4. Т е о р е м а. Радиусы -ге тең шардың көлемі мына формула бойынша есептеп шығарылады:
Дәлелдеу. Центрі және диаметрі жарты дөңгелек берілсін. Жарты дөңгелек жазықтығында центрі нүктесінде жатқан және абсциссалар осі болатын тік
бұрышты координаталар системасын
е![](data:image/png;base64,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) нгіземіз (197-сурет). Жарты
дөңгелек қисық
сызықты трапецияның дербес
түрі болып табылады. Ол абсциссалар
осімен және функциясының
графигімен шектелген. 197-сурет
Осы жарты дөңгелекті абсциссалар осінен айналдырғанда шар пайда болады. Айналу фигурасы көлемінің формуласын пайдаланып, оның көлемін табамыз:
Т е о р е м а.
Достарыңызбен бөлісу: |