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1
Fossum-Reyes
Chapter 14 – Chemical Kinetics
How fast do chemical processes occur?
There is an enormous range of time scales.
Kinetics also sheds light on the reaction mechanism (exactly how the reaction occurs).
Why is it important?
Increase the shelf life of products like food, beverages, pharmaceutical drugs, etc. (How?)
– slowing down some reactions.
Remove hazardous pollutants from the environment (How?)
– speeding up some reactions (biodegradable materials).
14.1 Factors that affect Reaction Rates
1. Physical state of reactants (s, l, g, aq). Molecules must come in contact with each other in order to
react, therefore:
– The more homogeneous the mixture of reactants, the faster the molecules can react.
– Gases tend to react faster than liquids, which react faster than solids.
– For solids, however, surface area is important (powders react faster than chunks).
2. Reactant Concentrations. Generally, the larger the concentration of reactant molecules, the faster the
reaction will proceed (Why?). The likelihood that reactant molecules will collide increases.
3. Reaction Temperature. Higher T leads to higher kinetic energy, molecules move faster and collide
more often and with greater energy (i.e. more molecules have enough energy to react).
– chemist’s rule of thumb: ΔT = 10 °C → 2(rate)
4. The presence/concentration of a catalyst.
– Catalysts speed up reactions by changing the mechanism of the reaction.
– Catalysts are not consumed during the course of the reaction.
14.2 Reaction Rates
[ ]
( )
For the hypothetical reaction: A → B
‘A’ will decrease and ‘B’ will increase (every 1 A that reacts produces 1 B).
[ ]
[ ]
The rate of reaction is positive (+) by convention; however, the change of
reactants and products can be positive (+) or negative (–).
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The average rate over a certain time interval depends on the time interval chosen.
The instantaneous rate refers to the rate at a particular moment.
To determine the instantaneous rate from a graph of concentration vs time:
1. Draw a tangent to the curve at the desired time point.
2. Determine the slope of the tangent.
For a chemical reaction, the rate decreases as the time goes on (i.e. the slope gets less steep).
Reaction Rate Changes Over Time
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.
Problem 1 Using Figure 14.4, determine the instantaneous rate of disappearance of C4H9Cl at t = 300 s.
Relating rates
Rates of products and reactants can be related: N2O5(g) 2 NO2(g) + ½ O2(g)
As 1 mol N2O5(g) is consumed, 2 mol NO2(g) and ½ mol of O2(g) are formed.
So [NO2] changes twice as fast as [N2O5].
So rate [N2O5] = ½ rate [NO2].
[ ]
[ ]
[ ]
Reaction Rates and Stoichiometry
To generalize, then, for the reaction:
[ ]
[ ]
[ ]
[ ]
Instantaneous Rate Example
Using [H2], the instantaneous rate at 50 s is:
Using [HI], the instantaneous rate at 50 s is
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Problem 2 a. How is the rate at which ozone disappears related to the rate at which oxygen appears in the reaction?
2 O3(g) 3 O2(g)?
b. If the rate at which O2 appears, [O2]/t, is 6.0 10–5
M/s at a particular instant, what is the rate of change of
O3?
c. What is the overall rate at this instant?
Measuring the Reaction Rate
To measure the reaction rate we need to measure the concentration of at least one component (reactant or
product) in the mixture at many points in time.
- Continuous monitoring for reactions that take place in less than an hour.
- Sampling of the mixture at various times for reactions that happen in a long time.
Possible tests:
Measure the absorbance of visible or UV light, pH, electrical conductivity, and pressure of a gas.
14.3 Concentration and Rate Laws
We can gain information about the rate of a reaction by seeing how the rate changes with changes in
concentration.
The rate law of a reaction is the mathematical relationship between the rate of the reaction and the
concentrations of the reactants.
The rate law must be determined experimentally!! (There is no way to predict it!!)
For the reaction:
N2O5(g) 2 NO2(g) + ½ O2(g)
It was determined experimentally that when [N2O5] doubles, the reaction rate doubles. If [N2O5] triples, the rate
triples. If [N2O5] is halved, the rate is halved.
Therefore: rate α [N2O5].
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N2O5(g) 2 NO2(g) + ½ O2(g)
The rate law for this reaction: [ ].
Where is the rate constant, which depends on the reaction and on T. (It is determined by experiment.)
In general:
[ ] [ ] [ ]
are called the orders for each reactant (usually 0, 1, 2, but they can be fractions or negative).
Again: is called the rate constant.
The rate law must be determined experimentally, and it is not related to the balanced equation. For:
The rate law is:
[ ][ ][ ]
exponents ≠ coefficients
(except by coincidence)
2 NO(g) + O2(g) → 2 NO2(g)
The rate law for the reaction 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 (order of the reaction)
For:
[ ][ ][ ]
First order in [ ]
First order in [ ] Second order in [ ]
Fourth order overall (add all exponents).
For: ( ) ( ) ( ) [ ]
Zero order in NH3
Experimental determination of Rate Law: one method is the Method of Initial Rates.
Initial rate – rate at the very beginning of the reaction (≈1-2% complete. Convenient because: initial [ ] are
known, avoids complications with products and side reactions).
Approach: vary initial [reactants] and see how the rate is affected.
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( ) ( ) ( ) Exp. Initial [NO] Initial [O2] Initial rate M/sec
1 0.020 0.010 0.028
2 0.020 0.020 0.057
3 0.020 0.040 0.114
4 0.040 0.020 0.227
5 0.010 0.020 0.014
1st solve by inspection, then by brute force:
If we compare reactions 1 and 2, we notice that: Rate α [O2] so first order in O2.
Compare experiments 2 and 4 ([O2] constant). Rate is second order in [NO].
“Brute Force” Method (Math)
Take a ratio of the rate laws (larger/smaller):
[ ]
[ ]
[ ] [ ]
For reactions 1 and 2, [NO] is constant. k is also constant (it is the same reaction and the same T). So:
[ ]
[ ] (
[ ] [ ]
)
(
)
The rate law is first order in O2, as we previously found by inspection (you can skip the math, if it is simple!).
For reactions 2 and 4, [NO] doubles, but [O2] and k are constant. We have:
[ ]
[ ]
[ ] [ ]
[ ]
[ ] (
[ ] [ ]
)
[ ] [ ]
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Once the orders are known, we can use the results of any experiment to determine k. Using experiment 3:
[ ] [ ]
[ ] [ ]
(Check the units; they depend on the overall reaction order)
Q. For the reaction: 2 NO + 2 H2 → N2 + 2 H2O
[ ] [ ]
1. Orders?
2. If [NO] is doubled, what happens to the rate?
3. If [H2] is halved, what happens to the rate?
Q. Determine the rate law and the rate constant:
Exp. Initial [ ] Initial [ ] Initial rate M/sec
1 0.080 0.034 2.2×10-4
2 0.080 0.017 1.1×10-4
3 0.16 0.017 2.2×10-4
14.4 The Change of Concentration with Time
From the rate laws, we can obtain equations that relate concentrations of reactants or products to time.
- calculate concentrations after a certain amount of time
- how long it will take reach a certain concentration level
- obtain k
First Order Reactions
[ ]
[ ]
If we rearrange, integrate and evaluate both sides (calculus required here!):
[ ] [ ]
[ ] [ ]
Notes: we use the natural logarithm. Also, there is a concentrations ratio, just make sure the units of
concentration are the same and you’ll be fine (M, mol, m, g, mg, P, etc).
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Sucrose H+Glucose + FructoseQ.
rate = k[sucrose] ; k=0.21 hr-1
(first order)
If [Sucrose] initially = 0.010 M, what is [Sucrose] after 5.0 hr?
Q. For the same reaction. How long will it take for [Sucrose] to decrease to 20.0% of its initial value?
Q. For the same reaction. How long will it take for the reaction to be 95.0% complete?
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One more thing:
[ ] [ ]
[ ] [ ]
Second Order Reactions
[ ]
[ ]
After we rearrange and integrate:
[ ]
[ ]
Q. 2 HI → H2 + I2 [ ]
Calculate [HI] after 10. min if the original [HI] = 0.010 M
𝑙𝑛[𝐴]
𝒍𝒏[𝑨]
𝒕𝒊𝒎𝒆
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One more thing on Second Order Reactions:
[ ]
[ ]
[ ]
[ ]
Zero Order Reactions
[ ]
[ ] ( )
After we integrate:
[ ] [ ]
[ ] [ ]
A way to determine the rate law
Plot [A] vs t, if a line, rxn is zero order in A.
Plot ln[A] vs t, if a line, rxn is first order in A.
Plot 1/[A] vs t, if a line, rxn is second order in A.
Sample Exercise (p. 572)
The decomposition of NO2 at 300 °C is described by the equation
NO2 (g) → NO (g) + ½ O2 (g)
and yields data comparable to this table:
Is the reaction 1st or 2
nd order in NO2?
Time (s) [NO2], M
0.0 0.01000
50.0 0.00787
100.0 0.00649
200.0 0.00481
300.0 0.00380
[𝐴]
𝒕𝒊𝒎𝒆
[𝐴]
[𝑨]
𝒕𝒊𝒎𝒆
[ ]
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Half life (
)
It refers to the time it takes for the reactant concentration to decrease to half of its initial value.
For first order reactions:
[ ] [ ]
(
[ ] [ ]
)
(
)
( )
For first order reactions, t½ is independent of the initial [A].
The half-life expression for second order and zero order reactions are:
Second order Zero order
[ ]
[ ]
For a first order reaction:
Time (sec) [A] t½ left
0 2.0
100 1.0 1 1/2 left
200 0.50 2 1/4 left
300 0.25 3 1/8 left
400 0.125 4 1/16 left
Q. cyclopropane → propene is first order. . What is the half life? What fraction
of cyclopropane remains after 51.2 hr? What fraction remains after 18.0 hr?
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14.5 Temperature and Rate
Generally, as temperature increases, so does the reaction rate.
This is because k is temperature-dependent.
Rule of Thumb: rate doubles every ΔT=10°C.
The Collision Model
In a chemical reaction, bonds are broken and new bonds are formed. Molecules can only react if they collide
with each other.
Two requirements: molecules must collide with the correct orientation and with enough energy to cause bond
breakage and formation.
Lots of collisions are not contributing to the reaction due to incorrect orientation.
However, increasing the concentration of reactants leads to more frequent collisions and a faster reaction.
Activation Energy (Ea)
It is the minimum energy required for a reaction to occur (it varies). Higher Ea leads to a slower reaction.
Reaction Coordinate Diagrams
The diagram shows the energy of the reactants and products (and, therefore, E).
The energy gap between the reactants and the activated complex is the activation-energy barrier.
The transition state contains partial bonds.
Maxwell–Boltzmann Distributions
As the temperature increases, so does the fraction of molecules that can overcome the activation-energy barrier.
As a result, the reaction rate increases.
The fraction of molecules possessing enough energy can be found through the expression:
where R (8.314 J/mol•K) is the gas constant and T is the Kelvin temperature.
Arrhenius Equation
Changing the temperature changes the rate constant of the rate law. Svante Arrhenius investigated this
relationship and showed that:
where A is the frequency factor, a number that represents the likelihood that collisions would occur with the
proper orientation for reaction.
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The equation can be algebraically solved to give:
(
)
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.
Another form of the Equation (p. 579)
The two points form:
(
)
We can calculate at some if we know , the rate constant and some other temperature .
Q. Acetaldehyde CH3CHO → CH4 + CO
a. Find Ea. b. Find K at 865 K.
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14.6 Reaction Mechanisms
A chemical equation shows all the reactant and product molecules; however, the probability of more than 3
molecules colliding…
- at the same instant
- with the proper orientation
- and sufficient energy
is negligible.
Most reactions occur in a series of small reactions (elementary reactions or elementary processes) involving
1, 2, or at most 3 molecules.
The molecularity of a process tells how many molecules are involved in the process.
The sequence of steps that describes the actual process by which reactants become products is called the
reaction mechanism.
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)
Two bimolecular elementary steps (they cannot be broken down into simpler steps).
Intermediates
HI is made but then consumed (it does not show up in the overall reaction).
Materials that are products in an early mechanism step, but then reactants in a later step, are called
intermediates.
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.
For elementary reactions ONLY, the rate law can be written from the balanced equation:
H2(g) + ICl(g) HCl(g) + HI(g) Rate = k1[H2][ICl]
HI(g) + ICl(g) HCl(g) + I2(g) Rate = k2[HI][ICl]
H2(g) + 2 ICl(g) 2 HCl(g) + I2(g) Rate = ?
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Q. Write the rate laws for the following elementary steps. Overall reaction? Intermediate?
1. NO2 (g) + NO2 (g) → NO3 (g) + NO (g)
2. NO3 (g) + CO (g) → NO2 (g) + CO2 (g)
Keep in mind the following…
In general, we cannot predict rate laws from balanced equations because many reactions involve 2 or more
steps. The rate law for the overall rxn is some combination of the rate laws for the individual steps.
Mechanisms of Reaction are theories (i.e. we think them up. They can be disproven, but cannot be proved.)
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.
Rate Determining Step
In most mechanisms, one step occurs slower than the other steps (the formation of product cannot occur any
faster than the rate of this slowest step).
We call the slowest step in the mechanism the rate determining step (it has the largest activation energy)
The overall rate of reaction is usually equal to the rate of the slow step.
Rate Determining Step
1. NO2 (g) + NO2 (g) → NO3 (g) + NO (g) SLOW
2. NO3 (g) + CO (g) → NO2 (g) + CO2 (g) FAST
NO2 (g) + CO (g) → NO (g) + CO2 (g) (Overall) Rateobs = k[NO2]2
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+
N2O5 NO2 NO3
k1
k-1+1.
NO2 NO3+k2 NO NO2+ + O22.
3. NO3 NOk3 2 NO2
Fast, equilibrium
Slow
Fast
Mechanisms with a Fast Initial Step
[ ] Proposed mechanism:
[ ][ ]
Problems to solve:
a. the rate observed for the overall reaction and the slow step don’t match each other (wrong mechanism?).
b. The rate of the slow step includes [NO3], which is an intermediate (they are usually unstable and have low,
unknown concentrations).
[ ][ ]
At equilibrium, the rates of the forward and reverse reactions are equal:
[ ] [ ][ ]
[ ] [ ]
[ ]
[ ] [ ]
[ ]
[ ] [ ]
Q. 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
1. O3(g) O2(g) + O(g) Fast
2. O3(g) + O(g) 2 O2(g) Slow
14.7 Catalysts Catalysts increase the rate of a reaction by decreasing the activation energy of the reaction.
Catalysts change the mechanism by which the process occurs.
Note: ΔE doesn’t change. The catalyst speeds up both, the forward and the reverse reactions.
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Catalysts are consumed in an early mechanism step, then made in a later step; therefore, they do not appear in
the balanced equation.
mechanism without catalyst mechanism with catalyst
O3(g) + O(g) 2 O2(g) V. Slow Cl(g) + O3(g) O2(g) + ClO(g) Fast
ClO(g) + O(g) O2(g) + Cl(g) Slow
Heterogeneous catalysts (in a different phase than reactants) hold one reactant molecule in proper orientation
for reaction to occur when the collision takes place.
Homogeneous catalysts react with one of the reactant molecules to form a more stable activated complex with a
lower activation energy.
Heterogeneous Catalysts
Often composed of metals or metal oxides.
Hydrogenation is much faster in the presence of Pd, Pt or Ni.
H2 gets adsorbed on the surface of the metal.
Catalytic Converters (p. 592)
CO and HC’s to CO2 and H2O. And NOx’s to N2.
Enzymes
Enzyme: A protein or other molecule that acts as a catalyst for a biological reaction.
Substrate: Substance upon which the enzyme acts (the reactant).
Active site: The site on the enzyme where catalysis occurs. Very specific; its shape matches only a certain type
of molecule (Lock-and-Key model).
How do enzymes catalyze reactions?
Bring substrate(s) and catalytic sites together (proximity effect).
Hold substrate(s) at the exact distance and in the exact orientation necessary for reaction (orientation effect).
Provide acidic, basic, or other types of groups required for catalysis (catalytic effect).
Lower the energy barrier by inducing strain in bonds in the substrate molecule (energy effect).
Efficiency of Enzymes
Enzymes are much more efficient than other types of catalysts.
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