Solutions are formed when a solute dissolves in a solvent. Because we measure solutions by volume rather than mass, we use concentration to link solution volumes with amount in moles.
Concentration Equations
Concentration is the amount of solute dissolved in a unit volume of solution. It can be expressed in two ways:
- Moles per cubic decimeter (\( \text{mol dm}^{-3} \))
- Grams per cubic decimeter (\( \text{g dm}^{-3} \))
Where:
- \( n \) = amount of substance in moles (\( \text{mol} \))
- \( C \) = concentration in moles per cubic decimeter (\( \text{mol dm}^{-3} \))
- \( V \) = volume of solution in cubic centimeters (\( \text{cm}^3 \))
🔑 Key Principle
To convert from \( \text{mol dm}^{-3} \) to \( \text{g dm}^{-3} \), multiply the concentration by the relative molecular mass (\( M_r \)) of the solute: \[ \text{Concentration in g dm}^{-3} = \text{Concentration in mol dm}^{-3} \times M_r \]
Preparing a Standard Solution
A standard solution is a solution of known concentration. Preparing one is the first part of AQA Required Practical 1 (RP1):
- Weigh the solute in a weighing boat on a balance.
- Transfer the solid to a beaker and reweigh the weighing boat (weighing by difference).
- Dissolve the solid in a beaker using distilled water, stirring with a glass rod.
- Transfer the solution to a volumetric flask using a funnel. Rinse the beaker, glass rod, and funnel with distilled water and transfer the washings to the flask.
- Fill the flask with distilled water until the bottom of the meniscus lies exactly on the graduation mark. Use a pipette for the last few drops.
- Stopper the flask and invert it several times to ensure thorough mixing.
Titration Calculations
A titration is used to find the concentration of an unknown solution by reacting it with a standard solution. The three-step roadmap below outlines the titration calculation process:
Step 1: Calculate the moles of sodium hydroxide used.
\[ n(\text{NaOH}) = \frac{C \times V}{1000} = \frac{0.100 \times 25.0}{1000} = 2.50 \times 10^{-3} \text{ mol} \]
Step 2: Use the reaction stoichiometry to find the moles of sulfuric acid.
The equation shows that \( 2 \text{ moles of NaOH} \) react with \( 1 \text{ mole of } \text{H}_2\text{O}_4 \). The ratio is \( 2 : 1 \).
\[ n(\text{H}_2\text{SO}_4) = \frac{2.50 \times 10^{-3}}{2} = 1.25 \times 10^{-3} \text{ mol} \]
Step 3: Calculate the concentration of the sulfuric acid.
\[ C(\text{H}_2\text{SO}_4) = \frac{n \times 1000}{V} = \frac{1.25 \times 10^{-3} \times 1000}{20.0} = 0.0625 \text{ mol dm}^{-3} \]
When selecting results to calculate the mean titre, only use concordant titres. Concordant titres are those within \( 0.10 \text{ cm}^3 \) of each other. Never include a rough titration titre in your mean titre calculation!
Percentage Uncertainty in Measurements
Every piece of apparatus used in a titration has an uncertainty. You must be able to calculate the percentage uncertainty associated with a measurement using the formula:
Note: A titre volume requires two readings: an initial volume reading and a final volume reading. Therefore, the number of readings is 2.
\[ \text{Total Absolute Uncertainty} = 2 \times 0.05 = 0.10 \text{ cm}^3 \]
\[ \text{Percentage Uncertainty} = \frac{0.10}{20.00} \times 100 = 0.50\% \]
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