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20 Mar 2019, 11:13
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
(hard)
Question Stats:
65% (02:35) correct
35%
(02:43)
wrong
based on 382
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When 10% of a solution of milk and water is removed and replaced with water, the ratio of milk and water becomes 3 : 1. Find the ratio of milk and water before the water is added to the solution.
1. 2 : 1
2. 4 : 1
3. 5 : 1
4. 5 : 2
5. 4 : 3
1. 2 : 1
2. 4 : 1
3. 5 : 1
4. 5 : 2
5. 4 : 3
20 Mar 2019, 11:40
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let, initially there was x unit milk and y unit water.
in the removed 10% mixture, milk is 0.1x unit and water is 0.1y unit. we also have to add equal amount of water, that is 0.1(x+y)
new milk amount= x-0.1x= 0.9x
new water amount= y-0.1y+ 0.1(x+y)= y+0.1x
as per the question, 0.9x/(y+0.1x) = 3/1
solution, x/y= 5/1
ans C
in the removed 10% mixture, milk is 0.1x unit and water is 0.1y unit. we also have to add equal amount of water, that is 0.1(x+y)
new milk amount= x-0.1x= 0.9x
new water amount= y-0.1y+ 0.1(x+y)= y+0.1x
as per the question, 0.9x/(y+0.1x) = 3/1
solution, x/y= 5/1
ans C
15 May 2019, 13:33
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Archit3110
Hi, I can solve this question based on VeristasKarishma's weighted average formula.
C2=C1*(V1/V2)
in which C1 is the original ratio of the milk and total amount
C2 is the later ratio which is 3/4
V1/V2=9/10 (because we take out 10% of the mixture)
=> 3/4=C1*9/10 => C1=5/6 => the original ratio of the milk and total 5:6 => the original ratio of the milk and water is 5:1
U can see the explanation behind this formula here: https://www.gmatclub.com/forum/veritas-prep-resource-links-no-longer-available-399979.html#/2012/0 ... -mixtures/
