1. Chapter 13 Chemical Kinetics

2. Chemical Kinetics
The speed of a chemical reaction is called its reaction rate
The rate of a reaction is a measure of how fast the reaction makes products
or uses reactants
The ability to control the speed of a chemical reaction is important

3. Defining Rate
Rate is how much a quantity changes in a given period of time
The speed you drive your car is a rate – the distance your car travels (miles) in a given period of time (1 hour)
so the rate of your car has units of mi/hr

4. Defining Reaction Rate
The rate of a chemical reaction is generally measured in terms of how much the concentration of a reactant decreases in a given period of time
or product concentration increases
For reactants, a negative sign is placed in front of the definition

5. at t = 0
[A] = 8
[B] = 8
[C] = 0
at t = 0
[X] = 8
[Y] = 8
[Z] = 0
at t = 16
[A] = 4
[B] = 4
[C] = 4
at t = 16
[X] = 7
[Y] = 7
[Z] = 1

6. at t = 16
[A] = 4
[B] = 4
[C] = 4
at t = 16
[X] = 7
[Y] = 7
[Z] = 1
at t = 32
[A] = 2
[B] = 2
[C] = 6
at t = 32
[X] = 6
[Y] = 6
[Z] = 2

7. at t = 32
[A] = 2
[B] = 2
[C] = 6
at t = 32
[X] = 6
[Y] = 6
[Z] = 2
at t = 48
[A] = 0
[B] = 0
[C] = 8
at t = 48
[X] = 5
[Y] = 5
[Z] = 3

8. Hypothetical Reaction Red  Blue
In this reaction,
one molecule of Red turns
into one molecule of Blue
The number of molecules
will always total 100
The rate of the reaction can
be measured as the speed of loss of Red molecules
over time, or the speed of
gain of Blue molecules
over time

9. Hypothetical Reaction Red  Blue

10. Hypothetical Reaction Red  Blue

11. Reaction Rate Changes Over Time
As time goes on, the rate of a reaction generally slows down
because the concentration of the reactants decreases
At some time the reaction stops, either because the reactants run out or because the system has reached equilibrium

12. Reaction Rate and Stoichiometry
In most reactions, the coefficients of the balanced equation are not all the same
H2 (g) + I2 (g)  2 HI(g)
For these reactions, the change in the number of molecules of one substance is a multiple of the change in the number of molecules of another
for the above reaction, for every 1 mole of H2 used, 1 mole of I2 will also be used and 2 moles of HI made
therefore the rate of change will be different
To be consistent, the change in the concentration of each substance is multiplied by 1/coefficient

13. Average Rate
The average rate is the change in measured concentrations in any particular time period
linear approximation of a curve
The larger the time interval, the more the average rate deviates from the instantaneous rate

14. Hypothetical Reaction Red  Blue

15. H2 I2 HI Stoichiometry tells us that for every 1 mole/L of H2 used,
2 moles/L of HI are made.
The average rate is the change in the concentration in a given time period
Assuming a 1 L container, at 10 s, we used moles of H2. Therefore the amount of HI made is 2(0.181 moles) = moles.
In the first 10 s, the D[H2] is −0.181 M, so the rate is
At 60 s, we used moles of H2. Therefore the amount of HI made is 2(0.699 moles) = moles.

16. average rate in a given time period =  slope of the line connecting the [H2] points; and ½ +slope of the line for [HI]
the average rate for the first 80 s is M/s
the average rate for the first 40 s is M/s
the average rate for the first 10 s is M/s

17. Instantaneous Rate
The instantaneous rate is the change in concentration at any one particular time
slope at one point of a curve
Determined by taking the slope of a line tangent to the curve at that particular point
first derivative of the function
for you calculus fans

18. H2 (g) + I2 (g)  2 HI (g)
Using [H2], the instantaneous rate at 50 s is
Using [HI], the instantaneous rate at 50 s is

19. Practice – If 2. 4 x 102 g of NOBr decomposes in a 2
Practice – If 2.4 x 102 g of NOBr decomposes in a 2.0 x 102 mL flask in 5.0 minutes, find the average rate of Br2 production 2 NOBr(g)  2 NO(g) + Br2(l)
Given:
Find:
5.45 M Br2, 3.0 x 102 s
D[Br2]/Dt, M/s
240.0 g NOBr, L, 5.0 min.
D[Br2]/Dt, M/s
240.0 g NOBr, mL, 5.0 min.
D[Br2]/Dt, M/s
Conceptual Plan:
Relationships:
D M
D mole Br2
Rate
D min
D s }
2 mol NOBr:1 mol Br2, 1 mol = g, 1 mL=0.001 L
Solve:

20. Measuring Reaction Rate
To measure the reaction rate you need to be able to measure the concentration of at least one component in the mixture at many points in time
There are two ways of approaching this problem
1. for reactions that are complete in less than 1 hour, it is best to use continuous monitoring of the concentration
2. for reactions that happen over a very long time, sampling of the mixture at various times can be used
when sampling is used, often the reaction in the sample is stopped by a quenching technique

21. Continuous Monitoring
Polarimetry – measuring the change in the degree of rotation of plane-polarized light caused by one of the components over time
Spectrophotometry – measuring the amount of light of a particular wavelength absorbed by one component over time
the component absorbs its complementary color
Total pressure – the total pressure of a gas mixture is stoichiometrically related to partial pressures of the gases in the reaction

22. Sampling the Reaction Mixture at Specific Times
At specific times during the reaction, drawing off aliquots, (samples from the reaction mixture), and doing quantitative analysis
titration for one of the components
gravimetric analysis
Gas chromatography can measure the concentrations of various components in a mixture
for samples that have volatile components
separates mixture by adherence to a surface

23. Methods for Determining Concentrations in a Mixture

24. Methods for Determining Concentrations in a Mixture24

25. Methods for Determining Concentrations in a Mixture25

26. Factors Affecting Reaction Rate: Nature of the Reactants
Nature of the reactants means what kind of reactant molecules and what physical condition they are in
small molecules tend to react faster than large molecules
gases tend to react faster than liquids, which react faster than solids
powdered solids are more reactive than “blocks”
more surface area for contact with other reactants
certain types of chemicals are more reactive than others
e.g. potassium metal is more reactive than sodium
ions react faster than molecules
no bonds need to be broken

27. Factors Affecting Reaction Rate: Temperature
Increasing temperature increases reaction rate
chemist’s rule of thumb—for each 10 °C rise in temperature, the speed of the reaction doubles
for many reactions
There is a mathematical relationship between the absolute temperature and the speed of a reaction discovered by Svante Arrhenius, which will be examined later

28. Factors Affecting Reaction Rate: Catalysts
Catalysts are substances that affect the speed of a reaction without being consumed
Most catalysts are used to speed up a reaction; these are called positive catalysts
catalysts used to slow a reaction are called negative catalysts.
Homogeneous = present in same phase
Heterogeneous = present in different phase
How catalysts work will be examined later

29. Factors Affecting Reaction Rate: Reactant Concentration
Generally, the larger the concentration of reactant molecules, the faster the reaction
increases the frequency of reactant molecule contact
concentration of gases depends on the partial pressure of the gas
higher pressure = higher concentration
Concentrations of solutions depend on the solute-to-solution ratio (molarity)

30. The Rate Law
The rate law of a reaction is the mathematical relationship between the rate of the reaction and the concentrations of the reactants
and homogeneous catalysts as well
The rate law must be determined experimentally!!
The rate of a reaction is directly proportional to the concentration of each reactant raised to a power
For the reaction aA + bB  products the rate law would have the form given below
n and m are called the orders for each reactant
k is called the rate constant

31. Reaction Order
The exponent on each reactant in the rate law is called the order with respect to that reactant
The sum of the exponents on the reactants is called the order of the reaction
The rate law for the reaction
2 NO(g) + O2(g) ® 2 NO2(g)
is Rate = k[NO]2[O2]
The reaction is
second order with respect to [NO],
first order with respect to [O2],
and third order overall

32. Sample Rate Laws
The bottom reaction is autocatalytic because a product affects the rate.
Hg2+ is a negative catalyst; increasing its concentration slows the reaction.

33. Practice – What is the rate of the reaction when the [acetaldehyde] = 1.75 x 10−3 M and the rate constant is 6.73 x 10−6 M−1•s−1?
Given:
Find:
[acetaldehyde] = 1.75 x 10−3 M, k= 6.73 x 10−6 M−1•s−1
Rate, M/s
Conceptual Plan:
Relationships:
k, [acetaldehyde]
Rate
Rate = k[acetaldehyde]2
Solve:

34. Finding the Rate Law: the Initial Rate Method
The rate law must be determined experimentally
The rate law shows how the rate of a reaction depends on the concentration of the reactants
Changing the initial concentration of a reactant will therefore affect the initial rate of the reaction
then doubling the initial concentration of A does not change the initial reaction rate
then doubling the initial concentration of A quadruples the initial reaction rate
then doubling the initial concentration of A doubles the initial reaction rate
if for the reaction
A → Products

35. Rate = k[A]n
If a reaction is Zero Order, the rate of the reaction is always the same
doubling [A] will have no effect on the reaction rate
If a reaction is First Order, the rate is directly proportional to the reactant concentration
doubling [A] will double the rate of the reaction
If a reaction is Second Order, the rate is directly proportional to the square of the reactant concentration
doubling [A] will quadruple the rate of the reaction

36. Determining the Rate Law When there Are Multiple Reactants
Changing each reactant will effect the overall rate of the reaction
By changing the initial concentration of one reactant at a time, the effect of each reactant’s concentration on the rate can be determined
In examining results, we compare differences in rate for reactions that only differ in the concentration of one reactant

37. Comparing Expt #1 and Expt #2, the [NO2] changes but the [CO] does not
Example 13.2: Determine the rate law and rate constant for the reaction NO2(g) + CO(g)  NO(g) + CO2(g) given the data below
Comparing Expt #1 and Expt #2, the [NO2] changes but the [CO] does not

38. Example 13.2: Determine the rate law and rate constant for the reaction NO2(g) + CO(g)  NO(g) + CO2(g) given the data below

39. Example 13.2: Determine the rate law and rate constant for the reaction NO2(g) + CO(g)  NO(g) + CO2(g) given the data below

40. Example 13.2: Determine the rate law and rate constant for the reaction NO2(g) + CO(g)  NO(g) + CO2(g) given the data below

41. Example 13.2: Determine the rate law and rate constant for the reaction NO2(g) + CO(g)  NO(g) + CO2(g) given the data below
n = 2, m = 0

42. Example 13.2: Determine the rate law and rate constant for the reaction NO2(g) + CO(g)  NO(g) + CO2(g) given the data below
Substitute the concentrations and rate for any experiment into the rate law and solve for k
Expt.
Number
Initial [NO2], (M)
Initial
[CO], (M)
Initial Rate
(M/s) 1.
0.10
0.0021 2.
0.20
0.0082 3.
0.0083 4.
0.40
0.033

43. Practice – Determine the rate law and rate constant for the reaction NH4+ + NO2− ® N2 + 2 H2O given the data below

44. Practice – Determine the rate law and rate constant for the reaction NH4+ + NO2− ® N2 + 2 H2O given the data below
Rate = k[NH4+]n[NO2]m

45. Finding the Rate Law: Graphical Methods
The rate law must be determined experimentally
A graph of concentration of reactant vs. time can be used to determine the effect of concentration on the rate of a reaction
This involves using calculus to determine the area under a curve – which is beyond the scope of this course
Later we will examine the results of this analysis so we can use graphs to determine rate laws for several simple cases

46. Reactant Concentration vs. Time A  Products
insert figure 13.6

47. Integrated Rate Laws
For the reaction A  Products, the rate law depends on the concentration of A
Applying calculus to integrate the rate law gives another equation showing the relationship between the concentration of A and the time of the reaction – this is called the Integrated Rate Law

48. Half-Life
The half-life, t1/2, of a reaction is the length of time it takes for the concentration of the reactant to fall to ½ its initial value
The half-life of the reaction depends on the order of the reaction

49. Zero Order Reactions [A] Rate = k[A]0 = k constant rate reactions
[A] = −kt + [A]initial
Graph of [A] vs. time is straight line with slope = −k and y–intercept = [A]initial
t ½ = [Ainitial]/2k
When Rate = M/sec, k = M/sec
[A]initial
[A]
slope = −k
time

50. First Order Reactions Rate = k[A]1 = k[A] ln[A] = −kt + ln[A]initial
Graph ln[A] vs. time gives straight line with slope = −k and y–intercept = ln[A]initial
used to determine the rate constant
t½ = 0.693/k
The half-life of a first order reaction is constant
When Rate = M/sec, k = s–1

51. ln[A]initial
ln[A]
time
slope = −k

52. The Half-Life of a First-Order Reaction Is Constant

53. Rate Data for C4H9Cl + H2O ® C4H9OH + HCl

54. C4H9Cl + H2O  C4H9OH + 2 HCl

55. C4H9Cl + H2O  C4H9OH + 2 HCl

56. C4H9Cl + H2O  C4H9OH + 2 HCl
slope =
−2.01 x 10−3
k =
2.01 x 10−3 s-1

57. Second Order Reactions
Rate = k[A]2
1/[A] = kt + 1/[A]initial
Graph 1/[A] vs. time gives straight line with slope = k and y–intercept = 1/[A]initial
used to determine the rate constant
t½ = 1/(k[A0])
When Rate = M/sec, k = M−1s−1

58. slope = k
1/[A]
1/[A]initial
time

59. Rate Data For 2 NO2 ® 2 NO + O2

60. Rate Data For 2 NO2 ® 2 NO + O2

61. Rate Data Graphs for 2 NO2 ® 2 NO + O2

62. Rate Data Graphs for 2 NO2 ® 2 NO + O2

63. Rate Data Graphs for 2 NO2 ® 2 NO + O2

65. Practice – The reaction Q  2 R is second order in Q
Practice – The reaction Q  2 R is second order in Q. If the initial [Q] = M and after 5.0 x 102 seconds the [Q] = M, find the rate constant
Given:
Find:
[Q]init = M, t = 5.0 x 102 s, [Q]t = M k
Conceptual Plan:
Relationships: k
[Q]init, t, [Q]t
Solution:

66. Graphical Determination of the Rate Law for A  Product
Plots of [A] vs. time, ln[A] vs. time, and 1/[A] vs. time allow determination of whether a reaction is zero, first, or second order
Whichever plot gives a straight line determines the order with respect to [A]
if linear is [A] vs. time, Rate = k[A]0
if linear is ln[A] vs. time, Rate = k[A]1
if linear is 1/[A] vs. time, Rate = k[A]2

67. Practice – Complete the Table and Determine the Rate Equation for the Reaction A ® 2 Product
What will the rate be when the [A] = M?

68. Practice – Complete the Table and Determine the Rate Equation for the Reaction A ® 2 Product

72. Practice – Complete the table and determine the rate equation for the reaction A ® 2 Product
Because the graph 1/[A] vs. time is linear, the reaction is second order,
Rate  k[A]2
k  slope of the line  0.10 M–1 s –1

73. Relationship Between Order and Half-Life
For a zero order reaction, the lower the initial concentration of the reactants, the shorter the half-life
t1/2 = [A]init/2k
For a first order reaction, the half-life is independent of the concentration
t1/2 = ln(2)/k
For a second order reaction, the half-life is inversely proportional to the initial concentration – increasing the initial concentration shortens the half-life
t1/2 = 1/(k[A]init)

74. Practice – The reaction Q  2 R is second order in Q
Practice – The reaction Q  2 R is second order in Q. If the initial [Q] = M and the rate constant is 1.8 M−1•s−1 find the length of time for [Q] = ½[Q]init
Given:
Find:
[Q]init = M, k = 1.8 M−1s−1
t1/2, s
Conceptual Plan:
Relationships:
t1/2
[Q]init, k
Solution:

75. The Effect of Temperature on Rate
Changing the temperature changes the rate constant of the rate law
Svante Arrhenius investigated this relationship and showed that:
where T is the temperature in kelvins
R is the gas constant in energy units, J/(mol•K)
A is called the frequency factor, the rate the reactant energy approaches the activation energy
Ea is the activation energy, the extra energy needed to start the molecules reacting

77. Activation Energy and the Activated Complex
There is an energy barrier to almost all reactions
The activation energy is the amount of energy needed to convert reactants into the activated complex
aka transition state
The activated complex is a chemical species with partially broken and partially formed bonds
always very high in energy because of its partial bonds

78. Isomerization of Methyl Isonitrile
methyl isonitrile rearranges to acetonitrile
for the reaction to occur, the H3C─N bond must break, and a new H3C─C bond form

79. Energy Profile for the Isomerization of Methyl Isonitrile
As the reaction begins, the C─N bond weakens enough for the CN group to start to rotate
the activated complex is a chemical species with partial bonds
the frequency is the number of molecules that begin to form the activated complex in a given period of time
the activation energy is the difference in energy between the reactants and the activated complex

80. The Arrhenius Equation: The Exponential Factor
The exponential factor in the Arrhenius equation is a number between 0 and 1
Tt represents the fraction of reactant molecules with sufficient energy so they can make it over the energy barrier
the higher the energy barrier (larger activation energy), the fewer molecules that have sufficient energy to overcome it
That extra energy comes from converting the kinetic energy of motion to potential energy in the molecule when the molecules collide
increasing the temperature increases the average kinetic energy of the molecules
therefore, increasing the temperature will increase the number of molecules with sufficient energy to overcome the energy barrier
therefore increasing the temperature will increase the reaction rate

82. Arrhenius Plots
The Arrhenius Equation can be algebraically solved to give the following form:
this equation is in the form y = mx + b
where y = ln(k) and x = (1/T)
a graph of ln(k) vs. (1/T) is a straight line
(−8.314 J/mol∙K)(slope of the line) = Ea, (in Joules)
ey–intercept = A (unit is the same as k)

83. Example 13.7: Determine the activation energy and frequency factor for the reaction O3(g)  O2(g) + O(g) given the following data:

84. Example 13.7: Determine the activation energy and frequency factor for the reaction O3(g)  O2(g) + O(g) given the following data:

85. slope, m = 1.12 x 104 K y–intercept, b = 26.8
Example 13.7: Determine the activation energy and frequency factor for the reaction O3(g)  O2(g) + O(g) given the following data:
slope, m = 1.12 x 104 K
y–intercept, b = 26.8

86. Arrhenius Equation: Two-Point Form
If you only have two (T,k) data points, the following forms of the Arrhenius Equation can be used:

87. Example 13.8: The reaction NO2(g) + CO(g)  CO2(g) + NO(g) has a rate constant of 2.57 M−1∙s−1 at 701 K and 567 M−1∙s−1 at 895 K. Find the activation energy in kJ/mol
Given:
Find:
T1 = 701 K, k1 = 2.57 M−1∙s−1, T2 = 895 K, k2 = 567 M−1∙s−1
Ea, kJ/mol
Conceptual Plan:
Relationships: Ea
T1, k1, T2, k2
Solution:
most activation energies are tens to hundreds of kJ/mol – so the answer is reasonable
Check:

88. Hint: make T1 = 300 K, T2 = 310 K and k2 = 2k1
Practice – It is often said that the rate of a reaction doubles for every 10 °C rise in temperature. Calculate the activation energy for such a reaction.
Hint:
make T1 = 300 K, T2 = 310 K
and k2 = 2k1

89. Practice – Find the activation energy in kJ/mol for increasing the temperature 10 ºC doubling the rate
Given:
Find:
T1 = 300 K, T1 = 310 K, k2 = 2 k1
Ea, kJ/mol
Conceptual Plan:
Relationships: Ea
T1, k1, T2, k2
Solution:
Check:
most activation energies are tens to hundreds of kJ/mol – so the answer is reasonable

90. Collision Theory of Kinetics
For most reactions, for a reaction to take place, the reacting molecules must collide with each other
on average about 109 collisions per second
Once molecules collide they may react together or they may not, depending on two factors –
1. whether the collision has enough energy to "break the bonds holding reactant molecules together"; and
2. whether the reacting molecules collide in the proper orientation for new bonds to form

91. Effective Collisions Kinetic Energy Factor
For a collision to lead to overcoming the energy barrier, the reacting molecules must have sufficient kinetic energy so that when they collide the activated complex can form

92. Effective Collisions Orientation Effect

93. Effective Collisions
Collisions in which these two conditions are met (and therefore lead to reaction) are called effective collisions
The higher the frequency of effective collisions, the faster the reaction rate
When two molecules have an effective collision, a temporary, high energy (unstable) chemical species is formed – the activated complex

94. Collision Theory and the Frequency Factor of the Arrhenius Equation
The Arrhenius Equation includes a term, A, called the Frequency Factor
The Frequency Factor can be broken into two terms that relate to the two factors that determine whether a collision will be effective

95. Collision Frequency
The collision frequency is the number of collisions that happen per second
The more collisions per second there are, the more collisions can be effective and lead to product formation

96. Orientation Factor
The orientation factor, p, is a statistical term relating the frequency factor to the collision frequency
For most reactions, p < 1
Generally, the more complex the reactant molecules, the smaller the value of p
For reactions involving atoms colliding, p ≈ 1 because of the spherical nature of the atoms
Some reactions actually can have a p > 1
generally involve electron transfer

97. Orientation Factor
The proper orientation results when the atoms are aligned in such a way that the old bonds can break and the new bonds can form
The more complex the reactant molecules, the less frequently they will collide with the proper orientation
reactions where symmetry results in multiple orientations leading to reaction have p slightly less than 1
For most reactions, the orientation factor is less than 1

98. Molecular Interpretation of Factors Affecting Rate – Reactant Nature
Reactions generally occur faster in solution than in pure substances
mixing gives more particle contact
particles separated, allowing more effective collisions per second
forming some solutions breaks bonds that need to be broken
Some materials undergo similar reactions at different rates either because they have a (1) higher initial potential energy and are therefore closer in energy to the activated complex, or (2) because their reaction has a lower activation energy
CH4 + Cl2  CH3Cl + HCl is about 12x faster than CD4 + Cl2  CD3Cl + DCl because the C─H bond is weaker and less stable than the C─D bond
CH4 + X2  CH3X + HX occurs about 100x faster with F2 than with Cl2 because the activation energy for F2 is 5 kJ/mol but for Cl2 is 17 kJ/mol

99. Molecular Interpretation of Factors Affecting Rate – Temperature
Increasing the temperature raises the average kinetic energy of the reactant molecules
There is a minimum amount of kinetic energy needed for the collision to be converted into enough potential energy to form the activated complex
Increasing the temperature increases the number of molecules with sufficient kinetic energy to overcome the activation energy

100. Molecular Interpretation of Factors Affecting Rate – Concentration
Reaction rate generally increases as the concentration or partial pressure of reactant molecules increases
except for zero order reactions
More molecules leads to more molecules with sufficient kinetic energy for effective collision
distribution the same, just bigger curve

101. Reaction Mechanisms
We generally describe chemical reactions with an equation listing all the reactant molecules and product molecules
But the probability of more than 3 molecules colliding at the same instant with the proper orientation and sufficient energy to overcome the energy barrier is negligible
Most reactions occur in a series of small reactions involving 1, 2, or at most 3 molecules
Describing the series of reactions that occurs to produce the overall observed reaction is called a reaction mechanism
Knowing the rate law of the reaction helps us understand the sequence of reactions in the mechanism

102. An Example of a Reaction Mechanism
Overall reaction:
H2(g) + 2 ICl(g)  2 HCl(g) + I2(g)
Mechanism:
1. H2(g) + ICl(g)  HCl(g) + HI(g)
2. HI(g) + ICl(g)  HCl(g) + I2(g)
The reactions in this mechanism are elementary steps, meaning that they cannot be broken down into simpler steps and that the molecules actually interact directly in this manner without any other steps

103. Elements of a Mechanism Intermediates
H2(g) + 2 ICl(g)  2 HCl(g) + I2(g)
1) H2(g) + ICl(g)  HCl(g) + HI(g)
2) HI(g) + ICl(g)  HCl(g) + I2(g)
Notice that the HI is a product in Step 1, but then a reactant in Step 2
Because HI is made but then consumed, HI does not show up in the overall reaction
Materials that are products in an early mechanism step, but then a reactant in a later step, are called intermediates

104. Molecularity
The number of reactant particles in an elementary step is called its molecularity
A unimolecular step involves one particle
A bimolecular step involves two particles
though they may be the same kind of particle
A termolecular step involves three particles
though these are exceedingly rare in elementary steps

105. Rate Laws for Elementary Steps
Each step in the mechanism is like its own little reaction – with its own activation energy and own rate law
The rate law for an overall reaction must be determined experimentally
But the rate law of an elementary step can be deduced from the equation of the step
H2(g) + 2 ICl(g)  2 HCl(g) + I2(g)
1) H2(g) + ICl(g)  HCl(g) + HI(g) Rate = k1[H2][ICl]
2) HI(g) + ICl(g)  HCl(g) + I2(g) Rate = k2[HI][ICl]

106. Rate Laws of Elementary Steps

107. Rate Determining Step
In most mechanisms, one step occurs slower than the other steps
The result is that product production cannot occur any faster than the slowest step – the step determines the rate of the overall reaction
We call the slowest step in the mechanism the rate determining step
the slowest step has the largest activation energy
The rate law of the rate determining step determines the rate law of the overall reaction

108. Another Reaction Mechanism
NO2(g) + CO(g)  NO(g) + CO2(g) Rateobs = k[NO2]2
1. NO2(g) + NO2(g)  NO3(g) + NO(g) Rate = k1[NO2]2 Slow
2. NO3(g) + CO(g)  NO2(g) + CO2(g) Rate = k2[NO3][CO] Fast
The first step is slower than the second step because its activation energy is larger.
The first step in this mechanism is the rate determining step.
The rate law of the first step is the same as the rate law of the overall reaction.

109. Validating a Mechanism
To validate (not prove) a mechanism, two conditions must be met:
1. The elementary steps must sum to the overall reaction
2. The rate law predicted by the mechanism must be consistent with the experimentally observed rate law

110. Mechanisms with a Fast Initial Step
When a mechanism contains a fast initial step, the rate limiting step may contain intermediates
When a previous step is rapid and reaches equilibrium, the forward and reverse reaction rates are equal – so the concentrations of reactants and products of the step are related
and the product is an intermediate
Substituting into the rate law of the RDS will produce a rate law in terms of just reactants

111. An Example 2 H2(g) + 2 NO(g)  2 H2O(g) + N2(g) Rateobs = k [H2][NO]2
2 NO(g)  N2O2(g) Fast
H2(g) + N2O2(g)  H2O(g) + N2O(g) Slow Rate = k2[H2][N2O2]
H2(g) + N2O(g)  H2O(g) + N2(g) Fast k1
k−1
2 H2(g) + 2 NO(g)  2 H2O(g) + N2(g) Rateobs = k [H2][NO]2

112. O3(g) + O(g)  2 O2(g) Slow Rate = k2[O3][O]
Example 13.9: Show that the proposed mechanism for the reaction 2 O3(g)  3 O2(g) matches the observed rate law Rate = k[O3]2[O2]−1 k1
O3(g)  O2(g) + O(g) Fast
O3(g) + O(g)  2 O2(g) Slow Rate = k2[O3][O]
k−1

113. Practice – Mechanism
Determine the overall reaction, the rate determining step, the rate law, and identify all
intermediates of the following mechanism
1. A + B2 ® AB + B Slow
2. A + B ® AB Fast

114. Practice – Mechanism
Determine the overall reaction, the rate determining step, the rate law, and identify all intermediates of the following mechanism
1. A + B2 ® AB + B Slow
2. A + B ® AB Fast
reaction 2 A + B2 ® 2 AB
B is an intermediate
The first step is the rate determining step
Rate = k[A][B2], same as RDS

115. Catalysts
Catalysts are substances that affect the rate of a reaction without being consumed
Catalysts work by providing an alternative mechanism for the reaction
with a lower activation energy
Catalysts are consumed in an early mechanism step, then made in a later step
mechanism without catalyst
O3(g) + O(g)  2 O2(g) V. Slow
mechanism with catalyst
Cl(g) + O3(g)  O2(g) + ClO(g) Fast
ClO(g) + O(g)  O2(g) + Cl(g) Slow

116. Ozone Depletion over the Antarctic

117. Molecular Interpretation of Factors Affecting Rate – Catalysts
Catalysts generally speed a reaction
They give the reactant molecules a different path to follow with a lower activation energy
heterogeneous catalysts hold one reactant molecule in proper orientation for reaction to occur when the collision takes place
and sometimes also help to start breaking bonds
homogeneous catalysts react with one of the reactant molecules to form a more stable activated complex with a lower activation energy

118. Energy Profile of a Catalyzed Reaction
polar stratospheric clouds contain ice crystals that catalyze reactions that release Cl from atmospheric chemicals

119. Practice – Mechanism
Determine the overall reaction, the rate determining step, the rate law, and identify all catalysts and intermediates of the following mechanism
1. HQ2R2 + R− Û Q2R2− + HR Fast
2. Q2R2− ® Q2R + R− Slow

120. Practice – Mechanism
Determine the overall reaction, the rate determining step, the rate law, and identify all catalysts and intermediates of the following mechanism
1. HQ2R2 + R− Û Q2R2− + HR Fast
2. Q2R2− ® Q2R + R− Slow
reaction HQ2R2 ® Q2R + HR
R− is a catalyst
Q2R2− is an intermediate
The second step is the rate determining step
Rate = k[Q2R2−] = k[HQ2R2][R−]

121. Catalysts
Homogeneous catalysts are in the same phase as the reactant particles
Cl(g) in the destruction of O3(g)
Heterogeneous catalysts are in a different phase than the reactant particles
solid catalytic converter in a car’s exhaust system

122. Types of Catalysts

123. Catalytic Hydrogenation H2C=CH2 + H2 → CH3CH3

124. Enzymes
Because many of the molecules are large and complex, most biological reactions require a catalyst to proceed at a reasonable rate
Protein molecules that catalyze biological reactions are called enzymes
Enzymes work by adsorbing the substrate reactant onto an active site that orients the substrate for reaction
1) Enzyme + Substrate  Enzyme─Substrate Fast
2) Enzyme─Substrate → Enzyme + Product Slow

125. Enzyme–Substrate Binding: the Lock and Key Mechanism

126. Enzymatic Hydrolysis of Sucrose