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30 litre of solution contains alcohol and water in the ratio 2:3. How much alcohol must be added to the solution to make a solution containing 60% of alcohol?
- a)10
- b)12
- c)14
- d)15
- e)None of these
Correct answer is option 'D'. Can you explain this answer?
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Verified Answer
30 litre of solution contains alcohol and water in the ratio 2:3. How ...
Answer – d) 15 Explanation : alcohol = 30*2/5 = 12 and water = 18 litres (12 + x)/(30 +x) = 60/100, we will get x = 15
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30 litre of solution contains alcohol and water in the ratio 2:3. How ...
Problem: To make a 60% alcohol solution, we need to add alcohol to a given solution containing alcohol and water in the ratio 2:3. We need to find the amount of alcohol to be added.
Given: 30 litres of solution containing alcohol and water in the ratio 2:3.
Let's assume the amount of alcohol in the given solution is 2x litres and the amount of water is 3x litres.
Then, according to the question, we can write:
Amount of alcohol in the given solution = 2x litres
Amount of water in the given solution = 3x litres
Total amount of solution = 30 litres
Now, we need to find the amount of alcohol to be added to make a 60% alcohol solution. Let's assume we need to add y litres of alcohol.
Then, the amount of alcohol in the final solution will be (2x + y) litres and the amount of water will still be 3x litres.
According to the question, the final solution should be a 60% alcohol solution. This means that:
(2x + y) / (2x + y + 3x) = 0.6
Simplifying the above equation, we get:
2x + y = 18x + 0.6y
0.4y = 16x
y = 40x/3
Therefore, we need to add 40x/3 litres of alcohol to the given solution to make a 60% alcohol solution.
Now, we know that the total amount of solution is 30 litres. So,
2x + 3x = 30
5x = 30
x = 6
Therefore, the amount of alcohol in the given solution is 2x = 12 litres and the amount of water is 3x = 18 litres.
Substituting the value of x in the equation for y, we get:
y = 40x/3 = 40*6/3 = 80/3
Therefore, we need to add 80/3 litres of alcohol to the given solution to make a 60% alcohol solution.
Hence, the correct answer is option (d) 15.
Given: 30 litres of solution containing alcohol and water in the ratio 2:3.
Let's assume the amount of alcohol in the given solution is 2x litres and the amount of water is 3x litres.
Then, according to the question, we can write:
Amount of alcohol in the given solution = 2x litres
Amount of water in the given solution = 3x litres
Total amount of solution = 30 litres
Now, we need to find the amount of alcohol to be added to make a 60% alcohol solution. Let's assume we need to add y litres of alcohol.
Then, the amount of alcohol in the final solution will be (2x + y) litres and the amount of water will still be 3x litres.
According to the question, the final solution should be a 60% alcohol solution. This means that:
(2x + y) / (2x + y + 3x) = 0.6
Simplifying the above equation, we get:
2x + y = 18x + 0.6y
0.4y = 16x
y = 40x/3
Therefore, we need to add 40x/3 litres of alcohol to the given solution to make a 60% alcohol solution.
Now, we know that the total amount of solution is 30 litres. So,
2x + 3x = 30
5x = 30
x = 6
Therefore, the amount of alcohol in the given solution is 2x = 12 litres and the amount of water is 3x = 18 litres.
Substituting the value of x in the equation for y, we get:
y = 40x/3 = 40*6/3 = 80/3
Therefore, we need to add 80/3 litres of alcohol to the given solution to make a 60% alcohol solution.
Hence, the correct answer is option (d) 15.
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Community Answer
30 litre of solution contains alcohol and water in the ratio 2:3. How ...
The initial solution contains 30 liters, with alcohol and water in the ratio 2:3.
The amount of alcohol in the solution is:
The amount of water in the solution is:
The amount of water in the solution is:
We need to add some amount of alcohol (let it be x) to make the alcohol content 60% of the total solution.
After adding x liters of alcohol, the new total volume of the solution will be 30 + x liters, and the amount of alcohol will be 12 + x liters.
The concentration of alcohol should be 60%, so:
Solving the equation:
Solving the equation:
Thus, 15 liters of alcohol must be added to the solution.
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30 litre of solution contains alcohol and water in the ratio 2:3. How much alcohol must be added to the solution to make a solution containing 60% of alcohol?a)10b)12c)14d)15e)None of theseCorrect answer is option 'D'. Can you explain this answer?
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