1.02x

0.05x

0.10x

0.795^

1

0.11x

1

0.11x

2

0.97x₂



0.12x

3

0.05x



1.04x ³

0.849^

1.398^


(*)

^{1 2 3} 

Yechish. Berilgan sistema matritsasining diagonal elementlari birga yaqin bo‘lib, qolganlari modul jihatdan birdan ancha kichik. Iteratsiya usulini qo‘llab yechish uchun (*) sistemani quyidagi ko‘rinishga keltiramiz:

x₁ 0.79 50.0 2x₁  0.05x₂  0.1x_{3 }

x₂ 0.84 9 0.1 1x₁  0.0 3x₂  0.05x_{3 }

x₃ 1.39 8 0.1 1x₁  0.1 2x₂ 0.04x_{3 }

Olingan bu sistema uchun yaqinlashish shartini tekshiramiz:

3



j  1

^c1 j

=0.02+0.05+0.10=0.17<1;

3



j  1

3

^c2 j

=0.11+0.05+0.03=0.19<1;



j  1

^c3 j

=0.11+0.12+0.04=0.27<1.

Bulardan, =0.27<1 bo‘lib,



1

_ 0.27

1 0.27
 0.369...  0.37

Demak, hosil bo‘lgan oxirgi sistemaga qo‘llaniladigan iteratsiya

yaqinlashuvchi bo‘lar ekan.

Boshlang‘ich x^{ 0} vektorning elementlari sifatida ozod hadlarni verguldan

so‘ng ikki xonagacha aniqlik bilan quyidagicha tanlaymiz:

 ^0.80

_x _{0 } ^{ }

_ 0.85_
 

 ^1.40

Endi hosil bo‘lgan sistemaga iteratsiya usulini qo‘llash bilan yechimni ketma-ket quyidagicha topamiz:

K=1 bo‘lganda

K=2 bo‘lganda

x ⁽¹⁾ =0.795-0.013+0.0425+0.140=0.9613

x ⁽¹⁾ =0.849+0.088-0.0255+0.070=0.9813
1

2


x ⁽¹⁾ =1.398+0.088+0.1020-0.056=1.532
3

K=3 bo‘lganda

2

3


(2)

1

x


^{ 0.978 ,} x ⁽²⁾

2

 1.002 ^,

x⁽²⁾  1.560

3

(3)
x

1

 0.980 ^,

x⁽³⁾  1.004 ^,

x⁽³⁾  1.563

K=2 va K=3 bo‘lganda yechim qiymatlarining farqi modul jihatdan 0,37^.

3. 
   dan katta emas, shuning uchun taqribiy yechimni quyidagicha olamiz:
   

x₁  0.980, x₂  1.004, x₃  1.563

4. Gauss – Zeydelning iteratsiya usuli

Quyidagi chiziqli tenglamalar sistemasini Gayss-Zeydel usulida yechamiz.

^a₁₁^x₁^+a₁₂ ^x₂^+a₁₃^x₃^+a₁₄ ^x₄^=b₁


a


_{ 21}x₁+a

22 ^x

₂+a

23^x

₃+a

24 ^x

₄=b₂

(4.1)

^ ₃₁x₁+a
a




32 ^x

₂+a

33^x

₃+a

34 ^x

₄=b₃

^a₄₁x₁+a ₄₂ x₂+a ₄₃x₃+a ₄₄ x₄=b₄


Aytaylik,

a_ii  0

i=1,2,3,4 bo‘lsin. Berilgan sistemani

_x₁=(b₁-a₁₂x₂-a₁₃x₃-a₁₄x₄ )/a₁₁

^x₂=(b₂-a₁₁x₁-a₂₃x₃-a₂₄x₄ )/a₂₂



^x₃=(b₃-a₃₁x₁-a₃₂x₂-a₃₄x₄ )/a₃₃



^_x₄=(b₄-a₄₁x₁-a₄₂x₂-a₄₃x₃ )/a₄₄

(4.2)

ko‘rinishga keltiramiz.

Bu sistemaning yechimini topish uchun birorta boshlang‘ich yaqinlashishni

tanlab

1

ikkinchi tenglamasidan

2 12 2

13 3

14 4 11

x ⁽¹⁾  (b  a x ⁽¹⁾  a x ⁽⁰⁾  a x ⁽⁰⁾ ) / a

2

uchinchi tenglamasidan

2 21 1

23 3

24 4 22

x ⁽¹⁾  (b  a x ⁽¹⁾  a x ⁽¹⁾  a x ⁽⁰⁾ ) / a

3 3 31 1

32 2

34 4 33

to‘rtinchi tenglamasidan esa

x⁽¹⁾  (b₄  a₄₁x⁽¹⁾  a₄₂x⁽¹⁾  a₄₃x⁽¹⁾) / a₄₄

4

larni hisoblab topamiz.

1 2 3

Xuddi shu yo‘l bilan k-1 yaqinlashish asosida k-chi yaqinlashishni quyidagicha topamiz:

x ^{(k )}  (b

_{ a x} (k  1) _{ a x} (k  1) _{ a x} (k  1) _{) / a}

1 1 12 2

13 3

14 4 11

x ^{(k )}  (b

_{ a x} (k ) _{ a x} (k  1) _{ a x} (k  1) _{) / a}

2 2 21 1 23 3 24 4 22

x ^{(k )}  (b  a x ^{(k )}  a x ^{(k )}  a x ^{(k  1)} ) / a

3 3 31 1 32 2 34 4 33

x ^{(k )}  (b  a x ^{(k )}  a x ^{(k )}  a x ^{(k )} ) / a

4 4 41 1 42 2 34 43 44

Umuman, agar (3.2) tenglamalar sistemasi o‘rniga n noma’lum n chiziqli

tenglamalar sistemasi berilgan bo‘lib, a_ii  0, i  1, n bo‘lsa, k-yaqinlashish uchun

x^(k)  (b  a

x^(k) ...  a

_x(k) _{ a}

x^{(k 1)} ...  a

_x(k 1)_{) / a}

i i

formula hosil bo‘ladi.

i1 1

i, i 1 i 1

i, i 1 i 1

i, n_1 n 1 ii

Iteratsiya jarayoni

_{max x}(k ) _{ x}(k  1) _{ }

i i

shart bajarilguncha davom etadi (>0 berilgan aniqlik).

Bu iteratsiya jarayonining yaqinlashishi uchun

^{ a}ij

 a_ii ,

i  1, n

(4.3)

j  1, i  j

tengsizliklarning bajarilishi etarlidir.

3.3-misol. Quyidagi chiziqli tenglamalar sistemasi =10^-3 aniqlikda Zeydel usuli bilan yeching.

^20.9x₁ ^1.2x₂ ^{ 2.1x}₃ ^{ 0.9x}₄ ^{ 21.7}



_1.2x₁  21.9x₂ 1.5x₃  2.5x₄  27.46

^2.1x 1.5x 19.8x 1.3x  28.76

^ 1 2 3 4

^0.9x₁  2.5x₂ 1.3x₃  32.1x₄  49.72



Yechish. Bu tenglamalar sistemasi uchun (4.3) shartning bajarilishini tekshirib ko‘rish qiyin emas. Uni (3.40) ko‘rinishga keltiramiz.

x₁=(21.70-1.2x₂-2.1x₃-0.9x₄)/20.9

x₂=(27.46-1.2x₁-1.5x₃-2.5x₄)/21.2

x₃=(28.76-2.1x₁-1.5x₂-1.3x₄)/19.8

x₄=(49.72-0.9x₁-2.5x₂-1.3x₃)/32.1

boshlang‘ich

x^{ 0} vektorni

^1.04

 

_{0 }1.30_
x 

1

2

3

4


^1.45^

eku

x⁽⁰⁾  1.04,

x⁽⁰⁾  1.3,

x⁽⁰⁾  1.45,

x⁽⁰⁾  1.55

 

_1.55_

kabi tanlab, Zeydel usulini qo‘llaymiz.

K=1 deb, birinchi yaqinlashishni topamiz:

x⁽¹⁾ =(21.7-1.1 x ⁽⁰⁾ -2.1 x ⁽⁰⁾ -0.9 x ⁽⁰⁾ )/20.9=

¹ 2 3 4

=(21.7-1.56-3.045-1.395)/20.9=0.7512

x⁽¹⁾ =(27.46-1.2 x ⁽¹⁾ -1.5 x ⁽⁰⁾ -2.5 x ⁽⁰⁾ )/21.2=

² 1 3 4

=(27.46-0.900-2.175-3.875)=0.9674

x⁽¹⁾ =(28.76-2.1 x ⁽¹⁾ -1.5 x ⁽¹⁾ -1.3 x ⁽⁰⁾ )/19.8=

³ 2 2 4

=(28.76-1.575-1.455-2.013)=1.1977

x⁽¹⁾ =(49.72-0.9 x ⁽¹⁾ -2.5 x ⁽¹⁾ -1.3 x ⁽¹⁾ )/32.1=

⁴ 1 2 3

max

_xi(1) _{ xi}(0)

=(49.72-0.675-2.425-1.56)=1.4037

 max0,2888; 0,3004; 0,2504; 0,1500 0,3004  10^3.

K=2 bo‘lganda:

x⁽²⁾ =13.76062/20.9=0,6558

x⁽²⁾ =21.9902/21.2=0.9996
1

2


x⁽²⁾ =23.75180/19,8=1,19959
3


x⁽²⁾ =44.93971/32.1=1.4000
4

_{max xi} (2) _{ xi} (1)

 max0,0954; 0,0322; 0,0019; 0,0037 0,0954  10^3.

K=3 bo‘lganda:
_{max xi}(3) _{ xi}(4)

x⁽³⁾ =13.7213/20.9=0.6557

x⁽³⁾ =21.200528/21.2=1.00002
2

1


x⁽³⁾ =23.759844/19.8=1.19999
3


x⁽³⁾ =44.939909/32.1=1.4000
4

 max0,0001; 0,0004; 0,0004;0,3  0,0004   10 ^3

Bu qadam uchun yaqinlashish sharti bajarildi, demak, berilgan aniqlikdagi yechim:
x

x

x

 0,656;
x

1

 1,000;

 1,200;

 1,400.

CHiziqli tenglamalar sistemasini Zeydel usuli bilan hisoblash dasturini beramiz:
2

3

4

{ Delphi tilida dastur} uses crt;

label 40,90,100; var