Colligative Properties

Introduction


We will now discuss the unique properties of solutions. As you might imagine, a mixture of substances might share some of the properties of the original substances. However, the substances interact when they are mixed, so some of the solution properties are substantially different than any of the original substances. We will discuss the so-called colligative properties now.


Colligative properties - an overview


The term colligative properties covers a set of solution properties that depend only on the amount of solute dissolved in a solvent and not on the identity of that solute. The colligative properties we will discuss are:


  1. Vapor pressure lowering: The vapor pressure of a solution gets lower as the concentration of solute increases.

  2. Freezing point depression (the topic of lab 12A): The freezing point of a solution gets lower as the concentration of solute increases.

  3. Boiling point elevation: The boiling point of a solution gets higher as the concentration of solute increases.

  4. Osmotic pressure (has to do with osmosis): The osmotic pressure increases as the concentration of solute increases.


We will now discuss each of the properties.


Vapor pressure lowering


Remember that vapor pressure is the partial pressure of vapor over a liquid phase - in essence, it's how much of the substance present is in the vapor phase. Vapor pressure lowering , then, is the change in vapor pressure over a solvent caused by the addition of a nonvolatile solute (that is, a solute that doesn't easily go into the vapor phase itself).


This property can be described with a simple equation called Raoult's Law:


Object1(1)

PA = vapor pressure of A in the solution


PoA = vapor pressure of pure A


XA = the mole fraction of A in the solution


Raoult's Law works best for dilute solutions of similar molecules- in other words, solutions where XA is close to 1.


For a simple case of one solute, you can actually use Raoult's Law directly to find the vapor pressure lowering. How? We'll do a little simple algebra. Assume that the solvent is component "A" and the solute is component "B".


First, realize that vapor pressure lowering, Object16, can be represented this way:


Object2(2)


If we substitute equation (1) into equation (2), we get:


Object3(3)


We can collect terms to get:


Object4(4)


Remember that all mole fractions must sum to one. Since there are only two components, we know that:


Object5(5)


Object6(6)


Combining equations (6) and (4), we get a simple expression for the vapor pressure lowering of a solution containing only one solute:


Object7

Object8= vapor pressure lowering


PoA = vapor pressure of pure solvent


XB = the mole fraction of solute in the solution


This effect is industrially useful - it's the basis of distillation columns that separate substances based on how volatile they are (see page 525-526 of your text if you'd like more information). In the case of a distillation column, the solute and solvent are both volatile, but one is more volatile than the other. The more volatile component will be present at greater concentrations in the vapor phase.


Freezing point depression and boiling point elevation


We will talk about these two colligative properties together as they are very similar. You're probably familiar - at least in a qualitative sense - with these properties already. When you put antifreeze (typically a compound called ethylene glycol) in your car, you might notice that the label probably brags about keeping your radiator from boiling over in the summer and freezing in the winter. What you might not have realized is that the lowering of the freezing point and the raising of the boiling point of the water in your radiator doesn't depend on the kind of antifreeze you put in - it depends only on the amount.


In theory, you could use anything as antifreeze, as long as it dissolves in water. Sugar, salt, ethylene glycol, etc. All will affect the freezing point and boiling point of water in the same way - assuming they're put in at the same concentration. (Why ethylene glycol? It's not likely to clog the radiator or cause it to rust.)


Let's look first at the boiling point elevation. Since the boiling point and the vapor pressure are related (the boiling point is the temperature where the vapor pressure equals atmospheric pressure), if the vapor pressure is lowered by a solvent, the boiling point is increased - it takes a higher temperature to reach the same vapor pressure.


The boiling point elevation, then, is the difference between the boiling point of the solution and the boiling point of the pure solvent. Mathematically, this has been found to be


Object9

Object10 = the boiling point elevation (in oC)


Kb = the boiling point elevation constant


cm = the molal concentration ( m )


You can look up the boiling point elevation constant for various solvents in books (your book has a few on page 528 - along with some freezing point depression constants).


A few notes on the boiling point elevation:


Freezing point depression is treated very similarly to boiling point elevation. Since the freezing process normally depends on the formation of a crystalline solid with the molecules of the substance in fixed positions. Anything that interferes with this process (like, say, the presence of a solute which can get in the way of solvent molecules coming together) will change the freezing point. It will take more energy loss to form the solid in the presence of a solute, so the freezing point will be lowered.


The freezing point depression, then, is the difference between the freezing point of the pure solvent and the freezing point of the solution. Mathematically, this is:


Object11

Object12 = the freezing point depression (in oC)


Kf = the freezing point depression constant


cm = the molal concentration ( m )


As with the boiling point elevation, constant, you can look up the freezing point depression constant for various solvents in books (page 528 in your textbook.


A few notes on the freezing point elevation:


Freezing point depression and boiling point elevation are properties that find wide use in the real world. Freezing point depression is used in the kitchen - salt lowers the freezing point when you make ice cream. The same effect is used to remove ice from roads (when the ice melts a bit, salt solution is formed - and the freezing point is lowered). Both freezing point depression and boiling point elevation are used in your car - to keep the coolant in your radiator from freezing in winter or boiling away in summer.


Osmotic pressure


To understand our fourth colligative property, we need to understand first what the phenomenon of osmosis is. Osmosis is the flow of a solvent through a semipermeable membrane to equalize the concentration of a solute on either side of the membrane. The membrane is called "semipermeable" because while solvent particles can flow through the membrane, solute particles cannot. The situation looks like this:


Graphic1

  • The membrane is in the middle of the pictures. Notice that it contains holes large enough for one type of particle to pass but not the other.. The membrane divides the system into two parts, left and right.

  • The solute particles are represented by the large red circles. Note that the left side is more concentrated, while the right side is more dilute.

  • The solvent is represented by the smaller blue circles. The solvent can flow through the membrane, and will flow in the direction of the arrow to equalize the concentration of solute particles on both sides of the membrane.

Illustration 1 - Osmosis



Osmosis occurs naturally. It can, however, be stopped by the application of pressure to the concentrated solution. The pressure that is needed to just stop osmosis the called the osmotic pressure, and osmotic pressure is a colligative property. Obviously, it would depend on the concentration of solute particles.


If you have a situation where you have a concentrated solution on one side of the membrane and no solute on the other side, the osmotic pressure can be calculated simply using:


Object13

Object14 = osmotic pressure (atm)


M = the molarity of the solution (M)


R = 0.08206 L-atm/(mol-K). This is the ideal gas constant


T = the temperature in Kelvin (K) units.


If you apply a pressure greater than the osmotic pressure, you can actually make the solvent flow from an area of high concentration to an area of low concentration. This is exactly how water is purified by reverse osmosis - pressure is applied to salt water stored in a setup similar to illustration #1. The water is forced to flow through the membrane by pressure, and you get pure water.


Osmosis is also important in biological systems, since most cells are held together with semipermeable membranes. Osmosis is part of the reason that organisms that thrive in salt water have a tough time living in fresh water.


Colligative properties and ionic substances


Since ionic solutions contain solutes that actually break apart into multiple particles (ions) when they dissolve, you might wonder how that affects colligative properties. Colligative properties don't depend on the nature of the particles - only their numbers, so the colligative properties of ionic solutions depend on the amount of ions present. If you use a salt like sodium chloride (NaCl), two moles of ions are produced for every mole of salt you dissolve. If you use a salt like lithium carbonate (Li 2 CO 3 ), three moles of ions are produced . You can account for this effect by multiplying the concentration of the solute (molar or molal concentration) by the number of ions produced when you dissolve it. Here's a brief example and comparison to a molecular substance (which does not ionize)


Let's say we have a 1.00 molal aqueous solution of each of these substances: glucose (C6H12O6), sodium chloride (NaCl), and lithium carbonate (Li2CO3). What are the boiling point elevations of each?


To solve this, we remember that Object15. We have been given the molal concentration of each solution already (1.00 m). If we look up water's Kb, we find that it is 0.512 oC/m . So, all we have to do is plug in, and take into account that the ionic substances break up into ions:


Substance

Expression

Object17

C6H12O6

(0.512 oC/m)(1.00 m)

0.512 oC

NaCl (2 ions)

(2)(0.512 oC/m)(1.00 m)

1.02 oC

Li2CO3 (3 ions)

(3)(0.512 oC/m)(1.00 m)

1.54 oC


So the lithium carbonate raises the boiling point more than the other two solutes at the same nominal concentration. This is because the lithium carbonate forms more actual particles than the other two. Glucose doesn't ionize at all, and sodium chloride forms only two ions compared to lithium carbonate's three.


[Note that this is an approximation for ionic substances - the actual boiling point elevations are a little different due to interactions between ions. It's a good enough approximation for our work.]


Summary


This note pack discussed four colligative properties of solutions - properties based only on the number of solute particles dissolved in a solution. You should know what vapor pressure lowering, boiling point elevation, freezing point depression, and osmotic pressure are and how to calculate each. You should also be familiar with real-world applications of colligative properties (can you think of any that aren't listed here in this pack?). Finally, you should understand that ionic substances form multiple ions when they dissolve, so you have to account for those.


All original site content ©2007 Charles Taylor. Page updated: December 12, 2007.