Milk was poured into 4 cans; 30 percent of the total milk was poured into the first can. 2 5 sixths
September 11, 2021 | education
| Milk was poured into 4 cans; 30 percent of the total milk was poured into the first can. 2 5 sixths of that which is 26 liters less than 1 of 4 10 liters more than the second into the first and third How many liters of milk were poured into 4 cans.
Let there be x liters of milk in total.
Then 30% of the total milk or 0.3x liters was poured into the first can.
In the second, 5/6 * 0.3x = 1 / 4x = 0.25x liters.
In the third (0.3x – 26) liters.
The fourth (0.25x + 10) liters.
Let’s get and solve the equation.
0.3x + 0.25x + (0.3x – 26) + (0.25x + 10) = x,
1.1x – 16 = x,
1,1x – x = 16,
0.1x = 16,
x = 16: 0.1,
x = 160 (liters).
Answer: 160 liters of milk was poured into 4 cans.
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