жазықтығында жатып нүктесінде қиылсын (156-сурет). және жазықтықтары қиылссын деп қарсы жориық, яғни болсын.
Сонда шығатыны:
![](data:image/png;base64,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) болғандықтан, теорема-4 бойынша болады.
болғандықтан болады.
Параллель түзулер аксиомасына қайшылық келіп шықты. Демек, .
және жазықтықтары дәл келіп беттесуі
мүмкін (157-сурет). Бұл жағдайда параллельдік
белгісі тура болады, өйткені жазықтықтардың беттесуі 157-сурет
олардың параллельдігінің дербес жағдайы.
Т е о р е м а.
Достарыңызбен бөлісу: |