Matematika

Test _Amaliy matematika 2

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#1
Funksiya hosilasini toping: ๐‘“(๐‘ฅ) = 4๐‘’2.
  1. 8
  2. 0
  3. 4e
  4. 8x
Javobni ko'rish
0
#2
Agar f(x) = 8 boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. 2
  2. 8
  3. 1
  4. 0
Javobni ko'rish
0
#3
Funksiya hosilasini toping: ๐‘“(๐‘ฅ) = 4๐‘ฅ2 โˆ’2
  1. 0
  2. 8x
  3. 4xโˆ’2
  4. 8
Javobni ko'rish
8x
#4
Agar ๐‘“(๐‘ฅ) = 4๐‘ฅ3 โˆ’2๐‘ฅ+ 1 boโ€™lsa, quyidagini toping: fโ€ฒ(1) =?
  1. 14
  2. 10
  3. 12xโˆ’2
  4. 3
Javobni ko'rish
10
#5
Agar ๐‘“(๐‘ฅ) = ๐‘ฅ3 + 2๐‘ฅ boโ€™lsa, quyidagini toping: fโ€ฒ(1) =?
  1. 0
  2. 3๐‘ฅ2 + 2๐‘ฅ
  3. 5
  4. 3
Javobni ko'rish
5
#6
Agar f(x) = sin x+ 4 boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. 4
  2. cosx
  3. 0
  4. sinx
Javobni ko'rish
cosx
#7
Agar f(x) = sin xโˆ’cosx boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. 2 sinx
  2. cosx+ sin x
  3. 2 cosx
  4. 0
Javobni ko'rish
cosx+ sin x
#8
Agar f(x) = 4ยทcosx boโ€™lsa, quyidagini toping: fโ€ฒ(ฯ€/4) =?
  1. 0
  2. 1
  3. โˆ’2โˆš2
  4. โˆ’4 sinx
Javobni ko'rish
โˆ’2โˆš2
#9
Agar f(x) =โˆ’sinx+ 7 boโ€™lsa, quyidagini toping: fโ€ฒ(ฯ€/3) =?
  1. 0
  2. โˆ’โˆš3/2
  3. โˆš2/2
  4. โˆ’1/2
Javobni ko'rish
โˆ’1/2
#10
Agar f(x) = cos xโˆ’2x boโ€™lsa, quyidagini toping: fโ€ฒ(ฯ€/6) =?
  1. 0
  2. โˆš3/2โˆ’ฯ€/3
  3. โˆ’5/2
  4. โˆš3/2
Javobni ko'rish
โˆ’5/2
#11
Funksiya hosilasini toping: f(x) = 5x.
  1. 5๐‘ฅ๐‘™๐‘›5
  2. 1
  3. 5๐‘ฅ
  4. 5๐‘ฅ
Javobni ko'rish
5๐‘ฅ๐‘™๐‘›5
#12
Funksiya hosilasini toping: ๐‘“(๐‘ฅ) = ๐‘’๐‘ฅ.
  1. ๐‘’๐‘ฅ
  2. 1
  3. ๐‘’๐‘ฅ
  4. 0
Javobni ko'rish
๐‘’๐‘ฅ
#13
Agar ๐‘“(๐‘ฅ) = ๐‘ฅ3 + 3๐‘ฅ boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. 3๐‘ฅ
  2. 32 + 3๐‘ฅ
  3. 3๐‘ฅ2 + 3๐‘ฅ๐‘™๐‘›3
  4. 3๐‘ฅ
Javobni ko'rish
3๐‘ฅ2 + 3๐‘ฅ๐‘™๐‘›3
#14
Agar ๐‘“(๐‘ฅ) = ๐‘’๐‘ฅ+ 3๐‘ฅ2 + 7๐‘ฅ boโ€™lsa, quyidagini toping: fโ€ฒ(0) =?
  1. ๐‘’๐‘ฅ+ 6๐‘ฅ+ 7
  2. 1
  3. 0
  4. 8
Javobni ko'rish
8
#15
Agar ๐‘“(๐‘ฅ) = 7๐‘ฅ boโ€™lsa, quyidagini toping: fโ€ฒ(0) =?
  1. 7๐‘ฅ๐‘™๐‘›7
  2. 0
  3. ln7
  4. 7๐‘ฅ
Javobni ko'rish
ln7
#16
Agar ๐‘“(๐‘ฅ) = 3๐‘ฅ boโ€™lsa, quyidagini toping: fโ€ฒ(1) =?
  1. 1
  2. 3ln3
  3. 0
  4. ln3
Javobni ko'rish
3ln3
#17
Agar ๐‘“(๐‘ฅ) = 3๐‘ฅ2 + sin30๐‘œ boโ€™lsa, quyidagini toping: fโ€ฒ(1) =?
  1. 7
  2. 0
  3. 5
  4. 6
Javobni ko'rish
6
#18
Agar ๐‘“(๐‘ฅ) = 2๐‘ฅ4 + 3๐‘ฅ2 boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. 8๐‘ฅ3 + 6๐‘ฅ
  2. 8๐‘ฅ3 โˆ’6๐‘ฅ
  3. 14๐‘ฅ
  4. 8๐‘ฅ4 + 6๐‘ฅ3
Javobni ko'rish
8๐‘ฅ3 + 6๐‘ฅ
#19
Agar ๐‘“(๐‘ฅ) = 2๐‘ฅ3 + 3๐‘ฅโˆ’7 boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. 2๐‘ฅ2 โˆ’4๐‘ฅ
  2. 2๐‘ฅ+ 4
  3. 6๐‘ฅ2 + 3
  4. 6๐‘ฅ+ 5
Javobni ko'rish
6๐‘ฅ2 + 3
#20
Agar ๐‘“(๐‘ฅ) = ๐‘ฅโˆ’8 boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. ๐‘“โ€ฒ(๐‘ฅ) = โˆ’8๐‘ฅ
  2. ๐‘“โ€ฒ(๐‘ฅ) = โˆ’8๐‘ฅโˆ’7
  3. ๐‘“โ€ฒ(๐‘ฅ) = 8๐‘ฅ7
  4. ๐‘“โ€ฒ(๐‘ฅ) = โˆ’8๐‘ฅโˆ’9
Javobni ko'rish
๐‘“โ€ฒ(๐‘ฅ) = โˆ’8๐‘ฅโˆ’9
#21
Agar ๐‘“(๐‘ฅ) = ๐‘ฅโˆ’3 + ๐‘ฅโˆ’2 boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. ๐‘“โ€ฒ(๐‘ฅ) = โˆ’3๐‘ฅโˆ’4 โˆ’2๐‘ฅโˆ’3
  2. ๐‘“โ€ฒ(๐‘ฅ) = ๐‘ฅโˆ’4 โˆ’๐‘ฅโˆ’3
  3. ๐‘“โ€ฒ(๐‘ฅ) = โˆ’3๐‘ฅโˆ’2 + 2๐‘ฅโˆ’1
  4. ๐‘“โ€ฒ(๐‘ฅ) = ๐‘ฅโˆ’2 โˆ’๐‘ฅโˆ’1
Javobni ko'rish
๐‘“โ€ฒ(๐‘ฅ) = โˆ’3๐‘ฅโˆ’4 โˆ’2๐‘ฅโˆ’3
#22
Agar f(x) = 2 sin xยทcosx boโ€™lsa, quyidagini toping: fโ€ฒ(ฯ€/2) =?
  1. 2
  2. 0
  3. 1
  4. 1
Javobni ko'rish
2
#23
Agar ๐‘“(๐‘ฅ) = 2๐‘ฅ2 + 1 boโ€™lsa, quyidagini toping: fโ€ฒ(ฯ€/4) =?
  1. ฯ€
  2. ฯ€/2
  3. 1
  4. 0
Javobni ko'rish
ฯ€
#24
Agar (๐‘ฅ) = cos (๐‘ฅ2) boโ€™lsa, quyidagini toping: fโ€ฒ(x) =?
  1. sin (๐‘ฅ2) โˆ—(2๐‘ฅ)
  2. โˆ’sin (๐‘ฅ2) โˆ—(2๐‘ฅ)
  3. cos (๐‘ฅ2) โˆ—(2๐‘ฅ)
  4. 2 โˆ—sin (๐‘ฅ2)
Javobni ko'rish
โˆ’sin (๐‘ฅ2) โˆ—(2๐‘ฅ)
#25
Agar ๐‘“(๐‘ฅ) = ๐‘๐‘œ๐‘ 2(5๐‘ฅ)boโ€™lsa, quyidagini toping:fโ€ฒ(x) =?
  1. sin(5x)
  2. โˆ’5ยทsin(10 x)
  3. 5ยทsin(10 x)
  4. โˆ’5ยทsin(5x)
Javobni ko'rish
โˆ’5ยทsin(10 x)
#26
Agar f(x) = 5 sin x+ 3 cos x boโ€™lsa, quyidagini toping: fโ€ฒ(ฯ€/4) =?
  1. 4โˆš2
  2. โˆ’โˆš2
  3. โˆš2
  4. โˆ’2โˆš3
Javobni ko'rish
โˆš2
#27
Agar ๐‘“(๐‘ฅ) = 1 3 ๐‘ฅ3 โˆ’16๐‘ฅ boโ€™lsa, quyidagini toping: fโ€ฒ(4) =? .
  1. 2
  2. 3
  3. 0
  4. 1
Javobni ko'rish
0
#28
Agar ๐‘“(๐‘ฅ) = 3๐‘ฅโˆ—2๐‘ฅ boโ€™lsa, quyidagini toping: fโ€ฒ(0) =?
  1. 3ln 2
  2. 3
  3. 3
  4. 0
Javobni ko'rish
3
#29
Agar ๐‘“(๐‘ฅ) = 2๐‘ฅโˆ—3๐‘ฅ boโ€™lsa, quyidagini toping:fโ€ฒ(0) =?
  1. 2
  2. 0
  3. 2
  4. 2ln 3
Javobni ko'rish
2
#30
Funksiya hosilasini toping: ๐‘ฆ= ๐‘’๐‘ฅโˆ—๐‘ฅ2.
  1. ๐‘’๐‘ฅ(๐‘ฅ2 + ๐‘ฅ)
  2. ๐‘’๐‘ฅ(๐‘ฅ2 + 2๐‘ฅ)
  3. ๐‘’๐‘ฅ(๐‘ฅ2 + 2)
  4. ๐‘’๐‘ฅ(2๐‘ฅ+ 1)
Javobni ko'rish
๐‘’๐‘ฅ(๐‘ฅ2 + 2๐‘ฅ)
#31
Funksiya hosilasini toping: ๐‘ฆ= ๐‘’๐‘๐‘ก๐‘”๐‘ฅ.
  1. โˆ’
  2. ๐‘’๐‘๐‘ก๐‘”๐‘ฅ๐‘™๐‘›๐‘ฅ
  3. ๐‘’๐‘๐‘ก๐‘”๐‘ฅ
  4. ๐‘๐‘ก๐‘”๐‘ฅโˆ—๐‘’๐‘๐‘ก๐‘”๐‘ฅโˆ’1
Javobni ko'rish
โˆ’
#32
Agar f(x) = ln(sin x) boโ€™lsa, quyidagini toping: fโ€ฒ(ฯ€/4) =?
  1. 1
  2. 3
  3. 1
  4. โˆ’โˆš3
Javobni ko'rish
1
#33
Funksiya hosilasini toping: y= sin(cos x).
  1. cosxยทsin(cos x)
  2. โˆ’sinxยทcos(cos x)
  3. โˆ’cosxยทsin(cos x)
  4. sinxยทcos(cos x)
Javobni ko'rish
โˆ’sinxยทcos(cos x)
#34
Ushbu y = 3xยฒ โˆ’ 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = 3xยณ โˆ’ x + C
  2. F(x) = 3xยณ โˆ’ 2x + C
  3. F(x) = โ…“xยณ โˆ’ x + C
  4. F(x) = xยณ โˆ’ x + C
Javobni ko'rish
F(x) = xยณ โˆ’ x + C
#35
Ushbu y = x โˆ’ 3 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยฒ โˆ’ x + C
  2. F(x) = ยฝxยฒ โˆ’ 3x + C
  3. F(x) = โ…“xยฒ โˆ’ 3x + C
  4. F(x) = โ…“xยฒ โˆ’ 3x + C
Javobni ko'rish
F(x) = ยฝxยฒ โˆ’ 3x + C
#36
Ushbu y = x โˆ’ 2 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = ยฝxยฒ โˆ’ 2x + C
  2. F(x) = ยฝxยฒ โˆ’ x + C
  3. F(x) = ยฝxยฒ โˆ’ ยฝx + C
  4. F(x) = ยฝxยณ โˆ’ 3x + C
Javobni ko'rish
F(x) = ยฝxยฒ โˆ’ 2x + C
#37
Ushbu y = 2x โˆ’ 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = 2xยฒ โˆ’ x + C
  2. F(x) = xยฒ โˆ’ x + C
  3. F(x) = ยฝxยฒ โˆ’ x + C
  4. F(x) = โ…“xยฒ โˆ’ 3x + C
Javobni ko'rish
F(x) = xยฒ โˆ’ x + C
#38
Ushbu y = xยฒ โˆ’ 2x funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยณ โˆ’ 2xยฒ + C
  2. F(x) = โ…“xยฒ โˆ’ ยฝxยฒ + C
  3. F(x) = โ…“xยณ โˆ’ xยฒ + C
  4. F(x) = โ…“xยณ โˆ’ x + C
Javobni ko'rish
F(x) = โ…“xยณ โˆ’ xยฒ + C
#39
Ushbu y = 2xยฒ โˆ’ 2x + 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…”xยณ โˆ’ 2xยฒ + 1 + C
  2. F(x) = โ…”xยฒ โˆ’ 2x + 1 + C
  3. F(x) = โ…”xยณ โˆ’ xยฒ + x + C
  4. F(x) = โ…“xยณ โˆ’ xยฒ + x + C
Javobni ko'rish
F(x) = โ…”xยณ โˆ’ xยฒ + x + C
#40
Ushbu y = 2x โˆ’ 2 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = 2xยฒ โˆ’ 3x + C
  2. F(x) = xยฒ โˆ’ 2x + C
  3. F(x) = ยฝxยฒ โˆ’ 2x + C
  4. F(x) = 2xยฒ โˆ’ 2x + C
Javobni ko'rish
F(x) = xยฒ โˆ’ 2x + C
#41
Ushbu y = xยฒ โˆ’ x + 2 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยณ โˆ’ x + C
  2. F(x) = โ…“xยณ โˆ’ 2xยฒ + C
  3. F(x) = โ…“xยณ โˆ’ ยฝxยฒ + 2x + C
  4. F(x) = โ…“xยณ โˆ’ ยฝxยฒ + 2x + C
Javobni ko'rish
F(x) = โ…“xยณ โˆ’ ยฝxยฒ + 2x + C
#42
Ushbu y = 4xยณ โˆ’ 4x funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = ยผxยฒ โˆ’ 4x + C
  2. F(x) = ยผxโด โˆ’ 4x + 4C
  3. F(x) = ยฝxโด โˆ’ 4x + 4C
  4. F(x) = xโด โˆ’ 2xยฒ + C
Javobni ko'rish
F(x) = xโด โˆ’ 2xยฒ + C
#43
Ushbu y = xยฒ โˆ’ 4 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยณ โˆ’ 4x + C
  2. F(x) = ยผxโด โˆ’ 4x + C
  3. F(x) = ยผxยณ โˆ’ 4xยฒ โˆ’ 4C
  4. F(x) = โ…“xยณ โˆ’ 4x + 4 + C
Javobni ko'rish
F(x) = โ…“xยณ โˆ’ 4x + C
#44
Ushbu y = xยฒ โˆ’ 2x + 3 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยณ โˆ’ ยฝxยฒ + 3x + 3 + C
  2. F(x) = ยฝxยฒ โˆ’ 2x + 3 + C
  3. F(x) = ยฝxยณ โˆ’ xยฒ + 3 + C
  4. F(x) = โ…“xยณ โˆ’ xยฒ + 3x + C
Javobni ko'rish
F(x) = โ…“xยณ โˆ’ xยฒ + 3x + C
#45
Ushbu y = xยฒ โˆ’ 4 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยณ โˆ’ 4x + C
  2. F(x) = โ…“xยณ โˆ’ 4x + 4 + C
  3. F(x) = ยผxยณ โˆ’ 4x + C
  4. F(x) = โ…“xยณ โˆ’ 3x + C
Javobni ko'rish
F(x) = โ…“xยณ โˆ’ 4x + C
#46
Ushbu y = 1โ„x โˆ’ 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = ยฝ lnยฒ x โˆ’ x + C
  2. F(x) = 2 ln x โˆ’ x + 1 + C
  3. F(x) = ln xยฒ โˆ’ x + C
  4. F(x) = ln x โˆ’ x + C
Javobni ko'rish
F(x) = ln x โˆ’ x + C
#47
Ushbu y = xยฒ โˆ’ x + 2 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = ยฝxยฒ โˆ’ ยฝx + 2 + C
  2. F(x) = ยฝxยฒ โˆ’ ยฝx + 4 + C
  3. F(x) = ยผxโด โˆ’ โ…“xยณ + 2xยฒ + 2x + C
  4. F(x) = โ…“xยณ โˆ’ ยฝxยฒ + 2x + C
Javobni ko'rish
F(x) = โ…“xยณ โˆ’ ยฝxยฒ + 2x + C
#48
Ushbu y = ยฝxยฒ โˆ’ x + 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…™xยณ โˆ’ ยฝxยฒ + 2x + 1 + C
  2. F(x) = โ…™xยณ โˆ’ xยฒ + 1 + C
  3. F(x) = โ…™xยณ โˆ’ ยฝxยฒ + x + C
  4. F(x) = โ…™xยฒ โˆ’ x + C
Javobni ko'rish
F(x) = โ…™xยณ โˆ’ ยฝxยฒ + x + C
#49
Ushbu y = 1โ„(x โˆ’ 1) + xยฒ + 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = ln(x โˆ’ 1) + โ…“xยณ + x + C
  2. F(x) = ln(x โˆ’ 1) + ยฝxยฒ + x + C
  3. F(x) = ln(x โˆ’ 1) + ยฝxโด + 2x + C
  4. F(x) = ln(x โˆ’ 1) + โ…™xยณ + x + C
Javobni ko'rish
F(x) = ln(x โˆ’ 1) + โ…“xยณ + x + C
#50
Ushbu y = x โˆ’ 1โ„x + 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = ยฝxยฒ โˆ’ ln x + x + C
  2. F(x) = โ…™xยณ โˆ’ 2 ln x + x + C
  3. F(x) = ยผxยฒ โˆ’ 2 ln x + x + C
  4. F(x) = โ…™xยณ โˆ’ ln x + x + C
Javobni ko'rish
F(x) = ยฝxยฒ โˆ’ ln x + x + C
#51
Ushbu y = 3xยฒ + 2x โˆ’ 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = xยณ + xยฒ โˆ’ x + C
  2. F(x) = โ…“xยณ + xยฒ โˆ’ x + C
  3. F(x) = xยณ + 2xยฒ โˆ’ x + C
  4. F(x) = 3xยณ + xยฒ โˆ’ x + C
Javobni ko'rish
F(x) = xยณ + xยฒ โˆ’ x + C
#52
Ushbu y = 4x โˆ’ 5 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = xยฒ โˆ’ 5x + C
  2. F(x) = 4xยฒ โˆ’ 5x + C
  3. F(x) = 2xยฒ โˆ’ 10x + C
  4. F(x) = 2xยฒ โˆ’ 5x + C
Javobni ko'rish
F(x) = 2xยฒ โˆ’ 5x + C
#53
Ushbu y = xยฒ + 2x funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยณ + 3x + C
  2. F(x) = ยฝxยฒ + 3x + C
  3. F(x) = โ…“xยณ + xยฒ + C
  4. F(x) = xยณ + 3xยฒ + C
Javobni ko'rish
F(x) = โ…“xยณ + xยฒ + C
#54
Ushbu y = 2xยณ funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…”xโด + C
  2. F(x) = ยฝxโด + C
  3. F(x) = 2xโด + C
  4. F(x) = xโด + C
Javobni ko'rish
F(x) = ยฝxโด + C
#55
Ushbu y = xยฒ โˆ’ 3x + 1 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…“xยณ โˆ’ 3xยฒ + x + C
  2. F(x) = โ…“xยณ โˆ’ 3โ„2xยฒ + x + C
  3. F(x) = xยณ โˆ’ 3xยฒ + x + C
  4. F(x) = ยฝxยฒ โˆ’ 3x + 1 + C
Javobni ko'rish
F(x) = โ…“xยณ โˆ’ 3โ„2xยฒ + x + C
#56
Ushbu y = 6xยฒ funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = 6xยณ + C
  2. F(x) = 3xยณ + C
  3. F(x) = 2xยณ + C
  4. F(x) = xยณ + C
Javobni ko'rish
F(x) = 2xยณ + C
#57
Ushbu y = 5 funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = xโต + C
  2. F(x) = ยฝxยฒ + C
  3. F(x) = 5x + C
  4. F(x) = 5 + C
Javobni ko'rish
F(x) = 5x + C
#58
Ushbu y = 7x funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = 7x + C
  2. F(x) = 7xยฒ + C
  3. F(x) = ยฝxยฒ + C
  4. F(x) = 7โ„2xยฒ + C
Javobni ko'rish
F(x) = 7โ„2xยฒ + C
#59
Ushbu y = xยณ โˆ’ x funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = ยผxโด โˆ’ ยฝxยฒ + C
  2. F(x) = xโด โˆ’ xยฒ + C
  3. F(x) = ยฝxโด โˆ’ ยฝxยฒ + C
  4. F(x) = ยผxยณ โˆ’ ยฝxยฒ + C
Javobni ko'rish
F(x) = ยผxโด โˆ’ ยฝxยฒ + C
#60
Ushbu y = 2xยฒ โˆ’ 4x funksiyaning boshlangโ€˜ich funksiyalaridan birini toping.
  1. F(x) = โ…”xยฒ โˆ’ 2x + C
  2. F(x) = xยณ โˆ’ 4xยฒ + C
  3. F(x) = โ…”xยณ โˆ’ 2xยฒ + C
  4. F(x) = xยณ โˆ’ 2xยฒ + C
Javobni ko'rish
F(x) = โ…”xยณ โˆ’ 2xยฒ + C
#61
Ushbu โˆซ๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘ฅ+ ๐ถ
  2. ๐ถ
  3. โˆ’๐‘ฅ+ ๐ถ
  4. ๐‘ฅโˆ’๐ถ
Javobni ko'rish
๐‘ฅ+ ๐ถ
#62
Ushbu โˆ’โˆซ๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘ฅโˆ’๐ถ
  2. ๐ถ
  3. ๐‘ฅ+ ๐ถ
  4. โˆ’๐‘ฅ+ ๐ถ
Javobni ko'rish
โˆ’๐‘ฅ+ ๐ถ
#63
Ushbu โˆซ2๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. โˆ’
  2. 2๐‘ฅ
  3. 2๐‘ฅ
  4. 2๐‘ฅ
Javobni ko'rish
2๐‘ฅ
#64
Ushbu โˆซ 2๐‘‘๐‘ฅ integralni hisoblang.
  1. 2๐‘ฅ+ ๐ถ
  2. ๐‘ฅโˆ’๐ถ
  3. โˆ’๐‘ฅ+ ๐ถ
  4. ๐ถ
Javobni ko'rish
2๐‘ฅ+ ๐ถ
#65
Ushbu โˆ’โˆซ 2๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘ฅโˆ’๐ถ
  2. ๐‘ฅ+ ๐ถ
  3. ๐ถ
  4. โˆ’2๐‘ฅ+ ๐ถ
Javobni ko'rish
โˆ’2๐‘ฅ+ ๐ถ
#66
Ushbu โˆซ 2๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. 2๐‘ฅ
  2. โˆ’
  3. 2๐‘ฅ
  4. 2๐‘ฅ
Javobni ko'rish
2๐‘ฅ
#67
Ushbu โˆซ ๐‘’3๐‘ฅ+1๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘’3๐‘ฅ+1
  2. ๐‘’3๐‘ฅ+1
  3. ๐‘’3๐‘ฅ+1
  4. ๐‘’3๐‘ฅ+1
Javobni ko'rish
๐‘’3๐‘ฅ+1
#68
Ushbu โˆซ 2024๐‘ฅ2023๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘ฅ2024
  2. ๐‘ฅ2024 + ๐ถ
  3. ๐‘ฅ2023
  4. โˆ’
Javobni ko'rish
๐‘ฅ2024 + ๐ถ
#69
Ushbu โˆซ 4๐‘‘๐‘ฅ integralni hisoblang.
  1. x
  2. ๐‘ฅ2
  3. ๐‘ฅ
  4. 4๐‘ฅ+ ๐ถ
Javobni ko'rish
4๐‘ฅ+ ๐ถ
#70
Ushbu โˆซ (sin ๐‘ฅ+ cos ๐‘ฅ)๐‘‘๐‘ฅ integralni hisoblang.
  1. โˆ’sin ๐‘ฅ+ cos ๐‘ฅ+ ๐ถ
  2. sin ๐‘ฅ+ cos ๐‘ฅ+ ๐ถ
  3. โˆ’sin ๐‘ฅโˆ’cos ๐‘ฅ+ ๐ถ
  4. sin ๐‘ฅโˆ’cos ๐‘ฅ+ ๐ถ
Javobni ko'rish
โˆ’sin ๐‘ฅ+ cos ๐‘ฅ+ ๐ถ
#71
Ushbu โˆซ sin2 ๐‘ฅ๐‘‘๐‘ฅ+ โˆซ cos2 ๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘ฅ+ ๐ถ
  2. sin ๐‘ฅ+ cos ๐‘ฅ+ ๐ถ
  3. sin2 ๐‘ฅโˆ’cos2 ๐‘ฅ+ ๐ถ
  4. sin2 ๐‘ฅ+ cos2 ๐‘ฅ+ ๐ถ
Javobni ko'rish
๐‘ฅ+ ๐ถ
#72
Ushbu โˆซ 1โˆ’sin2 ๐‘ฅ cos ๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. sin ๐‘ฅ+ cos ๐‘ฅ+ ๐ถ
  2. sin ๐‘ฅ+ B
  3. cos ๐‘ฅ+ ๐ถ
  4. sin ๐‘ฅโˆ’cos ๐‘ฅ+ ๐ถ
Javobni ko'rish
cos ๐‘ฅ+ ๐ถ
#73
Ushbu โˆซ 1โˆ’cos2 ๐‘ฅ sin ๐‘ฅ ๐‘‘๐‘ฅ integralni hisoblang.
  1. sin ๐‘ฅ+ ๐ถ
  2. โˆ’cos ๐‘ฅ+ ๐ถ
  3. cos ๐‘ฅ+ ๐ถ
  4. โˆ’sin ๐‘ฅ+ ๐ถ
Javobni ko'rish
sin ๐‘ฅ+ ๐ถ
#74
Ushbu โˆซ (1 + ๐‘ก๐‘”2๐‘ฅ)cos2 ๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. โˆ’๐‘ฅ+ ๐ถ
  2. ๐‘ฅ+ ๐ถ
  3. cos2 ๐‘ฅ+ ๐ถ
  4. tg๐‘ฅ+ ๐ถ
Javobni ko'rish
๐‘ฅ+ ๐ถ
#75
Ushbu โˆซ (tg๐‘ฅโ‹…ctg๐‘ฅ)๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘ฅ+ ๐ถ
  2. โˆ’๐‘ฅ+ ๐ถ
  3. tg๐‘ฅ+ ๐ถ
  4. ctg๐‘ฅ+ ๐ถ
Javobni ko'rish
๐‘ฅ+ ๐ถ
#76
Ushbu โˆซ ( 5 2 sin ๐‘ฅ+ 4) ๐‘‘๐‘ฅ integralni hisoblang.
  1. โˆ’
  2. 5
  3. โˆ’
  4. โˆ’
Javobni ko'rish
โˆ’
#77
Ushbu โˆซ (โˆ’2sin ๐‘ฅ+ 3cos ๐‘ฅ)๐‘‘๐‘ฅ integralni hisoblang.
  1. โˆ’2cos ๐‘ฅ+ 3sin ๐‘ฅ+ ๐ถ
  2. 2cos ๐‘ฅ+ 3sin ๐‘ฅ+ ๐ถ
  3. โˆ’2cos ๐‘ฅโˆ’3sin ๐‘ฅ+ ๐ถ
  4. 2cos ๐‘ฅโˆ’3sin ๐‘ฅ+ ๐ถ
Javobni ko'rish
2cos ๐‘ฅ+ 3sin ๐‘ฅ+ ๐ถ
#78
Ushbu โˆซ (4๐‘ฅ+ 4)๐‘‘๐‘ฅ integralni hisoblang.
  1. 4๐‘ฅ
  2. 4๐‘ฅ
  3. 4๐‘ฅ
  4. 4๐‘ฅ
Javobni ko'rish
4๐‘ฅ
#79
Ushbu โˆซ (๐‘’+ ๐‘’๐‘ฅ)๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘’๐‘ฅ+ ๐ถ
  2. ๐‘’๐‘ฅ+ ๐‘’๐‘ฅ+ ๐ถ
  3. ๐‘’๐‘ฅโˆ’๐‘’๐‘ฅ+ ๐ถ
  4. ๐‘’๐‘ฅ+ ๐ถ
Javobni ko'rish
๐‘’๐‘ฅ+ ๐‘’๐‘ฅ+ ๐ถ
#80
Ushbu โˆซ (๐‘’๐‘ฅ+4 + 1 ๐‘ฅ) ๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘’๐‘ฅ+4 + ln ๐‘ฅ+ ๐ถ
  2. 3๐‘ฅ+ ๐‘’3๐‘ฅ+ ๐ถ
  3. ln 3๐‘ฅ+ ๐‘’3๐‘ฅ+ ๐ถ
  4. ln ๐‘ฅ+ ๐‘’๐‘ฅ+ ๐ถ
Javobni ko'rish
๐‘’๐‘ฅ+4 + ln ๐‘ฅ+ ๐ถ
#81
Ushbu โˆซ ๐‘’๐‘ฅ+๐‘ฆ๐‘‘๐‘ฅ integralni hisoblang.
  1. ๐‘’๐‘ฆ+ ๐ถ
  2. ๐‘’๐‘ฅ+๐‘ฆ+ ๐ถ
  3. โˆ’๐‘’๐‘ฆ+ ๐ถ
  4. โˆ’๐‘’๐‘ฅ+ ๐ถ
Javobni ko'rish
๐‘’๐‘ฅ+๐‘ฆ+ ๐ถ
#82
Ushbu โˆซ ๐‘’๐‘ฅ+๐‘ฆ๐‘‘๐‘ฆ integralni hisoblang.
  1. ๐‘’๐‘ฅ+๐‘ฆ+ ๐ถ
  2. ๐‘’๐‘ฅ+ ๐ถ
  3. โˆ’๐‘’๐‘ฅ+๐‘ฆ+ ๐ถ
  4. โˆ’๐‘’๐‘ฆ+ ๐ถ
Javobni ko'rish
๐‘’๐‘ฅ+๐‘ฆ+ ๐ถ
#83
Ushbu โˆซ 6๐‘ฅln 6๐‘‘๐‘ฅ integralni hisoblang.
  1. ln 6๐‘ฅ+ ๐ถ
  2. 6๐‘ฅ+ ๐ถ
  3. โˆ’6๐‘ฅ+ ๐ถ
  4. 6๐‘ฅ+ ๐ถ
Javobni ko'rish
6๐‘ฅ+ ๐ถ
#84
Ushbu โˆซ 16๐‘ฅโ‹…ln 2๐‘‘๐‘ฅ integralni hisoblang.
  1. 24๐‘ฅln 4 + ๐ถ
  2. 24๐‘ฅโˆ’4 + ๐ถ
  3. ln 2๐‘ฅ+ ๐ถ
  4. 24๐‘ฅ+ ๐ถ
Javobni ko'rish
24๐‘ฅ+ ๐ถ
#85
Ushbu โˆซ ln3 ๐‘ฅ ๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. ln5 ๐‘ฅ
  2. ln4 ๐‘ฅ
  3. ln2 ๐‘ฅ
  4. ln3 ๐‘ฅ
Javobni ko'rish
ln4 ๐‘ฅ
#86
Ushbu โˆซ 2sin ๐‘ฅโ‹…cos ๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. cos 2๐‘ฅ+ ๐ถ
  2. cos2 ๐‘ฅ+ ๐ถ
  3. sin2 ๐‘ฅ+ ๐ถ
  4. sin 2๐‘ฅ+ ๐ถ
Javobni ko'rish
sin2 ๐‘ฅ+ ๐ถ
#87
Ushbu โˆซ cos ๐‘ฅ sin ๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. ln |cos ๐‘ฅ| + ๐ถ
  2. โˆ’ln |sin ๐‘ฅ|๐‘ฅ+ ๐ถ
  3. โˆ’ln |cos ๐‘ฅ| + ๐ถ
  4. ln |sin ๐‘ฅ| + ๐ถ
Javobni ko'rish
ln |sin ๐‘ฅ| + ๐ถ
#88
Ushbu โˆซ ๐‘‘๐‘ฅ ๐‘ฅโ‹…ln ๐‘ฅ๐‘‘๐‘ฅ integralni hisoblang.
  1. ln (ln ๐‘ฅ) + ๐ถ
  2. โˆ’ln (ln ๐‘ฅ) + ๐ถ
  3. โˆ’ln ๐‘ฅ+ ๐ถ
Javobni ko'rish
ln (ln ๐‘ฅ) + ๐ถ
#89
Aniq integralni hisoblang. โˆซ1 3 ๐‘ฅ๐‘‘๐‘ฅ
  1. 2
  2. 0
  3. 1
  4. 4
Javobni ko'rish
4
#90
Aniq integralni hisoblang. โˆซ1 3 2๐‘ฅ๐‘‘๐‘ฅ
  1. 0
  2. 4
  3. 6
  4. 8
Javobni ko'rish
8
#91
Aniq integralni hisoblang. โˆซ1 3 3๐‘ฅ2๐‘‘๐‘ฅ
  1. 6
  2. 26
  3. 24
  4. 20
Javobni ko'rish
26
#92
Aniq integralni hisoblang. โˆซ0 1 4๐‘ฅ3๐‘‘๐‘ฅ
  1. 6
  2. 1
  3. 2
  4. 0
Javobni ko'rish
1
#93
Aniq integralni hisoblang. โˆซ0 1 3๐‘ฅ2๐‘‘๐‘ฅ
  1. 0
  2. 1
  3. 2
  4. 6
Javobni ko'rish
1
#94
Aniq integralni hisoblang. โˆซโˆ’1 1 ๐‘ฅ๐‘‘๐‘ฅ
  1. 2
  2. 6
  3. 1
  4. 0
Javobni ko'rish
0
#95
Aniq integralni hisoblang. โˆซโˆ’1 1 ๐‘ฅ3๐‘‘๐‘ฅ
  1. 0
  2. 2
  3. 1
  4. 6
Javobni ko'rish
0
#96
Aniq integralni hisoblang. โˆซโˆ’1 1 ๐‘ฅ5๐‘‘๐‘ฅ
  1. 2
  2. 6
  3. 1
  4. 0
Javobni ko'rish
0
#97
Aniq integralni hisoblang. โˆซ0 2 6๐‘ฅ2๐‘‘๐‘ฅ
  1. 20
  2. 16
  3. 10
  4. 6
Javobni ko'rish
20
#98
Aniq integralni hisoblang. โˆซ๐œ‹ 6 ๐œ‹ 3 cos ๐‘ฅ๐‘‘๐‘ฅ
  1. 1
  2. 1
  3. โˆš3โˆ’1
  4. 0
Javobni ko'rish
โˆš3โˆ’1
#99
Aniq integralni hisoblang. โˆซ๐œ‹ 6 ๐œ‹ 3 2cos ๐‘ฅ๐‘‘๐‘ฅ
  1. 1
  2. 1
  3. โˆš3 โˆ’1
  4. 0
Javobni ko'rish
โˆš3 โˆ’1
#100
Aniq integralni hisoblang. โˆซ0 ๐œ‹ 2 sin ๐‘ฅ๐‘‘๐‘ฅ
  1. 1
  2. 0
  3. 1
  4. 1
Javobni ko'rish
1
#101
Aniq integralni hisoblang. โˆซ1 ๐‘’4 1 ๐‘ฅ๐‘‘๐‘ฅ
  1. 0
  2. 1
  3. 4
  4. 1
Javobni ko'rish
4
#102
โˆซ0 ln 7 ๐‘’๐‘ฅ๐‘‘๐‘ฅ= ?
  1. 1
  2. 0
  3. 6
  4. 7
Javobni ko'rish
6
#103
Aniq integralni hisoblang. โˆซ0 1 1 1+๐‘ฅ2 ๐‘‘๐‘ฅ
  1. 0
  2. ๐œ‹
  3. ๐œ‹
  4. ๐œ‹
Javobni ko'rish
๐œ‹
#104
Aniq integralni hisoblang. โˆซ2 3 ๐‘ฅ2๐‘‘๐‘ฅ
  1. 19
  2. 2
  3. 1
  4. 1
Javobni ko'rish
19
#105
Aniq integralni hisoblang. โˆซโˆ’1 0 ๐‘’๐‘ฅ๐‘‘๐‘ฅ
  1. ๐‘’
  2. ๐‘’โˆ’1
  3. 1
  4. 1
Javobni ko'rish
๐‘’โˆ’1
#106
Aniq integralni hisoblang. โˆซ2 6 2 ๐‘ฅ๐‘‘๐‘ฅ
  1. 1
  2. 0
  3. ๐‘’
  4. ln 9
Javobni ko'rish
ln 9
#107
Aniq integralni hisoblang. โˆซโˆ’1 1 ๐‘ฅ7๐‘‘๐‘ฅ
  1. 2
  2. 0
  3. 6
  4. 1
Javobni ko'rish
0
#108
Aniq integralni hisoblang. โˆซโˆ’๐œ‹ 2 ๐œ‹ 2 cos ๐‘ฅ๐‘‘๐‘ฅ
  1. 2
  2. 1
  3. 1
  4. 0
Javobni ko'rish
2
#109
Aniq integralni hisoblang. โˆซโˆ’3 3 ๐‘ฅ2๐‘‘๐‘ฅ
  1. 18
  2. 1
  3. 11
  4. 0
Javobni ko'rish
18
#110
Aniq integralni hisoblang. โˆซโˆ’2 2 ๐‘ฅ2๐‘‘๐‘ฅ
  1. 16
  2. 2
  3. 1
  4. 1
Javobni ko'rish
16
#111
Sonli qator qaysi javobda to'g'ri berilgan?
  1. ๐‘Ž1 + ๐‘Ž2 + ๐‘Ž3 + โ‹ฏ+ ๐‘Ž๐‘›+ โ‹ฏ
  2. ๐‘Ž1 + ๐‘Ž2 + ๐‘Ž3
  3. ๐‘Ž1 + ๐‘Ž2 + ๐‘Ž3 + โ‹ฏ+ ๐‘Ž๐‘›
  4. ๐‘Ž1
Javobni ko'rish
๐‘Ž1 + ๐‘Ž2 + ๐‘Ž3 + โ‹ฏ+ ๐‘Ž๐‘›+ โ‹ฏ
#112
1 + 1 2 + 1 4 + 1 8 + โ‹ฏ ni hisoblang.
  1. 1
  2. 3
  3. 2
  4. 1
Javobni ko'rish
2
#113
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› 2๐‘›+1 sonli qatorning yettinchi hadini hisoblang.
  1. โˆ’
  2. โˆ’
  3. 1
  4. 1
Javobni ko'rish
โˆ’
#114
โˆ‘๐‘›=1 โˆž 1 โˆš๐‘› sonli qator yaqinlashuvchimi?
  1. ham yaqinlashuvchi, ham uzoqlashuvchi
  2. ha, yaqinlashuvchi
  3. to'g'ri javob berilmagan
  4. yo'q, uzoqlashuvchi
Javobni ko'rish
yo'q, uzoqlashuvchi
#115
1 + 2 + 3 + โ‹ฏ+ ๐‘›+ โ‹ฏ sonli qatorning dastlabki ๐‘› ta hadi yig'indisini hisoblang.
  1. ๐‘›
  2. (๐‘›+1)(๐‘›+2)
  3. ๐‘›(๐‘›+1)
  4. ๐‘›
Javobni ko'rish
๐‘›(๐‘›+1)
#116
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘›+1 sonli qatorning dastlabki 9 ta hadi yig'indisini hisoblang.
  1. 1
  2. 1
  3. 2
  4. 0
Javobni ko'rish
1
#117
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘›+1 sonli qatorning dastlabki 12 ta hadi yig'indisini hisoblang.
  1. 2
  2. 1
  3. 0
  4. 1
Javobni ko'rish
0
#118
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘›+1 sonli qatorning dastlabki 13 ta hadi yig'indisini hisoblang.
  1. 1
  2. 1
  3. 2
  4. 0
Javobni ko'rish
1
#119
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘›+1 sonli qatorning dastlabki 11 ta hadi yig'indisini hisoblang.
  1. 1
  2. 1
  3. 2
  4. 0
Javobni ko'rish
1
#120
1 + 1 3 + 1 9 + 1 27 + โ‹ฏ+ 1 3๐‘›+ โ‹ฏ ni hisoblang.
  1. 1
  2. 2
  3. 1
  4. 3
Javobni ko'rish
3
#121
โˆ‘๐‘›=1 โˆž 1 ๐‘›(๐‘›+1) sonli qatorning yig'indisini toping.
  1. 1
  2. 1
  3. 0
  4. 2
Javobni ko'rish
1
#122
โˆ‘๐‘›=1 โˆž 2 ๐‘›(๐‘›+1) sonli qatorning yig'indisini toping.
  1. 1
  2. 1
  3. 2
  4. 0
Javobni ko'rish
2
#123
โˆ‘๐‘›=1 โˆž 1 ๐‘›(๐‘›+1) sonli qatorning ๐‘› ta yig'indisini toping.
  1. ๐‘›
  2. ๐‘›
  3. 2โˆ’๐‘›
  4. 2๐‘›
Javobni ko'rish
๐‘›
#124
โˆ‘๐‘›=1 โˆž 2 ๐‘›(๐‘›+1) sonli qatorning ๐‘› ta yig'indisini toping.
  1. 2๐‘›
  2. ๐‘›
  3. 2โˆ’๐‘›
  4. ๐‘›
Javobni ko'rish
2๐‘›
#125
1 1โ‹…3 + 1 2โ‹…5 + 1 3โ‹…7 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›=
  2. ๐‘Ž๐‘›=
  3. ๐‘Ž๐‘›=
  4. ๐‘Ž๐‘›= ๐‘›
Javobni ko'rish
๐‘Ž๐‘›=
#126
1 + 1 4 + 1 16 + 1 64 + โ‹ฏ ni hisoblang.
  1. 1
  2. 4
  3. 1
  4. 1
Javobni ko'rish
4
#127
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› 2๐‘›+1 sonli qatorning beshinchi hadini hisoblang.
  1. 1
  2. โˆ’
  3. 1
  4. โˆ’
Javobni ko'rish
โˆ’
#128
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› 2๐‘›+1 sonli qatorning uchinchi hadini hisoblang.
  1. โˆ’
  2. 1
  3. โˆ’
  4. 1
Javobni ko'rish
โˆ’
#129
โˆ‘๐‘›=1 โˆž 1 ๐‘› sonli qator yaqinlashuvchimi?
  1. ham yaqinlashuvchi, ham uzoqlashuvchi
  2. yo'q, uzoqlashuvchi
  3. to'g'ri javob berilmagan
  4. ha, yaqinlashuvchi
Javobni ko'rish
yo'q, uzoqlashuvchi
#130
2 + 4 + 6 + โ‹ฏ+ 2๐‘›+ โ‹ฏ sonli qatorning dastlabki ๐‘› ta hadi yig'indisini hisoblang.
  1. ๐‘›(๐‘›+ 1)
  2. ๐‘›
  3. ๐‘›
  4. (๐‘›+1)(๐‘›+2)
Javobni ko'rish
๐‘›(๐‘›+ 1)
#131
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› sonli qatorning dastlabki 8 ta hadi yig'indisini hisoblang.
  1. 0
  2. 1
  3. 1
  4. 2
Javobni ko'rish
0
#132
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› sonli qatorning dastlabki 13 ta hadi yig'indisini hisoblang.
  1. 0
  2. 1
  3. 2
  4. 1
Javobni ko'rish
1
#133
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› sonli qatorning dastlabki 11 ta hadi yig'indisini hisoblang.
  1. 2
  2. 1
  3. 0
  4. 1
Javobni ko'rish
1
#134
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› sonli qatorning dastlabki 12 ta hadi yig'indisini hisoblang.
  1. 1
  2. 1
  3. 0
  4. 2
Javobni ko'rish
0
#135
1 + 1 5 + 1 25 + 1 125 + โ‹ฏ+ 1 5๐‘›+ โ‹ฏ ni hisoblang.
  1. 1
  2. 5
  3. 1
  4. 4
Javobni ko'rish
5
#136
โˆ‘๐‘›=1 โˆž 3 ๐‘›(๐‘›+1) sonli qatorning yig'indisini toping.
  1. 2
  2. 0
  3. 3
  4. 3
Javobni ko'rish
3
#137
1 2โ‹…3 + 1 3โ‹…4 + 1 4โ‹…5 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›=
  2. ๐‘Ž๐‘›=
  3. ๐‘Ž๐‘›= ๐‘›
  4. ๐‘Ž๐‘›=
Javobni ko'rish
๐‘Ž๐‘›=
#138
2 + 5 + 8 + 11 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›= 4๐‘›โˆ’2
  2. ๐‘Ž๐‘›= 2๐‘›+ 1
  3. ๐‘Ž๐‘›= ๐‘›+ 1
  4. ๐‘Ž๐‘›= 3๐‘›โˆ’1
Javobni ko'rish
๐‘Ž๐‘›= 3๐‘›โˆ’1
#139
5 3โ‹…4 + 5 4โ‹…5 + 5 5โ‹…6 + โ‹ฏ86 sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›=
  2. ๐‘Ž๐‘›=
  3. ๐‘Ž๐‘›=
  4. ๐‘Ž๐‘›= ๐‘›
Javobni ko'rish
๐‘Ž๐‘›=
#140
4 + 6 + 8 + 10 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›= ๐‘›+ 3
  2. ๐‘Ž๐‘›= 2๐‘›+ 2
  3. ๐‘Ž๐‘›= 4๐‘›โˆ’2
  4. ๐‘Ž๐‘›= 3๐‘›+ 1
Javobni ko'rish
๐‘Ž๐‘›= 2๐‘›+ 2
#141
1 3 + 1 9 + 1 27 + โ‹ฏ+ 1 3๐‘›+ โ‹ฏ ni hisoblang.
  1. 1
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#142
1 2 + 1 4 + 1 8 + โ‹ฏ ni hisoblang.
  1. 3
  2. 2
  3. 1
  4. 1
Javobni ko'rish
1
#143
1 4 + 1 16 + 1 64 + โ‹ฏ ni hisoblang.
  1. 1
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#144
1 5 + 1 25 + 1 125 + โ‹ฏ+ 1 5๐‘›+ โ‹ฏ ni hisoblang.
  1. 4
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#145
1 2 + 1 6 + 1 12 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›=
  2. ๐‘Ž๐‘›= ๐‘›
  3. ๐‘Ž๐‘›=
  4. ๐‘Ž๐‘›=
Javobni ko'rish
๐‘Ž๐‘›=
#146
5 + 8 + 11 + 14 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›= 2๐‘›+ 3
  2. ๐‘Ž๐‘›= 4๐‘›+ 1
  3. ๐‘Ž๐‘›= 3๐‘›+ 2
  4. ๐‘Ž๐‘›= 6๐‘›โˆ’1
Javobni ko'rish
๐‘Ž๐‘›= 3๐‘›+ 2
#147
2 + 3 + โ‹ฏ+ ๐‘›+ โ‹ฏ sonli qatorning dastlabki ๐‘› ta hadi yig'indisini hisoblang.
  1. (๐‘›+1)(๐‘›+2)
  2. ๐‘›
  3. ๐‘›(๐‘›+3)
  4. ๐‘›+3
Javobni ko'rish
๐‘›(๐‘›+3)
#148
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘›+1 sonli qatorning dastlabki 11 ta hadi yig'indisini hisoblang.
  1. 0
  2. 1
  3. 1
  4. 2
Javobni ko'rish
1
#149
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘›+1 sonli qatorning dastlabki 14 ta hadi yig'indisini hisoblang.
  1. 2
  2. 1
  3. 1
  4. 0
Javobni ko'rish
0
#150
1 3 + 1 9 + 1 27 + โ‹ฏ+ 1 3๐‘›+ โ‹ฏ ni hisoblang.
  1. 1
  2. 1
  3. 1
  4. 2
Javobni ko'rish
1
#151
โˆ‘๐‘›=1 โˆž 3 ๐‘›(๐‘›+1) sonli qatorning yig'indisini toping.
  1. 2
  2. 3
  3. 1
  4. 0
Javobni ko'rish
3
#152
1 2โ‹…3 + 1 3โ‹…5 + 1 4โ‹…7 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›=
  2. ๐‘Ž๐‘›=
  3. ๐‘Ž๐‘›=
  4. ๐‘Ž๐‘›= ๐‘›
Javobni ko'rish
๐‘Ž๐‘›=
#153
1 4 + 1 16 + 1 64 + โ‹ฏ ni hisoblang.
  1. 1
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#154
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› 4๐‘›+1 sonli qatorning beshinchi hadini hisoblang.
  1. 1
  2. โˆ’
  3. โˆ’
  4. 1
Javobni ko'rish
โˆ’
#155
โˆ‘๐‘›=1 โˆž 1 ๐‘›(๐‘›+1) sonli qatorning dastlabki 6 ta hadi yig`indisini hisoblang.
  1. 6
  2. 1
  3. 1
  4. 4
Javobni ko'rish
6
#156
โˆ‘๐‘›=1 โˆž 1 3๐‘› sonli qator yaqinlashuvchimi?
  1. ha, yaqinlashuvchi
  2. to'g'ri javob berilmagan
  3. yo'q, uzoqlashuvchi
  4. ham yaqinlashuvchi, ham uzoqlashuvchi
Javobni ko'rish
yo'q, uzoqlashuvchi
#157
4 + 8 + 12 + โ‹ฏ+ 4๐‘›+ โ‹ฏ sonli qatorning dastlabki ๐‘› ta hadi yig'indisini hisoblang.
  1. 2๐‘›(๐‘›+ 1)
  2. ๐‘›
  3. (๐‘›+ 1)(๐‘›+ 2)
  4. ๐‘›
Javobni ko'rish
(๐‘›+ 1)(๐‘›+ 2)
#158
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› sonli qatorning dastlabki 5 ta hadi yig'indisini hisoblang.
  1. 2
  2. 0
  3. 1
  4. 1
Javobni ko'rish
1
#159
โˆ‘๐‘›=1 โˆž (โˆ’1)๐‘› sonli qatorning dastlabki 7 ta hadi yig'indisini hisoblang.
  1. 1
  2. 0
  3. 1
  4. 2
Javobni ko'rish
0
#160
โˆ‘๐‘›=1 โˆž 4 ๐‘›(๐‘›+1) sonli qatorning yig'indisini toping.
  1. 4
  2. 0
  3. 4
  4. 2
Javobni ko'rish
4
#161
4 + 7 + 10 + 13 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›= 4๐‘›โˆ’2
  2. ๐‘Ž๐‘›= 2๐‘›+ 2
  3. ๐‘Ž๐‘›= ๐‘›+ 1
  4. ๐‘Ž๐‘›= 3๐‘›+ 1
Javobni ko'rish
๐‘Ž๐‘›= 3๐‘›+ 1
#162
2 3โ‹…4 + 2 4โ‹…5 + 2 5โ‹…6 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›=
  2. ๐‘Ž๐‘›= ๐‘›
  3. ๐‘Ž๐‘›=
  4. ๐‘Ž๐‘›=
Javobni ko'rish
๐‘Ž๐‘›=
#163
5 + 7 + 9 + 11 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›= 4๐‘›โˆ’2
  2. ๐‘Ž๐‘›= 3๐‘›+ 1
  3. ๐‘Ž๐‘›= ๐‘›+ 4
  4. ๐‘Ž๐‘›= 2๐‘›+ 3
Javobni ko'rish
๐‘Ž๐‘›= 2๐‘›+ 3
#164
2 + 1 3 + 1 9 + 1 27 + โ‹ฏ+ 1 3๐‘›+ โ‹ฏ ni hisoblang.
  1. 2
  2. 2
  3. 2
  4. 2
Javobni ko'rish
2
#165
2 + 1 2 + 1 4 + 1 8 + โ‹ฏ ni hisoblang.
  1. 3
  2. 1
  3. 2
  4. 4
Javobni ko'rish
3
#166
1 + 1 4 + 1 16 + 1 64 + โ‹ฏ ni hisoblang.
  1. 1
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#167
1 + 1 5 + 1 25 + 1 125 + โ‹ฏ+ 1 5๐‘›+ โ‹ฏ ni hisoblang.
  1. 1
  2. 1
  3. 2
  4. 1
Javobni ko'rish
1
#168
3 + 8 + 13 + 18 + โ‹ฏ sonli qator berilgan. ๐‘Ž๐‘› ni toping.
  1. ๐‘Ž๐‘›= 2๐‘›+ 3
  2. ๐‘Ž๐‘›= 5๐‘›โˆ’2
  3. ๐‘Ž๐‘›= 6๐‘›โˆ’3
  4. ๐‘Ž๐‘›= 4๐‘›โˆ’1
Javobni ko'rish
๐‘Ž๐‘›= 5๐‘›โˆ’2
#169
1 2 โˆ’ 1 4 + 1 8 + โ‹ฏ ni hisoblang.
  1. 0
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#170
1 โˆ’ 1 4 + 1 16 โˆ’ 1 64 + โ‹ฏ ni hisoblang.
  1. 1
  2. 4
  3. 1
  4. 1
Javobni ko'rish
4
#171
1 โˆ’ 1 5 + 1 25 โˆ’ 1 125 + โ‹ฏ+ (โˆ’1)๐‘›+1 5๐‘› + โ‹ฏ ni hisoblang.
  1. 5
  2. 1
  3. 1
  4. 4
Javobni ko'rish
5
#172
๐‘ฆโ€ฒ = sin ๐‘ฅ tenglamaning yechimini toping.
  1. sin ๐‘ฅ+ ๐ถ
  2. โˆ’cos ๐‘ฅ+ ๐ถ
  3. โˆ’sin ๐‘ฅ+ ๐ถ
  4. cos ๐‘ฅ+ ๐ถ
Javobni ko'rish
โˆ’cos ๐‘ฅ+ ๐ถ
#173
๐‘ฆโ€ฒ = cos ๐‘ฅ tenglamaning yechimini toping.
  1. cos ๐‘ฅ+ ๐ถ
  2. โˆ’sin ๐‘ฅ+ ๐ถ
  3. sin ๐‘ฅ+ ๐ถ
  4. โˆ’cos ๐‘ฅ+ ๐ถ
Javobni ko'rish
sin ๐‘ฅ+ ๐ถ
#174
๐‘ฆโ€ฒ = tan ๐‘ฅ tenglamaning yechimini toping.
  1. ln |sin ๐‘ฅ| + ๐ถ
  2. ln cos ๐‘ฅ+ ๐ถ
  3. โˆ’ln |cos ๐‘ฅ| + ๐ถ
  4. โˆ’ln sin ๐‘ฅ+ ๐ถ
Javobni ko'rish
โˆ’ln |cos ๐‘ฅ| + ๐ถ
#175
๐‘ฅ๐‘ฆโ€ฒ = 1 tenglamaning yechimini toping.
  1. ln |๐‘ฅ| + ๐ถ
  2. ln ๐‘ฅ+ ๐ถ
  3. โˆ’ln |๐‘ฅ| + ๐ถ
  4. โˆ’ln ๐‘ฅ+ ๐ถ
Javobni ko'rish
ln |๐‘ฅ| + ๐ถ
#176
๐‘ฆโ€ฒ = ๐‘ฅ+ 1 tenglamaning yechimini toping.
  1. ๐‘ฅ2
  2. ๐‘ฅ2
  3. ๐‘ฅ+ ๐ถ
  4. ๐‘ฅ2
Javobni ko'rish
๐‘ฅ2
#177
๐‘ฆ๐‘ฆโ€ฒ = ๐‘ฅโˆ’1 tenglamaning yechimini toping.
  1. ๐‘ฆ2
  2. ๐‘ฆ2
  3. ๐‘ฆ2
  4. ๐‘ฆ2
Javobni ko'rish
๐‘ฆ2
#178
(1 + ๐‘ฆ2)๐‘‘๐‘ฅ+ (1 + ๐‘ฅ2)๐‘‘๐‘ฆ= 0 tenglamaning yechimini toping.
  1. arctan ๐‘ฅ+ arctan ๐‘ฆ= 0
  2. arctan ๐‘ฅโˆ’arctan ๐‘ฆ= ๐ถ
  3. arctan ๐‘ฅ+ arctan ๐‘ฆ= ๐ถ
  4. arctan ๐‘ฅโˆ’arctan ๐‘ฆ= 0
Javobni ko'rish
arctan ๐‘ฅ+ arctan ๐‘ฆ= ๐ถ
#179
(4 + ๐‘ฆ2)๐‘‘๐‘ฅ+ (9 + ๐‘ฅ2)๐‘‘๐‘ฆ= 0 tenglamaning yechimini toping.
  1. arctan
  2. 2arctan
  3. arctan
  4. 2arctan
Javobni ko'rish
2arctan
#180
(4 + ๐‘ฆ2)๐‘‘๐‘ฅ= (9 + ๐‘ฅ2)๐‘‘๐‘ฆ tenglamaning yechimini toping.
  1. arctan
  2. 2arctan
  3. arctan
  4. 2arctan
Javobni ko'rish
2arctan
#181
๐‘ฆ(1 + ๐‘ฅ2)๐‘‘๐‘ฆ= ๐‘ฅ(1 + ๐‘ฆ2)๐‘‘๐‘ฅ tenglamaning yechimini toping.
  1. ๐‘ฆ2 = โˆ’(1 + ๐‘ฅ2) โ‹…๐ถ
  2. 1 + ๐‘ฆ2 = (1 + ๐‘ฅ2) โ‹…๐ถ
  3. ๐‘ฆ2 = (1 + ๐‘ฅ2) โ‹…๐ถ
  4. 1 + ๐‘ฆ2 = โˆ’(1 + ๐‘ฅ2) โ‹…๐ถ
Javobni ko'rish
1 + ๐‘ฆ2 = (1 + ๐‘ฅ2) โ‹…๐ถ
#182
(๐‘ฅ+ 1)2๐‘‘๐‘ฆ= (๐‘ฆโˆ’2)2๐‘‘๐‘ฅ tenglamaning yechimini toping.
  1. 1
  2. โˆ’
  3. 1
  4. โˆ’
Javobni ko'rish
1
#183
(๐‘ฅ+ 1)3๐‘‘๐‘ฆ= (๐‘ฆโˆ’2)3๐‘‘๐‘ฅ tenglamaning yechimini toping.
  1. 1
  2. โˆ’
  3. 1
  4. โˆ’
Javobni ko'rish
1
#184
Differensial tenglama deb nimaga aytiladi?
  1. Erkli o'zgaruvchi va noma'lum funksiya hosilalari yoki differensiallarini bog'lovchi
  2. Noma'lum funksiyani bogโ€˜ lovchi munosabat differensial tenglama deyiladi
  3. Erkli o'zgaruvchi va noma'lum funksiya bog'lovchi munosabatlar differensial tenglama
  4. Erkli o'zgaruvchi va noma'lum funksiya va uning hosilalari yoki differensiallarini bogโ€˜lovchi
Javobni ko'rish
Erkli o'zgaruvchi va noma'lum funksiya va uning hosilalari yoki differensiallarini bogโ€˜lovchi
#185
Oddiy differensial tenglama deb nimaga aytiladi?
  1. Agar noma'lum funksiya beshta erkli o'zgaruvchiga bog'liq bo'lsa, bunday differensial
  2. Agar noma'lum funksiya uchta erkli o'zgaruvchiga bog ' liq bo'lsa, bunday differensial
  3. Agar noma'lum funksiya ikkita erkli o'zgaruvchiga bog'liq bo'lsa, bunday differensial tenglama
  4. 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?
  1. Differensial tenglama tartibi
  2. Differensial tenglama o'lchami
  3. Differensial tenglama o'lchovi
  4. Differensial tenglama yechimi
Javobni ko'rish
Differensial tenglama tartibi
#187
Differensial tenglamaning yechimi deb qanday funksiyaga aytiladi?
  1. Har qanday funksionalga aytiladi
  2. Har qanday uzluksiz funksiyaga aytiladi
  3. Har qanday uzilishga ega bo'lgan funksiyaga aytiladi
  4. Ixtiyoriy differensiallanuvchi funksiyaga aytiladi
Javobni ko'rish
Ixtiyoriy differensiallanuvchi funksiyaga aytiladi
#188
๐‘ฆโ€ฒโ€ฒ + 3๐‘ฆโ€ฒ = 0 tenglamaning tartibini aniqlang.
  1. 3
  2. 1
  3. 2
  4. 0
Javobni ko'rish
2
#189
๐‘ฆโ€ฒโ€ฒ + 3๐‘ฆ4 + cosx = 0 tenglamaning tartibini aniqlang.
  1. 0
  2. 2
  3. 3
  4. 1
Javobni ko'rish
2
#190
๐‘ฆ(6) + ๐‘ฆ7 โˆ’2x = 0 tenglamaning tartibini aniqlang.
  1. 1
  2. 2
  3. 6
  4. 0
Javobni ko'rish
6
#191
๐‘ฆ(4) + 3x๐‘ฆโ€ฒ = 0 tenglamaning tartibini aniqlang.
  1. 1
  2. 0
  3. 2
  4. 4
Javobni ko'rish
4
#192
๐‘ฆโ€ฒโ€ฒ + 3๐‘ฆ(5) โˆ’x = 0 tenglamaning tartibini aniqlang.
  1. 0
  2. 5
  3. 1
  4. 2
Javobni ko'rish
5
#193
2๐‘ฆโ€ฒโ€ฒโ€ฒ + ๐‘ฆโ€ฒ + 3 = 0 tenglamaning tartibini aniqlang.
  1. 0
  2. 2
  3. 3
  4. 1
Javobni ko'rish
3
#194
Birinchi tartibli oddiy differensial tenglamani umumiy ko'rinishini aniqlang.
  1. ๐น(๐‘ฅ, ๐‘ฆ, ๐‘ฆโ€ฒ) = 0
  2. ๐น(๐‘ฆ, ๐‘ฆโ€ฒ) = 0
  3. ๐น(๐‘ฅ, ๐‘ฆโ€ฒ) = 0
  4. ๐น(๐‘ฅ, ๐‘ฆ, ๐‘) = 0
Javobni ko'rish
๐น(๐‘ฅ, ๐‘ฆ, ๐‘ฆโ€ฒ) = 0
#195
Birinchi tartibli differensial tenglamaga qo'yilgan Koshi masalasini aniqlang.
  1. ๐‘ฆโ€ฒ = ๐‘“(๐‘ฅ, ๐‘ฆ) va ๐‘ฆ|๐‘ฅ=๐‘ฅ0 = ๐‘ฆ0
  2. ๐‘ฆโ€ฒ = ๐‘“(๐‘ฅ, ๐‘ฆ) va ๐‘ฆโ€ฒ|๐‘ฅ=๐‘ฅ0 = ๐‘ฆ0
  3. ๐‘ฆโ€ฒ = ๐‘“(๐‘ฅ, ๐‘ฆ) va ๐‘ฆโ€ฒโ€ฒ|๐‘ฅ=๐‘ฅ0 = ๐‘ฆ0
  4. ๐‘ฆโ€ฒ = ๐‘“(๐‘ฅ, ๐‘ฆ) va ๐‘ฅ|๐‘ฅ=๐‘ฅ0 = ๐‘ฆ0
Javobni ko'rish
๐‘ฆโ€ฒ = ๐‘“(๐‘ฅ, ๐‘ฆ) va ๐‘ฆ|๐‘ฅ=๐‘ฅ0 = ๐‘ฆ0
#196
๐‘ฅ๐‘‘๐‘ฆ+ ๐‘ฆ๐‘‘๐‘ฅ= 0 tenglamaning tartibini aniqlang.
  1. 1
  2. 3
  3. 2
  4. 0
Javobni ko'rish
1
#197
๐‘ฆโ€ฒโ€ฒ + ๐‘ฆโ€ฒ + 5๐‘ฆ= 0 tenglamaning tartibini aniqlang.
  1. 0
  2. 3
  3. 1
  4. 2
Javobni ko'rish
2
#198
๐‘ฅโˆš1 โˆ’๐‘ฆ2๐‘‘๐‘ฅ+ ๐‘ฆโˆš1 โˆ’๐‘ฅ2๐‘‘๐‘ฆ= 0 tenglamaning tartibini aniqlang.
  1. 3
  2. 1
  3. 0
  4. 2
Javobni ko'rish
1
#199
O'zgaruvchilari ajraladigan differensial tenglamani ko'rsating.
  1. ๐‘ฆโ€ฒ = ๐‘ƒ(๐‘ฅ, ๐‘ฆ)
  2. ๐‘ฆโ€ฒ + ๐‘ƒ(๐‘ฅ)๐‘ฆ= ๐‘„(๐‘ฆ)
  3. to'g'ri javob keltirilmagan
  4. ๐‘ฆโ€ฒ = ๐‘“(๐‘ฅ)๐‘”(๐‘ฆ)
Javobni ko'rish
๐‘ฆโ€ฒ = ๐‘“(๐‘ฅ)๐‘”(๐‘ฆ)
#200
๐‘ฆโ€ฒsin ๐‘ฅโˆ’๐‘ฆcos ๐‘ฅ= 0 tenglamaning yechimini toping.
  1. ๐‘ฆ= sin ๐‘ฅโ‹…๐ถ
  2. ๐‘ฆ= cos ๐‘ฅโ‹…๐ถ
  3. ๐‘ฆ= โˆ’sin ๐‘ฅโ‹…๐ถ
  4. ๐‘ฆ= โˆ’cos ๐‘ฅโ‹…๐ถ
Javobni ko'rish
๐‘ฆ= sin ๐‘ฅโ‹…๐ถ
#201
๐‘ฆโ€ฒsin ๐‘ฅ+ ๐‘ฆcos ๐‘ฅ= 0 tenglamaning yechimini toping.
  1. ๐‘ฆ= cos ๐‘ฅโ‹…๐ถ
  2. ๐‘ฆโ‹…cos ๐‘ฅ= ๐ถ
  3. ๐‘ฆโ‹…sin ๐‘ฅ= ๐ถ
  4. ๐‘ฆ= โˆ’sin ๐‘ฅโ‹…๐ถ
Javobni ko'rish
๐‘ฆโ‹…sin ๐‘ฅ= ๐ถ
#202
3๐‘ฆโ€ฒsin ๐‘ฅโˆ’๐‘ฆcos ๐‘ฅ= 0 tenglamaning yechimini toping.
  1. ๐‘ฆ3 = cos ๐‘ฅโ‹…๐ถ
  2. ๐‘ฆ3 = sin ๐‘ฅโ‹…๐ถ
  3. ๐‘ฆ3 = โˆ’sin ๐‘ฅโ‹…๐ถ
  4. ๐‘ฆ3 = โˆ’cos ๐‘ฅโ‹…๐ถ
Javobni ko'rish
๐‘ฆ3 = sin ๐‘ฅโ‹…๐ถ
#203
๐‘ฆโ€ฒsin ๐‘ฅโˆ’3๐‘ฆcos ๐‘ฅ= 0 tenglamaning yechimini toping.
  1. ๐‘ฆ= โˆ’cos3 ๐‘ฅโ‹…๐ถ
  2. ๐‘ฆ= โˆ’sin3 ๐‘ฅโ‹…๐ถ
  3. ๐‘ฆ= sin3 ๐‘ฅโ‹…๐ถ
  4. ๐‘ฆ= cos3 ๐‘ฅโ‹…๐ถ
Javobni ko'rish
๐‘ฆ= sin3 ๐‘ฅโ‹…๐ถ
#204
๐‘ฆโ€ฒx โˆ’y = 0 tenglamaning yechimini toping.
  1. ๐‘ฆ= ๐‘ฅ+ ๐ถ
  2. ๐‘ฆ= โˆ’ ๐‘ฅโ‹…๐ถ
  3. ๐‘ฆ= โˆ’x + ๐ถ
  4. ๐‘ฆ= ๐‘ฅโ‹…๐ถ
Javobni ko'rish
๐‘ฆ= ๐‘ฅโ‹…๐ถ
#205
๐‘ฆโ€ฒx โˆ’y = 0 tenglamaning yechimini toping.
  1. ๐‘ฆ= ๐‘ฅโ‹…๐ถ
  2. ๐‘ฆ= ๐‘ฅ+ ๐ถ
  3. ๐‘ฆ= โˆ’ ๐‘ฅโ‹…๐ถ
  4. ๐‘ฆ= โˆ’x + ๐ถ
Javobni ko'rish
๐‘ฆ= ๐‘ฅโ‹…๐ถ
#206
5 ta kitobni kitob javoniga necha xil usulda joylashtirish mumkin?
  1. 25
  2. 120
  3. 100
  4. 115
Javobni ko'rish
120
#207
4 ta kitobni kitob javoniga necha xil usulda joylashtirish mumkin?
  1. 16
  2. 24
  3. 15
  4. 25
Javobni ko'rish
24
#208
3 ta kitobni kitob javoniga necha xil usulda joylashtirish mumkin?
  1. 6
  2. 5
  3. 10
  4. 3
Javobni ko'rish
6
#209
1,2 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
  1. 10
  2. 3
  3. 5
  4. 6
Javobni ko'rish
6
#210
5,4 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
  1. 5
  2. 10
  3. 3
  4. 6
Javobni ko'rish
6
#211
1,4 va 6 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
  1. 10
  2. 5
  3. 3
  4. 6
Javobni ko'rish
6
#212
1,2 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanishi mumkin)
  1. 10
  2. 6
  3. 27
  4. 18
Javobni ko'rish
27
#213
0,2 va 3 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
  1. 4
  2. 6
  3. 5
  4. 3
Javobni ko'rish
4
#214
0,4 va 5 raqamlaridan nechata uch xonali son yasash mumkin(raqamlar takrorlanmasin)
  1. 6
  2. 3
  3. 5
  4. 4
Javobni ko'rish
4
#215
Ikkita tanga tashlanganda kamida bitta raqam tomon tushish ehtimolini toping?
  1. 3
  2. 5
  3. 1
  4. 1
Javobni ko'rish
3
#216
Ikkita tanga tashlanganda kamida bitta gerb tomon tushish ehtimolini toping?
  1. 1
  2. 1
  3. 3
  4. 5
Javobni ko'rish
3
#217
Ikkita tanga tashlanganda faqat bitta raqam tomon tushish ehtimolini toping?
  1. 3
  2. 1
  3. 5
  4. 1
Javobni ko'rish
1
#218
Ikkita tanga tashlanganda faqat bitta gerb tomon tushish ehtimolini toping?
  1. 3
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#219
Ikkita tanga tashlanganda faqat gerb tomon tushish ehtimolini toping?
  1. 1
  2. 1
  3. 1
  4. 3
Javobni ko'rish
1
#220
Ikkita tanga tashlanganda faqat gerb tomon tushish ehtimolini toping?
  1. 1
  2. 1
  3. 3
  4. 1
Javobni ko'rish
1
#221
Muqarrar hodisaning ehtimoli nimaga teng?
  1. 1
  2. 1
  3. 1
  4. 0
Javobni ko'rish
1
#222
Mumkin boโ€™lmagan hodisaning ehtimoli nimaga teng?
  1. 0
  2. 1
  3. 1
  4. 1
Javobni ko'rish
0
#223
Oโ€™yin kubigi bir marta tashlanganda 2 raqam chiqish ehtimolini toping?
  1. 1
  2. 3
  3. 1
  4. 1
Javobni ko'rish
1
#224
Oโ€™yin kubigi bir marta tashlanganda 3 raqam chiqish ehtimolini toping?
  1. 3
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#225
Oโ€™yin kubigi bir marta tashlanganda 6 raqam chiqish ehtimolini toping?
  1. 3
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#226
Oโ€™yin kubigi bir marta tashlanganda juft son chiqish ehtimolini toping?
  1. 3
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#227
Oโ€™yin kubigi bir marta tashlanganda toq son chiqish ehtimolini toping?
  1. 1
  2. 1
  3. 1
  4. 3
Javobni ko'rish
1
#228
Oโ€™yin kubigi bir marta tashlanganda 2 ga karrali son chiqish ehtimolini toping?
  1. 3
  2. 1
  3. 1
  4. 1
Javobni ko'rish
1
#229
Oโ€™yin kubigi bir marta tashlanganda 3 ga karrali son chiqish ehtimolini toping?
  1. 1
  2. 1
  3. 1
  4. 3
Javobni ko'rish
1
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