Lotharmeyerite, Ca(Zn,Mn)2(AsO4)2(H2O,OH)2

Yang, Y.W.; Evans, S.H.; Downs, R.T.; Yang, H.

doi:10.1107/S1600536811054286

inorganic compounds

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ISSN: 2056-9890

Volume 68| Part 1| January 2012| Pages i9-i10

doi:10.1107/S1600536811054286

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Lotharmeyerite, Ca(Zn,Mn)₂(AsO₄)₂(H₂O,OH)₂

Yongbo W. Yang,^a ^* Stanley H. Evans,^b Robert T. Downs ^b and Hexiong Yang ^b

^aDepartment of Chemsitry and Biochemistry, University of Arizona, 1306 E. University Blvd., Tucson, Arizona 85721-0041, USA, and ^bDepartment of Geosciences, University of Arizona, 1040 E. 4th Street, Tucson, Arizona 85721-0077, USA
^*Correspondence e-mail: ywyang@email.arizona.edu

(Received 5 December 2011; accepted 16 December 2011; online 23 December 2011)

Lotharmeyerite, calcium bis(zinc/manganese) bis(arsenate) bis(hydroxide/hydrate), Ca(Zn,Mn³⁺)₂(AsO₄)₂(H₂O,OH)₂, is a member of the natrochalcite group of minerals, which are characterized by the general formula AM₂(XO₄)₂(H₂O,OH)₂, where A may be occupied by Pb²⁺, Ca²⁺, Na⁺, and Bi³⁺, M by Fe³⁺, Mn³⁺, Cu²⁺, Zn²⁺, Co²⁺, Ni²⁺, Al³⁺, and Mg²⁺, and X by P^V, As^V, V^V, and S^VI. The minerals in the group display either monoclinic or triclinic symmetry, depending on the ordering of chemical components in the M site. Based on single-crystal X-ray diffraction data of a sample from the type locality, Mapimi, Durango, Mexico, this study presents the first structure determination of lotharmeyerite. Lotharmeyerite is isostructural with natrochalcite and tsumcorite. The structure is composed of rutile-type chains of edge-shared MO₆ octahedra (site symmetry $[\overline1]$ ) extending along [010], which are interconnected by XO₄ tetrahedra (site symmetry 2) and hydrogen bonds to form [M₂(XO₄)₂(OH,H₂O)₂] sheets parallel to (001). These sheets are linked by the larger A cations (site symmetry 2/m), as well as by hydrogen bonds. Bond-valence sums for the M cation, calculated with the parameters for Mn³⁺ and Mn²⁺ are 2.72 and 2.94 v.u., respectively, consistent with the occupation of the M site by Mn³⁺. Two distinct hydrogen bonds are present, one with O⋯O = 2.610 (4) Å and the other O⋯O = 2.595 (3) Å. One of the H-atom positions is disordered over two sites with 50% occupancy, in agreement with observations for other natrochalcite-type minerals, such as natrochalcite and tsumcorite.

Related literature

For lotharmeyerite, see: Dunn (1983 ); Kampf et al. (1984 ); Brugger et al. (2002 ). For related minerals in the natrochalcite group, see: Tillmanns & Gebert (1973 ); Chevrier et al. (1993 ); Ansell et al. (1992 ); Krause et al. (1998 , 1999 , 2001 ); Brugger et al. (2000 , 2002). Parameters for bond-valence calculations were taken from Brese & O'Keeffe (1991 ). For additional information on related minerals, see: Ferraris & Ivaldi (1984 ); Krickl & Wildner (2007 ).

Experimental

Crystal data

Ca(Zn·Mn)₂(AsO₄)₂(H₂O·OH)₂
M_r = 474.14
Monoclinic,
a = 9.0727 (6) Å
b = 6.2530 (4) Å
c = 7.4150 (5) Å
β = 116.739 (4)°
V = 375.68 (4) Å³
Z = 2
Mo Kα radiation
μ = 14.38 mm⁻¹
T = 293 K
0.06 × 0.05 × 0.05 mm

Data collection

Bruker APEXII CCD area-detector diffractometer
Absorption correction: multi-scan [SADABS (Sheldrick, 2005 ) and XABS2 (Parkin et al., 1995 )] T_min = 0.477, T_max = 0.532
2512 measured reflections
739 independent reflections
659 reflections with I > 2σ(I)
R_int = 0.022

Refinement

R[F² > 2σ(F²)] = 0.019
wR(F²) = 0.045
S = 0.91
739 reflections
49 parameters
All H-atom parameters refined
Δρ_max = 0.81 e Å⁻³
Δρ_min = −0.77 e Å⁻³

Table 1
Hydrogen-bond geometry (Å, °)

D—H⋯A	D—H	H⋯A	D⋯A	D—H⋯A
O1—H1⋯O1ⁱ	0.82 (7)	1.79 (8)	2.610 (4)	177 (11)
O1—H2⋯O4ⁱⁱ	0.66 (5)	1.95 (5)	2.595 (3)	163 (6)
Symmetry codes: (i) ; (ii) $[-x+{\script{1\over 2}}, -y+{\script{1\over 2}}, -z]$ .

Data collection: APEX2 (Bruker, 2004 ); cell refinement: SAINT (Bruker, 2004); data reduction: SAINT; program(s) used to solve structure: SHELXS97 (Sheldrick, 2008 ); program(s) used to refine structure: SHELXL97 (Sheldrick, 2008); molecular graphics: XtalDraw (Downs & Hall-Wallace, 2003 ); software used to prepare material for publication: publCIF (Westrip, 2010 ).

Supporting information

Crystal structure: contains datablocks I, global. DOI: 10.1107/S1600536811054286/pk2375sup1.cif

Structure factors: contains datablock I. DOI: 10.1107/S1600536811054286/pk2375Isup2.hkl

checkCIF report

Comment top

The natrochalcite group of minerals is characterized by the general formula AM₂(XO₄)₂(H₂O,OH)₂, where currently it is observed that A = Pb, Ca, Na, and Bi, M = Fe³⁺, Mn³⁺, Cu²⁺, Zn²⁺, Co²⁺, Ni²⁺, Al³⁺, and Mg²⁺, and X = P⁵⁺, As⁵⁺, V⁵⁺, and S⁶⁺ (Krause et al., 1998, 2001; Brugger et al., 2000; 2002). The majority of minerals in this group crystallize in monoclinic C2/m symmetry and a few in triclinic P1 symmetry. In particular, monoclinic natrochalcite-group minerals with A = Ca and X = As can be further assigned to the lotharmeyerite subgroup, which includes six members: lotharmeyerite (M = Zn) (Dunn, 1983; Kampf et al., 1984; Brugger et al., 2002), ferrilotharmeyerite (M = Fe³⁺) (Ansell et al., 1992; Krause et al., 1998), cobaltlotharmeyerite (M = Co) (Krause et al., 1999), nickellotharmeyerite (M = Ni) (Krause et al., 2001), manganlotharmeyerite (M = Mn³⁺) (Brugger et al., 2002), and cabalzarite (M = Mg) (Brugger et al., 2000).

Lotharmeyerite from the Ojuela mine, Mapimi, Mexico was first described by Dunn (1983) with the chemical formula CaZnMn³⁺(AsO₄)₂(OH).2H₂O. This formula, however, was revised to CaZnMn³⁺(AsO₃OH)₂(OH)₃ by Kampf et al. (1984) on the basis of the infrared spectroscopic data measured on the specimen from the type locality. Unfortunately, due to the very small crystals in drusy growths, which gave somewhat diffuse and split spots on precession films, Kampf et al. (1984) only obtained the unit-cell parameters for this mineral: a = 9.066 (4), b = 6.276 (2), c = 7.408 (2) Å, β = 116.16 (3)°, V = 378.3 (4) Å³. From the structure refinement of ferrilotharmeyerite, the Fe³⁺ analogue of lotharmeyerite, Krause et al. (1998) proposed a new chemical formula for lotharmeyerite as Ca(Mn³⁺,Zn)₂(AsO₄)₂(OH,H₂O)₂. Yet, by defining lotharmeyerite and manganlotharmeyerite to represent the Zn- and Mn-dominant endmembers of the lotharmeyerite subgroup, Brugger et al. (2002) made another revision of the chemical formula of lotharmeyerite to Ca(Zn,Mn³⁺)₂(AsO₄)₂(H₂O,OH)₂ based on a new chemical analysis from a lotharmeyerite crystal from the type locality. Thus far, the crystal structures of all minerals, except lotharmeyerite, in the lotharmeyerite subgroup have been determined. This study reports the first structure refinement of lotharmeyerite from the type locality by means of single-crystal X-ray diffraction data.

Lotharmeyerite is isotypic with other monoclinic natrochalcite-group minerals (e.g., Tillmanns & Gebert, 1973; Chevrier et al., 1993; Krause et al., 1998, 1999, 2001; Brugger et al., 2000; 2002). Its structure is composed of rutile-type chains of edge-shared MO₆ octahedra extending along [010], which are interconnected by XO₄ tetrahedra and hydrogen bonds to form [M₂(XO₄)₂(OH,H₂O)₂] sheets parallel to (001) (Fig. 1). These sheets are linked together by the larger A cations, as well as hydrogen bonds. Bond-valence sums for the M cation, calculated with the parameters for Mn³⁺ and Mn²⁺ (Brese & O'Keeffe, 1991), are 2.72 and 2.94 v.u., respectively, consistent with the occupation of the M site by Mn³⁺ (Brugger et al. 2002).

The presence of protonated AsO₃OH groups was postulated for lotharmeyerite by Kampf et al. (1984) from the infrared spectral measurement and by analogy also for ferrilotharmeyerite by Ansell et al. (1992). According to Ferraris & Ivaldi (1984), a protonated AsO₃OH tetrahedron is generally distorted with the As—OH bond distance noticeably longer than the other three As—O bond distances. This appears to be the case for all monoclinic arsenate minerals in the natrochalcite-group, such as ferrilotharmeyerite, tsumcorite, mounanaite, gartrellite (Krause et al., 1998), cobaltlotharmeyerite (Krause et al. 1999), nickellotharmeyerite (Krause et al., 2001), and manganlotharmeyerite (Brugger et al., 2002). In all these minerals, the As—O2 bond distance is the longest within the AsO₄ group. However, from the crystal-chemical considerations, Krause et al. (1998) ruled out the likelihood for O2 being protonated, due to its coordination by one A, two M, and one X cations, which gives rise to a nearly ideal bond-valence sum (2.0 v.u.) for O2. Moreover, Krause et al. (1998) argued that a protonated AsO₃OH tetrahedron, in general, exhibits a decrease in the OH—As—O angles and an increase in the O—As—O angles, but they were unable to verify such a variation for the natrochalcite-group minerals. Our refinement on lotharmeyerite lends further support to the conclusion by Krause et al. (1998) that there is no evidence for the presence of the HAsO₄ group in this structure. Specifically, the As—O bond lengths in lotharmeyerite vary from 1.671 (2) to 1.698 (2) Å, with an average of 1.688 Å. No outstanding long As—O bond is observed. Considering the experimental uncertainties, the difference between the longest As—O2 and next longest As—O3 bond distances is essentially insignificant [1.698 (2) Å versus. 1.692 (1) Å]. Furthermore, the O2—As—O3 and O2—As—O4 angles are 111.60 (6) and 101.87 (11)°, respectively, which are compared to the O3—As—O3 and O3—As—O4 angles of 108.93 (10) and 111.37 (7)°, respectively. The calculated bond-valence sum for O2 in lotharmeyerite is 1.94 v.u.

Two distinct hydrogen bonds are present in lotharmeyerite, one between symmetry related O1 atoms [(x, y, z) and (1-z, y, 1-z)] and the other between O1 and O4 [at (x, y, z) and (0.5-x, 0.5+y, -z) respectively]. However, our refined H1 position is not half way between the two O1 atoms, indicating a non-centric, i.e. split position of the H1 atom. Similar results have been observed in other natrochalcite-type minerals, such as natrochalcite NaCu₂(SO₄)₂(OH).H₂O (Chevrier et al., 1993), cabalzerite CaMg₂(AsO₄)₂.2H₂O (Brugger et al. 2000), and synthetic Co- and Ni-analogs of natrochalcite (Krickl & Wildner, 2007). Such a hydrogen bonding scheme has also been discussed in detail by Tillmanns & Gebert (1973), Krause et al. (1998, 1999, 2001), and Brugger et al. (2002).

Related literature top

For lotharmeyerite, see: Dunn (1983); Kampf et al. (1984); Brugger et al. (2002). For related minerals in the natrochalcite group, see: Tillmanns & Gebert (1973); Chevrier et al. (1993); Ansell et al. (1992); Krause et al. (1998, 1999, 2001); Brugger et al. (2000, 2002). Parameters for bond-valence calculations were taken from Brese & O'Keeffe (1991). For additional information on related minerals, see: Ferraris & Ivaldi (1984); Krickl & Wildner (2007).

Experimental top

The lotharmeyerite crystal used in this study is from the type locality Mapimi, Durango, Mexico and is in the collection of the RRUFF project (deposition No. R060682; http://rruff.info). The experimental chemical composition, Ca_0.99(Zn_1.01Mn³⁺_0.85)(As_1.03O₄)₂(H₂O,OH)₂, was determined with a CAMECA SX100 electron microprobe at the conditions of 15 kV, 10 nA, and a beam size of 5 µm (http//rruff.info).

Computing details top

Data collection: APEX2 (Bruker, 2004); cell refinement: SAINT (Bruker, 2004); data reduction: SAINT (Bruker, 2004); program(s) used to solve structure: SHELXS97 (Sheldrick, 2008); program(s) used to refine structure: SHELXL97 (Sheldrick, 2008); molecular graphics: XtalDraw (Downs & Hall-Wallace, 2003); software used to prepare material for publication: publCIF (Westrip, 2010).

Figures top

Fig. 1. Crystal structure of lotharmeyerite. The large green and small blue spheres represent Ca and H atoms, respectively. The yellow octahedra and red tetrahedra represent MO₄(H₂O,OH)₂ and AsO₄ groups.

calcium bis(zinc/manganese) bis(arsenate) bis(hydroxide/hydrate) top

Crystal data top

Ca(Zn·Mn)₂(AsO₄)₂(H₂O·OH)₂	F(000) = 448
M_r = 474.14	D_x = 4.186 Mg m⁻³
Monoclinic, C2/m	Mo Kα radiation, λ = 0.71073 Å
Hall symbol: -C 2y	Cell parameters from 1568 reflections
a = 9.0727 (6) Å	θ = 4.0–29.5°
b = 6.2530 (4) Å	µ = 14.38 mm⁻¹
c = 7.4150 (5) Å	T = 293 K
β = 116.739 (4)°	Cube, brown
V = 375.68 (4) Å³	0.06 × 0.05 × 0.05 mm
Z = 2

Data collection top

Bruker APEXII CCD area-detector diffractometer	739 independent reflections
Radiation source: fine-focus sealed tube	659 reflections with I > 2σ(I)
Graphite monochromator	R_int = 0.022
ϕ and ω scan	θ_max = 32.6°, θ_min = 3.1°
Absorption correction: multi-scan [SADABS (Sheldrick, 2005) and XABS2 (Parkin et al., 1995)]	h = −13→13
T_min = 0.477, T_max = 0.532	k = −8→9
2512 measured reflections	l = −11→8

Refinement top

Refinement on F²	Secondary atom site location: difference Fourier map
Least-squares matrix: full	Hydrogen site location: difference Fourier map
R[F² > 2σ(F²)] = 0.019	All H-atom parameters refined
wR(F²) = 0.045	w = 1/[σ²(F_o²) + (0.030P)²] where P = (F_o² + 2F_c²)/3
S = 0.91	(Δ/σ)_max < 0.001
739 reflections	Δρ_max = 0.81 e Å⁻³
49 parameters	Δρ_min = −0.77 e Å⁻³
0 restraints	Extinction correction: SHELXL97 (Sheldrick, 2008), Fc^*=kFc[1+0.001xFc²λ³/sin(2θ)]^-1/4
Primary atom site location: structure-invariant direct methods	Extinction coefficient: 0

Crystal data top

Ca(Zn·Mn)₂(AsO₄)₂(H₂O·OH)₂	V = 375.68 (4) Å³
M_r = 474.14	Z = 2
Monoclinic, C2/m	Mo Kα radiation
a = 9.0727 (6) Å	µ = 14.38 mm⁻¹
b = 6.2530 (4) Å	T = 293 K
c = 7.4150 (5) Å	0.06 × 0.05 × 0.05 mm
β = 116.739 (4)°

Data collection top

Bruker APEXII CCD area-detector diffractometer	739 independent reflections
Absorption correction: multi-scan [SADABS (Sheldrick, 2005) and XABS2 (Parkin et al., 1995)]	659 reflections with I > 2σ(I)
T_min = 0.477, T_max = 0.532	R_int = 0.022
2512 measured reflections

Refinement top

R[F² > 2σ(F²)] = 0.019	0 restraints
wR(F²) = 0.045	All H-atom parameters refined
S = 0.91	Δρ_max = 0.81 e Å⁻³
739 reflections	Δρ_min = −0.77 e Å⁻³
49 parameters

Special details top

Geometry. All e.s.d.'s (except the e.s.d. in the dihedral angle between two l.s. planes) are estimated using the full covariance matrix. The cell e.s.d.'s are taken into account individually in the estimation of e.s.d.'s in distances, angles and torsion angles; correlations between e.s.d.'s in cell parameters are only used when they are defined by crystal symmetry. An approximate (isotropic) treatment of cell e.s.d.'s is used for estimating e.s.d.'s involving l.s. planes.

Refinement. Refinement of F² against ALL reflections. The weighted R-factor wR and goodness of fit S are based on F², conventional R-factors R are based on F, with F set to zero for negative F². The threshold expression of F² > σ(F²) is used only for calculating R-factors(gt) etc. and is not relevant to the choice of reflections for refinement. R-factors based on F² are statistically about twice as large as those based on F, and R- factors based on ALL data will be even larger.

Fractional atomic coordinates and isotropic or equivalent isotropic displacement parameters (Å²) top

	x	y	z	U_iso*/U_eq	Occ. (<1)
Ca1	0.0000	0.0000	0.0000	0.01360 (16)
Zn1	0.2500	0.2500	0.5000	0.00936 (11)	0.512 (8)
Mn1	0.2500	0.2500	0.5000	0.00936 (11)	0.488 (8)
As1	0.41579 (3)	0.0000	0.20474 (4)	0.00864 (9)
O1	0.3390 (3)	0.5000	0.4132 (3)	0.0140 (4)
O2	0.3182 (3)	0.0000	0.3536 (3)	0.0153 (4)
O3	0.03469 (18)	0.2798 (2)	0.2437 (2)	0.0127 (3)
O4	0.2569 (3)	0.0000	−0.0265 (3)	0.0199 (5)
H1	0.440 (9)	0.5000	0.464 (16)	0.040*	0.50
H2	0.298 (6)	0.5000	0.313 (7)	0.040*

Atomic displacement parameters (Å²) top

	U¹¹	U²²	U³³	U¹²	U¹³	U²³
Ca1	0.0185 (4)	0.0120 (3)	0.0108 (4)	0.000	0.0070 (3)	0.000
Zn1	0.00931 (18)	0.00899 (16)	0.0080 (2)	0.00002 (10)	0.00232 (14)	−0.00002 (11)
Mn1	0.00931 (18)	0.00899 (16)	0.0080 (2)	0.00002 (10)	0.00232 (14)	−0.00002 (11)
As1	0.00787 (14)	0.00860 (12)	0.00895 (16)	0.000	0.00336 (11)	0.000
O1	0.0098 (10)	0.0201 (10)	0.0092 (11)	0.000	0.0017 (8)	0.000
O2	0.0192 (11)	0.0116 (8)	0.0220 (12)	0.000	0.0155 (10)	0.000
O3	0.0122 (7)	0.0110 (6)	0.0146 (8)	0.0023 (5)	0.0057 (6)	−0.0005 (5)
O4	0.0150 (11)	0.0294 (12)	0.0111 (11)	0.000	0.0020 (9)	0.000

Geometric parameters (Å, º) top

Ca1—O4ⁱ	2.426 (2)	Zn1—O1	1.9940 (14)
Ca1—O4	2.426 (2)	Zn1—O3^iv	2.0303 (15)
Ca1—O3	2.4318 (14)	Zn1—O3	2.0303 (15)
Ca1—O3ⁱ	2.4318 (14)	Zn1—O2^iv	2.1468 (14)
Ca1—O3ⁱⁱ	2.4318 (14)	Zn1—O2	2.1468 (14)
Ca1—O3ⁱⁱⁱ	2.4318 (14)	As1—O4	1.671 (2)
Ca1—O2	2.898 (2)	As1—O3^v	1.6918 (13)
Ca1—O2ⁱ	2.898 (2)	As1—O3^vi	1.6918 (13)
Zn1—O1^iv	1.9940 (14)	As1—O2	1.698 (2)

O4ⁱ—Ca1—O4	180.00 (10)	O3ⁱⁱ—Ca1—O2ⁱ	114.55 (4)
O4ⁱ—Ca1—O3	75.38 (5)	O3ⁱⁱⁱ—Ca1—O2ⁱ	65.45 (4)
O4—Ca1—O3	104.62 (5)	O2—Ca1—O2ⁱ	180.00 (9)
O4ⁱ—Ca1—O3ⁱ	104.62 (5)	O1^iv—Zn1—O1	180.0
O4—Ca1—O3ⁱ	75.38 (5)	O1^iv—Zn1—O3^iv	89.12 (7)
O3—Ca1—O3ⁱ	180.00 (7)	O1—Zn1—O3^iv	90.88 (7)
O4ⁱ—Ca1—O3ⁱⁱ	75.38 (5)	O1^iv—Zn1—O3	90.88 (7)
O4—Ca1—O3ⁱⁱ	104.62 (5)	O1—Zn1—O3	89.12 (7)
O3—Ca1—O3ⁱⁱ	92.03 (7)	O3^iv—Zn1—O3	180.0
O3ⁱ—Ca1—O3ⁱⁱ	87.97 (7)	O1^iv—Zn1—O2^iv	99.04 (6)
O4ⁱ—Ca1—O3ⁱⁱⁱ	104.62 (5)	O1—Zn1—O2^iv	80.96 (6)
O4—Ca1—O3ⁱⁱⁱ	75.38 (5)	O3^iv—Zn1—O2^iv	88.18 (7)
O3—Ca1—O3ⁱⁱⁱ	87.97 (7)	O3—Zn1—O2^iv	91.82 (7)
O3ⁱ—Ca1—O3ⁱⁱⁱ	92.03 (7)	O1^iv—Zn1—O2	80.96 (6)
O3ⁱⁱ—Ca1—O3ⁱⁱⁱ	180.00 (12)	O1—Zn1—O2	99.04 (6)
O4ⁱ—Ca1—O2	121.94 (7)	O3^iv—Zn1—O2	91.82 (7)
O4—Ca1—O2	58.06 (7)	O3—Zn1—O2	88.18 (7)
O3—Ca1—O2	65.45 (4)	O2^iv—Zn1—O2	180.0
O3ⁱ—Ca1—O2	114.55 (4)	O4—As1—O3^v	111.37 (7)
O3ⁱⁱ—Ca1—O2	65.45 (4)	O4—As1—O3^vi	111.37 (7)
O3ⁱⁱⁱ—Ca1—O2	114.55 (4)	O3^v—As1—O3^vi	108.93 (10)
O4ⁱ—Ca1—O2ⁱ	58.06 (7)	O4—As1—O2	101.87 (11)
O4—Ca1—O2ⁱ	121.94 (7)	O3^v—As1—O2	111.60 (6)
O3—Ca1—O2ⁱ	114.55 (4)	O3^vi—As1—O2	111.60 (6)
O3ⁱ—Ca1—O2ⁱ	65.45 (4)

Symmetry codes: (i) −x, −y, −z; (ii) x, −y, z; (iii) −x, y, −z; (iv) −x+1/2, −y+1/2, −z+1; (v) x+1/2, −y+1/2, z; (vi) x+1/2, y−1/2, z.

Hydrogen-bond geometry (Å, º) top

D—H···A	D—H	H···A	D···A	D—H···A
O1—H1···O1^vii	0.82 (7)	1.79 (8)	2.610 (4)	177 (11)
O1—H2···O4^viii	0.66 (5)	1.95 (5)	2.595 (3)	163 (6)

Symmetry codes: (vii) −x+1, −y+1, −z+1; (viii) −x+1/2, −y+1/2, −z.

Experimental details

Crystal data
Chemical formula	Ca(Zn·Mn)₂(AsO₄)₂(H₂O·OH)₂
M_r	474.14
Crystal system, space group	Monoclinic, C2/m
Temperature (K)	293
a, b, c (Å)	9.0727 (6), 6.2530 (4), 7.4150 (5)
β (°)	116.739 (4)
V (Å³)	375.68 (4)
Z	2
Radiation type	Mo Kα
µ (mm⁻¹)	14.38
Crystal size (mm)	0.06 × 0.05 × 0.05

Data collection
Diffractometer	Bruker APEXII CCD area-detector diffractometer
Absorption correction	Multi-scan [SADABS (Sheldrick, 2005) and XABS2 (Parkin et al., 1995)]
T_min, T_max	0.477, 0.532
No. of measured, independent and observed [I > 2σ(I)] reflections	2512, 739, 659
R_int	0.022
(sin θ/λ)_max (Å⁻¹)	0.757

Refinement
R[F² > 2σ(F²)], wR(F²), S	0.019, 0.045, 0.91
No. of reflections	739
No. of parameters	49
H-atom treatment	All H-atom parameters refined
Δρ_max, Δρ_min (e Å⁻³)	0.81, −0.77

Computer programs: APEX2 (Bruker, 2004), SAINT (Bruker, 2004), SHELXS97 (Sheldrick, 2008), SHELXL97 (Sheldrick, 2008), XtalDraw (Downs & Hall-Wallace, 2003), publCIF (Westrip, 2010).

Hydrogen-bond geometry (Å, º) top

D—H···A	D—H	H···A	D···A	D—H···A
O1—H1···O1ⁱ	0.82 (7)	1.79 (8)	2.610 (4)	177 (11)
O1—H2···O4ⁱⁱ	0.66 (5)	1.95 (5)	2.595 (3)	163 (6)

Symmetry codes: (i) −x+1, −y+1, −z+1; (ii) −x+1/2, −y+1/2, −z.

Acknowledgements

The authors gratefully acknowledge support of this study by the Arizona Science Foundation.

References

Ansell, G. H., Roberts, A. C., Dunn, P. J., Birch, W. D., Ansell, V. E. & Grice, J. D. (1992). Can. Mineral. 30, 225–227. CAS Google Scholar
Brese, N. E. & O'Keeffe, M. (1991). Acta Cryst. B47, 192–197. CrossRef CAS Web of Science IUCr Journals Google Scholar
Brugger, J., Krivovichev, S. V., Kolitsch, U., Meisser, N., Andrut, M., Ansermet, S. & Burns, P. C. (2002). Can. Mineral. 40, 1597–1608. Web of Science CrossRef CAS Google Scholar
Brugger, J., Meisser, N., Schenk, K., Berlepsch, P., Bonin, M., Armbruster, T., Nyfeler, D. & Schmidt, S. (2000). Am. Mineral. 85, 1307–1314. CAS Google Scholar
Bruker (2004). APEX2 and SAINT. Bruker AXS Inc., Madison, Wisconsin, USA. Google Scholar
Chevrier, G., Giester, G. & Zemann, J. (1993). Z. Kristallogr. 206, 7–14. CrossRef CAS Web of Science Google Scholar
Downs, R. T. & Hall-Wallace, M. (2003). Am. Mineral. 88, 247–250. CAS Google Scholar
Dunn, P. J. (1983). Mineral. Rec, 14, 35–36. CAS Google Scholar
Ferraris, G. & Ivaldi, G. (1984). Acta Cryst. B40, 1–6. CrossRef CAS Web of Science IUCr Journals Google Scholar
Kampf, A. R., Shigley, J. E. & Rossman, G. R. (1984). Mineral. Rec, 15, 223–226. CAS Google Scholar
Krause, W., Belendorff, K., Bernhardt, H. J., McCammon, C. A., Effenberger, H. & Mikenda, W. (1998). Eur. J. Mineral. 10, 179–206. CAS Google Scholar
Krause, W., Bernhardt, H. J., Effenberger, H. & Martin, M. (2001). Neues Jahr. Mineral. Monatsh. 2001, 558–576. Google Scholar
Krause, W., Effenberger, H., Bernhardt, H. J. & Martin, M. (1999). Neues Jahr. Mineral. Monatsh. 1999, 505–517. Google Scholar
Krickl, R. & Wildner, M. (2007). Eur. J. Mineral. 19, 805–816. CrossRef CAS Google Scholar
Parkin, S., Moezzi, B. & Hope, H. (1995). J. Appl. Cryst. 28, 53–56. CrossRef CAS Web of Science IUCr Journals Google Scholar
Sheldrick, G. M. (2005). SADABS. University of Göttingen, Germany. Google Scholar
Sheldrick, G. M. (2008). Acta Cryst. A64, 112–122. Web of Science CrossRef CAS IUCr Journals Google Scholar
Tillmanns, E. & Gebert, W. (1973). Acta Cryst. B29, 2789–2794. CrossRef CAS IUCr Journals Web of Science Google Scholar
Westrip, S. P. (2010). J. Appl. Cryst. 43, 920–925. Web of Science CrossRef CAS IUCr Journals Google Scholar