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Molality is a measure of the concentration of a solution expressed in terms of the amount of solute per unit mass of solvent. It is an important concept in chemistry, especially when dealing with colligative properties like freezing point depression.
To calculate molality, use the formula: \( m = \frac{moles \ of \ solute}{kilogram \ of \ solvent} \).
In the exercise, we have 0.2 moles of KI dissolved in 1000 grams of water (which is 1 kilogram). So, the molality \( m \) is: \( m = \frac{0.2 \ moles}{1 \ kg} = 0.2 \ m \).
It is important to note that molality is temperature-independent since it is based on the mass of the solvent, not its volume.

The van't Hoff factor (\(i\)) is a measure of the effect of a solute on the colligative properties of a solution. It represents the number of particles into which a solute dissociates in solution. For ionic compounds, this is usually the total number of ions formed.
In the example given, KI dissociates completely into K+ and I- ions. This gives us a van't Hoff factor (\(i\)) of 2.
The formula to calculate the change in freezing point (freezing point depression) for a solution is: \( \Delta T_f = i \times K_f \times m \).
Here, \( K_f \) is the cryoscopic constant specific to the solvent, and molality \( m \) is as previously calculated.

The cryoscopic constant (\( K_f \)) is a proportionality factor that relates the freezing point depression to the molality of the solute in a solution. Each solvent has its own unique cryoscopic constant.
For water, \( K_f \) is approximately 1.86 °C/m. This means that for every molal (m) of solute added to 1 kilogram of water, the freezing point of the water decreases by 1.86°C.
Using the van't Hoff factor calculated earlier (which was 2 for KI), and the molality (which was 0.2 m), we get the freezing point depression: \( \Delta T_f = 2 \times 1.86 °C/m \times 0.2 m = 0.744 °C \).
The normal freezing point of pure water is 0°C, so the solution with KI freezes at \( -0.744 °C \).