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Әдістемелік нұсқау.
1) 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) 2) ,
5) =9
Б.06 ; ; векторлары берілген. векторының , , базисі бойынша жіктелуін тап.
4.R -те жазықтықтың теңдеуі.Жазықтықтардың өзара орналасуы. Нүктеден жазықтыққа дейінгі қашықтық. Әдебиет: [3], 64 бет. № А.01, А.05, А.06, 65 бет. № А.08-А.10, А.19-А.20, 66бет. №А.23..
5.R -тегі түзу теңдеуі. (түзудің жалпы жағдайдағы, бұрыштық коэффициентімен, «кесінді түріндегі», нормальдық теңдеулері. Әдебиет: [3], 31 бет.№ А.01-А.04., Б.01, Б.02., А.06, 32бет. №А.10-А.15.
6.R -де түзудің теңдеуі. Әдебиет: [3], 73 бет.№ А.02, А.03, А.05,А.06, А.07., 74 бет.№ А.12-А.16. Нүктеден түзуге дейінгі қашықтық. Әдебиет: [3], 77бет. №Б.13-Б.14. Екінші ретті қисықтың жалпы теңдеуі. Эллипстің, гиперболаның және параболаның канондық теңдеулері. Әдебиет: [3], 91 бет. №А.03, 92 бет. А.05-А.06, Б.01, 93 бет. №А.07, А.08.
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