2. Reaction Rate
Change in concentration of a reactant or product per unit time.
[A] means concentration of A in mol/L; A is the reactant or product being considered.
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3. The Decomposition of Nitrogen Dioxide
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4. The Decomposition of Nitrogen Dioxide
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5. Instantaneous Rate Value of the rate at a particular time.
Can be obtained by computing the slope of a line tangent to the curve at that point.
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6. Types of Rate Laws
Differential Rate Law (rate law) – shows how the rate of a reaction depends on concentrations.
Integrated Rate Law – shows how the concentrations of species in the reaction depend on time.
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7. Rate Law
Shows how the rate depends on the concentrations of reactants.
For the decomposition of nitrogen dioxide:
2NO2(g) → 2NO(g) + O2(g)
Rate = k[NO2]n:
k = rate constant
n = order of the reactant
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8. Rate Law
Rate = k[NO2]n
The concentrations of the products do not appear in the rate law because the reaction rate is being studied under conditions where the reverse reaction does not contribute to the overall rate.
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9. Rate Law
Rate = k[NO2]n
The value of the exponent n must be determined by experiment; it cannot be written from the balanced equation.
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10. Rate Laws: A Summary
Because we typically consider reactions only under conditions where the reverse reaction is unimportant, our rate laws will involve only concentrations of reactants.
Because the differential and integrated rate laws for a given reaction are related in a well–defined way, the experimental determination of either of the rate laws is sufficient.
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11. Rate Laws: A Summary
Experimental convenience usually dictates which type of rate law is determined experimentally.
Knowing the rate law for a reaction is important mainly because we can usually infer the individual steps involved in the reaction from the specific form of the rate law.
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12. Determine experimentally the power to which each reactant concentration must be raised in the rate law.
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13. Method of Initial Rates
The value of the initial rate is determined for each experiment at the same value of t as close to t = 0 as possible.
Several experiments are carried out using different initial concentrations of each of the reactants, and the initial rate is determined for each run.
The results are then compared to see how the initial rate depends on the initial concentrations of each of the reactants.
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14. Overall Reaction Order
The sum of the exponents in the reaction rate equation.
Rate = k[A]n[B]m
Overall reaction order = n + m
k = rate constant
[A] = concentration of reactant A
[B] = concentration of reactant B
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15. CONCEPT CHECK!
How do exponents (orders) in rate laws compare to coefficients in balanced equations? Why?
The exponents do not have any relation to the coefficients (necessarily). The coefficients tell us the mole ratio of the overall reaction. They give us no clue to how the reaction works (its mechanism).
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16. Types of Rate Laws
Differential Rate Law (rate law) – shows how the rate of a reaction depends on concentrations.
Integrated Rate Law – shows how the concentrations of species in the reaction depend on time.
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17. First-Order Rate = k[A] Integrated: ln[A] = –kt + ln[A]o
[A] = concentration of A at time t
k = rate constant
t = time
[A]o = initial concentration of A
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18. Plot of ln[N2O5] vs Time
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19. k = rate constant First-Order
Time required for a reactant to reach half its original concentration
Half–Life:
k = rate constant
Half–life does not depend on the concentration of reactants.
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20. A first order reaction is 35% complete at the end of 55 minutes
A first order reaction is 35% complete at the end of 55 minutes. What is the value of k?
k = 7.8 × 10–3 min–1
ln(0.65) = –k(55) + ln(1)
k = 7.8 x 10-3 min-1. If students use [A] = 35 in the integrated rate law (instead of 65), they will get k = 1.9 x 10-2 min-1.
Note: Use the red box animation to assist in explaining how to solve the problem.
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21. Second-Order Rate = k[A]2 Integrated:
[A] = concentration of A at time t
k = rate constant
t = time
[A]o = initial concentration of A
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22. Plot of ln[C4H6] vs Time and Plot of 1/[C4H6] vs Time

23. Second-Order Half–Life: [A]o = initial concentration of A
k = rate constant
[A]o = initial concentration of A
Half–life gets longer as the reaction progresses and the concentration of reactants decrease.
Each successive half–life is double the preceding one.
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24. EXERCISE!
For a reaction aA  Products, [A]0 = 5.0 M, and the first two half-lives are 25 and 50 minutes, respectively.
Write the rate law for this reaction.
rate = k[A]2
b) Calculate k.
k = 8.0 × 10-3 M–1min–1
Calculate [A] at t = 525 minutes.
[A] = 0.23 M
a) rate = k[A]2
We know this is second order because the second half–life is double the preceding one.
b) k = 8.0 x 10-3 M–1min–1
25 min = 1 / k(5.0 M)
c) [A] = 0.23 M
(1 / [A]) = (8.0 x 10-3 M–1min–1)(525 min) + (1 / 5.0 M)
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25. Zero-Order Rate = k[A]0 = k Integrated: [A] = –kt + [A]o
[A] = concentration of A at time t
k = rate constant
t = time
[A]o = initial concentration of A
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26. Plot of [A] vs Time
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27. Zero-Order Half–Life: k = rate constant
[A]o = initial concentration of A
Half–life gets shorter as the reaction progresses and the concentration of reactants decrease.
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28. CONCEPT CHECK!
How can you tell the difference among 0th, 1st, and 2nd order rate laws from their graphs?
For the zero-order reaction, the graph of concentration versus time is a straight line with a negative slope. For a first-order graph, the graph is a natural log function. The second-order graph looks similar to the first-order, but with a greater initial slope. Students should be able to write a conceptual explanation of how the half-life is dependent on concentration (or in the case of first-order reactions, not dependent).
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29. Rate Laws To play movie you must be in Slide Show Mode
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30. Summary of the Rate Laws
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31. Zero order First order Second order 4.7 M 3.7 M 2.0 M EXERCISE!
Consider the reaction aA  Products. [A]0 = 5.0 M and k = 1.0 × 10–2 (assume the units are appropriate for each case). Calculate [A] after 30.0 seconds have passed, assuming the reaction is:
Zero order
First order
Second order
4.7 M
3.7 M
2.0 M
a) 4.7 M
[A] = –(1.0×10–2)(30.0) + 5.0
b) 3.7 M
ln[A] = –(1.0×10–2)(30.0) + ln(5.0)
c) 2.0 M
(1 / [A]) = (1.0×10–2)(30.0) + (1 / 5.0)
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32. Reaction Mechanism
Most chemical reactions occur by a series of elementary steps.
An intermediate is formed in one step and used up in a subsequent step and thus is never seen as a product in the overall balanced reaction.
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33. The intermediate funnel decides the rate
The rate at which this colored solution enters the flask is determined by the size of the funnel stem, not how fast the solution is poured.
p575

34. Table 12-7 p575

35. NO2(g) + CO(g) → NO(g) + CO2(g)
A Molecular Representation of the Elementary Steps in the Reaction of NO2 and CO
NO2(g) + CO(g) → NO(g) + CO2(g)
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36. Elementary Steps (Molecularity)
Unimolecular – reaction involving one molecule; first order.
Bimolecular – reaction involving the collision of two species; second order.
Termolecular – reaction involving the collision of three species; third order. Very rare.
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37. Rate-Determining Step
A reaction is only as fast as its slowest step.
The rate-determining step (slowest step) determines the rate law and the molecularity of the overall reaction.
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38. Reaction Mechanism Requirements
The sum of the elementary steps must give the overall balanced equation for the reaction.
The mechanism must agree with the experimentally determined rate law.
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39. Decomposition of N2O5 To play movie you must be in Slide Show Mode
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40. Collision Model Molecules must collide to react. Main Factors:
Activation energy, Ea
Temperature
Molecular orientations
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41. Activation Energy, Ea
Energy that must be overcome to produce a chemical reaction.
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42. Transition States and Activation Energy
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43. Change in Potential Energy
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44. Figure | Plot showing the number of collisions with a particular energy at T1 and T2, where T2 . T1.
Figure p579

45. For Reactants to Form Products
Collision must involve enough energy to produce the reaction (must equal or exceed the activation energy).
Relative orientation of the reactants must allow formation of any new bonds necessary to produce products.
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46. The Gas Phase Reaction of NO and Cl2
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47. Arrhenius Equation
A = frequency factor Ea = activation energy R = gas constant ( J/K·mol) T = temperature (in K)
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48. Linear Form of Arrhenius Equation
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49. Linear Form of Arrhenius Equation
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50. Catalyst
A substance that speeds up a reaction without being consumed itself.
Provides a new pathway for the reaction with a lower activation energy.
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51. Energy Plots for a Catalyzed and an Uncatalyzed Pathway for a Given Reaction
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52. Effect of a Catalyst on the Number of Reaction-Producing Collisions
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53. Heterogeneous Catalyst
Most often involves gaseous reactants being adsorbed on the surface of a solid catalyst.
Adsorption – collection of one substance on the surface of another substance.
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54. Figure | Heterogeneous catalysis of the hydrogenation of ethylene. (a) The reactants above the metal surface. (b) Hydrogen is adsorbed onto the metal surface, forming metal–hydrogen bonds and breaking the H−H bonds. The p bond in ethylene is broken and metal–hydrogen bonds are formed during adsorption. (c) The adsorbed molecules and atoms migrate toward each other on the metal surface, forming new C−H bonds. (d) The C atoms in ethane (C2H6) have completely saturated bonding capacities and so cannot bind strongly to the metal surfaces. The C2H6 molecule thus escapes.
Figure p584

55. Heterogeneous Catalyst
Adsorption and activation of the reactants.
Migration of the adsorbed reactants on the surface.
Reaction of the adsorbed substances.
Escape, or desorption, of the products.
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56. Figure | The exhaust gases (HC, hydrocarbons; NOx, nitrous oxides; and CO) from an automobile engine are passed through a catalytic converter to minimize environmental damage.
Figure p585

57. Homogeneous Catalyst
Exists in the same phase as the reacting molecules.
Enzymes are nature’s catalysts.
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58. Some body enzymes
Amylase: This enzyme helps in breaking down carbohydrates. It is found in saliva, pancreas and intestinal juices. Proteases: It helps in digestion of proteins. It is present in the stomach, pancreatic and intestinal juices. Lipases: Lipases assist in digestion of fats. It is seen in the stomach, pancreatic juice and food fats.

59. Homogeneous Catalysis
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