A trader uses a faulty balance that shows 1250 g as 1 kg, and he also marks up his cost price by 20%. Find his overall profit percentage.
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A5 %
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B45 %
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C50 %
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D30 %
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ENone of these
Answer
Correct Answer: 50 %
Explanation
Introduction:Here, the trader benefits twice: by marking up the price and by under-delivering weight due to a miscalibrated balance. We compute the compound effect relative to the true cost of goods delivered.
Given Data / Assumptions:
- Scale shows 1 kg when actual is 0.8 kg (since 1.25 kg shows as 1 kg, the factor is actual = shown / 1.25)
- Markup on cost price = 20%
- Let true cost per kg = C rupees
Concept / Approach:For one “kg sale” (based on the faulty balance): revenue = 1.20 * C; actual quantity delivered = 0.8 kg; cost of delivered goods = 0.8 * C. Profit% is computed on the cost of goods delivered.
Step-by-Step Solution:Revenue per sale = 1.2 * CCost per sale = 0.8 * CProfit = 1.2C − 0.8C = 0.4CProfit% = (0.4C)/(0.8C) * 100 = 50%
Verification / Alternative check:Even without markup, under-delivery would create gain; with an added 20% markup, profit reaches exactly 50% under these parameters.
Why Other Options Are Wrong:5%, 30%, 45%: Do not reflect the combined effect of 20% markup and giving only 0.8 kg.
Common Pitfalls:Interpreting “shows 1250 g as 1 kg” backwards; computing profit on selling price instead of cost base of goods delivered.
Final Answer:50 %