# Gas laws

This article outlines the historical development of the laws describing ideal gases. For a detailed description of the ideal gas laws and their further development, see ideal gas law.

The gas laws was developed at the end of the 18th century, when scientists began to realize that relationships between the pressure, volume and temperature of a sample of gas could be obtained which would hold to a good approximation for all gases. Gases behave in a similar way over a wide variety of conditions because they all have molecules which are widely spaced, and the equation of state for an ideal gas is derived from kinetic theory. The earlier gas laws are now considered as special cases of the ideal gas equation, with one or more of the variables held constant.

## Boyle's Law

Main article: Boyle's Law

Boyle's Law, published in 1662, states that, at constant temperature, the product of the pressure and volume of a given mass of an ideal gas in a closed system is always constant. It can be verified experimentally using a pressure gauge and a variable volume container. It can also be derived from the kinetic theory of gases: if a container, with a fixed number of molecules inside, is reduced in volume, more molecules will strike a given area of the sides of the container per unit time, causing a greater pressure.

As a mathematical equation, Boyle's Law is written as either:

$P \propto \frac{1}{V}$, or
$PV=k_1$, or
$P_1 V_1=P_2 V_2\,$

where P is the pressure, and V is the volume of a gas, and k1 is the constant in this equation (and is not the same as the proportionality constants in the other equations below).

## Charles' Law

Main article: Charles's Law

Charles' Law, or the law of volumes, was found in 1787 by Jacques Charles. It states that, for a given mass of an ideal gas at constant pressure, the volume is directly proportional to its absolute temperature, assuming a closed system.

As a mathematical equation, Charles' Law is written as either:

$V \propto T\,$, or
$V/T=k_2$, or
$V_1/T_1=V_2/T_2$

where V is the volume of a gas, T is the absolute temperature and k2 is a proportionality constant (which is not the same as the proportionality constants in the other equations in this article).

## Gay-Lussac's Law

Main article: Gay-Lussac's Law

Gay-Lussac's Law, or the Pressure Law, was found by Joseph Louis Gay-Lussac in 1809. It states that, for a given mass and constant volume of an ideal gas, the pressure exerted on the sides of its container is directly proportional to its absolute temperature.

As a mathematical equation, Gay-Lussac's Law is written as either:

$P \propto T\,$, or
$P/T=k_3$, or
$P_1/T_1=P_2/T_2$

where P is the pressure, T is the absolute temperature, and k3 is another proportionality constant.

Avogadro's Law states that the volume occupied by an ideal gas is directly proportional to the number of molecules of the gas present in the container. This gives rise to the molar volume of a gas, which at STP is 22.4 dm3 (or litres). The relation is given by

$\frac{V_1}{n_1}=\frac{V_2}{n_2} \,$

where n is equal to the number of molecules of gas (or the number of moles of gas).

## Combined and Ideal Gas Laws

Main article: Ideal Gas Law

The Combined Gas Law or General Gas Equation is obtained by combining the three preceding gas laws, and shows the relationship between the pressure, volume, and temperature for a fixed mass (quantity) of gas:

$pV = k_5T \,$

This can also be written as:

$\qquad \frac {p_1V_1}{T_1}= \frac {p_2V_2}{T_2}$

With the addition of Avogadro's Law, the combined gas law develops into the Ideal Gas Law:

$pV = nRT \,$

where

p is pressure
V is volume
n is the number of moles
R is the universal gas constant
T is temperature (K)

where the proportionality constant, now named R, is the Gas constant with a value of 0.08206 (atm∙L)/(mol∙K). An equivalent formulation of this Law is:

$pV = kNT \,$

where

p is the pressure
V is the volume
N is the number of gas molecules
k is the Boltzmann constant (1.381×10−23 J·K−1 in SI units)
T is the absolute temperature

These equations are exact only for an ideal gas, which neglects various intermolecular effects (see real gas). However, the ideal gas law is a good approximation for most gases under moderate pressure and temperature.

This law has the following important consequences:

1. If temperature and pressure are kept constant, then the volume of the gas is directly proportional to the number of molecules of gas.
2. If the temperature and volume remain constant, then the pressure of the gas changes is directly proportional to the number of molecules of gas present.
3. If the number of gas molecules and the temperature remain constant, then the pressure is inversely proportional to the volume.
4. If the temperature changes and the number of gas molecules are kept constant, then either pressure or volume (or both) will change in direct proportion to the temperature.

## Other gas laws

• Graham's law states that the rate at which gas molecules diffuse is inversely proportional to the square root of its density. Combined with Avogadro's law (i.e. since equal volumes have equal number of molecules) this is the same as being inversely proportional to the root of the molecular weight.
$P_{total} = P_1 + P_2 + P_3 + ... + P_n \equiv \sum_{i=1}^n P_i \,$,

OR

$P_\mathrm{total} = P_\mathrm{gas} + P_\mathrm{H_2 O} \,$

where PTotal is the total pressure of the atmosphere, PGas is the pressure of the gas mixture in the atmosphere, and PH2O is the water pressure at that temperature.

At constant temperature, the amount of a given gas dissolved in a given type and volume of liquid is directly proportional to the partial pressure of that gas in equilibrium with that liquid.
$p = k_{\rm H}\, c$