. . . . , , . . .
. . . . , , . . .
, ,
Екінші қатардағы теңдіктерді мүшелеп қосып, мынаны табамыз:
,
немесе
Бұдан: ![](data:image/png;base64,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) .
Демек; .
Мысал. 24, 20 және 36 сандары 4-ке қалдықсыз бөлінеді.
Бұдан: .
Сандарды қосамыз: 24+20+36=80 немесе бұдан 80:4=20, демек .
Салдар.
Достарыңызбен бөлісу: |