Бақылау жұмысы №2
І-нұсқа.
А деңгейі.
1. Өрнектің мәнін табыңдар.
а) , ә) ![](data:image/png;base64,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) б) в)
2. Теңдеуді шешіңдер.
а) ә)
3. Түбірді тауып, оның а=2, b=3, с=2 болғандағы мәнін есептеңдер.
а)
ә) а=2, b=2, c=10
4. Теңсіздікті шешіңдер.
а) x³≤5
ә) ≥ 7
Достарыңызбен бөлісу: |