9-sinf 1-variant

2 2 2 2

10. 
    Hisoblang: sin ⁴ + cos ⁴ + sin ⁴ + cos ⁴ .
    

10. 
    Agar sin α = 1/3 bo’lsa, cos (π /4 – α) sin (3π /4 – α) ni hisoblang.
    

1 −sin²−cos²α−sin²α

10. 
    Soddalashtiring:
    

A) tg² B) 1 C) –1 D) ctg² E) – ctg²

10. 
    Agar tg α = 1/ 2 bo’lsa, sin (2 α + π /4) ni hisoblang.
    

10. 
    Hisoblang: sin 20⁰ sin 40⁰ sin 80⁰
    

10. 
    sin 16⁰ ni cos 37⁰ = a orqali ifodalang.
    

A) 12 B)13 C) 8 D) 15 E)aniqlab bo'lmaydi 17. Agar a = 2⁵ + 2^-5 va b = 2⁵ – 2^-5 bo’lsa, a² – b² ni toping?

A) 0 B) 2 C) 1 /2 D) 1 /4 E) 4

18. 
    Hisoblang: 7+ 4 3 + 7−4 3
    

18. 
    Soddalashtiring: 21−2 21+ 2 19−6 2
    

18. 
    a = 5,2 da ifodani qiymatini hisoblang. a² + a −6−(a −3) a² − 4
    

18. 
    Soddalashtiring:
    

− − −

18. 
    Soddalashtiring: a − 2a + a :a
    

4x² −4xy +3y² x + y

23. 
    Agar _{2 2} =1 bo’lsa, ni hisoblang.
    

A) 2 B)–2 C) 1 /2 D) – 1 /2 E) – 1

23. 
    a ning qanday qiymatlarida (a² + 2)x = a (x – 7) + 2 tenglamaning ildizlari cheksiz ko‘p bo‘ladi?
    

⎧ 10

⎪

⎪ 40

23. 
    ⎨yz/(y + z) = sistemasidan x ni toping.
    

⎪ 5

A) 80/79 B) 3/7 C) 7/13 D) 79/80 E) 7/5

⎧3x +(k −1)y = k +1

23. 
    k ning qanday qiymatlarida ⎨ tenglamalar sistemasi _⎩(k +1)x + y = 3
    

A) –1 B) –2 C) 0 D) 2 E) 1

23. 
    Ushbu (x² – x – 1) (x² – x – 7) ≤ – 5 tengsizlikni eng katta va eng kichik butun ildizlari ayirmasini toping.
    

23. 
    Agar 9 ≤ x ≤ y ≤ z ≤ t ≤ 81 bo’lsa, x/y + z/t ifodaning eng kichik qiymatini toping?
    

23. 
    Tenglamaning ildizlari yig’indisini toping: |x + 1| = 2 |x – 2|.
    

23. 
    Agar 1+ x −1 + 1− x −1 = 2 bo’lsa, ni hisoblang. x + 2
    

23. 
    a soni b² – 3 bilan to‘g‘ri proporsional. b =5 bo‘lganda a = 88 bo‘lsa, b = -3 bo‘lganda a soni nechaga teng bo‘ladi?
    

23. 
    5−| 2x −1| < 2 tengsizlikning butun yechimlari sonini toping.. A) 2 B) 3 C) 4 D) 6 E) cheksiz ko’p
    

23. 
    Funksiyaning aniqlanish sohasini toping: y = ₂
    

A) (-1; 1) B) (-1; 1) U {2} C) (-1; 2) D) (-∞; -1) U {2} E) (-∞; -1) U (1; +∞)

23. 
    m ning qanday qiymatlarida 4x² – ( 3 m – 3)x – 9 = 0 tenglama turli ishorali ildizlarga ega bo’ladi?
    

23. 
    Hisoblang: ⎜1− ₂ ⎟⎜1− ₂ ⎟...⎜1− ₂ ⎟.
    

A) 64/103 B) 67/103 C) 69/103 D) 415/515 E) 416/515 2  2

23. 
    Agar a(x;1;−1), b(1;0;1) vektorlar uchun (a+3b) =(a−2b) shart bajarilsa, х ni toping.
    

23. 
    Uchburchakning uchlari A(3; -2; 1), B (3; 0; 2) , C(1; 2; 5) nuqtalarda joylashgan. Shu uchburchakning BD medianasi va AC asosi orasidagi burchakni toping.
    

23. 
    b vektor a (1; 2; 2) vektorga kollinear hamda bu vektorlarning skalyar 
    

A) 3 B) 4 C) 12 D) 6 E) 5

23. 
    Berilgan nuqtadan tekislikka uzunliklari 13 va 37 sm bo‘lgan ikkita og‘ma o‘tkazilgan. Og‘malarning tekislikdagi proyejsiyalari nisbati 1 : 7 kabi bo‘lsa, tekislikdan berilgan nuqtagacha bo‘lgan masofani toping.
    

23. 
    AB kesma α tekislikni O nuqtada kesib o‘tadi. Agar AO : OB = 3 : 2 bo‘lib, B nuqtadan x tekislikkacha bo`lgan masofa 8 ga teng bo`lsa, A nuqtadan α tekislikkacha bo`lgan masofani aniqlang.
    

23. 
    x² = y² + 2y + 13 tenglamani qanoatlantiruvchi (x; y) butun sonlar juftligini toping.
    

x3 ²

23. 
    Tenglamani yeching: + x −4 = 0
    

23. 
    Sonlarni taqqoslang: a = sin1 , b = log.
    

44. 
    x ning qanday qiymatlarida ifoda musbat bo’ladi?
    

C) (0; ∞) D) (-∞; 0) E) x ≠πκ,κ∈Ζ

44. 
    n ning qnday qiymatlarida cosnx ⋅ sin x ning davri 3π ga teng? n