A sum of money is to be distributed among A,B,C,D in the ratio of 5:2:4:3. If A gets ₹1,000 more than D, then what is B's share? - Quantitative Aptitude MCQ Competitive Exam 2026 | ExamTest.live | ExamTest.live

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A sum of money is to be distributed among A,B,C,D in the ratio of 5:2:4:3. If A gets ₹1,000 more than D, then what is B's share?

A $₹1,200$
B $₹1,000$
C $₹500$
D $₹1,600$

Solution & Step-by-step Explanation

Let the shares of A,B,C, and D be 5k,2k,4k, and 3k respectively, where k is a constant multiplier. Given that A gets ₹1,000 more than D: Share of A-Share of D=1000 5k-3k=1000 2k=1000 k=500 We need to find B's share: Share of B=2k=2\times500=₹1,000

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A sum of money is to be distributed among A,B,C,D in the ratio of 5:2:4:3. If A gets ₹1,000 more than D, then what is B's share?

A

₹1,200

B

₹1,000

C

₹500

D

₹1,600

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ratio and proportion arithmetic

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