Free Radical Reactions

By James Ashenhurst

Selectivity in Free Radical Reactions: Bromination vs. Chlorination

Last updated: December 7th, 2022 |

The Selectivity of Free-Radical Bromination vs Chlorination. A Detailed Answer

In last blog post on radicals we saw this data that compares the chlorination of propane vs. the bromination of propane.

For chlorination, the  reaction is selective for secondary C-H over primary C-H by a factor of 55/(45/3) = 3.6 to 1


selectivity-for-free-radical-chlorination-statistical-versus-actual-yields-of-2-chloropropane-versus-1-chloropropane
For bromination, the reaction is selective for secondary C-H over primary C-H by a factor of 97/(3/3) = 97 to 1.

selectivity-in-free-radical-bromination-for-tertiary-bromination-statistical-would-give-25-per-cent-bromination-but-in-fact-97-per-cent-of-product-is-tertiary-bromine-versus-chlorine

Wow!!! Is bromination ridiculously more selective than chlorination, or what?? (Again, if you want to know how this was calculated, go back to the last post.)

Today we’re going to try to answer, “why is bromine more selective than chlorine” ?  You might think that going from 4:1 to 97:1 will involve a huge difference in energies. But as we’ll see, it’s more subtle than you might expect. A few kcal/mol can make a huge difference!

Table of Contents

  1. The Selectivity-Generating Step Is Breakage Of The C–H Bond By A Halogen Radical  (Propagation Step #1)
  2. Background: Activation Energy And The Arrhenius Equation (Yes, This Is Relevant)
  3. Heat Increases The Average Velocity (And Energy) Of Molecules
  4. As A Reaction Mixture Is Heated, A Larger Proportion Of Molecules Will Have Sufficient Activation Energy (Ea) To React
  5. Selectivity Is Proportional To Differences In Activation Energy For The Key Step
  6. Small Differences In Activation Energies (~ 3 kcal/mol) Can Mean LARGE Differences In Selectivity (97:1)
  7. So WHY Is The Difference For Activation Energies Greater  For Bromination Than For Chlorination? 
  8. The Transition  State For Chlorination Resembles The Reactants (An “Early” Transition State) Which Are Close Together In Energy. So Selectivity Is Low.
  9. The Transition  State For Bromination Resembles The Products (A “Late” Transition State) Which Are Farther Apart In Energy. So Selectivity Is High. 
  10. Summary: Selectivity For Free-Radical Chlorination  vs Bromination
  11. Notes
  12. (Advanced) References and Further Reading

1. The Selectivity-Generating Step Is Breakage Of The C–H Bond By A Halogen Radical  (Propagation Step #1)

The question that this post hopes to answer is  “Why is bromine more “selective” for the secondary carbon than chlorine?”. 

It’s kind of a long answer. This post goes through the data and makes the scientific argument. In the next post I’ll put forward a simple analogy that simplifies this idea for many students.

The first thing to note is formation of the different chloropropanes happens during the chain propagation step (that is, after initiation). So for our purposes here we are only going to analyze the two propagation steps and assume that initiation has already occurred.  In other words, this step:

in-free-radical-halogenation-selectivity-determinine-step-is-breakage-of-c-h-bond-by-halogen-radical-primary-versus-secondary

2. Background: Activation Energy And The Arrhenius Equation (Yes, This Is Relevant)

Before addressing the topic of selectivity directly, let’s first begin by talking about activation energy. You might recall that in order for a reaction to occur, the reactants must come into contact with each other with sufficient energy to overcome the repulsions between them (electron clouds). They also must collide in such a way that allows for transfer of electrons (aka “orbital overlap”)

In other words, the rate is equal to:

[concentration of molecules with sufficient energy] *[probability they collide in the “right way”]

This is dealt with by the Arrhenius equation:

arrhenius-equation-has-rate-constant-pre-exponential-factor-activation-energy-gas-constant-temperature

Here, the “probability they collide in the right way” is dealt with by the pre-exponential factor A and is unique for each reaction.  The exponential factor e-Ea/RT is what’s known as the “distribution function” and this is how we calculate the % of molecules in solution that have sufficient energy to react (heretofore known as the “activation energy”. )

3. Heat Increases The Average Velocity (And Energy) Of Molecules

Note the fact that this is temperature dependent. Why might that be? Well, as a collection of molecules is heated, the average speed of those molecules will increase. This is described by a related function known as the Boltzmann distribution, shown right here at three different temperatures [a=1, a=2, and a=5]. The y-axis shows the # of molecules (“distribution”) and the x-axis shows energy  [thank you Wikipedia]

Heat Increases The Average Velocity Of Molecules

boltzmann-distribution-from-wikipedia-at-different-temperatures

This shows the “distribution” (aka “number”) of molecules at specific energies. The hump in the middle is the “most probable” energy, and notice how it resembles a bell curve with tails at both ends. At the far right of the scale are the most energetic molecules. Note what happens when temperature is increased: on average, molecules have greater energy, and also the right-hand “tail” extends further out.

4. As A Reaction Mixture Is Heated, A Larger Proportion Of Molecules Will Have Sufficient Activation Energy (Ea) To React

Now imagine we have a reaction with activation energy Ea. At very cold temperatures, very few molecules have sufficient energy to react. But as the reaction mixture is heated, the proportion of those molecules increases. Ergo, the rate of the reaction increases with heat. Here is an example of how it works. Note how in this case below, the reaction doesn’t occur at 300K, but starts to occur at a reasonable rate at 330K!

as-reaction-mixture-is-heated-larger-proportion-of-molecules-have-sufficient-energy-activation-energy-to-react-300-k-versus-330-k

Okay, that covers changing the reaction temperature. But what does this have to do with the selectivity of halogenation? 

5. Selectivity For Bromination vs Chlorination Is Proportional To Differences In Activation Energy For The Key Step

Here, we’re keeping reaction temperature constant, but the activation energy for each reaction is slightly different.

We have four reactions in total to think about (two different halogens and two different C-H bonds).  The activation energy for each reaction has been experimentally measured [Ref 2] (and here, we’re talking about the activation of C-H bond breaking [i.e. propagation] not initiation.  Here’s what they look like.

approximate-activation-energies-for-first-propagation-step-of-radical-halogenation-about-3kcal-mol-for-chlorination-and-13-kcal-mol-for-bromination

This is actually all the information we need to be able to make a rough estimate of selectivities.
For a reaction at 300K,  we can calculate RT using the gas constant (1.987 cal/ K mol) and plug in the activation energy for each reaction. By dividing the two equations by each other, the pre-exponential factor A will roughly cancel out and we can obtain estimates for selectivities.
The bottom line here is that due to the nature of the Arrhenius equation, the greater the difference between activation energies, the larger the selectivity. The effects can be dramatic, even when going from a difference of 1kcal/mol (for chlorination) to 3 kcal/mol (for bromination of primary vs. secondary)

6. Small Differences In Activation Energies (~ 3 kcal/mol) Can Mean LARGE Differences In Selectivity (97:1)

Just a bit of math using the Arrhenius equation, a rough calculation of selectivities based on differences  in activation energy.

free-radical-halogenation-small-difference-in-activation-energy-gives-huge-difference-in-selectivity

All this is fine – it’s based on experimental data for activation energies. But it just opens up another question.

WHY is the difference for activation energies greater for bromination (3 kcal/mol) than for chlorination (1 kcal/mol). Great question!

7. So WHY Is The Difference For Activation Energies Greater  For Bromination Than For Chlorination?

Understanding this point begins with understanding the energy profile of these two different reactions (chlorination and bromination).

We’ll do the math in a second, but the key difference is that in chlorination, the key propagation step is exothermic and in bromination, the key propagation step is endothermic. This is because chlorination forms a strong H-Cl bond (103 kcal/mol) and bromination forms a much weaker H-Br bond (87 kcal/mol).

The two reaction coordinates roughly look like this:

reaction-coordinate-for-chlorination-versus-reaction-coordinate-for-bromination-early-versus-late-transition-states

Look closely where the transition state is for each reaction.
In chlorination, the reaction is exothermic, and the transition state resembles the reactants. According to Hammond’s postulate, we could say that this transition state is “early”.
In bromination, the reaction is endothermic, and the transition state resembles the products. According to Hammond’s postulate we say that this transition state is “late”.

8. The Transition  State For Chlorination Resembles The Reactants (An “Early” Transition State) Which Are Close Together In Energy. So Selectivity Is Low.

What this means is that for chlorination, the difference in activation energies between the two radical pathways (i.e. “secondary” and “primary”) will most closely resemble the reactants (which are identical in energy). So there will be a very small difference in activation energies between the two.

reaction-coordinate-for-free-radical-chlorination-shows-early-transition-state-small-difference-in-activation-energy

 

The difference in activation energies is small (1 kcal/mol) because of the early transition state. Note that even though there is a fairly large difference in energy between the products (3kcal/mol) it doesn’t affect the activation energies.

9. The Transition  State For Bromination Resembles The Products (A “Late” Transition State) Which Are Farther Apart In Energy. So Selectivity Is High.

We can do the same analysis for bromination. Here, it’s a “late” transition state, so the difference in activation energies between primary and secondary will closely resemble the differences in energy between the two. So we would expect the activation energy difference to more closely resemble the difference between the energies of the products. And that is the case!

reaction-coordinate-for-free-radical-bromination-shows-late-transition-state-2-point-5-kcal-mol-different-gives-larger-difference-in-products

So the bottom line for today’s post is a few things:

10. Summary: Selectivity For Free-Radical Chlorination  vs Bromination

1) going from an activation energy difference of 1kcal/mol to about 3 kcal/mol can mean the difference between a reaction with a selectivity of 3.5:1 and a reaction with a selectivity of 97:1. Wow!!

2) We compared a reaction with an “early” transition state and a “late” transition state and saw that the reaction with the “late” transition state was more selective. This is to be expected when we’re starting with identical reactants and there are significant differences in the energies of the products.

In the next post I’ll use a simple analogy to drive home the point in a way that has helped students to understand this point on a more intuitive level.

Next Post: Halogenation At Tiffany’s


Notes

Note 1.  Calculations for the energies of each reaction. Chlorination:

F1-calculation-for-energies-of-chlorination-of-primary-and-secondary-positions-of-propane

Bromination:

F2-calculations-for-bromination-of-primary-and-secondary-positions-of-propane


(Advanced) References and Further Reading

  1. The interaction of free radicals with saturated aliphatic compounds
    J. M. Tedder
    Q. Rev. Chem. Soc., 1960, 14, 336-356
    DOI: 10.1039/QR9601400336
    This review, though dated, contains a wealth of useful information, including the derivation of the activation energy of free-radical aliphatic bromination (13.3 kcal/mol), and the proposal that NBS can brominate alkanes by providing a steady low concentration of Br2.
  2. Competitive chlorination reactions in the gas phase: hydrogen and C1—C5 saturated hydrocarbons
    John H. Knox and Robert L. Nelson
    Faraday Soc., 1959, 55, 937-946
    DOI:
    10.1039/TF9595500937
    This paper is concerned with the free-radical chlorination of C1-C5 alkanes, and is a detailed kinetic analysis of the chlorination reaction using the Arrhenius equation. The experimentally determined activation energies are all rather low, on the order of 0.02-4.1 kcal/mol.
  3. Substitutions at Saturated Carbon-Hydrogen Bonds Utilizing Molecular Bromine or Bromotrichloromethane
    Glen A. Russell and Charles DeBoer
    Journal of the American Chemical Society 1963, 85 (20), 3136-3139
    DOI:
    1021/ja00903a019
    This paper studies benzylic bromination via a free-radical mechanism. As expected, reaction rates increase with increasing substitution at the benzylic position, but this paper provides experimental evidence for that.
  4. Directive Effects in Aliphatic Substitutions. XIX. Photobromination with N-Bromosuccinimide
    Glen A. Russell and Kathleen M. Desmond
    Journal of the American Chemical Society 1963, 85 (20), 3139-3141
    DOI:
    1021/ja00903a020
    This paper immediately follows Ref. 3 in the same issue of JACS, and provides evidence that NBS can also brominate via a free-radical mechanism (i.e. the Wohl-Ziegler reaction).
  5. Solvent Effects in the Reactions of Free Radicals and Atoms. VIII. The Photochlorination of Aralkyl Hydrocarbons
    Glen A. Russell, Akihiko. Ito, and Dale G. Hendry
    Journal of the American Chemical Society 1963, 85 (19), 2976-2983
    DOI:
    1021/ja00902a022
    Significant solvent effects are observed in the free-radical photochlorination of benzylic compounds. Complexation by solvent can significantly attenuate the reactivity of the chlorine radical, making it react more selectively.
  6. Reactions of radicals. 42. Hydrogen abstraction by the p-nitrophenyl radical
    A. Pryor, K. Smith, J. T. Echols, and D. L. Fuller
    The Journal of Organic Chemistry 1972, 37 (11), 1753-1758
    DOI:
    10.1021/jo00976a019
    Besides bromine and chlorine, other radicals can be generated and used in free-radical reactions. Organic radicals can also be used, and in this case, the phenyl and p-nitrophenyl radicals can be generated from decomposition of the respective azo precursors. The p-nitrophenyl radical is observed to be more selective than the phenyl radical in free-radical substitution reactions.
  7. Inertia and driving force of chemical reactions
    M. G. Evans and M. Polanyi
    Trans. Faraday Soc., 1938, 34, 11-24
    DOI:
    10.1039/TF9383400011
    This is a very important paper, introducing what is now known as the Bell-Evans-Polanyi principle. This observes that the difference in activation energy between two reactions of the same family is proportional to the difference of their enthalpy of reaction, thus allowing comparisons of similar reactions. Interestingly, while Michael Polanyi (this paper), was elected to the Royal Society, he did not receive a Nobel Prize, but his son, J. C. Polanyi, received the Nobel Prize in Chemistry in 1986 for his work in chemical physics.
  8. A Correlation of Reaction Rates
    George S. Hammond
    Journal of the American Chemical Society 1955, 77 (2), 334-338
    DOI:
    1021/ja01607a027
    Hammond’s Postulate is commonly taught to chemistry undergraduates worldwide and is a common mental tool which is also employed by experienced scientists. Exergonic reactions will have ‘early’ transition states resembling the starting materials, while endergonic reactions will have ‘late’ transition states resembling the products.

Comments

Comment section

16 thoughts on “Selectivity in Free Radical Reactions: Bromination vs. Chlorination

  1. Reply to Stefan,

    I was wondering the same thing… my guess is this is what James was referring to in the notes of a prior post, “Bond Strength and Radical Stability” where he writes:

    “the general trends in this post are valid because we discuss bonds to H, but use caution when comparing any other type of bond other than hydrogen…. Using the bond strengths (BDE’s) of unstrained bonds to hydrogen is a reasonable method for discerning trends in radical stabilities, as discussed in this post. However, BDE’s in and of themselves are not reliable for discerning absolute radical stabilities in cases where the bond may be weakened by strain, repulsion between lone pairs, or other factors. For example the BDE for hydrogen peroxide is 51 kcal/mol, which does NOT imply that the HO• radical is stable, but rather that the O–O bond is destabilized by repulsion between the lone pairs.”

    Now when I look at the BDE table in Wade’s Organic Chemistry the only cases I find where tertiary BDE are significantly lower than primary BDE was in breaking of C-H or C-C bonds. There was little BDE difference between tertiary and primary halides (C-F, C-Cl, C-Br, C-I) or C-O bonds.

    Since breaking of the C-X halide bond still produces a C* radical (and the halide is now gone), that C* radical ITSELF must be more stable if it is tertiary rather than primary. To me, that suggests the only way BDE can be equal (for tertiary and primary C-X halides) is if the tertiary C-X halide bond is more stable than a primary C-X halide bond. But why would that be?

    My guess (only a guess): the CH3- groups are electron donating and the halide is electron withdrawing, so perhaps that stabilizes the C-X halide bond in tertiary carbons (halides like electrons!) and make the halide more loathe to leave as a radical (where it only takes a single electron from the bond) … but I’m not a chem-major… so it would be good if James weighed in…

    So what says you James?!?

    Thanks!

  2. Leroy wade said in a write-up for hammonds Postulate –
    “The transition state is always the point of highest energy on the energy diagram.
    Its structure resembles either the reactants or the products, whichever ones are
    higher in energy. In an endothermic reaction, the products are higher in energy, and the
    transition state is product-like. In an exothermic reaction, the reactants are higher in energy, and the transition state is reactant-like. Thus, the Hammond postulate helps us understand why exothermic processes tend to be less selective than similar endothermic processes.”
    How is the last line obvious in light of understanding Selectivities ofChlorination vs Bromination in light of Hammonds Postulate?

  3. Hello,
    Just pointing out R=1.987 cal/ K mol (not kilo) written at the “Calculating the selectivities based on differences in activation energy” image and the paragraph above it.
    Also, could you please explain “[…] in chlorination, the key propagation step is exothermic and in bromination, the key propagation step is endothermic.”
    What makes the first propagation step the “key” step? Why not look at the net energy difference for both as you did in the image at the bottom?

    1. The first propagation step is the key step because it results in formation of a radical at the alkane – this is the slow step (breakage of C-H). The second step is fast because a considerably weaker bond is being broken (Cl-Cl) .

  4. Very well explained topic! There’s only one thing I don’t get (although it’s not important for the regioselective step):

    Why is the formation of the bond between the halogen and carbon energetically identical for the primary and secondary carbons? (83 kcal/mol in case of Cl, 70 kcal/mol in case of Br?) I would assume that there’s also a slight difference? Unfortunately I couldn’t find any thermodynamical data.

    I would appreciate your short answer.

    1. Ohhh my my my !!!! Hats off to you…..I am speechless…..its too detailed and lucid to understand.

  5. This is awesome from a physical organic chemistry perspective. How on earth are you not a professor at some school. You actually know your chemistry. I wish you were a professor at my school. This is a great write-up!

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