и![](data:image/png;base64,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) нтервалдар жиыны функциясының анықталу облысы болады (46-сурет)
46 – сурет
2. функциясы шенелмеген, яғни анықталу облысынан алынған аргументтің әрбір мәніне кез келген бір нақты сан сәйкес келеді.
3. функциясының таңбасы аралығында ( – жұп болғанда І ширек, – тақ болғанда ІІІ ширек) оң, ал аралығында ( – тақ болғанда ІІ ширекте, – жұп болғанда IV ширек) теріс болады.
Достарыңызбен бөлісу: |