HIn

Formula: HIn
Molecular weight: 115.826
CAS Registry Number: 13939-13-4
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Reaction thermochemistry data

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Individual Reactions

In^- + = HIn

By formula: In^- + H⁺ = HIn

Quantity	Value	Units	Method	Reference	Comment
Δ_rH°	1519. ± 8.8	kJ/mol	D-EA	Walter, Gibson, et al., 2010	gas phase; Given: 383.92±0.06 meV
Quantity	Value	Units	Method	Reference	Comment
Δ_rG°	1498. ± 9.2	kJ/mol	H-TS	Walter, Gibson, et al., 2010	gas phase; Given: 383.92±0.06 meV

Gas phase ion energetics data

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Data compiled by: John E. Bartmess

De-protonation reactions

In^- + = HIn

By formula: In^- + H⁺ = HIn

Quantity	Value	Units	Method	Reference	Comment
Δ_rH°	1519. ± 8.8	kJ/mol	D-EA	Walter, Gibson, et al., 2010	gas phase; Given: 383.92±0.06 meV
Quantity	Value	Units	Method	Reference	Comment
Δ_rG°	1498. ± 9.2	kJ/mol	H-TS	Walter, Gibson, et al., 2010	gas phase; Given: 383.92±0.06 meV

Constants of diatomic molecules

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Data compiled by: Klaus P. Huber and Gerhard H. Herzberg

Data collected through January, 1977

Symbols used in the table of constants
Symbol	Meaning
State	electronic state and / or symmetry symbol
T_e	minimum electronic energy (cm^-1)
ω_e	vibrational constant – first term (cm^-1)
ω_ex_e	vibrational constant – second term (cm^-1)
ω_ey_e	vibrational constant – third term (cm^-1)
B_e	rotational constant in equilibrium position (cm^-1)
α_e	rotational constant – first term (cm^-1)
γ_e	rotation-vibration interaction constant (cm^-1)
D_e	centrifugal distortion constant (cm^-1)
β_e	rotational constant – first term, centrifugal force (cm^-1)
r_e	internuclear distance (Å)
Trans.	observed transition(s) corresponding to electronic state
ν₀₀	position of 0-0 band (units noted in table)

Diatomic constants for ¹¹⁵InH
State	T_e	ω_e	ω_ex_e	ω_ey_e	B_e	α_e	γ_e	D_e	β_e	r_e	Trans.	ν₀₀
Open band structure in absorption from 40000 to 42900 cm^-1, no prominent heads.
↳Garton, 1951
A ¹Π	(22655)	[141.7] Z	1		[3.850] 2	3		389E-5		[2.093]	A ← X R	22016.9 Z
A ¹Π	↳Neuhaus, 1958; Neuhaus, 1958, 2
a ³Π₂	(17800)	[1300.9] 4 Z			5.489 4 5	0.332		[34.6E-5]		1.753	a → X V_R	17780.9 Z
a ³Π₂	↳Ginter, 1963
a ³Π₁	16941.6₁	1415.1₁ 4 Z	43.5₅ 6		5.399₆ 4 7 8 9 10	0.235₆ 7		[32.1E-₅] 7		1.7678	a ↔ X R_V	16904.9₈ Z
a ³Π₁	↳Grundstrom, 1939; Neuhaus, 1958; Ginter, 1963
State	T_e	ω_e	ω_ex_e	ω_ey_e	B_e	α_e	γ_e	D_e	β_e	r_e	Trans.	ν₀₀
a ³Π₀₊	16278.1₅	1458.5₇ 4 Z	61.0₃ 11		5.329 4 8 10	0.246₈ 12		[27.7E-5] 13		1.779₄	a ↔ X R_V	16259.6₈ Z
a ³Π₀₊	↳Grundstrom, 1939; Ginter, 1963
a ³Π_0-	(16230)	[1303.4₂] 4 Z			5.349 4	0.326		[28.1E-5] 14		1.776	a → X V_R	16211.5₃ Z
a ³Π_0-	↳Ginter, 1966
a' ³Σ⁺	Not observed, but suggested Veseth and Lofthus, 1974 as the state responsible for anomalies in the Λ-type doubling of ³Π₁ and for the predissociation of all ³Π components.
X ¹Σ⁺	0	1476.0₄ Z	25.61 15		4.994₅ 10	0.142₈ 16		22.3E-5 17		1.8380

Notes

ΔG(3/2) = 80.8.

Λ-type doubling, Δν_ef(v=0) = +0.0047J(J+1). Breaking off due to predissociation above J'= 9,7,4 in v'= 0,1,2, respectively; the limiting curve intersects the ordinate axis near 22250 cm^-1 above X ¹Σ(v=0,J=0). A few additional diffuse lines have been observed as well as fragments of an "extra" band; see 3.

B₁ = 1.915, B₂ = 1.363. D_v values are also given Neuhaus, 1958, but these constants are not sufficient to reproduce the levels of this perturbed state. Zeeman effect studies Larsson and Neuhaus, 1964.

Effective constants determined by Ginter, 1963,110. For a more rigorous treatment of the fine structure of a ³Π see Veseth and Lofthus, 1974.

Predissociation in v=0 above J=26 (³Π^-) and 27 (³Π⁺), in v=1 above J=17 (³Π⁺), The break-off points are in agreement with the limiting curve of dissociation for ³Π₁₊ Ginter, 1963.

missing note

Average constants for ³Π₁₊ and ³Π_1-; The Λ-type doubling is irregular, see Veseth and Lofthus, 1974, and may be caused by the unobserved a' ³Σ⁺ state. Zeeman effect studies Larsson and Neuhaus, 1964.

The ³Π₁ and ³Π₀₊ components have nearly identical limiting curves of predissociation; the derived dissociation limit at 20125 cm^-1 above X ¹Σ, v=0, J=0, appears to correspond to a potential maximum at ~3.3 Å Ginter, 1963. Possible correlations of the low-lying states of InH with those of the separated atoms have been discussed by Ginter and Battino, 1965 and more recently, by Veseth and Lofthus, 1974.

The hyperfine structure of J=1 has been investigated both experimentally Neuhaus, 1958, Neuhaus, 1958, 2, Larsson, Neuhaus, et al., 1968 and theoretically Freed, 1966, Veseth, 1976.

RKR potential curves Ginter and Battino, 1965.

ω_ey_e= -6.83

γ_e= -0.039₀

H₀= -3.7₆E-8. |D_v| and |H_v| increase rapidly with v.

H₀= -2.9E-8.

ω_ey_e= 0.30₈

γ_e= +0.0021₃

H₀= +0.46₃E-8.

From the predissociations in A ¹Π and a ³Π.

From the value for InH and the predissociation in A ¹Π.

ΔG(3/2) = 62.8, ΔG(5/2) = 51.1.

Λ-type doubling, Δν_ef(v=0)= +0.0012J(J+1). Breaking-off due to predissociation above J'=13(v'=0,1), 10(v'=2), 7(v'=3).

B₁ = 1.098, B₂ = 0.981, B₃ = 0.751. D_v values have been determined Neuhaus, 1958, 2 but their meaning is limited in view of the strong perturbations affecting this state. Fragments of three "extra" bands with v"=0,1,2.

ΔG(3/2) = 857.42.

References

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Walter, Gibson, et al., 2010
Walter, C.W.; Gibson, N.D.; Carman, D.J.; Li, Y.G.; Matyas, D.J., Electron affinity of indium and the fine structure of In- measured using infrared photodetachment threshold spectroscopy, Phys. Rev. A, 2010, 82, 3, 032507, https://doi.org/10.1103/PhysRevA.82.032507 . [all data]

Garton, 1951
Garton, W.R.S., Extension of line series in the arc spectrum of indium: ultra-violet absorption bands probably due to InH and GaH, Proc. Phys. Soc. London Sect. A, 1951, 64, 509. [all data]

Neuhaus, 1958
Neuhaus, H., Die hyperfeinstruktur der Indiumhydrid-Banden, Z. Phys., 1958, 150, 4-9. [all data]

Neuhaus, 1958, 2
Neuhaus, H., Uber die Indiumdeutrid- und -hydridbanden und deren Hyperfeinstruktur, Z. Phys., 1958, 152, 402-416. [all data]

Ginter, 1963
Ginter, M.L., The band spectrum of the InH molecule: characterization of the a³Π state, J. Mol. Spectrosc., 1963, 11, 301-320. [all data]

Grundstrom, 1939
Grundstrom, B., Das Bandenspektrum des Indiumhydrids, Z. Phys., 1939, 113, 721-729. [all data]

Ginter, 1966
Ginter, M.L., Identification of the a ³Π_0-(0^-) → X¹ Σ⁺ (0⁺) transition of the InH molecule, J. Mol. Spectrosc., 1966, 20, 240-247. [all data]

Veseth and Lofthus, 1974
Veseth, L.; Lofthus, A., Rotational Energies of Hund's case (c) ³Π states in diatomic molecules. The a³Π state of InH and InD, J. Mol. Spectrosc., 1974, 49, 414-422. [all data]

Larsson and Neuhaus, 1964
Larsson, T.; Neuhaus, H., Magnetic effects in the spectrum of indium hydride and their relevance for the coupling problem, Ark. Fys., 1964, 27, 19, 275-287. [all data]

Ginter and Battino, 1965
Ginter, M.L.; Battino, R., On the calculation of potential curves by the Rydberg-Klein-Rees method. I. Experimental limitations, extrapolation procedures, and applications to the third-group hydrides, J. Chem. Phys., 1965, 42, 3222. [all data]

Larsson, Neuhaus, et al., 1968
Larsson, T.; Neuhaus, H.; Aslund, N., Precision measurements of the hyperfine splittings in the optical spectrum of indium hydride, Ark. Fys., 1968, 37, 13, 141-149. [all data]

Freed, 1966
Freed, K.F., On the hyperfine structure of InH and the theory of the hyperfine structure of molecules in Hund's case (C), J. Chem. Phys., 1966, 45, 5, 1714-1722. [all data]

Veseth, 1976
Veseth, L., The hyperfine structure of diatomic molecules: Hund's case (c_α), J. Mol. Spectrosc., 1976, 59, 51. [all data]

Notes

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Symbols used in this document:

Δ_rG° Free energy of reaction at standard conditions

Δ_rH° Enthalpy of reaction at standard conditions
Data from NIST Standard Reference Database 69: NIST Chemistry WebBook
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Δ_rG°	Free energy of reaction at standard conditions
Δ_rH°	Enthalpy of reaction at standard conditions