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15 Apr 2020, 08:48
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
55%
(hard)
Question Stats:
64% (02:31) correct
36%
(02:37)
wrong
based on 258
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7 times the number of coins that A has is equal to 5 times the number of coins B has while 6 times the number of coins B has is equal to 11 times the number of coins C has. What is the minimum number of coins with A, B and C put together?
110
120
154
165
174
Are You Up For the Challenge: 700 Level Questions
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Are You Up For the Challenge: 700 Level Questions
15 Apr 2020, 08:59
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A:B = 5:7
B:C= 11:6
A:B:C = 5*11: 7*11: 6*7 = 55 :77 : 42
Minm of a+b+c = 55+77+42= 174
B:C= 11:6
A:B:C = 5*11: 7*11: 6*7 = 55 :77 : 42
Minm of a+b+c = 55+77+42= 174
Bunuel
15 Apr 2020, 09:00
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Bunuel
Let us get all the values in terms of ONE variable...
We are looking for A+B+C...
7 times the number of coins that A has is equal to 5 times the number of coins B has => \(7A=5B...A=\frac{5B}{7}\)
while 6 times the number of coins B has is equal to 11 times the number of coins C has.=> \(11C=6B...C=\frac{6B}{11}\)
\(A+B+C=\frac{5B}{7}+B+\frac{6B}{11}=\frac{174B}{77}\)
As \(\frac{174B}{77}\) has to be an integer, the LEAST value of B is 77, and SUM = \(\frac{174*77}{77}=174\)
E
