research communications
Structural parameters of dimethyl sulfoxide, DMSO, at 100 K, based on a redetermination by use of high-quality single-crystal X-ray data
aInstitute of Chemistry of New Materials, University of Osnabrück, Barbarastrasse 7, 49069 Osnabrück, Germany
*Correspondence e-mail: hreuter@uos.de
The title compound, C2H6OS, is a high melting, polar and aprotic solvent widely used in organic and inorganic chemistry. It serves as a H-atom acceptor in hydrogen bonding and is used as an ambidentate ligand in coordination chemistry. The evaluation of the influence of intermolecular interactions on the internal structural parameters of the chemically bonded DMSO molecules affords precise structural data of the free molecule as a point of reference. So far, valid data have been obtained only by use of neutron powder diffraction [Ibberson (2005). Acta Cryst. C61, o571–o573]. In the present redetermination, structural data have been obtained from a single-crystal X-ray diffraction experiment at 100 K, revealing a better comparison with DMSO molecules in other crystal structures. In the solid state, the pyramidal molecule exhibits a nearly perfect Cs symmetry [including H atoms, which are eclipsed with respect to the C⋯C axis], with a C—S—C bond angle of 97.73 (7)° and an S—O bond length of 1.5040 (10) Å, corresponding very well with an S=O double bond, and with almost equal S—C bond lengths [mean value = 1.783 (4) Å] and O—S—C bond angles [mean value = 106.57 (4)°]. The crystal packing is influenced by C—H⋯O interactions (2.42–2.47 Å) between all three H atoms of only one methyl group with the O atoms of three neighbouring DMSO molecules. The interactions of the O atom with H atoms (or Lewis acids, or hydrogen-donor groups) of adjacent molecules in relation to the orientation of the complete DMSO molecule are described in terms of the angle ω and the distance dnorm; ω is the angle between the pseudo-mirror plane of the molecule and the plane defined through the S=O bond and the interacting atom, and dnorm is the distance of the interacting atom from the plane perpendicular to the S=O bond.
Keywords: crystal structure; dimethyl sulfoxide; van der Waals interaction; geometric parameters; crystal packing.
CCDC reference: 1571260
1. Chemical context
Dimethyl sulfoxide (DMSO), (CH3)2SO, is a colourless with high melting (291 K) and boiling points (462 K), miscible with a wide range of organic solvents and water. It is commonly used in organic and inorganic chemistry because of its capability to dissolve numerous polar or nonpolar compounds. In addition to its solvation properties, the molecule may act as a H-atom acceptor in hydrogen bonding, as well as an ambidentate in coordination compounds. In the latter case, DMSO reactivity follows the HSAB principle (Pearson, 1963) which means that in combination with `hard' acids like tin(IV), DMSO coordinates via the `hard' O atom [e.g. iPrSnCl3(DMSO-O)2; Kastner & Reuter, 1999] and in combination with `soft' acids like platinum(II) via the `soft' S atom [e.g. cis-PtCl2(DMSO-S)2; Melanson & Rochon, 1975], while with acids at the `hard–soft' borderline like ruthenium(II), both coordination modes can be realized [cis-RuCl2(DMSO-O)1(DMSO-S)3; Tarighi & Abbasi, 2007]. DMSO is also used in pharmacology in transdermal drug delivery applications and in veterinary medicine.
Both hydrogen-bond formation and formation of coordination bonds will change the structural parameters of the DMSO molecule, as was shown by Calligaris (2004) for DMSO and other For the evaluation of the influence of these additional intermolecular bonds on the internal structural parameters of the coordinating or hydrogen-bonded DMSO ligands, precise data on bond lengths and angles within the free molecule are required as a point of reference. The available data, however, in the case of single-crystal X-ray structure determinations, are from the late 1960s (Viswamitra & Kannan, 1966; Thomas et al., 1966) when precession and Weissenberg photographs were state of the art. Therefore, these data are of less accuracy compared with modern X-ray data obtained with CCD area detectors. More recently, Ibberson (2005) published results on neutron powder diffraction studies of fully deuterated dimethyl sulfoxide at 2 and 100 K. Although, the data obtained are of higher precision than those of the forgoing single-crystal X-ray measurements, they suffer from the limitations of powder diffraction techniques.
In the current study, the results of a redetermination of the
of DMSO based on single-crystal X-ray data at 100 K are presented. The results are comparatively discussed with the previous structure determinations.2. Structural commentary
Unit-cell parameters of the current 100 K single-crystal X-ray measurement (SCXD) are consistent with those of the neutron powder diffraction (NPD) data of Ibberson (2005), but structural parameters of the DMSO molecule differ considerably between the two refinements (Table 1). In the pyramidal molecule of crystallographic symmetry C1 (Fig. 1, atom positions and atom labelling according to NPD), the S atom lies 0.6994 (9) Å above the triangular base formed by the O and C atoms. The S—O bond length of 1.5040 (10) Å is slightly longer than the value [1.496 (2) Å] determined by Ibberson at 100 K, but corresponds very well with a S=O double bond in [1.497 (13) Å; Allen et al., 1987].
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Other differences between the single-crystal X-ray and neutron powder diffraction data, however, are strongly expressed with respect to S—C bond lengths and even more with respect to O—S—C bond angles (Table 1). In the case of the neutron data, the difference between both S—C bonds is 0.05 Å [S—C1 = 1.838 (3) Å and S—C2 = 1.788 (3) Å], while in the case of the X-ray data, the difference between both bonds is reduced by a factor of about 10 to 0.006 Å [S—C1 = 1.7801 (14) Å and S—C2 = 1.7861 (15) Å]. Moreover, the bond to atom C1 is shorter than the bond to C2, in contrast to the bond-length distribution observed by Ibberson. This is of special interest in view of the C—H⋯O interactions discussed below. With respect to the C—S—O bond angles, structural differences between the NPD and SCXD model are enormous: the difference between both bond angles of 3.09° [O—S—C1 = 105.21 (16)° and O—S—C2 = 108.30 (15)°] found by Ibberson at 100 K can be compared with a difference of only 0.06° [O—S—C1 = 106.54 (6)° and O—S—C2 = 106.60 (7)°] in the case of the present work. All in all, the ideal Cs symmetry of the gaseous and liquid DMSO molecule is much better approached in the crystalline state, even at 100 K, than originally assumed from neutron powder data.
Although this symmetry consideration is not affected by the bond angle between the S atom and the methyl groups, it is important – on the background of coordination that seems to have a great influence on this bond angle – to emphasize that in the SCXD model [C—S—C = 97.73 (3)°], this angle is about 1.4° larger than in the NPD model [C—S—C = 96.37 (12)° at 100 K]. With respect to the hydrogen/deuterium positions, no differences occur, as both methyl groups show an eclipsed orientation with respect to C⋯C, thus fulfilling the nearly ideal Cs symmetry, too.
For the sake of completeness, structural data of the previous single-crystal X-ray et al. (1966) are also compiled in Table 1.
by Thomas3. Supramolecular features
C—H⋯O contacts are the most prominent intermolecular interactions responsible for the three-dimensional arrangement of the DMSO molecules in the solid state (Fig. 2). In order to compare our results with the results of the neutron powder diffraction experiment, one must take into account the different validity and strategies for the H/D atoms in both methods. Under consideration of the van der Waals radii of H (1.10 Å) and O (1.52 Å) supplied by Mantina et al. (2009), relevant H⋯O distances should be shorter than 2.62 Å. From the H atoms attached to C2, only one (H22) shows an interatomic distance below this threshold. With an H22⋯O1ii (for symmetry code, see Table 2) distance of 2.61 Å, a binding C—H⋯O interaction other than a van der Waals interaction can be excluded. Just the opposite is observed in case of the H atoms attached to C1: all three H atoms show an intermolecular contact to one O atom of three different DMSO molecules in the range 2.42–2.47 Å (Table 2). In this case, these contacts fall below the van der Waals distance by 7.6–5.7% (0.20–0.15 Å) which justifies the assumption of binding C—H⋯O interactions. The corresponding intermolecular donor–acceptor distances are in the range 3.318 (2)–3.445 (2) Å, while the C—H⋯O angles are in the range 152.0–173.0° (Table 2). In summary, each DMSO molecule participates in six C—H⋯O contacts to five neighbouring molecules (Fig. 3). The extent of the van der Waals and hydrogen-bonding interactions on the overlapping of the molecules is visualized in Fig. 4. Obviously, there is no weakening influence of these interactions on the S—C bond length. Quite the opposite, the S1—C1 bond is somewhat shorter than the S1—C2 bond (see above).
With respect to the O atom as an acceptor atom, bond angles (S=O⋯H) of the van der Waals contacts come to 114.0° for H132 (2 = −1 + x, y, z), 152.1° for H121 (1 = −x, 0.5 + y, 0.5 − z), and 103.4° for H113 (3 = −x, −y, −z). The geometrical aspects of these van der Waals interactions (or of coordinatively or hydrogen-bonded DMSO molecules) are described only incompletely with the foregoing used distances and angles as they disregard the orientation of the complete DMSO molecule in relation to the interactions described. In order to unambiguously account for this specific relationship, indexation by two additional values, ω and dnorm, using two planes as a reference (Fig. 5) is suggested. The first plane is identical, with the pseudo-mirror plane m′ defined by O1, S1 and the mid-point between both C atoms. The second plane, plO, is perpendicular to the S=O bond and located in O1. While dnorm represents the distance between the interacting atom (via a van der Waals interaction, a hydrogen bond or a coordinative bond) and plO, the angle ω marks the angle between m′ and the plane plH defined by O1, S1 and the interacting atom. Values of ω can stretch from 0 to 360° when looking down the O=S bond as in a In the case of the van der Waals interactions discussed here, the corresponding ω/dnorm values are: H121 = 98.2°/2.139 Å, H132 = 178.3°/1.006 Å and H113 = 335.1°/0.560 Å.
4. Synthesis and crystallization
Single crystals were grown from a commercial available sample (Sigma–Aldrich) within a 0.3 mm thick Lindemann capillary using the Kryoflex low-temperature device of the diffractometer.
5. Refinement
Crystal data, data collection and structure . All six H atoms were found in a difference-Fourier map. They could be refined without any restraints in meaningful positions [C—H range = 0.91 (2)–0.97 (2) Å; H—C—H range = 107.6 (11)–112.2 (15)°] with individual isotropic displacement parameters [range = 0.018 (4)–0.036 (5) Å2]. In order to obtain a structure model comparable to typical techniques of DMSO molecules in the structures of coordination compounds or with hydrogen bonds, conventional constraints [AFIX 137, C—H = 0.99 Å, H—C—H = 109.6° in SHELXL (Sheldrick, 2015)] with two common isotropic displacement parameters, one for each methyl group, have been applied. In summary, these restraints only slightly affected the final results: the final R value increased from 2.37 to 2.42%, while the bond lengths and bond angles remained unchanged. All data have been approved by a second independently grown crystal.
details are summarized in Table 3
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Supporting information
CCDC reference: 1571260
https://doi.org/10.1107/S2056989017012464/wm5409sup1.cif
contains datablock I. DOI:Structure factors: contains datablock I. DOI: https://doi.org/10.1107/S2056989017012464/wm5409Isup2.hkl
Supporting information file. DOI: https://doi.org/10.1107/S2056989017012464/wm5409Isup3.cml
Supporting information file. DOI: https://doi.org/10.1107/S2056989017012464/wm5409sup3.mp4
Data collection: APEX2 (Bruker, 2009); cell
SAINT (Bruker, 2009); data reduction: SAINT (Bruker, 2009); program(s) used to solve structure: SHELXS97 (Sheldrick, 2008); program(s) used to refine structure: SHELXL2014 (Sheldrick, 2015); molecular graphics: DIAMOND (Brandenburg, 2006) and Mercury (Macrae et al. (2008); software used to prepare material for publication: SHELXTL (Sheldrick, 2008).C2H6OS | F(000) = 168 |
Mr = 78.13 | Dx = 1.311 Mg m−3 |
Monoclinic, P21/c | Mo Kα radiation, λ = 0.71073 Å |
a = 5.2243 (3) Å | Cell parameters from 3349 reflections |
b = 6.7414 (4) Å | θ = 3.5–28.0° |
c = 11.2772 (6) Å | µ = 0.60 mm−1 |
β = 94.820 (2)° | T = 100 K |
V = 395.77 (4) Å3 | Bloc, colourless |
Z = 4 | 0.21 × 0.17 × 0.16 mm |
Bruker APEXII CCD diffractometer | 801 reflections with I > 2σ(I) |
φ and ω scans | Rint = 0.030 |
Absorption correction: multi-scan (SADABS; Bruker, 2009) | θmax = 28.0°, θmin = 3.5° |
Tmin = 0.883, Tmax = 0.913 | h = −6→6 |
5476 measured reflections | k = −8→8 |
938 independent reflections | l = −14→14 |
Refinement on F2 | 0 restraints |
Least-squares matrix: full | Hydrogen site location: inferred from neighbouring sites |
R[F2 > 2σ(F2)] = 0.024 | H-atom parameters constrained |
wR(F2) = 0.062 | w = 1/[σ2(Fo2) + (0.0238P)2 + 0.1531P] where P = (Fo2 + 2Fc2)/3 |
S = 1.13 | (Δ/σ)max < 0.001 |
938 reflections | Δρmax = 0.26 e Å−3 |
41 parameters | Δρmin = −0.25 e Å−3 |
Geometry. All esds (except the esd in the dihedral angle between two l.s. planes) are estimated using the full covariance matrix. The cell esds are taken into account individually in the estimation of esds in distances, angles and torsion angles; correlations between esds in cell parameters are only used when they are defined by crystal symmetry. An approximate (isotropic) treatment of cell esds is used for estimating esds involving l.s. planes. |
x | y | z | Uiso*/Ueq | ||
S1 | 0.18232 (6) | 0.14961 (5) | 0.19283 (3) | 0.01776 (12) | |
O1 | −0.10440 (18) | 0.13580 (16) | 0.16758 (10) | 0.0245 (3) | |
C1 | 0.3139 (3) | −0.0633 (2) | 0.12708 (13) | 0.0187 (3) | |
H11 | 0.2663 | −0.1825 | 0.1698 | 0.027 (3)* | |
H12 | 0.5015 | −0.0518 | 0.1317 | 0.027 (3)* | |
H13 | 0.2465 | −0.0729 | 0.0435 | 0.027 (3)* | |
C2 | 0.2905 (3) | 0.3307 (2) | 0.09280 (15) | 0.0247 (3) | |
H21 | 0.2217 | 0.2994 | 0.0114 | 0.033 (3)* | |
H22 | 0.4786 | 0.3299 | 0.0972 | 0.033 (3)* | |
H23 | 0.2305 | 0.4623 | 0.1149 | 0.033 (3)* |
U11 | U22 | U33 | U12 | U13 | U23 | |
S1 | 0.01277 (18) | 0.02359 (19) | 0.0170 (2) | −0.00180 (13) | 0.00161 (12) | −0.00362 (15) |
O1 | 0.0115 (5) | 0.0353 (6) | 0.0269 (6) | −0.0008 (4) | 0.0030 (4) | −0.0069 (5) |
C1 | 0.0159 (6) | 0.0194 (7) | 0.0209 (8) | 0.0003 (5) | 0.0030 (6) | 0.0000 (6) |
C2 | 0.0236 (7) | 0.0198 (7) | 0.0312 (9) | −0.0001 (6) | 0.0042 (6) | 0.0018 (6) |
S1—O1 | 1.5040 (10) | C1—H13 | 0.9800 |
S1—C1 | 1.7801 (14) | C2—H21 | 0.9800 |
S1—C2 | 1.7861 (15) | C2—H22 | 0.9800 |
C1—H11 | 0.9800 | C2—H23 | 0.9800 |
C1—H12 | 0.9800 | ||
O1—S1—C1 | 106.54 (6) | H12—C1—H13 | 109.5 |
O1—S1—C2 | 106.60 (7) | S1—C2—H21 | 109.5 |
C1—S1—C2 | 97.73 (7) | S1—C2—H22 | 109.5 |
S1—C1—H11 | 109.5 | H21—C2—H22 | 109.5 |
S1—C1—H12 | 109.5 | S1—C2—H23 | 109.5 |
H11—C1—H12 | 109.5 | H21—C2—H23 | 109.5 |
S1—C1—H13 | 109.5 | H22—C2—H23 | 109.5 |
H11—C1—H13 | 109.5 |
D—H···A | D—H | H···A | D···A | D—H···A |
C1—H11···O1i | 0.98 | 2.42 | 3.3318 (18) | 155 |
C1—H12···O1ii | 0.98 | 2.42 | 3.3184 (17) | 152 |
C1—H13···O1iii | 0.98 | 2.47 | 3.4450 (19) | 173 |
C2—H22···O1ii | 0.98 | 2.61 | 3.4618 (18) | 146 |
Symmetry codes: (i) −x, y−1/2, −z+1/2; (ii) x+1, y, z; (iii) −x, −y, −z. |
Thomas et al. (1966) | Ibberson (2005) | This work | |
Space group, Z | P21/c, 4 | P21/c, 4 | P21/c, 4 |
a (Å) | 5.303 (5) | 5.2390 (1) | 5.2243 (3) |
b (Å) | 6.829 (3) | 6.7581 (1) | 6.7414 (4) |
c (Å) | 11.693 (3) | 11.2696 (1) | 11.2772 (6) |
β (°) | 94.5 (3) | 94.8053 (3) | 94.820 (2) |
V (Å3) | 422.2 | 397.60 (1) | 395.77 (4) |
T (K) | 278 | 100 | 100 |
Sample | single crystal | powder | single crystal |
Radiation | Mo Kα | neutron | Mo Kα |
Technique | precession photographs | HRPD | CCDC |
R value | 7.4% | 3.77% | 2.4% |
Number of reflections | 777 | not given | 938 |
Number of parameters | not given | 93 | 41 |
H(D) atoms | constrained | refined | constrained |
d(S1—O1) (Å) | 1.531 (5) | 1.496 (2) | 1.5040 (10) |
d(S1—C1) (Å) | 1.775 (8) | 1.838 (3) | 1.7801 (14) |
d(S1—C2) (Å) | 1.821 (11) | 1.788 (3) | 1.7861 (15) |
O1—S1—C1 (°) | 106.7 (4) | 105.2 (2) | 106.54 (6) |
O1—S1—C2 (°) | 106.8 (4) | 108.3 (2) | 106.60 (7) |
C1—S1—C2 (°) | 97.4 (4) | 96.4 (1) | 97.73 (7) |
Acknowledgements
We thank the Deutsche Forschungsgemeinschaft and the Government of Lower-Saxony for funding the diffractometer and acknowledge support by Deutsche Forschungsgemeinschaft (DFG) and Open Access Publishing Fund of Osnabrück University.
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