Gelatin solutions P and Q of concentrations 3.5% and 0.5%, respectively, need to be mixed to obtain a 3% solution R. How much volume (in ml) of P needs to be mixed with 100 ml of Q to obtain R? (Choose the correct option)
Show Hint
- 100
- 250
- 500
- 1000
The Correct Option is C
Solution and Explanation
Step 1: Amount of gelatin in solution P
The concentration of solution P is 3.5%. This means in every 100 ml of solution P, there are 3.5 grams of gelatin.
So, in \( x \) ml of solution P, the amount of gelatin is:
\[ \text{Amount of gelatin in P} = 0.035x \, \text{grams}. \] Step 2: Amount of gelatin in solution Q
The concentration of solution Q is 0.5%. This means in every 100 ml of solution Q, there are 0.5 grams of gelatin.
So, in 100 ml of solution Q, the amount of gelatin is:
\[ \text{Amount of gelatin in Q} = 0.5 \, \text{grams}. \] Step 3: Total amount of gelatin in solution R
We are asked to mix the solutions to obtain a solution R of 3% concentration.
The total volume of the mixed solution is \( x + 100 \) ml (since we are adding \( x \) ml of P to 100 ml of Q).
The concentration of solution R is 3%, which means that the amount of gelatin in the mixture should be 3% of the total volume.
So, the total amount of gelatin in solution R is:
\[ \text{Amount of gelatin in R} = 0.03 \times (x + 100) \, \text{grams}. \] Step 4: Set up the equation
The total amount of gelatin in solution R is the sum of the gelatin from solutions P and Q. So, we have:
\[ \text{Amount of gelatin in R} = \text{Amount of gelatin in P} + \text{Amount of gelatin in Q} \] \[ 0.03 \times (x + 100) = 0.035x + 0.5 \] Step 5: Solve the equation
Now, let's solve for \( x \):
\[ 0.03(x + 100) = 0.035x + 0.5 \] \[ 0.03x + 3 = 0.035x + 0.5 \] Move all the terms involving \( x \) to one side:
\[ 0.03x - 0.035x = 0.5 - 3 \] \[ -0.005x = -2.5 \] Divide both sides by -0.005:
\[ x = \frac{-2.5}{-0.005} = 500 \] Thus, the volume of solution P that needs to be mixed with 100 ml of Q is 500 ml.
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