A sextuple bond is a type of covalent bond involving 12 bonding electrons and in which the bond order is 6. The only known molecules with true sextuple bonds are the diatomic dimolybdenum (Mo2) and ditungsten (W2), which exist in the gaseous phase and have boiling points of 4,639 °C (8,382 °F) and 5,930 °C (10,710 °F) respectively.

MO diagram of dimolybdenum

Theoretical analysis

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Roos et al argue that no stable element can form bonds of higher order than a sextuple bond, because the latter corresponds to a hybrid of the s orbital and all five d orbitals, and f orbitals contract too close to the nucleus to bond in the lanthan­ides.[1] Indeed, quantum mechanical calculations have revealed that the di­molybdenum bond is formed by a combination of two σ bonds, two π bonds and two δ bonds. (Also, the σ and π bonds contribute much more significantly to the sextuple bond than the δ bonds.)[2]

Although no φ bonding has been reported for transition metal dimers, it is predicted that if any sextuply-bonded actinides were to exist, at least one of the bonds would likely be a φ bond as in quintuply-bonded diuranium and di­neptunium.[3] No sextuple bond has been observed in lanthanides or actinides.[1]

For the majority of elements, even the possibility of a sextuple bond is foreclosed, because the d electrons ferromagnetically couple, instead of bonding. The only known exceptions are dimolybdenum and ditungsten.[1]

Quantum-mechanical treatment

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The formal bond order (FBO) of a molecule is half the number of bonding electrons surplus to antibonding electrons; for a typical molecule, it attains exclusively integer values. A full quantum treatment requires a more nuanced picture, in which electrons may exist in a superposition, contributing fractionally to both bonding and antibonding orbitals. In a formal sextuple bond, there would be P = 6 different electron pairs; an effective sextuple bond would then have all six contributing almost entirely to bonding orbitals.

Molecule FBO EBO[1]
Cr2 6 3.5
[PhCrCrPh] 5 3.5
Cr2(O2CCH3)4 4 2.0
Mo2 6 5.2
W2 6 5.2
Ac2 3 1.7
Th2 4 3.7
Pa2 5 4.5
U2 6 3.8[4]
[PhUUPh] 5 3.7
[Re2Cl8]2- 4 3.2

In Roos et al's calculations, the effective bond order (EBO) could be determined by the formula  where ηb is the proportion of formal bonding orbital occupation for an electron pair p, ηab is the proportion of the formal antibonding orbital occupation, and c is a correction factor account­ing for deviations from equilibrium geometry.[1] Several metal-metal bonds' EBOs are given in the table at right, compared to their formal bond orders.

Dimolybdenum and ditungsten are the only mole­cules with effective bond orders above 5, with a quintuple bond and a partially formed sixth covalent bond. Dichromium, while formally described as having a sextuple bond, is best described as a pair of chromium atoms with all electron spins exchange-coupled to each other.[5]

While diuranium is also formally described as having a sextuple bond, relativistic quantum mechanical calculations have determined it to be a quadruple bond with four electrons ferro­magnetically coupled to each other rather than in two formal bonds.[4] Previous calcu­lations on diuranium did not treat the electronic molecular Hamiltonian relativistically and produced higher bond orders of 4.2 with two ferromagnetically coupled electrons.[6]

Known instances: dimolybdenum and ditungsten

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Laser evaporation of a molybdenum sheet at low temperatures (7 K) produces gaseous dimolybdenum (Mo2). The resulting molecules can then be imaged with, for instance, near-infrared spectroscopy or UV spectroscopy.[7]

Both ditungsten and dimolybdenum have very short bond lengths compared to neighboring metal dimers.[1] For example, sextuply-bonded dimolybdenum has an equilibrium bond length of 1.93 Å. This equi­librium internuclear distance is signi­ficantly lower than in the dimer of any neighboring 4d transition metal, and sug­gestive of higher bond orders.[8][9][10] However, the bond dissociation energies of ditungsten and dimolybdenum are rather low, because the short internuclear distance introduces geometric strain.[1][11]

Dimer Force constant (Å)[10] EBO[10]
Cu2 1.13 1.00
Ag2 1.18 1.00
Au2 2.12 1.00
Zn2 0.01 0.01
Cd2 0.02 0.02
Hg2 0.02 0.02
Mn2 0.09 0.07
Mo2 6.33 5.38

One empirical technique to determine bond order is spectroscopic exami­nation of bond force constants. Linus Pauling investigated the relationships between bonding atoms[12] and developed a formula that predicts that bond order is roughly[13] proportional to the force constant; that is,   where n is the bond order, ke is the force constant of the interatomic inter­action and ke(1) is the force constant of a single bond between the atoms.[14]

The table at right shows some select force constants for metal-metal dimers com­pared to their EBOs; consistent with a sextuple bond, molybdenum's summed force constant is substantially more than quintuple the single-bond force constant.

Like dichromium, dimolybdenum and ditungsten are expected to exhibit a 1Σg+ singlet ground state.[15][16] However, in tungsten, this ground state arises from a hybrid of either two 5D0 ground states or two 7S3 excited states. Only the latter corresponds to the formation of a stable, sextuply-bonded ditungsten dimer.[8]

Ligand effects

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Although sextuple bonding in homodimers is rare, it remains a possibility in larger molecules.

Aromatics

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Theoretical computations suggest that bent dimetallocenes have a higher bond order than their linear counterparts.[17] For this reason, the Schaefer lab has investi­gated dimetallocenes for natural sextuple bonds. However, such com­pounds tend to exhibit Jahn-Teller distortion, rather than a true sextuple bond.

For example, dirhenocene is bent. Calculating its frontier molecular orbitals sug­gests the existence of relatively stable singlet and triplet states, with a sextuple bond in the singlet state. But that state is the excited one; the triplet ground state should exhibit a formal quintuple bond.[17] Similarly, for the dibenzene complexes Cr2(C6H6)2, Mo2(C6H6)2, and W2(C6H6)2, molecular bonding orbitals for the triplet states with symmetries D6h and D6d indicate the possibility of an intermetallic sex­tuple bond. Quantum chemistry calculations reveal, however, that the corre­sponding D2h singlet geometry is stabler than the D6h triplet state by 3–39 kcal/mol, depending on the central metal.[18]

Oxo ligands

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Both quantum mechanical calculations and photoelectron spectroscopy of the tungsten oxide clusters W2On (n = 1-6) indicate that increased oxidation state reduces the bond order in ditungsten. At first, the weak δ bonds break to yield a quadruply-bonded W2O; further oxidation generates the ditungsten complex W2O6 with two bridging oxo ligands and no direct W-W bonds.[19]

References

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  1. ^ a b c d e f g Roos, Björn O.; Borin, Antonio C.; Laura Gagliardi (2007). "Reaching the Maximum Multiplicity of the Covalent Chemical Bond". Angewandte Chemie International Edition. 46 (9): 1469–72. doi:10.1002/anie.200603600. PMID 17225237.
  2. ^ Bursten, Bruce E.; Cotton, F. Albert; Hall, Michael B. (September 1980). "Dimolybdenum: nature of the sextuple bond". Journal of the American Chemical Society. 102 (20): 6348–6349. doi:10.1021/ja00540a034. ISSN 0002-7863.
  3. ^ Bursten, Bruce E.; Ozin, Geoffrey A. (August 1984). "X.alpha.-SW calculations for naked actinide dimers: existence of .vphi. bonds between metal atoms". Inorganic Chemistry. 23 (18): 2910–2911. doi:10.1021/ic00186a039. ISSN 0020-1669.
  4. ^ a b Knecht, Stefan; Jensen, Hans Jørgen Aa.; Saue, Trond (January 2019). "Relativistic quantum chemical calculations show that the uranium molecule U2 has a quadruple bond" (PDF). Nature Chemistry. 11 (1): 40–44. Bibcode:2019NatCh..11...40K. doi:10.1038/s41557-018-0158-9. ISSN 1755-4330. PMID 30374039. S2CID 53112083.
  5. ^ Goodgame, Marvin M.; Goddard, William A. (February 1981). "The "sextuple" bond of chromium dimer". The Journal of Physical Chemistry. 85 (3): 215–217. doi:10.1021/j150603a001. ISSN 0022-3654.
  6. ^ Gagliardi, Laura; Roos, Björn O. (2005-05-17). "Quantum Chemical Calculations Show that the Uranium Molecule U2 Has a Quintuple Bond". ChemInform. 36 (20): 848. Bibcode:2005Natur.433..848G. doi:10.1002/chin.200520001. ISSN 0931-7597.
  7. ^ Kraus, D.; Lorenz, M.; Bondybey, V. E. (2001). "On the dimers of the VIB group: a new NIR electronic state of Mo2". PhysChemComm. 4 (10): 44–48. doi:10.1039/b104063b.
  8. ^ a b Borin, Antonio Carlos; Gobbo, João Paulo; Roos, Björn O. (April 2010). "Electronic structure and chemical bonding in W2 molecule". Chemical Physics Letters. 490 (1–3): 24–28. Bibcode:2010CPL...490...24B. doi:10.1016/j.cplett.2010.03.022. ISSN 0009-2614.
  9. ^ Efremov, Yu.M; Samoilova, A.N; Kozhukhovsky, V.B; Gurvich, L.V (December 1978). "On the electronic spectrum of the Mo2 molecule observed after flash photolysis of Mo(CO)6". Journal of Molecular Spectroscopy. 73 (3): 430–440. Bibcode:1978JMoSp..73..430E. doi:10.1016/0022-2852(78)90109-1. ISSN 0022-2852.
  10. ^ a b c Jules, Joseph L.; Lombardi, John R. (March 2003). "Transition Metal Dimer Internuclear Distances from Measured Force Constants". The Journal of Physical Chemistry A. 107 (9): 1268–1273. Bibcode:2003JPCA..107.1268J. doi:10.1021/jp027493+. ISSN 1089-5639.
  11. ^ Joy, Jyothish; Jemmis, Eluvathingal D. (2017). "A halogen bond route to shorten the ultrashort sextuple bonds in Cr2 and Mo2". Chemical Communications. 53 (58): 8168–8171. doi:10.1039/c7cc04653g. ISSN 1359-7345. PMID 28677703. S2CID 206066221.
  12. ^ Hardcastle, F. D. (2016-01-01). "A General Valence-Length Correlation for Determining Bond Orders: Application to Carbon-Carbon and Carbon-Hydrogen Chemical Bonds". Journal of the Arkansas Academy of Science. 70. doi:10.54119/jaas.2016.7009. ISSN 2326-0505.
  13. ^ Lombardi, John R.; Davis, Benjamin (2002-06-01). "Periodic Properties of Force Constants of Small Transition-Metal and Lanthanide Clusters". Chemical Reviews. 102 (6): 2431–2460. doi:10.1021/cr010425j. ISSN 0009-2665. PMID 12059275. Pauling showed that the force constant is approximately proportional to the bond order...Note that the term 'bond order' as used here is not the same as the usual chemical definition [i.e., 1/2(no. of bonding electrons - no. of antibonding electrons) or better a function of the electron density]. This might more accurately be termed the 'vibrational bond order' since it is experimentally determined.
  14. ^ Johnston, Harold S. (1966). Gas Phase Reaction Rate Theory. Ronald Press Company. ISBN 978-0-608-30060-3.
  15. ^ Merino, Gabriel; Donald, Kelling J.; D'Acchioli, Jason S.; Hoffmann, Roald (2007). "The Many Ways To Have a Quintuple Bond". J. Am. Chem. Soc. 129 (49): 15295–15302. doi:10.1021/ja075454b. PMID 18004851.
  16. ^ Borin, Antonio Carlos; Gobbo, João Paulo; Roos, Björn O. (January 2008). "A theoretical study of the binding and electronic spectrum of the Mo2 molecule". Chemical Physics. 343 (2–3): 210–216. Bibcode:2008CP....343..210B. doi:10.1016/j.chemphys.2007.05.028. ISSN 0301-0104.
  17. ^ a b Xu, Bing; Li, Qian-Shu; Xie, Yaoming; King, R. Bruce; Schaefer, Henry F. (2010-02-17). "Metal−Metal Quintuple and Sextuple Bonding in Bent Dimetallocenes of the Third Row Transition Metals". Journal of Chemical Theory and Computation. 6 (3): 735–746. doi:10.1021/ct900564p. ISSN 1549-9618. PMID 26613304.
  18. ^ Sun, Zhi; Schaefer, Henry F.; Xie, Yaoming; Liu, Yongdong; Zhong, Rugang (September 2013). "Does the metal–metal sextuple bond exist in the bimetallic sandwich compounds Cr2(C6H6)2, Mo2(C6H6)2, and W2(C6H6)2?†". Molecular Physics. 111 (16–17): 2523–2535. Bibcode:2013MolPh.111.2523S. doi:10.1080/00268976.2013.798434. ISSN 0026-8976. S2CID 94537427.
  19. ^ Zhai, Hua-Jin; Huang, Xin; Cui, Li-Feng; Li, Xi; Li, Jun; Wang, Lai-Sheng (July 2005). "Electronic and Structural Evolution and Chemical Bonding in Ditungsten Oxide Clusters: W2On-and W2On(n= 1−6)". The Journal of Physical Chemistry A. 109 (27): 6019–6030. Bibcode:2005JPCA..109.6019Z. doi:10.1021/jp051496f. ISSN 1089-5639. PMID 16833938.

Further reading

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