Tanabe–Sugano diagram

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Tanabe–Sugano diagrams are used in coordination chemistry to predict absorptions in the UV, visible and IR electromagnetic spectrum of coordination compounds. The results from a Tanabe–Sugano diagram analysis of a metal complex can also be compared to experimental spectroscopic data. They are qualitatively useful and can be used to approximate the value of 10Dq, the ligand field splitting energy. Tanabe–Sugano diagrams can be used for both high spin and low spin complexes, unlike Orgel diagrams, which apply only to high spin complexes. Tanabe–Sugano diagrams can also be used to predict the size of the ligand field necessary to cause high-spin to low-spin transitions.

In a Tanabe–Sugano diagram, the ground state is used as a constant reference, in contrast to Orgel diagrams. The energy of the ground state is taken to be zero for all field strengths, and the energies of all other terms and their components are plotted with respect to the ground term.

Background[]

Until Yukito Tanabe and Satoru Sugano published their paper "On the absorption spectra of complex ions", in 1954, little was known about the excited electronic states of complex metal ions. They used Hans Bethe's crystal field theory and Giulio Racah's linear combinations of Slater integrals,[1] now called Racah parameters, to explain the absorption spectra of octahedral complex ions in a more quantitative way than had been achieved previously.[2] Many spectroscopic experiments later, they estimated the values for two of Racah's parameters, B and C, for each d-electron configuration based on the trends in the absorption spectra of isoelectronic first-row transition metals. The plots of the energies calculated for the electronic states of each electron configuration are now known as Tanabe–Sugano diagrams.[3][4] Number must be fit for each octahedral coordination complex, but approximate (order of magnitude) numbers were reported by Tanabe and Sugano, tabulated below. Note that the ratio C/B is roughly around 4.5 for most ions. This ratio changes the relative energies of the levels in the Tanabe–Sugano diagrams, and thus the diagrams may vary slightly between sources depending on what C/B ratio was selected when plotting.

Rough Values of B and C[2][3]
Divalent ion Trivalent ion
Ion B / cm–1 C / cm–1 C/B Ion B / cm–1 C / cm–1 C/B
Ti2+ 694 2910 4.19
V2+ 755 3257 4.31 V3+ 861 3814 4.43
Cr2+ 810 3565 4.40 Cr3+ 918 4133 4.50
Mn2+ 860 3850 4.48 Mn3+ 965 4450 4.61
Fe2+ 917 4040 4.41 Fe3+ 1015 4800 4.73
Co2+ 971 4497 4.63 Co3+ 1065 5120 4.81
Ni2+ 1030 4850 4.71 Ni3+ 1115 5450 4.89

Parameters[]

The x-axis of a Tanabe–Sugano diagram is expressed in terms of the ligand field splitting parameter, Δ, or Dq (for "differential of quanta"[5][6]), divided by the Racah parameter B. The y-axis is in terms of energy, E, also scaled by B. Three Racah parameters exist, A, B, and C, which describe various aspects of interelectronic repulsion. A is an average total interelectron repulsion. B and C correspond with individual d-electron repulsions. A is constant among d-electron configuration, and it is not necessary for calculating relative energies, hence its absence from Tanabe and Sugano's studies of complex ions. C is necessary only in certain cases. B is the most important of Racah's parameters in this case.[7] One line corresponds to each electronic state. The bending of certain lines is due to the mixing of terms with the same symmetry. Although electronic transitions are only "allowed" if the spin multiplicity remains the same (i.e. electrons do not change from spin up to spin down or vice versa when moving from one energy level to another), energy levels for "spin-forbidden" electronic states are included in the diagrams, which are also not included in Orgel diagrams.[8] Each state is given its molecular-symmetry label (e.g. A1g, T2g, etc.), but "g" and "u" subscripts are usually left off because it is understood that all the states are gerade. Labels for each state are usually written on the right side of the table, though for more complicated diagrams (e.g. d6) labels may be written in other locations for clarity. Term symbols (e.g. 3P, 1S, etc.) for a specific dn free ion are listed, in order of increasing energy, on the y-axis of the diagram. The relative order of energies is determined using Hund's rules. For an octahedral complex, the spherical, free ion term symbols split accordingly:[9]

Splitting of Term Symbols from Spherical to Octahedral Symmetry
Term Degeneracy States in an octahedral field
S 1 A1g
P 3 T1g
D 5 Eg + T2g
F 7 A2g + T1g + T2g
G 9 A1g + Eg + T1g + T2g
H 11 Eg + T1g + T1g + T2g
I 13 A1g + A2g + Eg + T1g + T2g + T2g

Certain Tanabe–Sugano diagrams (d4, d5, d6, and d7) also have a vertical line drawn at a specific Dq/B value, which is accompanied by a discontinuity in the slopes of the excited states' energy levels. This pucker in the lines occurs when the identity of the ground state changes, shown in the diagram below. The left depicts the relative energies of the d7 ion states as functions of crystal field strength (Dq), showing an intersection of the 4T1 and the 2E states near Dq/B ~ 2.1. Subtracting the ground state energy produces the standard Tanabe–Sugano diagram shown on the right.

Tanabe Sugano Discontinuity

This change in identity generally happens when the spin pairing energy, P, is equal to the ligand field splitting energy, Dq. Complexes to the left of this line (lower Dq/B values) are high-spin, while complexes to the right (higher Dq/B values) are low-spin. There is no low-spin or high-spin designation for d2, d3, or d8 because none of the states cross at reasonable crystal field energies.[10]

Tanabe–Sugano diagrams[]

The seven Tanabe–Sugano diagrams for octahedral complexes are shown below.[7][11][12]

d2 Tanabe–Sugano diagram
d2 electron configuration
d3 Tanabe–Sugano diagram
d3 electron configuration
d4 Tanabe–Sugano diagram
d4 electron configuration
d5 Tanabe–Sugano diagram
d5 electron configuration
d6 Tanabe–Sugano diagram
d6 electron configuration
d7 Tanabe–Sugano diagram
d7 electron configuration
d8 Tanabe–Sugano diagram
d8 electron configuration


Unnecessary diagrams: d1, d9 and d10[]

d1[]

There is no electron repulsion in a d1 complex, and the single electron resides in the t2g orbital ground state. A d1 octahedral metal complex, such as [Ti(H2O)6]3+, shows a single absorption band in a UV-vis experiment.[7] The term symbol for d1 is 2D, which splits into the 2T2g and 2Eg states. The t2g orbital set holds the single electron and has a 2T2g state energy of -4Dq. When that electron is promoted to an eg orbital, it is excited to the 2Eg state energy, +6Dq. This is in accordance with the single absorption band in a UV-vis experiment. The prominent shoulder in this absorption band is due to a Jahn-Teller distortion which removes the degeneracy of the two 2Eg states. However, since these two transitions overlap in a UV-vis spectrum, this transition from 2T2g to 2Eg does not require a Tanabe–Sugano diagram.

d9[]

Similar to d1 metal complexes, d9 octahedral metal complexes have 2D spectral term. The transition is from the (t2g)6(eg)3 configuration (2Eg state) to the (t2g)5(eg)4 configuration (2T2g state). This could also be described as a positive "hole" that moves from the eg to the t2g orbital set. The sign of Dq is opposite that for d1, with a 2Eg ground state and a 2T2g excited state. Like the d1 case, d9 octahedral complexes do not require the Tanabe–Sugano diagram to predict their absorption spectra.

Splitting of "doublet D" term symbol into "doublet T2g" and "doublet Eg" states in octahedral symmetry
Splitting of 2D term in an octahedral crystal field
Electronic transition from ground state "doublet T2g" to excited state "doublet Eg" for a d1 electron configuration
Electronic transition from ground state 2T2g to excited state 2Eg for a d1 electron configuration
Electronic transition from ground state to excited state for a d9 electron configuration
Electronic transition from ground state to excited state for a d9 electron configuration

d10[]

There are no d-d electron transitions in d10 metal complexes because the d orbitals are completely filled. Thus, UV-vis absorption bands are not observed and a Tanabe–Sugano diagram does not exist.

Diagrams for tetrahedral symmetry[]

Tetrahedral Tanabe–Sugano diagrams are generally not found in textbooks because the diagram for a dn tetrahedral will be similar to that for d(10-n) octahedral, remembering that ΔT for tetrahedral complexes is approximately 4/9 of ΔO for an octahedral complex. A consequence of the much smaller size of ΔT results in (almost) all tetrahedral complexes being high spin and therefore the change in the ground state term seen on the X-axis for octahedral d4-d7 diagrams is not required for interpreting spectra of tetrahedral complexes.

Advantages over Orgel diagrams[]

In Orgel diagrams, the magnitude of the splitting energy exerted by the ligands on d orbitals, as a free ion approach a ligand field, is compared to the electron-repulsion energy, which are both sufficient at providing the placement of electrons. However, if the ligand field splitting energy, 10Dq, is greater than the electron-repulsion energy, then Orgel diagrams fail in determining electron placement. In this case, Orgel diagrams are restricted to only high spin complexes.[8]

Tanabe–Sugano diagrams do not have this restriction, and can be applied to situations when 10Dq is significantly greater than electron repulsion. Thus, Tanabe–Sugano diagrams are utilized in determining electron placements for high spin and low spin metal complexes. However, they are limited in that they have only qualitative significance. Even so, Tanabe–Sugano diagrams are useful in interpreting UV-vis spectra and determining the value of 10Dq.[8]

Applications as a qualitative tool[]

In a centrosymmetric ligand field, such as in octahedral complexes of transition metals, the arrangement of electrons in the d-orbital is not only limited by electron repulsion energy, but it is also related to the splitting of the orbitals due to the ligand field. This leads to many more electron configuration states than is the case for the free ion. The relative energy of the repulsion energy and splitting energy defines the high-spin and low-spin states.

Considering both weak and strong ligand fields, a Tanabe–Sugano diagram shows the energy splitting of the spectral terms with the increase of the ligand field strength. It is possible for us to understand how the energy of the different configuration states is distributed at certain ligand strengths. The restriction of the spin selection rule makes it is even easier to predict the possible transitions and their relative intensity. Although they are qualitative, Tanabe–Sugano diagrams are very useful tools for analyzing UV-vis spectra: they are used to assign bands and calculate Dq values for ligand field splitting.[13][14]

Examples[]

Absorption spectrum of manganese(II) hexahydrate
Absorption spectrum of [Mn(H2O)6]2+.

Manganese(II) hexahydrate[]

In the [Mn(H2O)6]2+ metal complex, manganese has an oxidation state of +2, thus it is a d5 ion. H2O is a weak field ligand (spectrum shown below), and according to the Tanabe–Sugano diagram for d5 ions, the ground state is 6A1. Note that there is no sextet spin multiplicity in any excited state, hence the transitions from this ground state are expected to be spin-forbidden and the band intensities should be low. From the spectra, only very low intensity bands are observed (low molar absorptivity (ε) values on y-axis).[13]

Absorption spectrum of cobalt(II) hexahydrate
Absorption spectrum of [Co(H2O)6]2+.

Cobalt(II) hexahydrate[]

Another example is [Co(H2O)6]2+.[14] Note that the ligand is the same as the last example. Here the cobalt ion has the oxidation state of +2, and it is a d7 ion. From the high-spin (left) side of the d7 Tanabe–Sugano diagram, the ground state is 4T1(F), and the spin multiplicity is a quartet. The diagram shows that there are three quartet excited states: 4T2, 4A2, and 4T1(P). From the diagram one can predict that there are three spin-allowed transitions. However, the spectra of [Co(H2O)6]2+ does not show three distinct peaks that correspond to the three predicted excited states. Instead, the spectrum has a broad peak (spectrum shown below). Based on the T–S diagram, the lowest energy transition is 4T1 to 4T2, which is seen in the near IR and is not observed in the visible spectrum. The main peak is the energy transition 4T1(F) to 4T1(P), and the slightly higher energy transition (the shoulder) is predicted to be 4T1 to 4A2. The small energy difference leads to the overlap of the two peaks, which explains the broad peak observed in the visible spectrum.

Solving for B and ΔO[]

d2 Tanabe–Sugano diagram
d2 Tanabe–Sugano diagram

For the d2 complex [V(H2O)6]3+, two bands are observed with maxima at around 17,500 and 26,000 cm−1.[citation needed] The ratio of experimental band energies is E(ν2)/E(ν1) is 1.49. There are three possible transitions expected, which include: ν1: 3T1g3T2g, ν2:3T1g3T1g(P), and ν3: 3T1g3A2g. There are three possible transitions, but only two are observed, so the unobserved transition must be determined.

ΔO / B = 10 20 30 40
Height E(ν1)/B 10 19 28 37
Height E(ν2)/B 23 33 42 52
Height E(ν3)/B 19 38 56 75
Ratio E(ν3)/E(ν1) 1.9 2.0 2.0 2.0
Ratio E(ν2)/E(ν1) 2.3 1.73 1.5 1.4

Fill in a chart like the one to the right by finding corresponding heights (E/B) of the symmetry states at certain values of ΔO / B. Then find the ratio of these values (E(ν2)/E(ν1) and E(ν3)/E(ν1)). Note that the ratio of E(ν3)/E(ν1) does not contain the calculated ratio for the experimental band energy, so we can determine that the 3T1g3A2g band is unobserved. Use ratios for E(ν2)/E(ν1) and the values of ΔO / B to plot a line with E(ν2)/E(ν1) being the y-values and ΔO/B being the x-values. Using this line, it is possible to determine the value of ΔO / B for the experimental ratio. (ΔO / B = 3.1 for a chart ratio of 1.49 in this example).

Find on the T–S diagram where ΔO / B = 3.1 for 3T1g3T2g and 3T1g3T1g(P). For 3T2g, E(ν1) / B = 27 and for 3T1g(P), E(ν2) / B = 43.

The Racah parameter can be found by calculating B from both E(ν2) and E(ν1). For 3T1g(P), B = 26,000 cm−1/43 = 604 cm−1. For 3T2g, B = 17,500 cm−1/ 27 = 648 cm−1. From the average value of the Racah parameter, the ligand field splitting parameter can be found (ΔO). If ΔO / B = 3.1 and B = 625 cm−1, then ΔO = 19,375 cm−1.

See also[]

References[]

  1. ^ Racah, Giulio (1942). "Theory of complex spectra II". Physical Review. 62 (9–10): 438–462. Bibcode:1942PhRv...62..438R. doi:10.1103/PhysRev.62.438.
  2. ^ Jump up to: a b Tanabe, Yukito; Sugano, Satoru (1954). "On the absorption spectra of complex ions I". Journal of the Physical Society of Japan. 9 (5): 753–766. Bibcode:1954JPSJ....9..753T. doi:10.1143/JPSJ.9.753.
  3. ^ Jump up to: a b Tanabe, Yukito; Sugano, Satoru (1954). "On the absorption spectra of complex ions II". Journal of the Physical Society of Japan. 9 (5): 766–779. Bibcode:1954JPSJ....9..766T. doi:10.1143/JPSJ.9.766.
  4. ^ Tanabe, Yukito; Sugano, Satoru (1956). "On the absorption spectra of complex ions III". Journal of the Physical Society of Japan. 11 (8): 864–877. Bibcode:1956JPSJ...11..864T. doi:10.1143/JPSJ.11.864.
  5. ^ Penney, William G.; Schlapp, Robert (1932). "The Influence of Crystalline Fields on the Susceptibilities of Salts of Paramagnetic Ions. I. The Rare Earths, Especially Pr and Nd". Physical Review. 41 (2): 194–207. doi:10.1103/PhysRev.41.194. ISSN 0031-899X.
  6. ^ Schlapp, Robert; Penney, William G. (1932). "Influence of Crystalline Fields on the Susceptibilities of Salts of Paramagnetic Ions. II. The Iron Group, Especially Ni, Cr and Co". Physical Review. 42 (5): 666–686. doi:10.1103/PhysRev.42.666. ISSN 0031-899X.\
  7. ^ Jump up to: a b c Atkins, Peter; Overton, Tina; Rourke, Jonathan; Weller, Mark; Armstrong, Fraser; Salvador, Paul; Hagerman, Michael; Spiro, Thomas; Stiefel, Edward (2006). Shriver & Atkins Inorganic Chemistry (4th ed.). New York: W.H. Freeman and Company. pp. 478–483. ISBN 0-7167-4878-9.
  8. ^ Jump up to: a b c Douglas, Bodie; McDaniel, Darl; Alexander, John (1994). Concepts and Models of Inorganic Chemistry (3rd ed.). New York: John Wiley & Sons. pp. 442–458. ISBN 0-471-62978-2.
  9. ^ Cotton, F. Albert; Wilkinson, Geoffrey; Gaus, Paul L. (1995). Basic Inorganic Chemistry (3rd ed.). New York: John Wiley & Sons. pp. 530–537. ISBN 0-471-50532-3.
  10. ^ Harris, Daniel C.; Bertolucci, Michael D. (1978). Symmetry and Spectroscopy: An Introduction to Vibrational and Electronic Spectroscopy. New York: Dover Publications, Inc. pp. 403–409, 539. ISBN 978-0-486-66144-5.
  11. ^ Lancashire, Robert John (4–10 June 1999), Interpretation of the spectra of first-row transition metal complexes (PDF), CONFCHEM, ACS Division of Chemical Education
  12. ^ Lancashire, Robert John (25 September 2006). "Tanabe-Sugano diagrams via spreadsheets". Retrieved 29 November 2009.
  13. ^ Jump up to: a b Jørgensen, Chr Klixbüll; De Verdier, Carl-Henric; Glomset, John; Sörensen, Nils Andreas (1954). "Studies of absorption spectra IV: Some new transition group bands of low intensity". Acta Chem. Scand. 8 (9): 1502–1512. doi:10.3891/acta.chem.scand.08-1502.
  14. ^ Jump up to: a b Jørgensen, Chr Klixbüll; De Verdier, Carl-Henric; Glomset, John; Sörensen, Nils Andreas (1954). "Studies of absorption spectra III: Absorption Bands as Gaussian Error Curves". Acta Chem. Scand. 8 (9): 1495–1501. doi:10.3891/acta.chem.scand.08-1495.
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