Mixing water with milk but selling at cost price: In what ratio should water be mixed with milk so that selling the resulting mixture at the original cost price of milk yields a profit of 50/3 %?
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A1:2
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B6:1
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C2:3
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D2:5
Answer
Correct Answer: 6:1
Explanation
Introduction / Context:This is a classic adulteration/mixture scenario. If a milk seller adds free water and still sells at the milk’s cost price, all the revenue from the water portion becomes profit. The profit percentage directly relates to the water-to-milk ratio.
Given Data / Assumptions:
- Let milk quantity be m and added water be w.
- Selling price per unit equals milk’s cost price per unit.
- Profit % = (50/3)% = 16.666…%.
Concept / Approach:Because water is free, profit comes from selling w units at milk’s unit cost. Hence Profit% = (w / m) * 100. Set (w / m) * 100 = 50/3 and solve for w : m, then invert if needed to express milk : water.
Step-by-Step Solution:(w / m) * 100 = 50 / 3 ⇒ w / m = 1 / 6.Therefore, milk : water = m : w = 6 : 1.
Verification / Alternative check:If milk = 6 L and water = 1 L, total = 7 L. Revenue at milk’s unit cost equals 7 units of cost while cost is only 6 units → profit = 1/6 of cost → 16.666…%, as required.
Why Other Options Are Wrong:
- 1:2, 2:3, and 2:5 do not produce a 16.666…% profit when selling at cost price.
Common Pitfalls:
- Treating profit% as w / (m + w) instead of w / m (since selling at cost price of milk).
Final Answer:6:1