Жауабы: 364 га.
Цистернаға 38 л бензин құйғаннан соң, цистернаның 5%-
нің толмағаны байқалады. Цистерна толық толтырылуы
үшін қанша бензин құйылуы керек?
Ш
5%
38л
ешуі: 38л – 95 %
Х – 100 %
Жауабы: 2л.
50. Зауытқа белгілі мерзімге 800 деталь жасау тапсырылған. График бойынша жүмыс істеп зауыт тапсырыстың 25%-ін орындады. Бұдан соң әр күні жоспардан 100 деталь артық орындап, тапсырысты мерзімінен екі күн бұрын бітірді. Зауыт тапсырысты неше күнде орындады?
Шешуі: Барлығы 8000 деталь
Әр күні – х деталь
![](data:image/png;base64,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)
x∙y=3900;
x=13%
Достарыңызбен бөлісу: |