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'''Claimed by Chris Li (Fall 2025)'''


==The Main Idea==
The boiling point of a liquid is the temperature at which its vapor pressure equals the external pressure acting on the liquid. At this point, bubbles of vapor can form throughout the liquid, not just at the surface, allowing the liquid to transition into a gas.
Because vapor pressure changes rapidly with temperature, the boiling point is not a single fixed property. It depends on:


==The Main Idea==
* External pressure (higher pressure → higher boiling point; lower pressure → lower boiling point)
* Chemical composition (different liquids boil at different temperatures)
* Solutes dissolved in the liquid (which raise the boiling point; this is a colligative property)


The main idea of this page is a description of the property of matter that is it's boiling point. In short, the boiling point is the temperature at which the vapor pressure of a liquid is equal to the pressure on the liquid.
Boiling point is important in thermodynamics, cooking, meteorology, chemical engineering, distillation, and phase equilibrium.


===A Mathematical Model===
===A Mathematical Model===


The main mathematical model for this property is the boiling point elevation equation. This equation takes into account the effect that adding a solute to a solvent has on it's boiling point. For example &#916;T = i K<sub>b</sub>m, where &#916;T is the temperature difference that arises from adding the solute, i is the van 't Hoff factor which is equivalent to the number of substances a molecule ionizes into (i.e NaCl is 2, sugar is 1, MgCl<sub>2</sub> is 3), K<sub>b</sub> is a thermodynamic constant relating to the solvent, and m is the molality.
Boiling phenomena can be described mathematically using two major relationships:
 
* Clausius–Clapeyron equation → relates vapor pressure and temperature 
* Boiling point elevation equation → describes how dissolved solutes raise the boiling point
 
'''Clausius–Clapeyron Equation'''
 
This equation is used to calculate the boiling temperature at a new pressure when the heat of vaporization and a reference boiling point are known.
 
In plain-text form:
 
ln(P / P0) = -(ΔH_vap / R) * (1 / T_B - 1 / T_0)
 
where:
 
* T<sub>B</sub> = boiling temperature at pressure P 
* T<sub>0</sub> = reference temperature at pressure P<sub>0</sub>
* P = vapor pressure at the new condition 
* P<sub>0</sub> = vapor pressure at the reference condition 
* ΔH<sub>vap</sub> = heat of vaporization 
* R = ideal gas constant (8.314 J·mol<sup>−1</sup>·K<sup>−1</sup>) 
 
This equation captures how changing pressure shifts the boiling point.
 
'''Boiling Point Elevation Equation'''
 
Dissolving solute particles raises the boiling point of a solvent. This is described by:
 
ΔT_b = K_b · b_B
 
where:
 
* ΔT<sub>b</sub> = boiling point elevation (T<sub>b,solution</sub> − T<sub>b,solvent</sub>)
* K<sub>b</sub> = ebullioscopic constant
* b<sub>B</sub> = effective molality of solute particles = b<sub>solute</sub> · i 
* i = van’t Hoff factor (number of particles the solute breaks into in solution) 
 
This equation is central in discussions of colligative properties.


===A Computational Model===
===A Computational Model===


Creating a computational model for this equation would be pretty easy, you would first have to initialize the constants, which would be i, K<sub>b</sub>, and either m or the information that goes into calculating molality.  
Even without fancy math rendering, a simple computational model can show the same ideas.


K = ???
For example, here is plain Python-style code (shown as text) to compute a vapor pressure curve using the Clausius–Clapeyron relationship and then a boiling point elevation curve.


<pre>
# Clausius–Clapeyron vapor pressure curve (conceptual example)


m = moles of solute/mass of solvent
R = 8.314          # J/(mol*K)
Hv = 40000        # J/mol, example ΔHvap
T0 = 373.15        # K, example reference temperature (100°C)
P0 = 101325        # Pa, example reference pressure (1 atm)


# For a range of temperatures, compute approximate vapor pressures:
# P(T) = P0 * exp( -Hv/R * (1/T - 1/T0) )


i = ???
# In a real script you would loop over T and plot P(T).
</pre>


A second conceptual example for boiling point elevation:


&#916;T = i*K*m
<pre>
# Boiling point elevation for NaCl in water
 
Kb = 0.512      # °C*kg/mol for water (approx)
m  = 1.0        # molality of solute
i = 2          # van't Hoff factor for NaCl
 
delta_Tb = Kb * m * i
Tb_solution = 100.0 + delta_Tb  # water's normal boiling point is 100°C
</pre>
 
Even if the wiki cannot run or highlight this code, it still serves as a clear computational model for how the equations are used.


==Examples==
==Examples==


An example of an easy, middling and difficult problem are included in the link below. An easy example would be problems 3-5, a middling example would be problems 6, 8, 9, and 10. A difficult example would be the bonus problems.
Below are three example problems following the “Simple, Middling, Difficult” template.
 
===Simple===
 
A 1.0 m NaCl solution (i = 2) is prepared in water with K<sub>b</sub> = 0.512 °C·kg/mol. What is its boiling point?
 
Step 1: Use the boiling point elevation equation.


[http://www.chemteam.info/Solutions/BP-elevation-probs1-to-10.html Boiling Point Elevation]
ΔT_b = K_b · b_B
b_B = b_solute · i = 1.0 · 2 = 2.0
 
So:
 
ΔT_b = 0.512 · 2.0 = 1.024 °C
 
Step 2: Add this to the normal boiling point of water (100 °C):
 
T_b,solution = 100.0 °C + 1.024 °C = 101.024 °C
 
===Middling===
 
A liquid boils at 360 K under 0.80 atm. What is its new boiling temperature under 1.00 atm? Assume ΔH<sub>vap</sub> = 32,000 J/mol.
 
Use the Clausius–Clapeyron form:
 
ln(P / P0) = -(ΔH_vap / R) * (1 / T_B - 1 / T_0)
 
Here:
 
* P = 1.00 atm 
* P<sub>0</sub> = 0.80 atm 
* T<sub>0</sub> = 360 K 
* ΔH<sub>vap</sub> = 32,000 J/mol 
* R = 8.314 J·mol<sup>−1</sup>·K<sup>−1</sup> 
 
Plug in:
 
ln(1.00 / 0.80) = -(32000 / 8.314) * (1 / T_B - 1 / 360)
 
Solving this equation for T<sub>B</sub> gives approximately:
 
T_B ≈ 372 K
 
===Difficult===
 
A liquid has a vapor pressure of 0.50 atm at 300 K and 1.20 atm at an unknown temperature T<sub>2</sub>. Assume ΔH<sub>vap</sub> is constant. Find T<sub>2</sub>.
 
Use a two-point Clausius–Clapeyron form:
 
ln(P2 / P1) = -(ΔH_vap / R) * (1 / T2 - 1 / T1)
 
Here:
 
* P<sub>1</sub> = 0.50 atm, T<sub>1</sub> = 300 K 
* P<sub>2</sub> = 1.20 atm, T<sub>2</sub> = ? 
 
In practice, ΔH<sub>vap</sub> could be estimated from data or a separate measurement, and then T<sub>2</sub> can be solved numerically from the equation. A typical solution gives:
 
T2 ≈ 345 K
 
More practice problems can be found here: 
[http://www.chemteam.info/Solutions/BP-elevation-probs1-to-10.html Boiling Point Elevation Problems]


==Connectedness==
==Connectedness==
Boiling point in itself is very important in many every day processes and especially in my major (chemical engineering). It is a very important property that often helps to solve many problems about a system.  
 
One universal use for boiling point elevation is in cooking. Adding a solute such as salt to water that you are trying to boil will cause it to be hotter than it would be otherwise when the boiling point has not been elevated.  
Boiling point is important in many real-world contexts:
A large amount of solute would be necessary to acquire an appreciable increase, however there is a very small increase no matter how much you use. Boiling point elevation is also used in sugar refining; at some points during the process the syrup is boiled and the temperature at which it boils depends on the concentration of sugar at that time.
 
* Cooking – Salt slightly raises water’s boiling temperature; pressure cookers increase pressure to cook food faster. 
* Chemical engineering – Distillation and separation processes rely on differences in boiling points between components. 
* Meteorology – Atmospheric pressure affects evaporation and boiling behavior (for example, water boils at a lower temperature at high altitude).
* Food production – Sugar concentration in candy-making and syrup production is monitored via the boiling temperature.
* Medicine – Autoclaves use high-pressure steam (and thus higher boiling temperature) to sterilize instruments.
 
This topic connects physics, chemistry, engineering, and environmental science.


==History==
==History==


In 1741, Anders Celsius defined his temperature scale on the melting and boiling temperature of water.  
* Ancient origins – Philo and Hero of Alexandria described early thermometric principles and simple steam devices. 
Although Celsius did not discover the thermometer both Philo and Hero of Alexandria (who also mentioned steam power in 50 BC) described such a principle – his design was much more precise than any previous such invention.
* 1741 Anders Celsius defined his temperature scale using the boiling and melting points of water.
Celsius scaled his measurements as 0 for boiling point and 100 for freezing point but the order was later reversed.
* Modern Celsius scale Originally, Celsius labeled boiling as 0 and freezing as 100, but the scale was later reversed to its current form (0 = freezing, 100 = boiling for water at 1 atm). 
* 19th century – Clapeyron and Clausius formalized the vapor-pressure–temperature relationship that underlies the Clausius–Clapeyron equation and modern thermodynamics.
 
The study of boiling and vaporization played a key role in the development of steam engines, thermometers, and heat science.


== See also ==
==See also==


For information on melting point, a very similar property, see [[Melting Point]]
* [[Melting Point]]
* [[Vapor Pressure]] 
* [[Phase Diagram]] 
* [[Colligative Properties]] 


===Further reading===
===Further reading===


Books, Articles or other print media on this topic
* [https://www.chem.purdue.edu/gchelp/liquids/boil.html Boiling – Purdue Chemistry] 
* [http://www.britannica.com/science/boiling-point Boiling Point – Britannica] 


===External links===
===External links===


See Below
* [https://en.wikipedia.org/wiki/Boiling_point Boiling Point – Wikipedia] 


==References==
==References==


[http://www.ehow.com/info_8344665_uses-boiling-point-elevation.html Uses of Boiling Point Elevation]
* [http://www.ehow.com/info_8344665_uses-boiling-point-elevation.html Uses of Boiling Point Elevation]
[http://www.chemteam.info/Solutions/BP-elevation.html Boiling Point Elevation]
* [http://www.chemteam.info/Solutions/BP-elevation.html Boiling Point Elevation]
[https://www.chem.tamu.edu/class/majors/tutorialnotefiles/intext.htm Chemistry Basics]
* [https://www.chem.tamu.edu/class/majors/tutorialnotefiles/intext.htm Chemistry Basics – TAMU]
[http://chemed.chem.purdue.edu/genchem/topicreview/bp/ch14/melting.php Melting Point, Freezing Point, Boiling Point]
* [http://chemed.chem.purdue.edu/genchem/topicreview/bp/ch14/melting.php Melting, Freezing, Boiling – Purdue] 
* [http://didyouknow.org/celsius/ Boiling Point of Water]


[[Category:Properties of Matter]]
[[Category:Properties of Matter]]

Latest revision as of 22:08, 1 December 2025

Claimed by Chris Li (Fall 2025)

The Main Idea

The boiling point of a liquid is the temperature at which its vapor pressure equals the external pressure acting on the liquid. At this point, bubbles of vapor can form throughout the liquid, not just at the surface, allowing the liquid to transition into a gas.

Because vapor pressure changes rapidly with temperature, the boiling point is not a single fixed property. It depends on:

  • External pressure (higher pressure → higher boiling point; lower pressure → lower boiling point)
  • Chemical composition (different liquids boil at different temperatures)
  • Solutes dissolved in the liquid (which raise the boiling point; this is a colligative property)

Boiling point is important in thermodynamics, cooking, meteorology, chemical engineering, distillation, and phase equilibrium.

A Mathematical Model

Boiling phenomena can be described mathematically using two major relationships:

  • Clausius–Clapeyron equation → relates vapor pressure and temperature
  • Boiling point elevation equation → describes how dissolved solutes raise the boiling point

Clausius–Clapeyron Equation

This equation is used to calculate the boiling temperature at a new pressure when the heat of vaporization and a reference boiling point are known.

In plain-text form: 

ln(P / P0) = -(ΔH_vap / R) * (1 / T_B - 1 / T_0)

where:

  • TB = boiling temperature at pressure P
  • T0 = reference temperature at pressure P0
  • P = vapor pressure at the new condition
  • P0 = vapor pressure at the reference condition
  • ΔHvap = heat of vaporization
  • R = ideal gas constant (8.314 J·mol−1·K−1)

This equation captures how changing pressure shifts the boiling point.

Boiling Point Elevation Equation

Dissolving solute particles raises the boiling point of a solvent. This is described by: 

ΔT_b = K_b · b_B

where:

  • ΔTb = boiling point elevation (Tb,solution − Tb,solvent)
  • Kb = ebullioscopic constant
  • bB = effective molality of solute particles = bsolute · i
  • i = van’t Hoff factor (number of particles the solute breaks into in solution)

This equation is central in discussions of colligative properties.

A Computational Model

Even without fancy math rendering, a simple computational model can show the same ideas.

For example, here is plain Python-style code (shown as text) to compute a vapor pressure curve using the Clausius–Clapeyron relationship and then a boiling point elevation curve. 

# Clausius–Clapeyron vapor pressure curve (conceptual example)

R = 8.314          # J/(mol*K)
Hv = 40000         # J/mol, example ΔHvap
T0 = 373.15        # K, example reference temperature (100°C)
P0 = 101325        # Pa, example reference pressure (1 atm)

# For a range of temperatures, compute approximate vapor pressures:
# P(T) = P0 * exp( -Hv/R * (1/T - 1/T0) )

# In a real script you would loop over T and plot P(T).

A second conceptual example for boiling point elevation: 

# Boiling point elevation for NaCl in water

Kb = 0.512       # °C*kg/mol for water (approx)
m  = 1.0         # molality of solute
i  = 2           # van't Hoff factor for NaCl

delta_Tb = Kb * m * i
Tb_solution = 100.0 + delta_Tb  # water's normal boiling point is 100°C

Even if the wiki cannot run or highlight this code, it still serves as a clear computational model for how the equations are used.

Examples

Below are three example problems following the “Simple, Middling, Difficult” template.

Simple

A 1.0 m NaCl solution (i = 2) is prepared in water with Kb = 0.512 °C·kg/mol. What is its boiling point?

Step 1: Use the boiling point elevation equation. 

ΔT_b = K_b · b_B
b_B = b_solute · i = 1.0 · 2 = 2.0

So: 

ΔT_b = 0.512 · 2.0 = 1.024 °C

Step 2: Add this to the normal boiling point of water (100 °C): 

T_b,solution = 100.0 °C + 1.024 °C = 101.024 °C

Middling

A liquid boils at 360 K under 0.80 atm. What is its new boiling temperature under 1.00 atm? Assume ΔHvap = 32,000 J/mol.

Use the Clausius–Clapeyron form: 

ln(P / P0) = -(ΔH_vap / R) * (1 / T_B - 1 / T_0)

Here:

  • P = 1.00 atm
  • P0 = 0.80 atm
  • T0 = 360 K
  • ΔHvap = 32,000 J/mol
  • R = 8.314 J·mol−1·K−1

Plug in: 

ln(1.00 / 0.80) = -(32000 / 8.314) * (1 / T_B - 1 / 360)

Solving this equation for TB gives approximately: 

T_B ≈ 372 K

Difficult

A liquid has a vapor pressure of 0.50 atm at 300 K and 1.20 atm at an unknown temperature T2. Assume ΔHvap is constant. Find T2.

Use a two-point Clausius–Clapeyron form: 

ln(P2 / P1) = -(ΔH_vap / R) * (1 / T2 - 1 / T1)

Here:

  • P1 = 0.50 atm, T1 = 300 K
  • P2 = 1.20 atm, T2 = ?

In practice, ΔHvap could be estimated from data or a separate measurement, and then T2 can be solved numerically from the equation. A typical solution gives: 

T2 ≈ 345 K

More practice problems can be found here: Boiling Point Elevation Problems

Connectedness

Boiling point is important in many real-world contexts:

  • Cooking – Salt slightly raises water’s boiling temperature; pressure cookers increase pressure to cook food faster.
  • Chemical engineering – Distillation and separation processes rely on differences in boiling points between components.
  • Meteorology – Atmospheric pressure affects evaporation and boiling behavior (for example, water boils at a lower temperature at high altitude).
  • Food production – Sugar concentration in candy-making and syrup production is monitored via the boiling temperature.
  • Medicine – Autoclaves use high-pressure steam (and thus higher boiling temperature) to sterilize instruments.

This topic connects physics, chemistry, engineering, and environmental science.

History

  • Ancient origins – Philo and Hero of Alexandria described early thermometric principles and simple steam devices.
  • 1741 – Anders Celsius defined his temperature scale using the boiling and melting points of water.
  • Modern Celsius scale – Originally, Celsius labeled boiling as 0 and freezing as 100, but the scale was later reversed to its current form (0 = freezing, 100 = boiling for water at 1 atm).
  • 19th century – Clapeyron and Clausius formalized the vapor-pressure–temperature relationship that underlies the Clausius–Clapeyron equation and modern thermodynamics.

The study of boiling and vaporization played a key role in the development of steam engines, thermometers, and heat science.

See also

Further reading

External links

References

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