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13 Jun 2025, 03:57
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B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
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Question Stats:
70% (02:55) correct
30%
(02:59)
wrong
based on 244
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A salt solution contains an unknown percentage of salt. When 1 liter of pure salt is added to the solution, the resulting mixture contains 60% salt. When 2 liters of water are then added to this new mixture, the salt concentration becomes 30%. What was the percentage of salt in the original solution?
(A) 15
(B) 20
(C) 25
(D) 30
(E) 40
(A) 15
(B) 20
(C) 25
(D) 30
(E) 40
13 Jun 2025, 14:55
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siddhantvarma
1 litre of pure salt is added,
\(\frac{s + 1 }{ s + w + 1}\) = \(\frac{3}{5}\\
\)
=> \(3w - 2s = 2\) ...........(i)
2 litres of water is added,
\(\frac{s + 1 }{ s + w + 3}\) = \(\frac{3}{10}\)
=> \(3w - 7s = 1\) ..............(ii)
Subtracting (ii) from (i)
\(5s = 1\) => \(s = \frac{1}{5}\); \(w = \frac{4}{5}\)
\(\frac{s }{ s + w }\) = 20%
Answer B.
General Discussion
17 Jun 2025, 14:09
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Step 1: Solution with s % of salt
Step 2: Solution with 60% of salt
Step 3: Solution with 30% of salt
Let's look at it going backward:
Salt concentration in percents \(S = \frac{ liters-of-salt}{total-liters }\)
From step 2 to 3: concentration is divided by 2 therefore volume is doubled
If adding 2L in step 3 doubles the volume in step 2, then volume in step 2 = 2L
Concentration of 60% means that 60% of the 2L is salt, aka \(\frac{60}{100}*2=1.2 \)
From step 1 to step 2:
- 1 liter of salt is added so the total volume in step 1 was 1L
- Salt step 2 - Salt added = Salt step 2 => \(1.2-1=0.2\)
S in step 1 = \(\frac{0.2}{1} \) =20%
Step 2: Solution with 60% of salt
Step 3: Solution with 30% of salt
Let's look at it going backward:
Salt concentration in percents \(S = \frac{ liters-of-salt}{total-liters }\)
From step 2 to 3: concentration is divided by 2 therefore volume is doubled
If adding 2L in step 3 doubles the volume in step 2, then volume in step 2 = 2L
Concentration of 60% means that 60% of the 2L is salt, aka \(\frac{60}{100}*2=1.2 \)
From step 1 to step 2:
- 1 liter of salt is added so the total volume in step 1 was 1L
- Salt step 2 - Salt added = Salt step 2 => \(1.2-1=0.2\)
S in step 1 = \(\frac{0.2}{1} \) =20%
