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2014A.Abdirashidov (1)

IV.
Funksiyani sonli integrallash.

1.
Sonli integrallash masalasini o‘rta, chap va o‘ng to‘g‘ri
to‘rtburchaklar usullari bilan yechish.
Namunaviy misol:
Hisoblang:


1
4
e
x
dx
,
n
= 10. Xatolikni
Runge formulasi bo‘yicha baholang.
2.
Sonli integrallash masalasini o‘rta to‘g‘ri to‘rtburchaklar va
trapetsiya usullari bilan yechish.
Namunaviy misol:
Hisoblang:


1
0
1
x
dx
,
n
= 10.
Xatolikni Runge formulasi bo‘yicha baholang.
3.
Sonli integrallash masalasini trapetsiya va Simpson usullari
bilan yechish.
Namunaviy misol:
Hisoblang:



1
0
1
)
1
ln(
dx
x
x
,
n
= 10.
Xatolikni Runge formulasi bo‘yicha baholang.
4.
Ikki karrali integrallarni taqribiy hisoblash.
V.
Oddiy differensial tenglamalarni sonli yechish.

1.
Oddiy differensial tenglamalarni taqribiy yechishning
klassik, modifikatsiyalangan, rivojlantirilgan Eyler usullari.
Namunaviy misol
: Ushbu
y

=
y
3
,
y
(0) = 0.5 Koshi
masalasining [0, 2] kesmadagi sonli yechimini
h
= 0.2
qadam bilan toping.

20
2.
Oddiy differensial tenglamalarni taqribiy yechishning
klassik Eyler va Eyler-Koshi usullari.
Namunaviy misol
: Ushbu
y

= -
y
2
+ 2/
x
2
,
y
(1) = 0
Koshi masalasining [1, 3] kesmadagi sonli yechimini
h
= 0.2 qadam bilan toping.
3.
Oddiy differensial tenglamalarni taqribiy yechishning Eyler
va Runge-Kutta usullari.
Namunaviy misol
: Ushbu
y

=
x
2
,
y
(0) = 1 Koshi
masalasining [0, 2] kesmadagi sonli yechimini
h
= 0.2
qadam bilan toping.
4.
Oddiy differensial tenglamalarni taqribiy yechishning
Runge-Kutta-Gill va Kutta-Merson usullari.
Namunaviy misol
: Ushbu
y

+
y
+
y
3
= cos(
x
),
y
(0) = 2
Koshi masalasining [0, 2] kesmadagi sonli yechimini
h
= 0.2 qadam bilan toping.
5.
Oddiy differensial tenglamalarni taqribiy yechishning
Adams va Adams-Krilov usullari.
Namunaviy misol
: Ushbu
y

+
y
= cos(
xy
),
y
(0) = 1
Koshi masalasining [0, 2] kesmadagi sonli yechimini
h
= 0.2 qadam bilan toping.
6.
Oddiy differensial tenglamalarni taqribiy yechishning
Adams va Miln usullari.
Namunaviy misol
: Ushbu
y

+
y
= sin(
xy
),
y
(0) = 2
Koshi masalasining [0, 2] kesmadagi sonli yechimini
h
= 0.2 qadam bilan toping.
7.
Oddiy differensial tenglamalarni taqribiy yechishning
Xemming va Adams-Beyshfort usullari.
Namunaviy misol
: Ushbu
y

+
y
+
y
3
= cos(5
x
),
y
(0) = 3
Koshi masalasining [0, 2] kesmadagi sonli yechimini
h
= 0.2 qadam bilan toping.

21
8.
Oddiy differensial tenglamalarni taqribiy yechishning
Adams-Multon va Miln usullari.
9.
Oddiy differensial tenglamalarni bir qadamli usullar (Eyler,
Runge-Kutta, Kutta-Merson usullari) bilan taqribiy yechish.
10.
Oddiy
differensial
tenglamalarni
prediktor-korrektor
tipidagi usullar (Adams-Beyshfort, Adams-Multon va Miln
usullari) yordamida taqribiy yechish.
11.
Oddiy differensial tenglamalarni ko‘p qadamli usullar
(Adams va Miln usullari) yordamida taqribiy yechish.
12.
Qat’iy differensial tenglamalarni taqribiy yechish usullari.
13.
Qat’iy bo‘lmagan differensial tenglamalarni taqribiy
yechish usullari.
14.
Birinchi tartibli oddiy differensial tenglamalar sistemasini
yechishning sonli usullari.

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