болады. Және
![](data:image/png;base64,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)
Сонымен бірінші типті қисық сызықты интегралды есептеу үшін интеграл астындағы функцияда х және у айнымалылардын координаталардың параметр арқылы өрнектерімен, ал ds көбейткішті параметрдің функциясы түрде доғаның дифференциалымен ауыстыру керек.
Достарыңызбен бөлісу: |