Mundarija kirish aniq integrallarni taqribiy hisoblash. Eng sodda interpolyatsion kvadratur formula to‘G’ri to‘rtburchaklar formulasi trapetsiyalar formulasi


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integralning taqribiy hisoblash usullari va monto karlo usuli

1.16143 1.37391 8.24584 0.00000 1.16143 2.53534 3.90926
2.57042 1.13671 3.31732 0.00000 2.57042 3.70713 4.84384
2.26348 1.88293 4.42765 0.00000 2.26348 4.14641 6.02934


Y1(i) <= y(i) <= y2(i) shart bo'yicha y(i)lar soni N1= 13
Z1(i) <= z(i) <= Z2(i) shart bo'yicha z(i)lar soni N2= 1
U(i)
Xtt(i) ytt(i) zt(i) ut(i) FNF(xtt, ytt,zt)
1.21274 2.99824 6.40941 6.94950 17.02980
w= 48
S1= 57.6
Yuqoridagilarga tayangan holda Maple 7 da va Basic tilidan olingan natijalar aniq yechimga qanchalik yaqinligini topamiz:

Aniq yechim y=170/3 va Maple 7 da olingan natija bilan bir xil.


Basic tilidagi natija esa s1=57.6
=(s1-y)/y=(57.6-170/3)/(170/3)=0.016=1,8% demak farq juda katta emas.


4-masala. integralni , integrallash sohasi D: x=1, x=3, y=x2, y=x+x2 chiziqlar bilan chegaralangan, bo‘lganda hisoblang.
Avvalo aniq hisoblashni ko‘ramiz:



4-masaladagi integralni hisoblash(Maple 7 va Mathcadda).
1. Chegarasiz hisoblash:
> Int( Int((x+y)^2, y),x)=int(int((x+y)^2, y),x);

2. Chegara bo’yicha hisoblash:
> Int( Int((x+y)^2, y=x^2..x+x^2),x=1..3)=
evalf(int(int((x+y)^2, y=x^2..x+x^2),x=1..3));

3.Mathcadda



5-masala. integralni, D: x=0, x=4, y=1, y=5 soha bo‘yicha hisoblang va baholang.
1. Chegarasiz hisoblash.
> Int( Int(x^2+y^2, y),x)=int(int(x^2+y^2, y),x);

2. Chegaraga asosan hisoblash.
> Int(Int(x^2+y^2, x = 0..4), y = 1..5)= evalf(int(int(x^2+y^2, x = 0..4), y = 1..5));

3.Mathcadda olingan natija:



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