№1
Берілген өрнектерді қандай топтарға бөлуге болады?
274+х=594 320+40=470-110
415=400+15
200+3=3+200
35-15<15+6
17>872-864
524-х=244
22>87-67
47<15+37
х-251=522
Теңдеудің теңдікпен теңсіздіктен қандай айырмашылығы бар?
Айнымалысы бар өрнек дегенді қалай түсінесіздер?
«Кім жылдам?», «Ойлан тап!» тапсырмалары беріледі.
№4
№5
Бөлшекті қысқарту
№6
№7
«Қайсысы ақиқат?»
№8
Есепті теңсіздік құру арқылы шығар.
Тік төртбұрыштың бір қабырғасы 12 см. Екінші қабырғасы қандай болу керек, төртбұрыштың периметрі ауданынан артық болу үшін?
№9
Айнұр 5 теңгеден 9 дәптер және 7 теңгеден бірнеше дәптер алды. Егер оның 59 теңгесі болса, олш 7 теңгеден қанша дәптер ала алады?
№11
Өрнектің мәнін тиімді тәсілмен есепте:
№12
х-тің кез келген мәнінде өрнектің 7-ге бөлінетінін дәлелде:
№13
Өрнектің мәнін тиімді тәсілмен есепте:
![](data:image/png;base64,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)
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3 топқа бөлуге болады: теңдік, теңдеу, теңсіздік.
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