Тапсырма №2
Төрт нүкте берілген: , АВ, ВС, DС, АD, АС және BD векторларының ішінен тең векторларды көрсетіңдер.
векторы берілген. Басы нүктесінде, ал В ұшы ху жазықтығында жатқан және онымен коллинеар векторды табыңдар.
Төрт нүкте берілген; ![](data:image/png;base64,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) және векторының арасындағы φ бұрышының cos-ын табыңдар.
х өсінің бойынан екі нүктеден бірдей қашықтықтағы нүктесін табыңдар.
Достарыңызбен бөлісу: |