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Chain reactions Chain reactions: a reaction intermediate produced in one step generates an intermediate in a subsequent step, then that intermediate generates.

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Presentation on theme: "Chain reactions Chain reactions: a reaction intermediate produced in one step generates an intermediate in a subsequent step, then that intermediate generates."— Presentation transcript:

1 Chain reactions Chain reactions: a reaction intermediate produced in one step generates an intermediate in a subsequent step, then that intermediate generates another intermediate, and so on. Chain carriers: theintermediates in a chain reaction. It could be radicals (species with unpaired electrons), ions, etc. Initiation step: Propagation steps: Termination steps:

2 23.1 The rate laws of chain reactions
Consider the thermal decomposition of acetaldehyde CH3CHO(g) → CH4(g) + CO(g) v = k[CH3CHO]3/2 it indeed goes through the following steps: 1. Initiation: CH3CHO → . CH CHO v = ki[CH3CHO] 2. Propagation: CH3CHO + . CH3 → CH4 + CH3CO kp Propagation: CH3CO. → .CH CO k’p 3. Termination: .CH CH3 → CH3CH3 kt The net rates of change of the intermediates are:

3 Applying the steady state approximation:
Sum of the above two equations equals: thus the steady state concentration of [.CH3] is: The rate of formation of CH4 can now be expressed as the above result is in agreement with the three-halves order observed experimentally.

4 Example: The hydrogen-bromine reaction has a complicated rate law rather than the second order reaction as anticipated. H2(g) + Br2(g) → 2HBr(g) Yield The following mechanism has been proposed to account for the above rate law. 1. Initiation: Br M → Br Br. + M ki 2. Propagation: Br H2 → HBr + H kp1 H Br2 → HBr Br kp2 3. Retardation: H HBr → H Br kr 4. Termination: Br Br. + M → Br M* kt derive the rate law based on the above mechanism.

5 The net rates of formation of the two intermediates are
The steady-state concentrations of the above two intermediates can be obtained by solving the following two equations: substitute the above results to the rate law of [HBr]

6 Effects of HBr, H2, and Br2 on the reaction rate based on the equation
continued The above results has the same form as the empirical rate law, and the two empirical rate constants can be identified as Effects of HBr, H2, and Br2 on the reaction rate based on the equation

7 Self-test 23.1 Deduce the rate law for the production of HBr when the initiation step is the photolysis, or light-induced decomposition, of Br2 into two bromine atoms, Br.. Let the photolysis rate be v = Iabs, where Iabs is the intensity of absorbed radiation. Hint: the initiation rate of Br. ?

8 Exercises 23.1b: On the basis of the following proposed mechanism, account for the experimental fact that the rate law for the decomposition 2N2O5(g) → 4NO2(g) + O2(g) is v = k[N2O5]. N2O5 ↔ NO2 + NO k1, k1’ NO NO3 → NO2 + O2 + NO k2 NO + N2O5 → NO2 + NO2 + NO2 k3

9 Explosions Thermal explosion: a very rapid reaction arising from a rapid increase of reaction rate with increasing temperature. Chain-branching explosion: occurs when the number of chain centres grows exponentially. An example of both types of explosion is the following reaction 2H2(g) O2(g) → 2H2O(g) 1. Initiation: H2 → H H. 2. Propagation H OH → H H2O kp 3. Branching: O H → O OH kb1 O H2 → .OH H Kb2 4. Termination H. + Wall → ½ H2 kt1 H. + O M → HO M* kt2

10 The explosion limits of the H2 + O2 reaction

11 Analyzing the reaction of hydrogen and oxygen (see preceding slide), show that an explosion occurs when the rate of chain branching exceeds that of chain termination. Method: 1. Set up the corresponding rate laws for the reaction intermediate and then apply the steady-state approximation. 2. Identify the rapid increase in the concentration of H. atoms. Applying the steady-state approximation to .OH and O gives

12 Therefore, we write kbranch = 2kb1[O2] and kterm = kt1 + kt2[O2][M], then At low O2 concentrations, termination dominates branching, so kterm > kbranch. Then this solution corresponds to steady combustion of hydrogen. At high O2 concentrations, branching dominates termination, kbranch > kterm. Then This is an explosive increase in the concentration of radicals!!!

13 Self-test 23.2 Calculate the variation in radical composition when rates of branching and termination are equal. Solution: kbranch = 2kb1[O2] and kterm = kt1 + kt2[O2][M], The integrated solution is [H.] = vinit t

14 Polymerization kinetics
Stepwise polymerization: any two monomers present in the reaction mixture can link together at any time. The growth of the polymer is not confined to chains that are already formed. Chain polymerization: an activated monomer attacks another monomer, links to it, then that unit attacks another monomer, and so on.

15 23.3 Stepwise polymerization
Commonly proceeds through a condensation reaction, in which a small molecule is eliminated in each step. The formation of nylon-66 H2N(CH2)6NH2 + HOOC(CH2)4COOH → H2N(CH2)6NHOC(CH2)4COOH HO-M-COOH + HO-M-COOH → HO-M-COO-M-COOH Because the condensation reaction can occur between molecules containing any number of monomer units, chains of many different lengths can grow in the reaction mixture.

16 Stepwise polymerization
The rate law can be expressed as Assuming that the rate constant k is independent of the chain length, then k remains constant throughout the reaction. The degree of polymerization: The average number of monomers per polymer molecule, <n>


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