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18 Dec 2014, 11:11
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D
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The ratio of a compound, by weight, consisting only of substances x, y, and z is 4:6:10,
respectively. Due to a dramatic increase in the surrounding temperature, the composition of the
compound is changed such that the ratio of x to y is halved and the ratio of x to z is tripled. In the
changed compound, if the total weight is 58 lbs, how much does substance x weigh?
A) 48
B) 36
C) 24
D) 12
E) 10
respectively. Due to a dramatic increase in the surrounding temperature, the composition of the
compound is changed such that the ratio of x to y is halved and the ratio of x to z is tripled. In the
changed compound, if the total weight is 58 lbs, how much does substance x weigh?
A) 48
B) 36
C) 24
D) 12
E) 10
18 Dec 2014, 11:17
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x:y=4:6
if the ratio is halevd then x:y=2:6
The old ratio of x to z was 4:10. If this ratio is tripled, then the new ratio of x to z is 12:10.
x:y=2:6=12:36 ( multiplied the ration with 6/6 to have a common co eff x in both the rations x:y and x:z)
so x:y:z= 12:36:10
and we know x + y + z = 58 lbs
from the ratio of x ,y and z we have x=12k y=36k z=10K
put it in the equation we have 12k+36k+10k=58
k=1
Hence x=12(1)=12
Ans D
if the ratio is halevd then x:y=2:6
The old ratio of x to z was 4:10. If this ratio is tripled, then the new ratio of x to z is 12:10.
x:y=2:6=12:36 ( multiplied the ration with 6/6 to have a common co eff x in both the rations x:y and x:z)
so x:y:z= 12:36:10
and we know x + y + z = 58 lbs
from the ratio of x ,y and z we have x=12k y=36k z=10K
put it in the equation we have 12k+36k+10k=58
k=1
Hence x=12(1)=12
Ans D
03 Jan 2015, 07:55
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I solve this type of problem using the LCM.
So, I lined up the substances and noted their ratios:
x____y____z
4____6___10
Then, 4 is halved in relation to y and it is tripled in relation to Z:
So, from 4 it becomes 2 and from 4 it becomes 12
The new ratios are:
x____y____z
2____6____z
12___y____10
Now, in order to find the missing ratio for y we will use the ratios for x. We need to find the LCM for the ratios of x, because now the denominators are different. LCM of 2 and 12 is 12. Then we multiply, such that we end up with 12, for x.
x____y____z ------------->x____y____z
2____6____z------x6---->12__36___z
12___y____10--->x1---->12__36___10. This last row shows the ratios we need.
Finally we use the unknown mupltiplier:
12x+36x+10x=58
58x=58
x=1, and since we have 12(x), this is 12(1), which is 12. ANS D.
So, I lined up the substances and noted their ratios:
x____y____z
4____6___10
Then, 4 is halved in relation to y and it is tripled in relation to Z:
So, from 4 it becomes 2 and from 4 it becomes 12
The new ratios are:
x____y____z
2____6____z
12___y____10
Now, in order to find the missing ratio for y we will use the ratios for x. We need to find the LCM for the ratios of x, because now the denominators are different. LCM of 2 and 12 is 12. Then we multiply, such that we end up with 12, for x.
x____y____z ------------->x____y____z
2____6____z------x6---->12__36___z
12___y____10--->x1---->12__36___10. This last row shows the ratios we need.
Finally we use the unknown mupltiplier:
12x+36x+10x=58
58x=58
x=1, and since we have 12(x), this is 12(1), which is 12. ANS D.
