|
|
бет | 382/451 | Дата | 12.03.2018 | өлшемі | 34,89 Mb. | | #39184 |
|
b) , y(0)=1, a=0, b=1,
6.Қуалау және ақырлы-айырымдық, вариациялық әдістерді қолданып төмендегі қарапайым дифференциалдық теңдеулер үшін шектік есепті шешу:
, y(0)=1; y(1)=e-1+1=1.367; e=10-2
, y(0)=1; y(1)=e-1+1=1.367; e=10-2
, y(0)=1; y(1)=e-1+1=1.367; e=10-2
, y(0)= y(1)=0, a=1+0,4k, k=0,1,2.,
b=2,5+0,5n, n=0,1,2,3,4,5.
![](data:image/png;base64,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)
Достарыңызбен бөлісу: |
|
|