Chapter 14 Chemical Kinetics

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Chapter 14 Chemical Kinetics

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Title: Chapter 14 Chemical Kinetics

1
Chapter 14Chemical Kinetics
Chemistry, The Central Science, 10th
edition Theodore L. Brown H. Eugene LeMay, Jr.
and Bruce E. Bursten

John D. Bookstaver
St. Charles Community College
St. Peters, MO
? 2006, Prentice Hall, Inc.

2
March 4

Reaction rates. Factors that affect the rate of a
reaction.
Determining the instantaneous rate from a graph.
Stoichiometry and reaction rates
Homework p 617 q 1to3
and up to what we get to for 11 to 15 , 17 to
31 odd

3
Kinetics

Is the branch of chemistry concerned with the
rate of chemical reactions and the mechanism by
which occur
Besides information about the speed at which
reactions occur, kinetics also sheds light on the
reaction mechanism (exactly how the reaction
occurs).

4
Collision Theory

In order for two particles to react chemically
they must collide. Not only they must collide,
but it must be an effective collision. That is,
they must have the correct amount of energy and
collide with the proper orientation in space.
Any factor which increases the likehood that they
will collide will increase the rate of the
chemical reaction.

5
Factors That Affect Reaction Rates (bonds must
break)

Surface area/contact area (opportunity for
collisions).
Concentration (increase frequency)
Temperature (increase frequency)
Catalyst ( Effective collisions)
Nature of reactants (effective collisions)

6
Factors That Affect Reaction Rates

Physical State of the Reactants
In order to react, molecules must come in contact
with each other.
The more homogeneous the mixture of reactants,
the faster the molecules can react.
For solid reactants increasing the surface area
increases the rate of reaction.

7
Factors That Affect Reaction Rates

Temperature
At higher temperatures, reactant molecules have
more kinetic energy, move faster, and collide
more often and with greater energy.

8
Factors That Affect Reaction Rates

Concentration of Reactants
As the concentration of reactants increases, so
does the likelihood that reactant molecules will
collide.

9
Factors That Affect Reaction Rates

Presence of a Catalyst
Catalysts speed up reactions by changing the
mechanism of the reaction.
Catalysts are not consumed during the course of
the reaction.

10
Reaction Rates

Speed of a reaction is measured by the change in
concentration with time.
For a reaction A ? B
Suppose A reacts to form B. Let us begin with
1.00 mol A.

11
Reaction Rates

Rates of reactions can be determined by
monitoring the change in concentration of either
reactants or products as a function of time.

At t 0 (time zero) there is 1.00 mol A (100 red
spheres) and no B present.
At t 20 min, there is 0.54 mol A and 0.46 mol
B.
At t 40 min, there is 0.30 mol A and 0.70 mol
B.
Calculating,

For the reaction A ? B there are two ways of
measuring rate
the speed at which the products appear (i.e.
change in moles of B per unit time), or
the speed at which the reactants disappear (i.e.
the change in moles of A per unit time).

By convention rates are always positive
quantities. Because A is decreasing with time, we
use a negative sign to convert the negative
change into a positive rate.
Because one molecule of A is consumed for every
molecule of B that forms the average rate of
disappearance of A equals the rate of appearance
of B

15
PRACTICE EXERCISE For the reaction pictured in
Figure 14.3, calculate the average rate of
appearance of B over the time interval from 0 to
40 s. (The necessary data are given in the figure
caption.)
Answer 1.8 ? 10 2 M/s
16

Change of Rate with Time
Most useful units for rates are to look at
molarity. Since volume is constant, molarity and
moles are directly proportional.
Consider
C4H9Cl(aq) H2O(l) ? C4H9OH(aq) HCl(aq)

17
Reaction Rates
C4H9Cl(aq) H2O(l) ??? C4H9OH(aq) HCl(aq)

In this reaction, the concentration of butyl
chloride or chlorobutane, C4H9Cl, was measured at
various times.

18
Reaction Rates
C4H9Cl(aq) H2O(l) ??? C4H9OH(aq) HCl(aq)

The average rate of the reaction over each
interval is the change in concentration divided
by the change in time

19
Reaction Rates
C4H9Cl(aq) H2O(l) ??? C4H9OH(aq) HCl(aq)

Note that the average rate decreases as the
reaction proceeds.
This is because as the reaction goes forward,
there are fewer collisions between reactant
molecules.

20
Reaction Rates
C4H9Cl(aq) H2O(l) ??? C4H9OH(aq) HCl(aq)

A plot of concentration vs. time for this
reaction yields a curve like this.
The slope of a line tangent to the curve at any
point is the instantaneous rate at that time.

21
Reaction Rates
C4H9Cl(aq) H2O(l) ??? C4H9OH(aq) HCl(aq)

All reactions slow down over time.
Therefore, the best indicator of the rate of a
reaction is the instantaneous rate near the
beginning.

22
Reaction Rates and Stoichiometry
C4H9Cl(aq) H2O(l) ??? C4H9OH(aq) HCl(aq)

In this reaction, the ratio of C4H9Cl to C4H9OH
is 11.
Thus, the rate of disappearance of C4H9Cl is the
same as the rate of appearance of C4H9OH.

C4H9Cl(aq) H2O(l) ? C4H9OH(aq) HCl(aq)
We can calculate the average rate in terms of the
disappearance of C4H9Cl.
The units for average rate are mol L-1 s-1 or
M/s.
The average rate decreases with time.
We plot C4H9Cl versus time.
The rate at any instant in time (instantaneous
rate) is the slope of the tangent to the curve.
Instantaneous rate is different from average
rate.
We usually call the instantaneous rate the rate.

24
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25
Reaction Rates and Stoichiometry

What if the ratio is not 11?

2 HI(g) ??? H2(g) I2(g)

Therefore,

26
Reaction Rates and Stoichiometry

To generalize, then, for the reaction

Reaction Rate
Change in concentration per unit time
For this reaction
N2 3H2 2NH3

As the reaction progresses the concentration H2
goes down

Concentration
H2
Time
29

As the reaction progresses the concentration N2
goes down 1/3 as fast

Concentration
N2
H2
Time
30

As the reaction progresses the concentration NH3
goes up.

Concentration
N2
H2
NH3
Time
31

Example
N2 3H2 2NH3
At a certain temperature, the rate of this
reaction is -0.13 mol N2 L-1 s-1. What is the
rate in mol H2 L-1 s-1? What is the rate in mol
NH3 L-1 s-1?

32
0.39 mol H2 L-1 s-1 0.26 mol NH3 L-1 s-1
33
(b) If the rate at which O2 appears, ?O2? /?t,
is 6.0 ? 105 M/s at a particular instant, at
what rate is O3 disappearing at this same time,
?O3? /?t?
34
Answers (a) 8.4 ? 10 7 M/s, (b) 2.1 ? 10 7 M/s
35
Concentration and Rate

One can gain information about the rate of a
reaction by seeing how the rate changes with
changes in concentration.

36
Concentration and Rate

Comparing Experiments 1 and 2, when NH4
doubles, the initial rate doubles.

37
Concentration and Rate

Likewise, comparing Experiments 5 and 6, when
NO2- doubles, the initial rate doubles.

This method requires that a reaction be run
several times.
The initial concentrations of the reactants are
varied.
The goal is to vary only one concentration at a
time
The reaction rate is measured just after the
reactants are mixed.

39
Concentration and Rate

This means
Rate ? NH4
Rate ? NO2-
Rate ? NH NO2-
or
Rate k NH4 NO2-
This equation is called the rate law, and k is
the rate constant.

For the reaction
NH4(aq) NO2-(aq) ? N2(g) 2H2O(l)
we note
as NH4 doubles with NO2- constant the rate
doubles,
as NO2- doubles with NH4 constant, the rate
doubles,
We conclude rate ? NH4NO2-.
Rate law
The constant k is the rate constant.

41
Rate Laws

A rate law shows the relationship between the
reaction rate and the concentrations of
reactants.
The exponents tell the order of the reaction with
respect to each reactant.
This reaction is
First-order in NH4
First-order in NO2-

42
Rate Laws

The overall reaction order can be found by adding
the exponents on the reactants in the rate law.
This reaction is second-order overall.

The exponents in a rate law indicate how the rate
is affected by the concentration of each
reactant.
For most reactions the orders are 0, 1 or 2,
occasionally reactions can have a reaction order
fractional or even negative.

2 NO2 2 NO O2
You will find that the rate will only depend on
the concentrations of the reactants.
Rate kNO2n
This is called a rate law expression.
k is called the rate constant.
n is the order of the reactant -usually a
positive integer.

Exponents in the Rate Law
For a general reaction with rate law
we say the reaction is mth order in reactant 1
and nth order in reactant 2.
The overall order of reaction is m n .
A reaction can be zeroth order if m, n, are
zero.
This means that the rate does not depend on the
concentration of (a) reactant(s)
Note the values of the exponents (orders) have
to be determined experimentally. They are not
simply related to stoichiometry.

Using Initial Rates to Determine Rate Laws
A reaction is zero order in a reactant if the
change in concentration of that reactant produces
no effect.
A reaction is first order if doubling the
concentration causes the rate to double.
A reacting is nth order if doubling the
concentration causes an 2n increase in rate.
Note that the rate constant does not depend on
concentration.

47
Example

For the reaction
BrO3- 5 Br- 6H 3Br2 3 H2O
The general form of the Rate Law is
Rate kBrO3-mBr-nHp
We use experimental data to determine the values
of m, n,and p

48
Initial concentrations (M)
BrO3-
Br-
H
Rate (M/s)
0.10 0.10 0.10 8.0 x 10-4
0.20 0.10 0.10 1.6 x 10-3
0.20 0.20 0.10 3.2 x 10-3
0.10 0.10 0.20 3.2 x 10-3

Now we have to see how the rate changes with
concentration

Determine the Rate Law.
Calculate the value of k, and determine its
units.
Calculate the initial rate of the reaction if the
initial concentrations are
BrO3- 0.20 M Br- 0.30 M
H 0.10 M

50
NH4 NO2- N2 2 H2O

Exp NH4 NO2- Initial Rate(M/s)
1 0.100 M 0.0050 M 1.35 x 10-7
2 0.100 M 0.010 M 2.70 x 10-7
3 0.200 M 0.010 M 5.40 x 10-7
Determine the rate law.
Calculate k, and determine its units.

51
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52
Check Each box contains 10 spheres. The rate law
indicates that in this case B has a greater
influence on rate than A because B has a higher
reaction order. Hence, the mixture with the
highest concentration of B (most purple spheres)
should react fastest. This analysis confirms the
order 2 lt 1 lt 3.
PRACTICE EXERCISE Assuming that rate kAB,
rank the mixtures represented in this Sample
Exercise in order of increasing rate.
Answer 2 3 lt 1
53

TYPES OF RATE LAW
CONCENTRATION AND TIME
FIRST ORDER REACTION
INTEGRATED RATE LAW
GRAPH METHOD
UNITS FOR K
GET READY FOR A SURPRISE QUIZ! Reaction rates and
reaction
Hw finish 33 to 43

54
Types of Rate Laws

Differential Rate law describes how rate depends
on reactant concentration (Referred to as simply
rate law).
Rate -D A/D tk A
Integrated Rate Law Describes how
concentration varies with time.

55
For each type of differential rate law there is
an integrated rate law and vice versa. Rate laws
can help us better understand reaction mechanisms
56

First Order Reactions
Goal convert rate law into a convenient equation
to give concentrations as a function of time.
For a first order reaction, the rate doubles as
the concentration of a reactant doubles.

Rate Law Integrated Rate Law
57
Integrated Rate Laws

Using calculus to integrate the rate law for a
first-order process gives us

Where
A0 is the initial concentration of A. At is
the concentration of A at some time, t, during
the course of the reaction.
58
Integrated Rate Laws

Manipulating this equation produces

ln At - ln A0 - kt
ln At - kt ln A0
which is in the form
y mx b
59
Unit for k for a 1st order reaction

k t-1

60
Answer 51 torr
61
Solution replace the given values into the
integrated first order rate law equation ln At
-kt ln A0 k 1.45 yr1, t 1.00 yr
insecticide0 5.0 ? 107 g/cm3 and
solve for 1ninsecticide (b) We have k
1.45yr1, insecticide0 5.0 ? 107 g/cm3, and
insecticidet 3.0 ? 107 g/cm3, and so we can
solve the equation for t.
62
First order

A certain first order decomposition reaction
reaches 65 completion in 18.9 seconds. Find the
rate constant for this reaction.
.055 s-1

Integrated rate law review first order
Second order processes
Half life

64
HW

33 TO 43 ODD
Go to www.sciencegeek.net
Follow the links to chapter 12
Take quiz

65
First-Order Processes
ln At -kt ln A0

Therefore, if a reaction is first-order, a plot
of ln A vs. t will yield a straight line, and
the slope of the line will be -k.

66
Graphical method to determine rate order

How do we find out if the reaction is first rate
from the experimental data?
Plot the ln reactant vs time.
If the plot is a straight line then the reaction
is first order.

67
First-Order Processes

Consider the process in which methyl isonitrile
is converted to acetonitrile.

68
First-Order Processes

This data was collected for this reaction at
198.9C.

69
First-Order Processes

When ln P is plotted as a function of time, a
straight line results.
Therefore,
The process is first-order.
k is the negative slope 5.1 ? 10-5 s-1.

70
Second-Order Processes Rate kA2

Integrating the rate law for a process that is
second-order in reactant A, we get

also in the form
y mx b
71
INTEGRATED RATE LAW FOR A 2nd ORDER REACTION

If a process is second-order in A, a plot of
1/A vs. t will yield a straight line, and the
slope of that line is k.
Unit for k M-1 t-1

72
Second-Order Processes
The decomposition of NO2 at 300C is described by
the equation
and yields data comparable to this
Time (s) NO2, M
0.0 0.01000
50.0 0.00787
100.0 0.00649
200.0 0.00481
300.0 0.00380
73
Second-Order Processes

Graphing ln NO2 vs. t yields

The plot is not a straight line, so the process
is not first-order in A.

Time (s) NO2, M ln NO2
0.0 0.01000 -4.610
50.0 0.00787 -4.845
100.0 0.00649 -5.038
200.0 0.00481 -5.337
300.0 0.00380 -5.573
74
Second-Order Processes

Graphing ln 1/NO2 vs. t, however, gives this
plot.

Because this is a straight line, the process is
second-order in A.

Time (s) NO2, M 1/NO2
0.0 0.01000 100
50.0 0.00787 127
100.0 0.00649 154
200.0 0.00481 208
300.0 0.00380 263
75
January 18

HALF LIFE
SUMMARY OF RATE LAWS
TEMPERATURE AND RATE
COLLISION MODEL /ACTIVATION ENERGY/ ACTIVATED
COMPLEX
ARRHENIUS EQUATION FOR ACTIVATION ENERGY
HW 45 TO 55

76
Half-Life

Half-life is defined as the time required for
one-half of a reactant to react.
Because A at t1/2 is one-half of the original
A,
At 0.5 A0.

Half-Life
Half-life is the time taken for the concentration
of a reactant to drop to half its original value.
For a first order process, half life, t½ is the
time taken for A0 to reach ½A0.

78
Half-Life

For a first-order process, this becomes

ln 0.5 -kt1/2
-0.693 -kt1/2
NOTE For a first-order process, the half-life
does not depend on A0.
79
Half life

The half life of a reaction is useful to describe
how fast it occurs.
For a first order reaction (like nuclear decay!)
it does not depend on the initial concentration
of the reactants.
HALF LIFE IS CONSTANT FOR A FIRST ORDER REACTION

80
Half-Life

For a second-order process

81
Second Order Reactions

The half life depends on the initial
concentration.
As the reactant concentration decreases the half
life increases.

82
Zero Order Rate Law

Rate kA0 k
Rate does not change with concentration.
Integrated A -kt A0
When A A0 /2 t t1/2
t1/2 A0 /2k

83
Zero Order Rate Law

Most often when reaction happens on a surface
because the surface area stays constant.
Also applies to enzyme chemistry.

84
Summary of Rate Laws
Zero Order 1st Order 2nd Order
Diff. Rate Law K kA KA2
Int. Rate Law A -kt Ao ln A -kt ln Ao 1/A kt 1/Ao
Straight Line Plot A vs. t m -k ln A vs. t m -k 1/A vs. t m k
Half-Life Ao/2k (ln 2)/k 1/kAo
85
Temperature and Rate

Generally, as temperature increases, so does the
reaction rate.
This is because k is temperature dependent.

Most reactions speed up as temperature increases.
(E.g. food spoils when not refrigerated.)
When two light sticks are placed in water one at
room temperature and one in ice, the one at room
temperature is brighter than the one in ice.
The chemical reaction responsible for
chemiluminescence is dependent on temperature
the higher the temperature, the faster the
reaction and the brighter the light.

The Collision Model
As temperature increases, the rate increases
(exponentially).

Since the rate law has no temperature term in it,
the rate constant must depend on temperature.
Consider the first order reaction
CH3NC ? CH3CN.
As temperature increases from 190 ?C to 250 ?C
the rate constant increases from 2.52 ? 10-5 s-1
to 3.16 ? 10-3 s-1.
The temperature effect is quite dramatic. Why?
Observations rates of reactions are affected by
concentration and temperature.

Goal develop a model that explains why rates of
reactions increase as concentration and
temperature increases.
The collision model in order for molecules to
react they must collide.
The greater the number of collisions the faster
the rate.
The more molecules present, the greater the
probability of collision and the faster the rate.

The higher the temperature, the more energy
available to the molecules and the faster the
rate.
Complication not all collisions lead to
products. In fact, only a small fraction of
collisions lead to product.
Effective Collision A collision between
molecules that leads to products (reaction
occurs)

91
The Collision Model

Furthermore, molecules must collide with the
correct orientation and with enough energy to
cause bond breakage and formation.

Consider
2 NOBr ? 2 NO Br2
There are several possible ways that NOBr
molecules can collide one is effective and the
others are not.

93
No Reaction
94
The Orientation Factor Cl ClNO Cl2 NO
95

Activation Energy
Arrhenius molecules must posses a minimum amount
of energy to react. Why?
In order to form products, bonds must be broken
in the reactants.
Bond breakage requires energy.
Activation energy, Ea, is the minimum energy
required to initiate a chemical reaction.

96
Activation Energy

There is a minimum amount of energy required for
reaction the activation energy, Ea.
Just as a ball cannot get over a hill if it does
not roll up the hill with enough energy, a
reaction cannot occur unless the molecules
possess sufficient energy to get over the
activation energy barrier.

97
Activation Energy

The lower the Ae the faster the reaction.
Is the energy needed to form the activated
complex.
Activated Complex or Transition State - The
arrangement of atoms at the top of the energy
barrier. Is a very unstable arrangement!

98
Reaction Coordinate Diagrams

It is helpful to visualize energy changes
throughout a process on a reaction coordinate
diagram like this one for the rearrangement of
methyl isonitrile.

99
Reaction Coordinate Diagrams

It shows the energy of the reactants and products
(and, therefore, ?E).
The high point on the diagram is the transition
state.

The species present at the transition state is
called the activated complex.
The energy gap between the reactants and the
activated complex is the activation energy
barrier.

100
MaxwellBoltzmann Distributions

Temperature is defined as a measure of the
average kinetic energy of the molecules in a
sample.

At any temperature there is a wide distribution
of kinetic energies.

101
MaxwellBoltzmann Distributions

As the temperature increases, the curve flattens
and broadens.
Thus at higher temperatures, a larger population
of molecules has higher energy.

102
MaxwellBoltzmann Distributions

If the dotted line represents the activation
energy, as the temperature increases, so does the
fraction of molecules that can overcome the
activation energy barrier.

As a result, the reaction rate increases.

103
MaxwellBoltzmann Distributions

This fraction of molecules can be found through
the expression
where R is the gas constant and T is the Kelvin
temperature.

f e-Ea/RT
104

The Arrhenius Equation
Arrhenius discovered most reaction-rate data
obeyed the Arrhenius equation
k is the rate constant, Ea is the activation
energy, R is the gas constant (8.314 J/K-mol) and
T is the temperature in K.
A is called the frequency factor.
A is a measure of the probability of a favorable
collision.
Both A and Ea are specific to a given reaction.

105
Arrhenius Equation

Taking the natural logarithm of both sides, the
equation becomes
ln k -Ea ( ) ln A

y mx b
Therefore, if k is determined experimentally at
several temperatures, Ea can be calculated from
the slope of a plot of ln k vs. 1/T.
106

Determining the Activation Energy
If we have a lot of data, we can determine Ea and
A graphically by rearranging the Arrhenius
equation
From the above equation, a plot of ln k versus
1/T will have slope of Ea/R and intercept of ln
A.

107
Temperature and Rate
108

REACTION MECHANISMS
HW 59 TO 67

109

If we do not have a lot of data, then we
recognize

110
Arrhenius Equation Problem
The rate constant for the formation of hydrogen
iodide from the elements H2 (g) I2 (g)? 2HI
(g) is 2.7 x 10-4 L/(mol.s) at 600 K and 3.5 x
10-3 L/(mol.s) at 650 K. Find the activation
energy Ea and solve for k2 when T is 700K
111
SAMPLE EXERCISE 14.10 Relating Energy Profiles to
Activation Energies and Speeds of Reaction
Consider a series of reactions having the
following energy profiles
Assuming that all three reactions have nearly the
same frequency factors, rank the reactions from
slowest to fastest.
Solution The lower the activation energy, the
faster the reaction. The value of ?? does not
affect the rate. Hence the order is (2) lt (3) lt
(1).
PRACTICE EXERCISE Imagine that these reactions
are reversed. Rank these reverse reactions from
slowest to fastest.
Answer (2) lt (1) lt (3) because Ea values are
40, 25, and 15 kJ/mol, respectively
112
Reaction Mechanisms

The balanced chemical equation provides
information about the beginning and end of
reaction.
The reaction mechanism gives the path of the
reaction.
Mechanisms provide a very detailed picture of
which bonds are broken and formed during the
course of a reaction.
Elementary Steps
Elementary step any process that occurs in a
single step.

113
Reaction Mechanisms

The molecularity of a process tells how many
molecules are involved in the process.
Molecularity is the number of species that must
collide to produce the reaction indicated by that
step

114
Multistep Mechanisms

In a multistep process, one of the steps will be
slower than all others.
The overall reaction cannot occur faster than
this slowest, rate-determining step.

115
Rate Laws for Elementary Steps
116

If a reaction proceeds via several elementary
steps, then the elementary steps must add to give
the balanced chemical equation.
Intermediate a species which appears in an
elementary step which is not a reactant or
product. It is produced in one step and consumed
in a later step.
The mechanism must agree with the experimentally
determined law.

117
Slow Initial Step
NO2 (g) CO (g) ??? NO (g) CO2 (g)

The rate law for this reaction is found
experimentally to be
Rate k NO22
CO is necessary for this reaction to occur, but
the rate of the reaction does not depend on its
concentration.
This suggests the reaction occurs in two steps.

118
RATE DETERMINING STEP

The rate is always determined by the slow rate
step.

119
Slow Initial Step

A proposed mechanism for this reaction is
Step 1 NO2 NO2 ??? NO3 NO (slow)
Step 2 NO3 CO ??? NO2 CO2 (fast)
The NO3 intermediate is consumed in the second
step.
As CO is not involved in the slow,
rate-determining step, it does not appear in the
rate law.

120

NO2(g) NO2(g) ? NO3(g) NO(g)
NO3(g) CO(g) ? NO2(g) CO2(g)
Notice that if we add the above steps, we get the
overall reaction
NO2(g) CO(g) ? NO(g) CO2(g)

121
Fast Initial Step
2 NO (g) Br2 (g) ??? 2 NOBr (g)

The rate law for this reaction is found to be
Rate k NO2 Br2
Because termolecular processes are rare, this
rate law suggests a two-step mechanism.

122
Fast Initial Step

A proposed mechanism is

Step 2 NOBr2 NO ??? 2 NOBr (slow)
Step 1 includes the forward and reverse reactions.
123
Fast Initial Step

The rate of the overall reaction depends upon the
rate of the slow step.
The rate law for that step would be
Rate k2 NOBr2 NO
But how can we find NOBr2?

124
Fast Initial Step

NOBr2 can react two ways
With NO to form NOBr
By decomposition to reform NO and Br2
The reactants and products of the first step are
in equilibrium with each other.
Therefore,
Ratef Rater

125
Fast Initial Step

Because Ratef Rater ,
k1 NO Br2 k-1 NOBr2
Solving for NOBr2 gives us

126
Fast Initial Step

Substituting this expression for NOBr2 in the
rate law for the rate-determining step gives

k NO2 Br2
127

Mechanisms of reaction practice
Catalysts
Chapter review

128

Example
NO Cl2 NOCl2 (fast)
NOCl2 NO 2 NOCl (slow)
1. Write the overall equation.
2. Determine the rate law.

129
Example

At low temperatures, the rate law for the
reaction
CO (g) NO2 (g) ? CO2 (g) NO (g)
Rate kNO22. Show why or why not each of the
following mechanisms is consistent with that rate
law for this reaction.

130

1. CO NO2 ? CO2 NO
1. 2 NO2 N2O4 (fast)
2. N2O4 2 CO 2 CO2 2 NO (slow)
1. 2 NO2 ? NO3 NO (slow)
2. NO3 CO ? NO2 CO2 (fast)
1. 2 NO2 ? 2 NO O2 (slow)
2. 2 CO O2 ? 2 CO2 (fast)

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Catalysts

Catalysts increase the rate of a reaction by
decreasing the activation energy of the reaction.
Catalyst are never consumed in the chemical
reaction.
Catalysts change the mechanism by which the
process occurs.

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Example

H2O2 I- ? H2O IO- (slow)
H2O2 IO- ? H2O O2 I- (fast)
1. What is the overall equation?
2. What is the catalyst?
3. What is the intermediate?
4. What is the rate law?

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There are two types of catalyst
Homogeneous present in the same phase as the
reacting molecule.
Heterogeneous exist in different phase, usually
a solid.
Homogeneous Catalysis
The catalyst and reaction is in one phase.
Chlorine atoms are catalysts for the destruction
of ozone.

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Hydrogen peroxide decomposes very slowly
2H2O2(aq) ? 2H2O(l) O2(g)
In the presence of the bromide ion, the
decomposition occurs rapidly
2Br-(aq) H2O2(aq) 2H(aq) ? Br2(aq)
2H2O(l).
Br2(aq) is brown.
Br2(aq) H2O2(aq) ? 2Br-(aq) 2H(aq) O2(g).
Br- is a catalyst because it can be recovered at
the end of the reaction.
Generally, catalysts operate by lowering the
activation energy for a reaction.

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Catalysts can operate by increasing the number of
effective collisions.
That is, from the Arrhenius equation catalysts
increase k be increasing A or decreasing Ea.
A catalyst may add intermediates to the reaction.
Example In the presence of Br-, Br2(aq) is
generated as an intermediate in the decomposition
of H2O2.

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When a catalyst adds an intermediate, the
activation energies for both steps must be lower
than the activation energy for the uncatalyzed
reaction. The catalyst is in a different phase
than the reactants and products.
Heterogeneous Catalysis
Typical example solid catalyst, gaseous
reactants and products (catalytic converters in
cars).
Most industrial catalysts are heterogeneous.

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First step is adsorption (the binding of reactant
molecules to the catalyst surface).
Adsorbed species (atoms or ions) are very
reactive.
Molecules are adsorbed onto active sites on the
catalyst surface.

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Consider the hydrogenation of ethylene
C2H4(g) H2(g) ? C2H6(g), ?H -136 kJ/mol.
The reaction is slow in the absence of a
catalyst.
In the presence of a metal catalyst (Ni, Pt or
Pd) the reaction occurs quickly at room
temperature.
First the ethylene and hydrogen molecules are
adsorbed onto active sites on the metal surface.
The H-H bond breaks and the H atoms migrate about
the metal surface.

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When an H atom collides with an ethylene molecule
on the surface, the C-C ? bond breaks and a C-H ?
bond forms.
When C2H6 forms it desorbs from the surface.
When ethylene and hydrogen are adsorbed onto a
surface, less energy is required to break the
bonds and the activation energy for the reaction
is lowered.
Enzymes
Enzymes are biological catalysts.
Most enzymes are protein molecules with large
molecular masses (10,000 to 106 amu).

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Enzymes have very specific shapes.
Most enzymes catalyze very specific reactions.
Substrates undergo reaction at the active site of
an enzyme.
A substrate locks into an enzyme and a fast
reaction occurs.
The products then move away from the enzyme.

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Only substrates that fit into the enzyme lock
can be involved in the reaction.
If a molecule binds tightly to an enzyme so that
another substrate cannot displace it, then the
active site is blocked and the catalyst is
inhibited (enzyme inhibitors).
The number of events (turnover number) catalyzed
is large for enzymes (103 - 107 per second).

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Enzymes
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SAMPLE EXERCISE 14.11 Determining the Energy of
Activation
The following table shows the rate constants for
the rearrangement of methyl isonitrile at various
temperatures
(a) From these data, calculate the activation
energy for the reaction. (b) What is the value of
the rate constant at 430.0 K?
Solution Analyze We are given rate constants, k,
measured at several temperatures and asked to
determine the activation energy, Ea, and the rate
constant, k, at a particular temperature. Plan
We can obtain Ea from the slope of a graph of ln
k versus 1/T. Once we know Ea, we can use ln k
-Ea (1/RT) ln A together with the given rate
data to calculate the rate constant at 430.0 K.
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Solve (a) We must first convert the temperatures
from degrees Celsius to kelvins. We then take the
inverse of each temperature, 1/T, and the natural
log of each rate constant, ln k. This gives us
the table shown at the right
A graph of ln k versus 1/T results in a straight
line, as shown in Figure 14.17.
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We report the activation energy to only two
significant figures because we are limited by the
precision with which we can read the graph
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SAMPLE EXERCISE 14.11 continued
Thus,
Note that the units of k1 are the same as those
of k2.
PRACTICE EXERCISE Using the data in Sample
Exercise 14.11, calculate the rate constant for
the rearrangement of methyl isonitrile at 280C.
Answer 2.2 ? 102s1

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