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X−	NaX	AgX
F	464	492
Cl	564	555
Br	598	577
Unit cell parameters (in pm, equal to two M–X bond lengths) for sodium and silver halides. All compounds crystallize in the NaCl structure.

Ions may be larger or smaller than the neutral atom, depending on the ion's electric charge. When an atom loses an electron to form a cation, the other electrons are more attracted to the nucleus, and the radius of the ion gets smaller. Similarly, when an electron is added to an atom, forming an anion, the added electron increases the size of the electron cloud by interelectronic repulsion.

The ionic radius is not a fixed property of a given ion, but varies with coordination number, spin state and other parameters. Nevertheless, ionic radius values are sufficiently transferable to allow periodic trends to be recognized. As with other types of atomic radius, ionic radii increase on descending a group. Ionic size (for the same ion) also increases with increasing coordination number, and an ion in a high-spin state will be larger than the same ion in a low-spin state. In general, ionic radius decreases with increasing positive charge and increases with increasing negative charge.

An "anomalous" ionic radius in a crystal is often a sign of significant covalent character in the bonding. No bond is completely ionic, and some supposedly "ionic" compounds, especially of the transition metals, are particularly covalent in character. This is illustrated by the unit cell parameters for sodium and silver halides in the table. On the basis of the fluorides, one would say that Ag+ is larger than Na+, but on the basis of the chlorides and bromides the opposite appears to be true.¹ This is because the greater covalent character of the bonds in AgCl and AgBr reduces the bond length and hence the apparent ionic radius of Ag+, an effect which is not present in the halides of the more electropositive sodium, nor in silver fluoride in which the fluoride ion is relatively unpolarizable.

Determination

The distance between two ions in an ionic crystal can be determined by X-ray crystallography, which gives the lengths of the sides of the unit cell of a crystal. For example, the length of each edge of the unit cell of sodium chloride is found to be 564.02 pm. Each edge of the unit cell of sodium chloride may be considered to have the atoms arranged as Na+∙∙∙Cl−∙∙∙Na+, so the edge is twice the Na-Cl separation. Therefore, the distance between the Na+ and Cl− ions is half of 564.02 pm, which is 282.01 pm. However, although X-ray crystallography gives the distance between ions, it doesn't indicate where the boundary is between those ions, so it doesn't directly give ionic radii.

Landé² estimated ionic radii by considering crystals in which the anion and cation have a large difference in size, such as LiI. The lithium ions are so much smaller than the iodide ions that the lithium fits into holes within the crystal lattice, allowing the iodide ions to touch. That is, the distance between two neighboring iodides in the crystal is assumed to be twice the radius of the iodide ion, which was deduced to be 214 pm. This value can be used to determine other radii. For example, the inter-ionic distance in RbI is 356 pm, giving 142 pm for the ionic radius of Rb+. In this way values for the radii of 8 ions were determined.

Wasastjerna estimated ionic radii by considering the relative volumes of ions as determined from electrical polarizability as determined by measurements of refractive index.³ These results were extended by Victor Goldschmidt.⁴ Both Wasastjerna and Goldschmidt used a value of 132 pm for the O2− ion.

Pauling used effective nuclear charge to proportion the distance between ions into anionic and a cationic radii.⁵ His data gives the O2− ion a radius of 140 pm.

A major review of crystallographic data led to the publication of revised ionic radii by Shannon.⁶ Shannon gives different radii for different coordination numbers, and for high and low spin states of the ions. To be consistent with Pauling's radii, Shannon has used a value of rion(O2−) = 140 pm; data using that value are referred to as "effective" ionic radii. However, Shannon also includes data based on rion(O2−) = 126 pm; data using that value are referred to as "crystal" ionic radii. Shannon states that "it is felt that crystal radii correspond more closely to the physical size of ions in a solid."⁷ The two sets of data are listed in the two tables below.

Tables

Crystal ionic radii in pm of elements as a function of ionic charge and spin (ls = low spin, hs = high spin). Ions are 6-coordinate unless indicated differently in parentheses (e.g. "146 (4)" for 4-coordinate N3−).⁸

Number	Name	Symbol	3−	2−	1−	1+	2+	3+	4+	5+	6+	7+	8+
1	Hydrogen	H			208	−4 (2)
3	Lithium	Li				90
4	Beryllium	Be					59
5	Boron	B						41
6	Carbon	C							30
7	Nitrogen	N	132 (4)					30		27
8	Oxygen	O		126
9	Fluorine	F			119							22
11	Sodium	Na				116
12	Magnesium	Mg					86
13	Aluminium	Al						67.5
14	Silicon	Si							54
15	Phosphorus	P						58		52
16	Sulfur	S		170					51		43
17	Chlorine	Cl			167					26 (3py)		41
19	Potassium	K				152
20	Calcium	Ca					114
21	Scandium	Sc						88.5
22	Titanium	Ti					100	81	74.5
23	Vanadium	V					93	78	72	68
24	Chromium ls	Cr					87	75.5	69	63	58
24	Chromium hs	Cr					94
25	Manganese ls	Mn					81	72	67	47 (4)	39.5 (4)	60
25	Manganese hs	Mn					97	78.5
26	Iron ls	Fe					75	69	72.5		39 (4)
26	Iron hs	Fe					92	78.5
27	Cobalt ls	Co					79	68.5
27	Cobalt hs	Co					88.5	75	67
28	Nickel ls	Ni					83	70	62
28	Nickel hs	Ni						74
29	Copper	Cu				91	87	68 ls
30	Zinc	Zn					88
31	Gallium	Ga						76
32	Germanium	Ge					87		67
33	Arsenic	As						72		60
34	Selenium	Se		184					64		56
35	Bromine	Br			182			73 (4sq)		45 (3py)		53
37	Rubidium	Rb				166
38	Strontium	Sr					132
39	Yttrium	Y						104
40	Zirconium	Zr							86
41	Niobium	Nb						86	82	78
42	Molybdenum	Mo						83	79	75	73
43	Technetium	Tc							78.5	74		70
44	Ruthenium	Ru						82	76	70.5		52 (4)	50 (4)
45	Rhodium	Rh						80.5	74	69
46	Palladium	Pd				73 (2)	100	90	75.5
47	Silver	Ag				129	108	89
48	Cadmium	Cd					109
49	Indium	In						94
50	Tin	Sn							83
51	Antimony	Sb						90		74
52	Tellurium	Te		207					111		70
53	Iodine	I			206					109		67
54	Xenon	Xe											62
55	Caesium	Cs				181
56	Barium	Ba					149
57	Lanthanum	La						117.2
58	Cerium	Ce						115	101
59	Praseodymium	Pr						113	99
60	Neodymium	Nd					143 (8)	112.3
61	Promethium	Pm						111
62	Samarium	Sm					136 (7)	109.8
63	Europium	Eu					131	108.7
64	Gadolinium	Gd						107.8
65	Terbium	Tb						106.3	90
66	Dysprosium	Dy					121	105.2
67	Holmium	Ho						104.1
68	Erbium	Er						103
69	Thulium	Tm					117	102
70	Ytterbium	Yb					116	100.8
71	Lutetium	Lu						100.1
72	Hafnium	Hf							85
73	Tantalum	Ta						86	82	78
74	Tungsten	W							80	76	74
75	Rhenium	Re							77	72	69	67
76	Osmium	Os							77	71.5	68.5	66.5	53 (4)
77	Iridium	Ir						82	76.5	71
78	Platinum	Pt					94		76.5	71
79	Gold	Au				151		99		71
80	Mercury	Hg				133	116
81	Thallium	Tl				164		102.5
82	Lead	Pb					133		91.5
83	Bismuth	Bi						117		90
84	Polonium	Po							108		81
85	Astatine	At										76
87	Francium	Fr				194
88	Radium	Ra					162 (8)
89	Actinium	Ac						126
90	Thorium	Th							108
91	Protactinium	Pa						116	104	92
92	Uranium	U						116.5	103	90	87
93	Neptunium	Np					124	115	101	89	86	85
94	Plutonium	Pu						114	100	88	85
95	Americium	Am					140 (8)	111.5	99
96	Curium	Cm						111	99
97	Berkelium	Bk						110	97
98	Californium	Cf						109	96.1
99	Einsteinium	Es						92.89

Effective ionic radii in pm of elements as a function of ionic charge and spin (ls = low spin, hs = high spin). Ions are 6-coordinate unless indicated differently in parentheses (e.g. "146 (4)" for 4-coordinate N3−).¹⁰

Number	Name	Symbol	3−	2−	1−	1+	2+	3+	4+	5+	6+	7+	8+
1	Hydrogen	H			139.9	−18 (2)
3	Lithium	Li				76
4	Beryllium	Be					45
5	Boron	B						27
6	Carbon	C							16
7	Nitrogen	N	146 (4)					16		13
8	Oxygen	O		140
9	Fluorine	F			133							8
11	Sodium	Na				102
12	Magnesium	Mg					72
13	Aluminium	Al						53.5
14	Silicon	Si							40
15	Phosphorus	P	21211					44		38
16	Sulfur	S		184					37		29
17	Chlorine	Cl			181					12 (3py)		27
19	Potassium	K				138
20	Calcium	Ca					100
21	Scandium	Sc						74.5
22	Titanium	Ti					86	67	60.5
23	Vanadium	V					79	64	58	54
24	Chromium ls	Cr					73	61.5	55	49	44
24	Chromium hs	Cr					80
25	Manganese ls	Mn					67	58	53	33 (4)	25.5 (4)	46
25	Manganese hs	Mn					83	64.5
26	Iron ls	Fe					61	55	58.5		25 (4)
26	Iron hs	Fe					78	64.5
27	Cobalt ls	Co					65	54.5
27	Cobalt hs	Co					74.5	61	53
28	Nickel ls	Ni					69	56	48
28	Nickel hs	Ni						60
29	Copper	Cu				77	73	54 ls
30	Zinc	Zn					74
31	Gallium	Ga						62
32	Germanium	Ge					73		53
33	Arsenic	As						58		46
34	Selenium	Se		198					50		42
35	Bromine	Br			196			59 (4sq)		31 (3py)		39
37	Rubidium	Rb				152
38	Strontium	Sr					118
39	Yttrium	Y						90
40	Zirconium	Zr							72
41	Niobium	Nb						72	68	64
42	Molybdenum	Mo						69	65	61	59
43	Technetium	Tc							64.5	60		56
44	Ruthenium	Ru						68	62	56.5		38 (4)	36 (4)
45	Rhodium	Rh						66.5	60	55
46	Palladium	Pd				59 (2)	86	76	61.5
47	Silver	Ag				115	94	75
48	Cadmium	Cd					95
49	Indium	In						80
50	Tin	Sn					10212		69
51	Antimony	Sb						76		60
52	Tellurium	Te		221					97		56
53	Iodine	I			220					95		53
54	Xenon	Xe											48
55	Caesium	Cs				167
56	Barium	Ba					135
57	Lanthanum	La						103.2
58	Cerium	Ce						101	87
59	Praseodymium	Pr						99	85
60	Neodymium	Nd					129 (8)	98.3
61	Promethium	Pm						97
62	Samarium	Sm					122 (7)	95.8
63	Europium	Eu					117	94.7
64	Gadolinium	Gd						93.5
65	Terbium	Tb						92.3	76
66	Dysprosium	Dy					107	91.2
67	Holmium	Ho						90.1
68	Erbium	Er						89
69	Thulium	Tm					103	88
70	Ytterbium	Yb					102	86.8
71	Lutetium	Lu						86.1
72	Hafnium	Hf							71
73	Tantalum	Ta						72	68	64
74	Tungsten	W							66	62	60
75	Rhenium	Re							63	58	55	53
76	Osmium	Os							63	57.5	54.5	52.5	39 (4)
77	Iridium	Ir						68	62.5	57
78	Platinum	Pt					80		62.5	57
79	Gold	Au				137		85		57
80	Mercury	Hg				119	102
81	Thallium	Tl				150		88.5
82	Lead	Pb					119		77.5
83	Bismuth	Bi						103		76
84	Polonium	Po		22313					94		67
85	Astatine	At										62
87	Francium	Fr				180
88	Radium	Ra					148 (8)
89	Actinium	Ac						106.5 (6)122.0 (9)14
90	Thorium	Th							94
91	Protactinium	Pa						104	90	78
92	Uranium	U						102.5	89	76	73
93	Neptunium	Np					110	101	87	75	72	71
94	Plutonium	Pu						100	86	74	71
95	Americium	Am					126 (8)	97.5	85
96	Curium	Cm						97	85
97	Berkelium	Bk						96	83
98	Californium	Cf						95	82.1
99	Einsteinium	Es						83.515

Soft-sphere model

Soft-sphere ionic radii (in pm) of some ions

Cation, M	RM	Anion, X	RX
Li+	109.4	Cl−	218.1
Na+	149.7	Br−	237.2

For many compounds, the model of ions as hard spheres does not reproduce the distance between ions, d m x {\displaystyle {d_{mx}}} , to the accuracy with which it can be measured in crystals. One approach to improving the calculated accuracy is to model ions as "soft spheres" that overlap in the crystal. Because the ions overlap, their separation in the crystal will be less than the sum of their soft-sphere radii.¹⁶

The relation between soft-sphere ionic radii, r m {\displaystyle {r_{m}}} and r x {\displaystyle {r_{x}}} , and d m x {\displaystyle {d_{mx}}} , is given by

d m x k = r m k + r x k {\displaystyle {d_{mx}}^{k}={r_{m}}^{k}+{r_{x}}^{k}} ,

where k {\displaystyle k} is an exponent that varies with the type of crystal structure. In the hard-sphere model, k {\displaystyle k} would be 1, giving d m x = r m + r x {\displaystyle {d_{mx}}={r_{m}}+{r_{x}}} .

Comparison between observed and calculated ion separations (in pm)

MX	Observed	Soft-sphere model
LiCl	257.0	257.2
LiBr	275.1	274.4
NaCl	282.0	281.9
NaBr	298.7	298.2

In the soft-sphere model, k {\displaystyle k} has a value between 1 and 2. For example, for crystals of group 1 halides with the sodium chloride structure, a value of 1.6667 gives good agreement with experiment. Some soft-sphere ionic radii are in the table. These radii are larger than the crystal radii given above (Li+, 90 pm; Cl−, 167 pm). Inter-ionic separations calculated with these radii give remarkably good agreement with experimental values. Some data are given in the table. Curiously, no theoretical justification for the equation containing k {\displaystyle k} has been given.

Non-spherical ions

The concept of ionic radii is based on the assumption of a spherical ion shape. However, from a group-theoretical point of view the assumption is only justified for ions that reside on high-symmetry crystal lattice sites like Na and Cl in halite or Zn and S in sphalerite. A clear distinction can be made, when the point symmetry group of the respective lattice site is considered,¹⁷ which are the cubic groups Oh and Td in NaCl and ZnS. For ions on lower-symmetry sites significant deviations of their electron density from a spherical shape may occur. This holds in particular for ions on lattice sites of polar symmetry, which are the crystallographic point groups C1, C1h, Cn or Cnv, n = 2, 3, 4 or 6.¹⁸ A thorough analysis of the bonding geometry was recently carried out for pyrite-type compounds, where monovalent chalcogen ions reside on C3 lattice sites. It was found that chalcogen ions have to be modeled by ellipsoidal charge distributions with different radii along the symmetry axis and perpendicular to it.¹⁹

See also

• Atomic orbital
• Atomic radii of the elements
• Born equation
• Covalent radius
• Electride
• Ionic potential
• Ionic radius ratio
• Pauling's rules
• Stokes radius
• Van der Waals radius

External links

• Aqueous Simple Electrolytes Solutions, H. L. Friedman, Felix Franks

References

1. On the basis of conventional ionic radii, Ag+ (129 pm) is indeed larger than Na+ (116 pm) ↩

2. Landé, A. (1920). "Über die Größe der Atome". Zeitschrift für Physik. 1 (3): 191–197. Bibcode:1920ZPhy....1..191L. doi:10.1007/BF01329165. S2CID 124873960. Archived from the original on 3 February 2013. Retrieved 1 June 2011. https://archive.today/20130203054518/http://springerlink.com/content/j862631p43032333/ ↩

3. Wasastjerna, J. A. (1923). "On the radii of ions". Comm. Phys.-Math., Soc. Sci. Fenn. 1 (38): 1–25. ↩

4. Goldschmidt, V. M. (1926). Geochemische Verteilungsgesetze der Elemente. Skrifter Norske Videnskaps—Akad. Oslo, (I) Mat. Natur. This is an 8 volume set of books by Goldschmidt. ↩

5. Pauling, L. (1960). The Nature of the Chemical Bond (3rd Edn.). Ithaca, NY: Cornell University Press. /wiki/Linus_Pauling ↩

6. R. D. Shannon (1976). "Revised effective ionic radii and systematic studies of interatomic distances in halides and chalcogenides". Acta Crystallogr A. 32 (5): 751–767. Bibcode:1976AcCrA..32..751S. doi:10.1107/S0567739476001551. https://doi.org/10.1107%2FS0567739476001551 ↩

7. R. D. Shannon (1976). "Revised effective ionic radii and systematic studies of interatomic distances in halides and chalcogenides". Acta Crystallogr A. 32 (5): 751–767. Bibcode:1976AcCrA..32..751S. doi:10.1107/S0567739476001551. https://doi.org/10.1107%2FS0567739476001551 ↩

8. R. D. Shannon (1976). "Revised effective ionic radii and systematic studies of interatomic distances in halides and chalcogenides". Acta Crystallogr A. 32 (5): 751–767. Bibcode:1976AcCrA..32..751S. doi:10.1107/S0567739476001551. https://doi.org/10.1107%2FS0567739476001551 ↩

9. R. G. Haire, R. D. Baybarz: "Identification and Analysis of Einsteinium Sesquioxide by Electron Diffraction", in: Journal of Inorganic and Nuclear Chemistry, 1973, 35 (2), S. 489–496; doi:10.1016/0022-1902(73)80561-5. /wiki/Journal_of_Inorganic_and_Nuclear_Chemistry ↩

10. R. D. Shannon (1976). "Revised effective ionic radii and systematic studies of interatomic distances in halides and chalcogenides". Acta Crystallogr A. 32 (5): 751–767. Bibcode:1976AcCrA..32..751S. doi:10.1107/S0567739476001551. https://doi.org/10.1107%2FS0567739476001551 ↩

11. "Atomic and Ionic Radius". Chemistry LibreTexts. 3 October 2013. https://chem.libretexts.org/Bookshelves/Physical_and_Theoretical_Chemistry_Textbook_Maps/Supplemental_Modules_(Physical_and_Theoretical_Chemistry)/Physical_Properties_of_Matter/Atomic_and_Molecular_Properties/Atomic_and_Ionic_Radius ↩

12. Sidey, V. (December 2022). "On the effective ionic radii for the tin(II) cation". Journal of Physics and Chemistry of Solids. 171 (110992). doi:10.1016/j.jpcs.2022.110992. https://www.sciencedirect.com/science/article/pii/S0022369722004097 ↩

13. Shannon, R. D. (1976), "Revised Effective Ionic Radii and Systematic Studies of Interatomic Distances in Halides and Chalcogenides", Acta Crystallogr. A, 32 (5): 751–67, Bibcode:1976AcCrA..32..751S, doi:10.1107/S0567739476001551. /wiki/Bibcode_(identifier) ↩

14. Deblonde, Gauthier J.-P.; Zavarin, Mavrik; Kersting, Annie B. (2021). "The coordination properties and ionic radius of actinium: A 120-year-old enigma". Coordination Chemistry Reviews. 446. Elsevier BV: 214130. doi:10.1016/j.ccr.2021.214130. ISSN 0010-8545. /wiki/Annie_Kersting ↩

15. R. G. Haire, R. D. Baybarz: "Identification and Analysis of Einsteinium Sesquioxide by Electron Diffraction", in: Journal of Inorganic and Nuclear Chemistry, 1973, 35 (2), S. 489–496; doi:10.1016/0022-1902(73)80561-5. /wiki/Journal_of_Inorganic_and_Nuclear_Chemistry ↩

16. Lang, Peter F.; Smith, Barry C. (2010). "Ionic radii for Group 1 and Group 2 halide, hydride, fluoride, oxide, sulfide, selenide and telluride crystals". Dalton Transactions. 39 (33): 7786–7791. doi:10.1039/C0DT00401D. PMID 20664858. https://zenodo.org/record/1043348 ↩

17. H. Bethe (1929). "Termaufspaltung in Kristallen". Annalen der Physik. 3 (2): 133–208. Bibcode:1929AnP...395..133B. doi:10.1002/andp.19293950202. /wiki/Bibcode_(identifier) ↩

18. M. Birkholz (1995). "Crystal-field induced dipoles in heteropolar crystals – I. concept". Z. Phys. B. 96 (3): 325–332. Bibcode:1995ZPhyB..96..325B. CiteSeerX 10.1.1.424.5632. doi:10.1007/BF01313054. S2CID 122527743. https://www.researchgate.net/publication/227050494 ↩

19. M. Birkholz (2014). "Modeling the Shape of Ions in Pyrite-Type Crystals". Crystals. 4 (3): 390–403. doi:10.3390/cryst4030390. https://doi.org/10.3390%2Fcryst4030390 ↩