
- ฯ
- ฯ/2
- 1
- 0
Javobni ko'rish
ฯ
#24
Agar (๐ฅ) = cos (๐ฅ2) boโlsa, quyidagini toping: fโฒ(x) =?
- sin (๐ฅ2) โ(2๐ฅ)
- โsin (๐ฅ2) โ(2๐ฅ)
- cos (๐ฅ2) โ(2๐ฅ)
- 2 โsin (๐ฅ2)
Javobni ko'rish
โsin (๐ฅ2) โ(2๐ฅ)
#25
Agar ๐(๐ฅ) = ๐๐๐ 2(5๐ฅ)boโlsa, quyidagini toping:fโฒ(x) =?
- sin(5x)
- โ5ยทsin(10 x)
- 5ยทsin(10 x)
- โ5ยทsin(5x)
Javobni ko'rish
โ5ยทsin(10 x)
#26
Agar f(x) = 5 sin x+ 3 cos x boโlsa, quyidagini toping: fโฒ(ฯ/4) =?
- 4โ2
- โโ2
- โ2
- โ2โ3
Javobni ko'rish
โ2
#27
Agar ๐(๐ฅ) = 1 3 ๐ฅ3 โ16๐ฅ boโlsa, quyidagini toping: fโฒ(4) =? .
- 2
- 3
- 0
- 1
Javobni ko'rish
0
#28
Agar ๐(๐ฅ) = 3๐ฅโ2๐ฅ boโlsa, quyidagini toping: fโฒ(0) =?
- 3ln 2
- 3
- 3
- 0
Javobni ko'rish
3
#29
Agar ๐(๐ฅ) = 2๐ฅโ3๐ฅ boโlsa, quyidagini toping:fโฒ(0) =?
- 2
- 0
- 2
- 2ln 3
Javobni ko'rish
2
#30
Funksiya hosilasini toping: ๐ฆ= ๐๐ฅโ๐ฅ2.
- ๐๐ฅ(๐ฅ2 + ๐ฅ)
- ๐๐ฅ(๐ฅ2 + 2๐ฅ)
- ๐๐ฅ(๐ฅ2 + 2)
- ๐๐ฅ(2๐ฅ+ 1)
Javobni ko'rish
๐๐ฅ(๐ฅ2 + 2๐ฅ)
#31
Funksiya hosilasini toping: ๐ฆ= ๐๐๐ก๐๐ฅ.
- โ
- ๐๐๐ก๐๐ฅ๐๐๐ฅ
- ๐๐๐ก๐๐ฅ
- ๐๐ก๐๐ฅโ๐๐๐ก๐๐ฅโ1
Javobni ko'rish
โ
#32
Agar f(x) = ln(sin x) boโlsa, quyidagini toping: fโฒ(ฯ/4) =?
- 1
- 3
- 1
- โโ3
Javobni ko'rish
1
#33
Funksiya hosilasini toping: y= sin(cos x).
- cosxยทsin(cos x)
- โsinxยทcos(cos x)
- โcosxยทsin(cos x)
- sinxยทcos(cos x)
Javobni ko'rish
โsinxยทcos(cos x)
#34
Ushbu y = 3xยฒ โ 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = 3xยณ โ x + C
- F(x) = 3xยณ โ 2x + C
- F(x) = โ
xยณ โ x + C
- F(x) = xยณ โ x + C
Javobni ko'rish
F(x) = xยณ โ x + C
#35
Ushbu y = x โ 3 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยฒ โ x + C
- F(x) = ยฝxยฒ โ 3x + C
- F(x) = โ
xยฒ โ 3x + C
- F(x) = โ
xยฒ โ 3x + C
Javobni ko'rish
F(x) = ยฝxยฒ โ 3x + C
#36
Ushbu y = x โ 2 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = ยฝxยฒ โ 2x + C
- F(x) = ยฝxยฒ โ x + C
- F(x) = ยฝxยฒ โ ยฝx + C
- F(x) = ยฝxยณ โ 3x + C
Javobni ko'rish
F(x) = ยฝxยฒ โ 2x + C
#37
Ushbu y = 2x โ 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = 2xยฒ โ x + C
- F(x) = xยฒ โ x + C
- F(x) = ยฝxยฒ โ x + C
- F(x) = โ
xยฒ โ 3x + C
Javobni ko'rish
F(x) = xยฒ โ x + C
#38
Ushbu y = xยฒ โ 2x funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ 2xยฒ + C
- F(x) = โ
xยฒ โ ยฝxยฒ + C
- F(x) = โ
xยณ โ xยฒ + C
- F(x) = โ
xยณ โ x + C
Javobni ko'rish
F(x) = โ
xยณ โ xยฒ + C
#39
Ushbu y = 2xยฒ โ 2x + 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ 2xยฒ + 1 + C
- F(x) = โ
xยฒ โ 2x + 1 + C
- F(x) = โ
xยณ โ xยฒ + x + C
- F(x) = โ
xยณ โ xยฒ + x + C
Javobni ko'rish
F(x) = โ
xยณ โ xยฒ + x + C
#40
Ushbu y = 2x โ 2 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = 2xยฒ โ 3x + C
- F(x) = xยฒ โ 2x + C
- F(x) = ยฝxยฒ โ 2x + C
- F(x) = 2xยฒ โ 2x + C
Javobni ko'rish
F(x) = xยฒ โ 2x + C
#41
Ushbu y = xยฒ โ x + 2 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ x + C
- F(x) = โ
xยณ โ 2xยฒ + C
- F(x) = โ
xยณ โ ยฝxยฒ + 2x + C
- F(x) = โ
xยณ โ ยฝxยฒ + 2x + C
Javobni ko'rish
F(x) = โ
xยณ โ ยฝxยฒ + 2x + C
#42
Ushbu y = 4xยณ โ 4x funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = ยผxยฒ โ 4x + C
- F(x) = ยผxโด โ 4x + 4C
- F(x) = ยฝxโด โ 4x + 4C
- F(x) = xโด โ 2xยฒ + C
Javobni ko'rish
F(x) = xโด โ 2xยฒ + C
#43
Ushbu y = xยฒ โ 4 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ 4x + C
- F(x) = ยผxโด โ 4x + C
- F(x) = ยผxยณ โ 4xยฒ โ 4C
- F(x) = โ
xยณ โ 4x + 4 + C
Javobni ko'rish
F(x) = โ
xยณ โ 4x + C
#44
Ushbu y = xยฒ โ 2x + 3 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ ยฝxยฒ + 3x + 3 + C
- F(x) = ยฝxยฒ โ 2x + 3 + C
- F(x) = ยฝxยณ โ xยฒ + 3 + C
- F(x) = โ
xยณ โ xยฒ + 3x + C
Javobni ko'rish
F(x) = โ
xยณ โ xยฒ + 3x + C
#45
Ushbu y = xยฒ โ 4 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ 4x + C
- F(x) = โ
xยณ โ 4x + 4 + C
- F(x) = ยผxยณ โ 4x + C
- F(x) = โ
xยณ โ 3x + C
Javobni ko'rish
F(x) = โ
xยณ โ 4x + C
#46
Ushbu y = 1โx โ 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = ยฝ lnยฒ x โ x + C
- F(x) = 2 ln x โ x + 1 + C
- F(x) = ln xยฒ โ x + C
- F(x) = ln x โ x + C
Javobni ko'rish
F(x) = ln x โ x + C
#47
Ushbu y = xยฒ โ x + 2 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = ยฝxยฒ โ ยฝx + 2 + C
- F(x) = ยฝxยฒ โ ยฝx + 4 + C
- F(x) = ยผxโด โ โ
xยณ + 2xยฒ + 2x + C
- F(x) = โ
xยณ โ ยฝxยฒ + 2x + C
Javobni ko'rish
F(x) = โ
xยณ โ ยฝxยฒ + 2x + C
#48
Ushbu y = ยฝxยฒ โ x + 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ ยฝxยฒ + 2x + 1 + C
- F(x) = โ
xยณ โ xยฒ + 1 + C
- F(x) = โ
xยณ โ ยฝxยฒ + x + C
- F(x) = โ
xยฒ โ x + C
Javobni ko'rish
F(x) = โ
xยณ โ ยฝxยฒ + x + C
#49
Ushbu y = 1โ(x โ 1) + xยฒ + 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = ln(x โ 1) + โ
xยณ + x + C
- F(x) = ln(x โ 1) + ยฝxยฒ + x + C
- F(x) = ln(x โ 1) + ยฝxโด + 2x + C
- F(x) = ln(x โ 1) + โ
xยณ + x + C
Javobni ko'rish
F(x) = ln(x โ 1) + โ
xยณ + x + C
#50
Ushbu y = x โ 1โx + 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = ยฝxยฒ โ ln x + x + C
- F(x) = โ
xยณ โ 2 ln x + x + C
- F(x) = ยผxยฒ โ 2 ln x + x + C
- F(x) = โ
xยณ โ ln x + x + C
Javobni ko'rish
F(x) = ยฝxยฒ โ ln x + x + C
#51
Ushbu y = 3xยฒ + 2x โ 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = xยณ + xยฒ โ x + C
- F(x) = โ
xยณ + xยฒ โ x + C
- F(x) = xยณ + 2xยฒ โ x + C
- F(x) = 3xยณ + xยฒ โ x + C
Javobni ko'rish
F(x) = xยณ + xยฒ โ x + C
#52
Ushbu y = 4x โ 5 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = xยฒ โ 5x + C
- F(x) = 4xยฒ โ 5x + C
- F(x) = 2xยฒ โ 10x + C
- F(x) = 2xยฒ โ 5x + C
Javobni ko'rish
F(x) = 2xยฒ โ 5x + C
#53
Ushbu y = xยฒ + 2x funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ + 3x + C
- F(x) = ยฝxยฒ + 3x + C
- F(x) = โ
xยณ + xยฒ + C
- F(x) = xยณ + 3xยฒ + C
Javobni ko'rish
F(x) = โ
xยณ + xยฒ + C
#54
Ushbu y = 2xยณ funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xโด + C
- F(x) = ยฝxโด + C
- F(x) = 2xโด + C
- F(x) = xโด + C
Javobni ko'rish
F(x) = ยฝxโด + C
#55
Ushbu y = xยฒ โ 3x + 1 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยณ โ 3xยฒ + x + C
- F(x) = โ
xยณ โ 3โ2xยฒ + x + C
- F(x) = xยณ โ 3xยฒ + x + C
- F(x) = ยฝxยฒ โ 3x + 1 + C
Javobni ko'rish
F(x) = โ
xยณ โ 3โ2xยฒ + x + C
#56
Ushbu y = 6xยฒ funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = 6xยณ + C
- F(x) = 3xยณ + C
- F(x) = 2xยณ + C
- F(x) = xยณ + C
Javobni ko'rish
F(x) = 2xยณ + C
#57
Ushbu y = 5 funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = xโต + C
- F(x) = ยฝxยฒ + C
- F(x) = 5x + C
- F(x) = 5 + C
Javobni ko'rish
F(x) = 5x + C
#58
Ushbu y = 7x funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = 7x + C
- F(x) = 7xยฒ + C
- F(x) = ยฝxยฒ + C
- F(x) = 7โ2xยฒ + C
Javobni ko'rish
F(x) = 7โ2xยฒ + C
#59
Ushbu y = xยณ โ x funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = ยผxโด โ ยฝxยฒ + C
- F(x) = xโด โ xยฒ + C
- F(x) = ยฝxโด โ ยฝxยฒ + C
- F(x) = ยผxยณ โ ยฝxยฒ + C
Javobni ko'rish
F(x) = ยผxโด โ ยฝxยฒ + C
#60
Ushbu y = 2xยฒ โ 4x funksiyaning boshlangโich funksiyalaridan birini toping.
- F(x) = โ
xยฒ โ 2x + C
- F(x) = xยณ โ 4xยฒ + C
- F(x) = โ
xยณ โ 2xยฒ + C
- F(x) = xยณ โ 2xยฒ + C
Javobni ko'rish
F(x) = โ
xยณ โ 2xยฒ + C
#61
Ushbu โซ๐๐ฅ integralni hisoblang.
- ๐ฅ+ ๐ถ
- ๐ถ
- โ๐ฅ+ ๐ถ
- ๐ฅโ๐ถ
Javobni ko'rish
๐ฅ+ ๐ถ
#62
Ushbu โโซ๐๐ฅ integralni hisoblang.
- ๐ฅโ๐ถ
- ๐ถ
- ๐ฅ+ ๐ถ
- โ๐ฅ+ ๐ถ
Javobni ko'rish
โ๐ฅ+ ๐ถ
#63
Ushbu โซ2๐ฅ๐๐ฅ integralni hisoblang.
- โ
- 2๐ฅ
- 2๐ฅ
- 2๐ฅ
Javobni ko'rish
2๐ฅ
#64
Ushbu โซ 2๐๐ฅ integralni hisoblang.
- 2๐ฅ+ ๐ถ
- ๐ฅโ๐ถ
- โ๐ฅ+ ๐ถ
- ๐ถ
Javobni ko'rish
2๐ฅ+ ๐ถ
#65
Ushbu โโซ 2๐๐ฅ integralni hisoblang.
- ๐ฅโ๐ถ
- ๐ฅ+ ๐ถ
- ๐ถ
- โ2๐ฅ+ ๐ถ
Javobni ko'rish
โ2๐ฅ+ ๐ถ
#66
Ushbu โซ 2๐ฅ๐๐ฅ integralni hisoblang.
- 2๐ฅ
- โ
- 2๐ฅ
- 2๐ฅ
Javobni ko'rish
2๐ฅ
#67
Ushbu โซ ๐3๐ฅ+1๐๐ฅ integralni hisoblang.
- ๐3๐ฅ+1
- ๐3๐ฅ+1
- ๐3๐ฅ+1
- ๐3๐ฅ+1
Javobni ko'rish
๐3๐ฅ+1
#68
Ushbu โซ 2024๐ฅ2023๐๐ฅ integralni hisoblang.
- ๐ฅ2024
- ๐ฅ2024 + ๐ถ
- ๐ฅ2023
- โ
Javobni ko'rish
๐ฅ2024 + ๐ถ
#69
Ushbu โซ 4๐๐ฅ integralni hisoblang.
- x
- ๐ฅ2
- ๐ฅ
- 4๐ฅ+ ๐ถ
Javobni ko'rish
4๐ฅ+ ๐ถ
#70
Ushbu โซ (sin ๐ฅ+ cos ๐ฅ)๐๐ฅ integralni hisoblang.
- โsin ๐ฅ+ cos ๐ฅ+ ๐ถ
- sin ๐ฅ+ cos ๐ฅ+ ๐ถ
- โsin ๐ฅโcos ๐ฅ+ ๐ถ
- sin ๐ฅโcos ๐ฅ+ ๐ถ
Javobni ko'rish
โsin ๐ฅ+ cos ๐ฅ+ ๐ถ
#71
Ushbu โซ sin2 ๐ฅ๐๐ฅ+ โซ cos2 ๐ฅ๐๐ฅ integralni hisoblang.
- ๐ฅ+ ๐ถ
- sin ๐ฅ+ cos ๐ฅ+ ๐ถ
- sin2 ๐ฅโcos2 ๐ฅ+ ๐ถ
- sin2 ๐ฅ+ cos2 ๐ฅ+ ๐ถ
Javobni ko'rish
๐ฅ+ ๐ถ
#72
Ushbu โซ 1โsin2 ๐ฅ cos ๐ฅ๐๐ฅ integralni hisoblang.
- sin ๐ฅ+ cos ๐ฅ+ ๐ถ
- sin ๐ฅ+ B
- cos ๐ฅ+ ๐ถ
- sin ๐ฅโcos ๐ฅ+ ๐ถ
Javobni ko'rish
cos ๐ฅ+ ๐ถ
#73
Ushbu โซ 1โcos2 ๐ฅ sin ๐ฅ ๐๐ฅ integralni hisoblang.
- sin ๐ฅ+ ๐ถ
- โcos ๐ฅ+ ๐ถ
- cos ๐ฅ+ ๐ถ
- โsin ๐ฅ+ ๐ถ
Javobni ko'rish
sin ๐ฅ+ ๐ถ
#74
Ushbu โซ (1 + ๐ก๐2๐ฅ)cos2 ๐ฅ๐๐ฅ integralni hisoblang.
- โ๐ฅ+ ๐ถ
- ๐ฅ+ ๐ถ
- cos2 ๐ฅ+ ๐ถ
- tg๐ฅ+ ๐ถ
Javobni ko'rish
๐ฅ+ ๐ถ
#75
Ushbu โซ (tg๐ฅโ
ctg๐ฅ)๐๐ฅ integralni hisoblang.
- ๐ฅ+ ๐ถ
- โ๐ฅ+ ๐ถ
- tg๐ฅ+ ๐ถ
- ctg๐ฅ+ ๐ถ
Javobni ko'rish
๐ฅ+ ๐ถ
#76
Ushbu โซ ( 5 2 sin ๐ฅ+ 4) ๐๐ฅ integralni hisoblang.
- โ
- 5
- โ
- โ
Javobni ko'rish
โ
#77
Ushbu โซ (โ2sin ๐ฅ+ 3cos ๐ฅ)๐๐ฅ integralni hisoblang.
- โ2cos ๐ฅ+ 3sin ๐ฅ+ ๐ถ
- 2cos ๐ฅ+ 3sin ๐ฅ+ ๐ถ
- โ2cos ๐ฅโ3sin ๐ฅ+ ๐ถ
- 2cos ๐ฅโ3sin ๐ฅ+ ๐ถ
Javobni ko'rish
2cos ๐ฅ+ 3sin ๐ฅ+ ๐ถ
#78
Ushbu โซ (4๐ฅ+ 4)๐๐ฅ integralni hisoblang.
- 4๐ฅ
- 4๐ฅ
- 4๐ฅ
- 4๐ฅ
Javobni ko'rish
4๐ฅ
#79
Ushbu โซ (๐+ ๐๐ฅ)๐๐ฅ integralni hisoblang.
- ๐๐ฅ+ ๐ถ
- ๐๐ฅ+ ๐๐ฅ+ ๐ถ
- ๐๐ฅโ๐๐ฅ+ ๐ถ
- ๐๐ฅ+ ๐ถ
Javobni ko'rish
๐๐ฅ+ ๐๐ฅ+ ๐ถ
#80
Ushbu โซ (๐๐ฅ+4 + 1 ๐ฅ) ๐๐ฅ integralni hisoblang.
- ๐๐ฅ+4 + ln ๐ฅ+ ๐ถ
- 3๐ฅ+ ๐3๐ฅ+ ๐ถ
- ln 3๐ฅ+ ๐3๐ฅ+ ๐ถ
- ln ๐ฅ+ ๐๐ฅ+ ๐ถ
Javobni ko'rish
๐๐ฅ+4 + ln ๐ฅ+ ๐ถ
#81
Ushbu โซ ๐๐ฅ+๐ฆ๐๐ฅ integralni hisoblang.
- ๐๐ฆ+ ๐ถ
- ๐๐ฅ+๐ฆ+ ๐ถ
- โ๐๐ฆ+ ๐ถ
- โ๐๐ฅ+ ๐ถ
Javobni ko'rish
๐๐ฅ+๐ฆ+ ๐ถ
#82
Ushbu โซ ๐๐ฅ+๐ฆ๐๐ฆ integralni hisoblang.
- ๐๐ฅ+๐ฆ+ ๐ถ
- ๐๐ฅ+ ๐ถ
- โ๐๐ฅ+๐ฆ+ ๐ถ
- โ๐๐ฆ+ ๐ถ
Javobni ko'rish
๐๐ฅ+๐ฆ+ ๐ถ
#83
Ushbu โซ 6๐ฅln 6๐๐ฅ integralni hisoblang.
- ln 6๐ฅ+ ๐ถ
- 6๐ฅ+ ๐ถ
- โ6๐ฅ+ ๐ถ
- 6๐ฅ+ ๐ถ
Javobni ko'rish
6๐ฅ+ ๐ถ
#84
Ushbu โซ 16๐ฅโ
ln 2๐๐ฅ integralni hisoblang.
- 24๐ฅln 4 + ๐ถ
- 24๐ฅโ4 + ๐ถ
- ln 2๐ฅ+ ๐ถ
- 24๐ฅ+ ๐ถ
Javobni ko'rish
24๐ฅ+ ๐ถ
#85
Ushbu โซ ln3 ๐ฅ ๐ฅ๐๐ฅ integralni hisoblang.
- ln5 ๐ฅ
- ln4 ๐ฅ
- ln2 ๐ฅ
- ln3 ๐ฅ
Javobni ko'rish
ln4 ๐ฅ
#86
Ushbu โซ 2sin ๐ฅโ
cos ๐ฅ๐๐ฅ integralni hisoblang.
- cos 2๐ฅ+ ๐ถ
- cos2 ๐ฅ+ ๐ถ
- sin2 ๐ฅ+ ๐ถ
- sin 2๐ฅ+ ๐ถ
Javobni ko'rish
sin2 ๐ฅ+ ๐ถ
#87
Ushbu โซ cos ๐ฅ sin ๐ฅ๐๐ฅ integralni hisoblang.
- ln |cos ๐ฅ| + ๐ถ
- โln |sin ๐ฅ|๐ฅ+ ๐ถ
- โln |cos ๐ฅ| + ๐ถ
- ln |sin ๐ฅ| + ๐ถ
Javobni ko'rish
ln |sin ๐ฅ| + ๐ถ
#88
Ushbu โซ ๐๐ฅ ๐ฅโ
ln ๐ฅ๐๐ฅ integralni hisoblang.
- ln (ln ๐ฅ) + ๐ถ
- โln (ln ๐ฅ) + ๐ถ
- โln ๐ฅ+ ๐ถ
Javobni ko'rish
ln (ln ๐ฅ) + ๐ถ
#89
Aniq integralni hisoblang. โซ1 3 ๐ฅ๐๐ฅ
- 2
- 0
- 1
- 4
Javobni ko'rish
4
#90
Aniq integralni hisoblang. โซ1 3 2๐ฅ๐๐ฅ
- 0
- 4
- 6
- 8
Javobni ko'rish
8
#91
Aniq integralni hisoblang. โซ1 3 3๐ฅ2๐๐ฅ
- 6
- 26
- 24
- 20
Javobni ko'rish
26
#92
Aniq integralni hisoblang. โซ0 1 4๐ฅ3๐๐ฅ
- 6
- 1
- 2
- 0
Javobni ko'rish
1
#93
Aniq integralni hisoblang. โซ0 1 3๐ฅ2๐๐ฅ
- 0
- 1
- 2
- 6
Javobni ko'rish
1
#94
Aniq integralni hisoblang. โซโ1 1 ๐ฅ๐๐ฅ
- 2
- 6
- 1
- 0
Javobni ko'rish
0
#95
Aniq integralni hisoblang. โซโ1 1 ๐ฅ3๐๐ฅ
- 0
- 2
- 1
- 6
Javobni ko'rish
0
#96
Aniq integralni hisoblang. โซโ1 1 ๐ฅ5๐๐ฅ
- 2
- 6
- 1
- 0
Javobni ko'rish
0
#97
Aniq integralni hisoblang. โซ0 2 6๐ฅ2๐๐ฅ
- 20
- 16
- 10
- 6
Javobni ko'rish
20
#98
Aniq integralni hisoblang. โซ๐ 6 ๐ 3 cos ๐ฅ๐๐ฅ
- 1
- 1
- โ3โ1
- 0
Javobni ko'rish
โ3โ1
#99
Aniq integralni hisoblang. โซ๐ 6 ๐ 3 2cos ๐ฅ๐๐ฅ
- 1
- 1
- โ3 โ1
- 0
Javobni ko'rish
โ3 โ1
#100
Aniq integralni hisoblang. โซ0 ๐ 2 sin ๐ฅ๐๐ฅ
- 1
- 0
- 1
- 1
Javobni ko'rish
1
#101
Aniq integralni hisoblang. โซ1 ๐4 1 ๐ฅ๐๐ฅ
- 0
- 1
- 4
- 1
Javobni ko'rish
4
#102
โซ0 ln 7 ๐๐ฅ๐๐ฅ= ?
- 1
- 0
- 6
- 7
Javobni ko'rish
6
#103
Aniq integralni hisoblang. โซ0 1 1 1+๐ฅ2 ๐๐ฅ
- 0
- ๐
- ๐
- ๐
Javobni ko'rish
๐
#104
Aniq integralni hisoblang. โซ2 3 ๐ฅ2๐๐ฅ
- 19
- 2
- 1
- 1
Javobni ko'rish
19
#105
Aniq integralni hisoblang. โซโ1 0 ๐๐ฅ๐๐ฅ
- ๐
- ๐โ1
- 1
- 1
Javobni ko'rish
๐โ1
#106
Aniq integralni hisoblang. โซ2 6 2 ๐ฅ๐๐ฅ
- 1
- 0
- ๐
- ln 9
Javobni ko'rish
ln 9
#107
Aniq integralni hisoblang. โซโ1 1 ๐ฅ7๐๐ฅ
- 2
- 0
- 6
- 1
Javobni ko'rish
0
#108
Aniq integralni hisoblang. โซโ๐ 2 ๐ 2 cos ๐ฅ๐๐ฅ
- 2
- 1
- 1
- 0
Javobni ko'rish
2
#109
Aniq integralni hisoblang. โซโ3 3 ๐ฅ2๐๐ฅ
- 18
- 1
- 11
- 0
Javobni ko'rish
18
#110
Aniq integralni hisoblang. โซโ2 2 ๐ฅ2๐๐ฅ
- 16
- 2
- 1
- 1
Javobni ko'rish
16
#111
Sonli qator qaysi javobda to'g'ri berilgan?
- ๐1 + ๐2 + ๐3 + โฏ+ ๐๐+ โฏ
- ๐1 + ๐2 + ๐3
- ๐1 + ๐2 + ๐3 + โฏ+ ๐๐
- ๐1
Javobni ko'rish
๐1 + ๐2 + ๐3 + โฏ+ ๐๐+ โฏ
#112
1 + 1 2 + 1 4 + 1 8 + โฏ ni hisoblang.
- 1
- 3
- 2
- 1
Javobni ko'rish
2
#113
โ๐=1 โ (โ1)๐ 2๐+1 sonli qatorning yettinchi hadini hisoblang.
- โ
- โ
- 1
- 1
Javobni ko'rish
โ
#114
โ๐=1 โ 1 โ๐ sonli qator yaqinlashuvchimi?
- ham yaqinlashuvchi, ham uzoqlashuvchi
- ha, yaqinlashuvchi
- to'g'ri javob berilmagan
- yo'q, uzoqlashuvchi
Javobni ko'rish
yo'q, uzoqlashuvchi
#115
1 + 2 + 3 + โฏ+ ๐+ โฏ sonli qatorning dastlabki ๐ ta hadi yig'indisini hisoblang.
- ๐
- (๐+1)(๐+2)
- ๐(๐+1)
- ๐
Javobni ko'rish
๐(๐+1)
#116
โ๐=1 โ (โ1)๐+1 sonli qatorning dastlabki 9 ta hadi yig'indisini hisoblang.
- 1
- 1
- 2
- 0
Javobni ko'rish
1
#117
โ๐=1 โ (โ1)๐+1 sonli qatorning dastlabki 12 ta hadi yig'indisini hisoblang.
- 2
- 1
- 0
- 1
Javobni ko'rish
0
#118
โ๐=1 โ (โ1)๐+1 sonli qatorning dastlabki 13 ta hadi yig'indisini hisoblang.
- 1
- 1
- 2
- 0
Javobni ko'rish
1
#119
โ๐=1 โ (โ1)๐+1 sonli qatorning dastlabki 11 ta hadi yig'indisini hisoblang.
- 1
- 1
- 2
- 0
Javobni ko'rish
1
#120
1 + 1 3 + 1 9 + 1 27 + โฏ+ 1 3๐+ โฏ ni hisoblang.
- 1
- 2
- 1
- 3
Javobni ko'rish
3
#121
โ๐=1 โ 1 ๐(๐+1) sonli qatorning yig'indisini toping.
- 1
- 1
- 0
- 2
Javobni ko'rish
1
#122
โ๐=1 โ 2 ๐(๐+1) sonli qatorning yig'indisini toping.
- 1
- 1
- 2
- 0
Javobni ko'rish
2
#123
โ๐=1 โ 1 ๐(๐+1) sonli qatorning ๐ ta yig'indisini toping.
- ๐
- ๐
- 2โ๐
- 2๐
Javobni ko'rish
๐
#124
โ๐=1 โ 2 ๐(๐+1) sonli qatorning ๐ ta yig'indisini toping.
- 2๐
- ๐
- 2โ๐
- ๐
Javobni ko'rish
2๐
#125
1 1โ
3 + 1 2โ
5 + 1 3โ
7 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐=
- ๐๐=
- ๐๐=
- ๐๐= ๐
Javobni ko'rish
๐๐=
#126
1 + 1 4 + 1 16 + 1 64 + โฏ ni hisoblang.
- 1
- 4
- 1
- 1
Javobni ko'rish
4
#127
โ๐=1 โ (โ1)๐ 2๐+1 sonli qatorning beshinchi hadini hisoblang.
- 1
- โ
- 1
- โ
Javobni ko'rish
โ
#128
โ๐=1 โ (โ1)๐ 2๐+1 sonli qatorning uchinchi hadini hisoblang.
- โ
- 1
- โ
- 1
Javobni ko'rish
โ
#129
โ๐=1 โ 1 ๐ sonli qator yaqinlashuvchimi?
- ham yaqinlashuvchi, ham uzoqlashuvchi
- yo'q, uzoqlashuvchi
- to'g'ri javob berilmagan
- ha, yaqinlashuvchi
Javobni ko'rish
yo'q, uzoqlashuvchi
#130
2 + 4 + 6 + โฏ+ 2๐+ โฏ sonli qatorning dastlabki ๐ ta hadi yig'indisini hisoblang.
- ๐(๐+ 1)
- ๐
- ๐
- (๐+1)(๐+2)
Javobni ko'rish
๐(๐+ 1)
#131
โ๐=1 โ (โ1)๐ sonli qatorning dastlabki 8 ta hadi yig'indisini hisoblang.
- 0
- 1
- 1
- 2
Javobni ko'rish
0
#132
โ๐=1 โ (โ1)๐ sonli qatorning dastlabki 13 ta hadi yig'indisini hisoblang.
- 0
- 1
- 2
- 1
Javobni ko'rish
1
#133
โ๐=1 โ (โ1)๐ sonli qatorning dastlabki 11 ta hadi yig'indisini hisoblang.
- 2
- 1
- 0
- 1
Javobni ko'rish
1
#134
โ๐=1 โ (โ1)๐ sonli qatorning dastlabki 12 ta hadi yig'indisini hisoblang.
- 1
- 1
- 0
- 2
Javobni ko'rish
0
#135
1 + 1 5 + 1 25 + 1 125 + โฏ+ 1 5๐+ โฏ ni hisoblang.
- 1
- 5
- 1
- 4
Javobni ko'rish
5
#136
โ๐=1 โ 3 ๐(๐+1) sonli qatorning yig'indisini toping.
- 2
- 0
- 3
- 3
Javobni ko'rish
3
#137
1 2โ
3 + 1 3โ
4 + 1 4โ
5 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐=
- ๐๐=
- ๐๐= ๐
- ๐๐=
Javobni ko'rish
๐๐=
#138
2 + 5 + 8 + 11 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐= 4๐โ2
- ๐๐= 2๐+ 1
- ๐๐= ๐+ 1
- ๐๐= 3๐โ1
Javobni ko'rish
๐๐= 3๐โ1
#139
5 3โ
4 + 5 4โ
5 + 5 5โ
6 + โฏ86 sonli qator berilgan. ๐๐ ni toping.
- ๐๐=
- ๐๐=
- ๐๐=
- ๐๐= ๐
Javobni ko'rish
๐๐=
#140
4 + 6 + 8 + 10 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐= ๐+ 3
- ๐๐= 2๐+ 2
- ๐๐= 4๐โ2
- ๐๐= 3๐+ 1
Javobni ko'rish
๐๐= 2๐+ 2
#141
1 3 + 1 9 + 1 27 + โฏ+ 1 3๐+ โฏ ni hisoblang.
- 1
- 1
- 1
- 1
Javobni ko'rish
1
#142
1 2 + 1 4 + 1 8 + โฏ ni hisoblang.
- 3
- 2
- 1
- 1
Javobni ko'rish
1
#143
1 4 + 1 16 + 1 64 + โฏ ni hisoblang.
- 1
- 1
- 1
- 1
Javobni ko'rish
1
#144
1 5 + 1 25 + 1 125 + โฏ+ 1 5๐+ โฏ ni hisoblang.
- 4
- 1
- 1
- 1
Javobni ko'rish
1
#145
1 2 + 1 6 + 1 12 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐=
- ๐๐= ๐
- ๐๐=
- ๐๐=
Javobni ko'rish
๐๐=
#146
5 + 8 + 11 + 14 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐= 2๐+ 3
- ๐๐= 4๐+ 1
- ๐๐= 3๐+ 2
- ๐๐= 6๐โ1
Javobni ko'rish
๐๐= 3๐+ 2
#147
2 + 3 + โฏ+ ๐+ โฏ sonli qatorning dastlabki ๐ ta hadi yig'indisini hisoblang.
- (๐+1)(๐+2)
- ๐
- ๐(๐+3)
- ๐+3
Javobni ko'rish
๐(๐+3)
#148
โ๐=1 โ (โ1)๐+1 sonli qatorning dastlabki 11 ta hadi yig'indisini hisoblang.
- 0
- 1
- 1
- 2
Javobni ko'rish
1
#149
โ๐=1 โ (โ1)๐+1 sonli qatorning dastlabki 14 ta hadi yig'indisini hisoblang.
- 2
- 1
- 1
- 0
Javobni ko'rish
0
#150
1 3 + 1 9 + 1 27 + โฏ+ 1 3๐+ โฏ ni hisoblang.
- 1
- 1
- 1
- 2
Javobni ko'rish
1
#151
โ๐=1 โ 3 ๐(๐+1) sonli qatorning yig'indisini toping.
- 2
- 3
- 1
- 0
Javobni ko'rish
3
#152
1 2โ
3 + 1 3โ
5 + 1 4โ
7 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐=
- ๐๐=
- ๐๐=
- ๐๐= ๐
Javobni ko'rish
๐๐=
#153
1 4 + 1 16 + 1 64 + โฏ ni hisoblang.
- 1
- 1
- 1
- 1
Javobni ko'rish
1
#154
โ๐=1 โ (โ1)๐ 4๐+1 sonli qatorning beshinchi hadini hisoblang.
- 1
- โ
- โ
- 1
Javobni ko'rish
โ
#155
โ๐=1 โ 1 ๐(๐+1) sonli qatorning dastlabki 6 ta hadi yig`indisini hisoblang.
- 6
- 1
- 1
- 4
Javobni ko'rish
6
#156
โ๐=1 โ 1 3๐ sonli qator yaqinlashuvchimi?
- ha, yaqinlashuvchi
- to'g'ri javob berilmagan
- yo'q, uzoqlashuvchi
- ham yaqinlashuvchi, ham uzoqlashuvchi
Javobni ko'rish
yo'q, uzoqlashuvchi
#157
4 + 8 + 12 + โฏ+ 4๐+ โฏ sonli qatorning dastlabki ๐ ta hadi yig'indisini hisoblang.
- 2๐(๐+ 1)
- ๐
- (๐+ 1)(๐+ 2)
- ๐
Javobni ko'rish
(๐+ 1)(๐+ 2)
#158
โ๐=1 โ (โ1)๐ sonli qatorning dastlabki 5 ta hadi yig'indisini hisoblang.
- 2
- 0
- 1
- 1
Javobni ko'rish
1
#159
โ๐=1 โ (โ1)๐ sonli qatorning dastlabki 7 ta hadi yig'indisini hisoblang.
- 1
- 0
- 1
- 2
Javobni ko'rish
0
#160
โ๐=1 โ 4 ๐(๐+1) sonli qatorning yig'indisini toping.
- 4
- 0
- 4
- 2
Javobni ko'rish
4
#161
4 + 7 + 10 + 13 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐= 4๐โ2
- ๐๐= 2๐+ 2
- ๐๐= ๐+ 1
- ๐๐= 3๐+ 1
Javobni ko'rish
๐๐= 3๐+ 1
#162
2 3โ
4 + 2 4โ
5 + 2 5โ
6 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐=
- ๐๐= ๐
- ๐๐=
- ๐๐=
Javobni ko'rish
๐๐=
#163
5 + 7 + 9 + 11 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐= 4๐โ2
- ๐๐= 3๐+ 1
- ๐๐= ๐+ 4
- ๐๐= 2๐+ 3
Javobni ko'rish
๐๐= 2๐+ 3
#164
2 + 1 3 + 1 9 + 1 27 + โฏ+ 1 3๐+ โฏ ni hisoblang.
- 2
- 2
- 2
- 2
Javobni ko'rish
2
#165
2 + 1 2 + 1 4 + 1 8 + โฏ ni hisoblang.
- 3
- 1
- 2
- 4
Javobni ko'rish
3
#166
1 + 1 4 + 1 16 + 1 64 + โฏ ni hisoblang.
- 1
- 1
- 1
- 1
Javobni ko'rish
1
#167
1 + 1 5 + 1 25 + 1 125 + โฏ+ 1 5๐+ โฏ ni hisoblang.
- 1
- 1
- 2
- 1
Javobni ko'rish
1
#168
3 + 8 + 13 + 18 + โฏ sonli qator berilgan. ๐๐ ni toping.
- ๐๐= 2๐+ 3
- ๐๐= 5๐โ2
- ๐๐= 6๐โ3
- ๐๐= 4๐โ1
Javobni ko'rish
๐๐= 5๐โ2
#169
1 2 โ 1 4 + 1 8 + โฏ ni hisoblang.
- 0
- 1
- 1
- 1
Javobni ko'rish
1
#170
1 โ 1 4 + 1 16 โ 1 64 + โฏ ni hisoblang.
- 1
- 4
- 1
- 1
Javobni ko'rish
4
#171
1 โ 1 5 + 1 25 โ 1 125 + โฏ+ (โ1)๐+1 5๐ + โฏ ni hisoblang.
- 5
- 1
- 1
- 4
Javobni ko'rish
5
#172
๐ฆโฒ = sin ๐ฅ tenglamaning yechimini toping.
- sin ๐ฅ+ ๐ถ
- โcos ๐ฅ+ ๐ถ
- โsin ๐ฅ+ ๐ถ
- cos ๐ฅ+ ๐ถ
Javobni ko'rish
โcos ๐ฅ+ ๐ถ
#173
๐ฆโฒ = cos ๐ฅ tenglamaning yechimini toping.
- cos ๐ฅ+ ๐ถ
- โsin ๐ฅ+ ๐ถ
- sin ๐ฅ+ ๐ถ
- โcos ๐ฅ+ ๐ถ
Javobni ko'rish
sin ๐ฅ+ ๐ถ
#174
๐ฆโฒ = tan ๐ฅ tenglamaning yechimini toping.
- ln |sin ๐ฅ| + ๐ถ
- ln cos ๐ฅ+ ๐ถ
- โln |cos ๐ฅ| + ๐ถ
- โln sin ๐ฅ+ ๐ถ
Javobni ko'rish
โln |cos ๐ฅ| + ๐ถ
#175
๐ฅ๐ฆโฒ = 1 tenglamaning yechimini toping.
- ln |๐ฅ| + ๐ถ
- ln ๐ฅ+ ๐ถ
- โln |๐ฅ| + ๐ถ
- โln ๐ฅ+ ๐ถ
Javobni ko'rish
ln |๐ฅ| + ๐ถ
#176
๐ฆโฒ = ๐ฅ+ 1 tenglamaning yechimini toping.
- ๐ฅ2
- ๐ฅ2
- ๐ฅ+ ๐ถ
- ๐ฅ2
Javobni ko'rish
๐ฅ2
#177
๐ฆ๐ฆโฒ = ๐ฅโ1 tenglamaning yechimini toping.
- ๐ฆ2
- ๐ฆ2
- ๐ฆ2
- ๐ฆ2
Javobni ko'rish
๐ฆ2
#178
(1 + ๐ฆ2)๐๐ฅ+ (1 + ๐ฅ2)๐๐ฆ= 0 tenglamaning yechimini toping.
- arctan ๐ฅ+ arctan ๐ฆ= 0
- arctan ๐ฅโarctan ๐ฆ= ๐ถ
- arctan ๐ฅ+ arctan ๐ฆ= ๐ถ
- arctan ๐ฅโarctan ๐ฆ= 0
Javobni ko'rish
arctan ๐ฅ+ arctan ๐ฆ= ๐ถ
#179
(4 + ๐ฆ2)๐๐ฅ+ (9 + ๐ฅ2)๐๐ฆ= 0 tenglamaning yechimini toping.
- arctan
- 2arctan
- arctan
- 2arctan
Javobni ko'rish
2arctan
#180
(4 + ๐ฆ2)๐๐ฅ= (9 + ๐ฅ2)๐๐ฆ tenglamaning yechimini toping.
- arctan
- 2arctan
- arctan
- 2arctan
Javobni ko'rish
2arctan
#181
๐ฆ(1 + ๐ฅ2)๐๐ฆ= ๐ฅ(1 + ๐ฆ2)๐๐ฅ tenglamaning yechimini toping.
- ๐ฆ2 = โ(1 + ๐ฅ2) โ
๐ถ
- 1 + ๐ฆ2 = (1 + ๐ฅ2) โ
๐ถ
- ๐ฆ2 = (1 + ๐ฅ2) โ
๐ถ
- 1 + ๐ฆ2 = โ(1 + ๐ฅ2) โ
๐ถ
Javobni ko'rish
1 + ๐ฆ2 = (1 + ๐ฅ2) โ
๐ถ
#182
(๐ฅ+ 1)2๐๐ฆ= (๐ฆโ2)2๐๐ฅ tenglamaning yechimini toping.
- 1
- โ
- 1
- โ
Javobni ko'rish
1
#183
(๐ฅ+ 1)3๐๐ฆ= (๐ฆโ2)3๐๐ฅ tenglamaning yechimini toping.
- 1
- โ
- 1
- โ
Javobni ko'rish
1
#184
Differensial tenglama deb nimaga aytiladi?
- Erkli o'zgaruvchi va noma'lum funksiya hosilalari yoki differensiallarini bog'lovchi
- Noma'lum funksiyani bogโ lovchi munosabat differensial tenglama deyiladi
- Erkli o'zgaruvchi va noma'lum funksiya bog'lovchi munosabatlar differensial tenglama
- Erkli o'zgaruvchi va noma'lum funksiya va uning hosilalari yoki differensiallarini bogโlovchi
Javobni ko'rish
Erkli o'zgaruvchi va noma'lum funksiya va uning hosilalari yoki differensiallarini bogโlovchi
#185
Oddiy differensial tenglama deb nimaga aytiladi?
- Agar noma'lum funksiya beshta erkli o'zgaruvchiga bog'liq bo'lsa, bunday differensial
- Agar noma'lum funksiya uchta erkli o'zgaruvchiga bog ' liq bo'lsa, bunday differensial
- Agar noma'lum funksiya ikkita erkli o'zgaruvchiga bog'liq bo'lsa, bunday differensial tenglama
- Agar noma'lum funksiya bitta erkli o'zgaruvchiga bog'liq bo'lsa, bunday differensial ' bog
Javobni ko'rish
Agar noma'lum funksiya bitta erkli o'zgaruvchiga bog'liq bo'lsa, bunday differensial ' bog
#186
Differensial tenglamaga kirgan hosilalarning eng yuqori tartibi nima deb ataladi?
- Differensial tenglama tartibi
- Differensial tenglama o'lchami
- Differensial tenglama o'lchovi
- Differensial tenglama yechimi
Javobni ko'rish
Differensial tenglama tartibi
#187
Differensial tenglamaning yechimi deb qanday funksiyaga aytiladi?
- Har qanday funksionalga aytiladi
- Har qanday uzluksiz funksiyaga aytiladi
- Har qanday uzilishga ega bo'lgan funksiyaga aytiladi
- Ixtiyoriy differensiallanuvchi funksiyaga aytiladi
Javobni ko'rish
Ixtiyoriy differensiallanuvchi funksiyaga aytiladi
#188
๐ฆโฒโฒ + 3๐ฆโฒ = 0 tenglamaning tartibini aniqlang.
- 3
- 1
- 2
- 0
Javobni ko'rish
2
#189
๐ฆโฒโฒ + 3๐ฆ4 + cosx = 0 tenglamaning tartibini aniqlang.
- 0
- 2
- 3
- 1
Javobni ko'rish
2
#190
๐ฆ(6) + ๐ฆ7 โ2x = 0 tenglamaning tartibini aniqlang.
- 1
- 2
- 6
- 0
Javobni ko'rish
6
#191
๐ฆ(4) + 3x๐ฆโฒ = 0 tenglamaning tartibini aniqlang.
- 1
- 0
- 2
- 4
Javobni ko'rish
4
#192
๐ฆโฒโฒ + 3๐ฆ(5) โx = 0 tenglamaning tartibini aniqlang.
- 0
- 5
- 1
- 2
Javobni ko'rish
5
#193
2๐ฆโฒโฒโฒ + ๐ฆโฒ + 3 = 0 tenglamaning tartibini aniqlang.
- 0
- 2
- 3
- 1
Javobni ko'rish
3
#194
Birinchi tartibli oddiy differensial tenglamani umumiy ko'rinishini aniqlang.
- ๐น(๐ฅ, ๐ฆ, ๐ฆโฒ) = 0
- ๐น(๐ฆ, ๐ฆโฒ) = 0
- ๐น(๐ฅ, ๐ฆโฒ) = 0
- ๐น(๐ฅ, ๐ฆ, ๐) = 0
Javobni ko'rish
๐น(๐ฅ, ๐ฆ, ๐ฆโฒ) = 0
#195
Birinchi tartibli differensial tenglamaga qo'yilgan Koshi masalasini aniqlang.
- ๐ฆโฒ = ๐(๐ฅ, ๐ฆ) va ๐ฆ|๐ฅ=๐ฅ0 = ๐ฆ0
- ๐ฆโฒ = ๐(๐ฅ, ๐ฆ) va ๐ฆโฒ|๐ฅ=๐ฅ0 = ๐ฆ0
- ๐ฆโฒ = ๐(๐ฅ, ๐ฆ) va ๐ฆโฒโฒ|๐ฅ=๐ฅ0 = ๐ฆ0
- ๐ฆโฒ = ๐(๐ฅ, ๐ฆ) va ๐ฅ|๐ฅ=๐ฅ0 = ๐ฆ0
Javobni ko'rish
๐ฆโฒ = ๐(๐ฅ, ๐ฆ) va ๐ฆ|๐ฅ=๐ฅ0 = ๐ฆ0
#196
๐ฅ๐๐ฆ+ ๐ฆ๐๐ฅ= 0 tenglamaning tartibini aniqlang.
- 1
- 3
- 2
- 0
Javobni ko'rish
1
#197
๐ฆโฒโฒ + ๐ฆโฒ + 5๐ฆ= 0 tenglamaning tartibini aniqlang.
- 0
- 3
- 1
- 2
Javobni ko'rish
2
#198
๐ฅโ1 โ๐ฆ2๐๐ฅ+ ๐ฆโ1 โ๐ฅ2๐๐ฆ= 0 tenglamaning tartibini aniqlang.
- 3
- 1
- 0
- 2
Javobni ko'rish
1
#199
O'zgaruvchilari ajraladigan differensial tenglamani ko'rsating.
- ๐ฆโฒ = ๐(๐ฅ, ๐ฆ)
- ๐ฆโฒ + ๐(๐ฅ)๐ฆ= ๐(๐ฆ)
- to'g'ri javob keltirilmagan
- ๐ฆโฒ = ๐(๐ฅ)๐(๐ฆ)
Javobni ko'rish
๐ฆโฒ = ๐(๐ฅ)๐(๐ฆ)
#200
๐ฆโฒsin ๐ฅโ๐ฆcos ๐ฅ= 0 tenglamaning yechimini toping.
- ๐ฆ= sin ๐ฅโ
๐ถ
- ๐ฆ= cos ๐ฅโ
๐ถ
- ๐ฆ= โsin ๐ฅโ
๐ถ
- ๐ฆ= โcos ๐ฅโ
๐ถ
Javobni ko'rish
๐ฆ= sin ๐ฅโ
๐ถ
#201
๐ฆโฒsin ๐ฅ+ ๐ฆcos ๐ฅ= 0 tenglamaning yechimini toping.
- ๐ฆ= cos ๐ฅโ
๐ถ
- ๐ฆโ
cos ๐ฅ= ๐ถ
- ๐ฆโ
sin ๐ฅ= ๐ถ
- ๐ฆ= โsin ๐ฅโ
๐ถ
Javobni ko'rish
๐ฆโ
sin ๐ฅ= ๐ถ
#202
3๐ฆโฒsin ๐ฅโ๐ฆcos ๐ฅ= 0 tenglamaning yechimini toping.
- ๐ฆ3 = cos ๐ฅโ
๐ถ
- ๐ฆ3 = sin ๐ฅโ
๐ถ
- ๐ฆ3 = โsin ๐ฅโ
๐ถ
- ๐ฆ3 = โcos ๐ฅโ
๐ถ
Javobni ko'rish
๐ฆ3 = sin ๐ฅโ
๐ถ
#203
๐ฆโฒsin ๐ฅโ3๐ฆcos ๐ฅ= 0 tenglamaning yechimini toping.
- ๐ฆ= โcos3 ๐ฅโ
๐ถ
- ๐ฆ= โsin3 ๐ฅโ
๐ถ
- ๐ฆ= sin3 ๐ฅโ
๐ถ
- ๐ฆ= cos3 ๐ฅโ
๐ถ
Javobni ko'rish
๐ฆ= sin3 ๐ฅโ
๐ถ
#204
๐ฆโฒx โy = 0 tenglamaning yechimini toping.
- ๐ฆ= ๐ฅ+ ๐ถ
- ๐ฆ= โ ๐ฅโ
๐ถ
- ๐ฆ= โx + ๐ถ
- ๐ฆ= ๐ฅโ
๐ถ
Javobni ko'rish
๐ฆ= ๐ฅโ
๐ถ
#205
๐ฆโฒx โy = 0 tenglamaning yechimini toping.
- ๐ฆ= ๐ฅโ
๐ถ
- ๐ฆ= ๐ฅ+ ๐ถ
- ๐ฆ= โ ๐ฅโ
๐ถ
- ๐ฆ= โx + ๐ถ
Javobni ko'rish
๐ฆ= ๐ฅโ
๐ถ
#206
5 ta kitobni kitob javoniga necha xil usulda joylashtirish mumkin?
- 25
- 120
- 100
- 115
Javobni ko'rish
120
#207
4 ta kitobni kitob javoniga necha xil usulda joylashtirish mumkin?
- 16
- 24
- 15
- 25
Javobni ko'rish
24
#208
3 ta kitobni kitob javoniga necha xil usulda joylashtirish mumkin?
- 6
- 5
- 10
- 3
Javobni ko'rish
6
#209
1,2 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
- 10
- 3
- 5
- 6
Javobni ko'rish
6
#210
5,4 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
- 5
- 10
- 3
- 6
Javobni ko'rish
6
#211
1,4 va 6 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
- 10
- 5
- 3
- 6
Javobni ko'rish
6
#212
1,2 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanishi mumkin)
- 10
- 6
- 27
- 18
Javobni ko'rish
27
#213
0,2 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
- 4
- 6
- 5
- 3
Javobni ko'rish
4
#214
0,4 va 5 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
- 6
- 3
- 5
- 4
Javobni ko'rish
4
#215
Ikkita tanga tashlanganda kamida bitta raqam tomon tushish ehtimolini toping?
- 3
- 5
- 1
- 1
Javobni ko'rish
3
#216
Ikkita tanga tashlanganda kamida bitta gerb tomon tushish ehtimolini toping?
- 1
- 1
- 3
- 5
Javobni ko'rish
3
#217
Ikkita tanga tashlanganda faqat bitta raqam tomon tushish ehtimolini toping?
- 3
- 1
- 5
- 1
Javobni ko'rish
1
#218
Ikkita tanga tashlanganda faqat bitta gerb tomon tushish ehtimolini toping?
- 3
- 1
- 1
- 1
Javobni ko'rish
1
#219
Ikkita tanga tashlanganda faqat gerb tomon tushish ehtimolini toping?
- 1
- 1
- 1
- 3
Javobni ko'rish
1
#220
Ikkita tanga tashlanganda faqat gerb tomon tushish ehtimolini toping?
- 1
- 1
- 3
- 1
Javobni ko'rish
1
#221
Muqarrar hodisaning ehtimoli nimaga teng?
- 1
- 1
- 1
- 0
Javobni ko'rish
1
#222
Mumkin boโlmagan hodisaning ehtimoli nimaga teng?
- 0
- 1
- 1
- 1
Javobni ko'rish
0
#223
Oโyin kubigi bir marta tashlanganda 2 raqam chiqish ehtimolini toping?
- 1
- 3
- 1
- 1
Javobni ko'rish
1
#224
Oโyin kubigi bir marta tashlanganda 3 raqam chiqish ehtimolini toping?
- 3
- 1
- 1
- 1
Javobni ko'rish
1
#225
Oโyin kubigi bir marta tashlanganda 6 raqam chiqish ehtimolini toping?
- 3
- 1
- 1
- 1
Javobni ko'rish
1
#226
Oโyin kubigi bir marta tashlanganda juft son chiqish ehtimolini toping?
- 3
- 1
- 1
- 1
Javobni ko'rish
1
#227
Oโyin kubigi bir marta tashlanganda toq son chiqish ehtimolini toping?
- 1
- 1
- 1
- 3
Javobni ko'rish
1
#228
Oโyin kubigi bir marta tashlanganda 2 ga karrali son chiqish ehtimolini toping?
- 3
- 1
- 1
- 1
Javobni ko'rish
1
#229
Oโyin kubigi bir marta tashlanganda 3 ga karrali son chiqish ehtimolini toping?
- 1
- 1
- 1
- 3
Javobni ko'rish
1
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