0Q: Two casks A and B were filled with 2 kinds of sherry, mixed in the cask A in the ratio of 2:7, and in the cask B in the ratio of 1:5. What quantity must be taken from each to form a mixture which shall consist of 2 gallons of one kind and 9 gallons of the other,
SOLUTION.
Let us assume that we take ‘a’ gallons from the first cask and ‘b’ from the other cask. The, considering the first cask, we have :
2a/9 parts(or, units) of First type of sherry,S1,and
7a/9 parts(or, units) of First type of sherry,S2 .
And, considering the second cask, we have:
b/6 parts (or, units) of First type of sherry, S1,and
5b/6 parts (or, units) of First type of sherry, S2.
In the mixture, therefore, we have 2a/9+b/6 units of S1 and 7a/9+5b/6 units of S2.
Now, 2a/9+b/6 = (4a+3b) / 18 and 7a/9+5b/6 = (14a+15b) / 18
Therefore, as per the question, the ratio of S1 to S2 in the mixture is,
-- ( (4a+3b) / 18 ) / ( (14a+15b) / 18 ) = 2 / 9
-- (4a+3b) / (14a+15b) = 2 / 9
From which,
-- 36a+27b = 28a+30b
-- 8a = 3b
From which, we have finally,
a/b = 3/8
Thus, we have to take 3 gallons from cask A and 8 gallons from cask B to form the mixture.
