Бақылау жұмысы №2
ІІ-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=3, b=2, с=1 болғандағы мәнін есептеңдер.
а)
ә) а=5, b=1, c=2
4. Теңсіздікті шешіңдер.
а) x <3
ә) >2
3>
Достарыңызбен бөлісу: |