Three drunkards agree to pool their vodka and decided to share it with a fourth drunkard (who had no vodka) at a price equal to 5 roubles a litre. The first drunkard contributed 1 litre more than the second and the second contributed a litre more than the third. Then all four of them divided the vodka equally and drank it. The fourth drunkard paid money, which was divided in the ratio of each drunkard's contribution towards his portion. It was found that the first drunkard should get twice as much money as the second. Based on this information answer the questions 26-28. (Assume that all shares are integral).
26. How much money did the second drunkard get in roubles)?
(a) 8
(c) 5
(b) 10
(d) Data insufficient
Answers
Answered by
4
Answer:
ans is a
Explanation:
Answered by
0
Answer:
c
Explanation:
money got by second drunkard in roubles is 5.
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