Transcript Powerpoint

Enthalpy
International Junior
Science Olympiad (IJSO)
Dr. Yu-San Cheung
[email protected]
Department of Chemistry
The Chinese University of Hong Kong
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Enthalpy(焓)
Enthalpy (H) is the heat content of a substance. It can also be
considered as the total energy of a substance.
When a physical process or chemical reaction occurs, heat is
usually given out or absorbed from the surroundings.
e.g., ice melting, condensation of water vapor, burning of coal.
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Enthalpy
Absolute enthalpy: difficult to determine
We are more interesting in the enthalpy changes(焓變), H, of
the processes.
H = H(products)  H(reactants)
Endothermic reaction(吸熱反應):
If H  0, H(products)  H(reactants), heat content increases,
heat is absorbed from the surroundings and the reaction mixture
becomes cooler/hotter.
Exothermic reaction(放熱反應):
If H  0, H(products)  H(reactants), heat content decreases,
heat is given out and the reaction mixture becomes cooler/hotter.
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Enthalpy
For chemical reactions, the symbol “Ho” is used. The “o”
emphasizes that the substances are in their pure forms at 1
atm.
For a chemical reaction, Ho is usually reported at specific
temperature, e.g., for the reaction
C6H12O6(s) + 6O2(g)  6CO2(g) + 6H2O(l)
Ho298K is the enthalpy change when C6H12O6(s) and O2(g) at
298K are converted to CO2(g) and H2O(l) at 298K.
Ho273K is the enthalpy change when C6H12O6(s) and O2(g) at
273K are converted to CO2(g) and H2O(l) at 273K.
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Enthalpy
Ho298K and Ho273K are not the same. Ho may increase or
decrease with increasing temperature.
If not specified, you may assume the temperature to be 298 K.
Ho is concerned with reactants and products only. When the
reaction is occurring, the temperature may be higher or lower.
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Example
2H2(g) + O2(g)  2H2O(l)
Ho = 571.66 kJ mol1
2 moles of H2(g) react with 1 mole of O2(g) to form 2 moles of
H2O(l) to give 571.66 kJ of energy.
If the coefficients of the species are “doubled”, Ho is also
doubled, i.e.,
4H2(g) + 2O2(g)  4H2O(l)
How about
Ho = 1143.32 kJ mol1
2H2O(l)  2H2(g) + O2(g)? Ho = ?
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Heat Capacity(熱容量)
Specific heat capacity(比熱容)
Example:
The specific heat capacity of water is 4.18 J g1 K1. The energy
needed to heat up 100 g of water from 280 K to 300 K is:
(4.18 J g1 K1) (100 g) (300 K  280 K) = 8360 J
Heat capacity
Similar to heat capacity, but referring to an object, e.g., “the heat
capacity of the metal block is 100 J K1.
Sometimes “heat capacity” is used for “specific heat capacity”.
You can tell which one is referred to from the unit and whether
one is talking about a substance/material or an object.
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Heat Capacity
Molar heat capacity(摩爾熱容)
Molar heat capacity is more commonly used in chemistry. It is
similar to specific heat capacity but it refers to heat capacity of
one mole a chemical substance.
Molar heat capacity = (specific heat capacity) x (molar mass)
e.g., molar heat capacity of water is:
(4.18 J g1 K1) x (18.00 g mol1) = 75.24 J mol1 K1
Latent heat(潛熱)of melting/boiling
Latent heat of melting: heat absorbed for melting (unit: J g1)
Latent heat of boiling: heat absorbed for boiling (unit: J g1)
Related: molar heat of fusion/vaporization
(unit: J mol1)
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Standard enthalpy of neutralization
Standard enthalpy of neutralization, sometimes simply
“enthalpy of neutralization”, also called “heat of neutralization”
(中和熱)
Example:
10 ml of 1 M NaOH solution is mixed with 5 ml of 1 M sulfuric
acid. The temperature of the final solution increases by 8.91C.
Calculate Ho for:
H+(aq) + OH(aq)  H2O(l)
Solution:
Heat given out = (4.18 J g1 K1) (15 g) (8.91 K) = 558.7 J
No of mole of OH(aq) = (10 × 103) (1) = 0.01
No of mole of H+(aq) = (5 × 103) (1) × 2 = 0.01
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Standard enthalpy of neutralization
Therefore, if 1 mole of H+(aq) reacts with 1 mole of OH(aq),
55870 J (or 55.87 kJ) is given out.
And because heat is given out, H is negative.
Therefore, Ho = 55.87 kJ mol1
Note that in the above mixing, NaOH solution is a strong alkali
and sulfuric acid is a strong acid.
If 1 L of 1 M NaOH solution is mixed with 1 L of 1 M acetic acid,
the heat given out is smaller/larger than 55.87 kJ.
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Hess’s Law(赫斯定律)
The enthalpy is an “intrinsic” property of a substance and it does
not depend on how the substance is formed.
Consider the following cycle (“Hess cycle” or “enthalpy cycle”):
H = H1 + H2
H
A
H1
B
X
H2
Example: How can we find out Ho for
1
C(s) + 2 O2(g)  CO(g)?
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Hess’s Law
Solution:
We need to make use of:
1
CO(g) + 2 O2(g)  CO2(g)
C(s) + O2(g)  CO2(g)
C(s)
Ho1 = 282.98 kJ mol1
Ho2 = 393.51 kJ mol1
+ O2(g), Ho2
+ ½O2(g), Ho
CO2(g)
+ ½O2(g), Ho1
CO(g)
Ho2 = Ho + Ho1
393.51 = Ho + (282.98)
Ho = 393.51 + 282.98 = 110.53 kJ mol1
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Bond enthalpy(鍵焓)
Bond enthalpy is the enthalpy change when a bond of a molecule
is broken. It is usually positive, meaning that energy is supplied to
break a bond. The larger the value, the stronger the bond.
Example:
Bond enthalpy for NN is 945 kJ mol1. It means:
N2(g)  2N(g)
Ho = +945 kJ mol1
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Bond enthalpy
Sometimes bond enthalpy is not unique because the chemical
environments may be different, e.g.,
CH4(g)  CH3(g) + H(g)
Ho = bond enthalpy for H3CH
CCl3H(g)  CCl3(g) + H(g)
Ho = bond enthalpy for Cl3CH
The “CH bond enthalpy” is usually an average value.
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Bond enthalpy
Bond enthalpy is usually applied for gaseous molecules because
molecules are isolated in gaseous state. In solid and liquid
states, molecules are held by each other by intermolecular
forces.
The importance of bond enthalpy relies on the fact that it can
be calculated accurately and there are some experimental
methods which can determine some bond enthalpy accurately.
The advantage is that we can determine Ho for a large number
of reactions by combinations of relatively few bond enthalpies.
But bond enthalpies used are usually average values and errors
are introduced.
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Calculating Ho from bond enthalpies
Consider the reaction: N2(g) + 3H2(g)  2NH3(g)
The enthalpies (in kJ mol1) of the bonds involved are:
NN
945
HH 436
NH 391
Enthalpy of atomizations:
Reactants:
N2(g) + 3H2(g)  2N(g) + 6H(g)
(1)
Ho = 945 + (3  436) = 2253 kJ mol1
Products:
2NH3(g)  2N(g) + 6H(g)
Ho = 2  (3  391) = 2346 kJ mol1
(1) – (2):
N2(g) + 3H2(g)  2NH3(g)
Ho = 2253  2346 = 93 kJ mol1
(2)
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Hof
(Standard enthalpy change of formation)
The above example makes use of the following Hess Cycle:
H
A
B
H1
H2
Atoms
The elements can also be used for the common reference states
for reactants and products.
A
Ho
Ho 1
B
Ho 2
Elemental
forms
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Hof
(Standard enthalpy change of formation)
Hof for a substance is the Ho for the formation of the
substance from its constituent elements in their standard states.
CO2(g):
C(s) + O2(g)  CO2(g)
Ho = 393.51 kJ mol1
 Hof[CO2(g)] is 393.51 kJ mol1
NH3(g):
N2(g) + 3H2(g)  2NH3(g)
Ho = 93 kJ mol1
Ho for the formation of two moles of NH3(g) is 93 kJ mol1.
Therefore, Ho for the formation of one mole of NH3(g) is 46.5 kJ
mol1.
We have Hof[NH3(g)] = 46.5 kJ mol1
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Remarks:
•
If an element exists in different forms, the most stable form is
chosen for the standard states.
Carbon: graphite, NOT diamond
Oxygen: O2, NOT O3
•
Hof for the elements at the standard states is zero.
•
Hof for aqueous ions:
(a) Compounds come with both cations and anions. It is
impossible to determine Hof for a single cation or anion.
Therefore, Hof for H+(aq) is set to zero (by human).
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Remarks:
(b) Strictly speaking, Hof for aqueous ions depends on their
concentrations. For example, heat changes for dissolving
one mole of NaCl in 1 L of water and in 10000 L of water
are different. We usually assume the concentration is
indefinitely low.
• Hof values for many compounds are tabulated. If the values
for the reactants and products of a reaction can be found, we
can determine Ho for this reaction.
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Example:
Given: Hof (in kJ mol1):
NH3(g): 46.5
NO(g): +90.25
H2O(l): 285.83
Find out Ho for the following reaction:
4NH3(g) + 5O2(g) 4NO(g) + 6H2O(l)
Solution:
1
3
NH3(g): 2 N2(g) + 2 H2(g)  NH3(g)
Ho1 = 46.5 kJ mol1
(1)
O2(g): O2(g)  O2(g)
Ho2 = 0 kJ mol1
(2)
1
1
NO(g): 2 N2(g) + 2 O2(g)  NO(g)
Ho3 = +90.25 kJ mol1
(3)
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1
H2O(l): H2(g) + 2 O2(g)  H2O(l)
Ho4 = 285.83 kJ mol1
(1)4 + (2)5:
2N2(g) + 6H2(g) + 5O2(g)  4NH3(g) + 5O2(g)
Ho5 = (46.5)4 + (0)5 = 186 kJ mol1
(4)
(5)
(3)4 + (4)6:
2N2(g) + 6H2(g) + 5O2(g)  4NO(g) + 6H2O(l)
(6)
Ho6 = (+90.25)4 + (285.83)6 = 1347.98 kJ mol1
(6)  (5):
4NH3(g) + 5O2(g)  4NO(g) + 6H2O(l)
Ho = 1347.98  (186) = 1162 kJ mol1
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In general, Ho = Hof,prod  Ho f,rxt
4NH3(g) + 5O2(g)
Ho rxt
Ho
4NO(g) + 6H2O(l)
Ho prod
Elemental forms:
2N2(g) + 6H2(g) + 5O2(g)
e.g., in the above example,
Ho = 4(+90.25) + 6(285.83)  4(46.5) + 5(0)
= 1162 kJ mol1
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Example:
Calculate Hof for Cl(aq) and Na+(aq) using the following Ho:
HCl(g)  H+(aq) + Cl(aq)
NaCl(s)  Na+(aq) + Cl(aq)
Ho = 74.85 kJ mol1
Ho = +3.87 kJ mol1
Also given Hof values (in kJ mol1):
HCl(g): 92.31
NaCl(s): 411.15
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Solution:
From the first reaction:
74.85 = 0 + Hof [Cl(aq)]  (92.31)
Hof [Cl(aq)] = 167.16 kJ mol1
From the second reaction:
+3.87 = Hof [Na+(aq)] + (167.16)  (411.15)
Hof [Na+(aq)] = 240.12 kJ mol1
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Standard enthalpy change of
combustion
Combustion: complete oxidation of a compound.
CCO2
HH2O
NN2
e.g., Given that Hof for trinitrotoluene (TNT, C7H5N3O6) is
54.39 kJ mol1.
Calculate Ho for the combustion of this compound.
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Solution:
Equation (unbalanced):
C7H5N3O6(s) + O2(g)  CO2(g) + H2O(l) + N2(g)
Balanced equation:
3
5
C7H5N3O6(s) + 13 O2(g)  7CO2(g) + 2 H2O(l) + 2 N2(g)
2
5
3
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Ho = 7(393.51) + 2 (285.83) + 2 (0)  1(54.39) + 2 (0)
= 3414.76 kJ mol1
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