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08 Jan 2024, 08:08
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Difficulty:
65%
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Question Stats:
69% (02:31) correct
31%
(02:18)
wrong
based on 1309
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A 10-kilogram soil mixture containing 30 percent sand and 70 percent humus, by weight, is thorougly mixed together. In order to create a 10-kilogram mixture that contains 50 percent of each component, approximately how many kilograms of the soil mixture should be removed and replaced by pure sand?
(A) 2.0
(B) 2.9
(C) 3.4
(D) 4.0
(E) 5.0
(A) 2.0
(B) 2.9
(C) 3.4
(D) 4.0
(E) 5.0
Updated on: 23 Oct 2025, 06:24
Originally posted by MartyMurray on 08 Jan 2024, 11:04.
Last edited by MartyMurray on 23 Oct 2025, 06:24, edited 7 times in total.
Last edited by MartyMurray on 23 Oct 2025, 06:24, edited 7 times in total.
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A 10-kilogram soil mixture containing 30 percent sand and 70 percent humus, by weight, is thoroughly mixed together. In order to create a 10-kilogram mixture that contains 50 percent of each component, approximately how many kilograms of the soil mixture should be removed and replaced by pure sand?
It's easy to get the impression that we should focus on the sand since the question involves replacing some of the mixture with pure sand. However, it's much easier to find the answer by focusing on the humus since that way we need to handle only removal of humus whereas, if we focus on the sand, we'll have to consider both subtracting and adding sand.
We need to create a 10-kilogram mixture such that each component makes up 50 percent of it. So, the final mixture will contain 10 × 0.5 = 5 kilograms each of humus and sand.
So, since the mixture currently has 10 × 0.7 = 7 kilograms of humus, we need to remove enough of the current mixture to remove 2 kilograms of humus.
The mixture is "thoroughly mixed." So, the humus is evenly distributed throughout the mixture. So, to remove 2 kilograms of humus, we remove 2/7 of the entire mixture.
1/7 is a little over 0.14. So, 2/7 is about 0.29.
0.29 × 10 = 2.9
(In case you didn't know the decimal equivalent of 1/7, you could quickly see that 2/7 is going to be a little less 0.3 because 21/7 = 3.)
(A) 2.0
(B) 2.9
(C) 3.4
(D) 4.0
(E) 5.0
Correct answer:
It's easy to get the impression that we should focus on the sand since the question involves replacing some of the mixture with pure sand. However, it's much easier to find the answer by focusing on the humus since that way we need to handle only removal of humus whereas, if we focus on the sand, we'll have to consider both subtracting and adding sand.
We need to create a 10-kilogram mixture such that each component makes up 50 percent of it. So, the final mixture will contain 10 × 0.5 = 5 kilograms each of humus and sand.
So, since the mixture currently has 10 × 0.7 = 7 kilograms of humus, we need to remove enough of the current mixture to remove 2 kilograms of humus.
The mixture is "thoroughly mixed." So, the humus is evenly distributed throughout the mixture. So, to remove 2 kilograms of humus, we remove 2/7 of the entire mixture.
1/7 is a little over 0.14. So, 2/7 is about 0.29.
0.29 × 10 = 2.9
(In case you didn't know the decimal equivalent of 1/7, you could quickly see that 2/7 is going to be a little less 0.3 because 21/7 = 3.)
(A) 2.0
(B) 2.9
(C) 3.4
(D) 4.0
(E) 5.0
Correct answer:
22 Feb 2024, 06:56
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Amount of sand in mixture = 3 kgs
Amount needed = 5 kgs
Say we remove x amount of the mixture. Then that mixture would be 3x/10 sand. We then add x amount of pure sand.
Therefore 3 - 3x/10 + x =5
On solving we get x=20/7 which is approx 2.9 since 21/7 is 3
Amount needed = 5 kgs
Say we remove x amount of the mixture. Then that mixture would be 3x/10 sand. We then add x amount of pure sand.
Therefore 3 - 3x/10 + x =5
On solving we get x=20/7 which is approx 2.9 since 21/7 is 3
