The Diffusion Coefficient of Cesium Chloride in Dilute Aqueous

Herbert S. Harned, Milton Blander, and Clarence L. Hildreth Jr. J. Am. Chem. Soc. , 1954, 76 (16), pp 4219–4220. DOI: 10.1021/ja01645a061. Publicati...
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DIFFUSIONCOEFFICIENT OF CESIUMCHLORIDE

Aug. 20, 1954

[CONTRIBUTION NO. 1221 FROM

THE

4219

DEPARTMENT O F CHEMISTRY O F YALE UNIVERSITY]

The Diffusion Coefficient of Cesium Chloride in Dilute Aqueous Solution at 25" B Y HERBERT s. HARNED,MILTONBLANDER AND CLARENCE L. HILDRETH,JR. RECEIVED MARCH30, 1954 The differential diffusion coefficient of cesium chloride has been determined by the conductometric method at 25' through the concentration range 0.001 to 0.012 M. At these low concentrations, the results are in accord with the Nernst-Onsager and Fuoss theory.

The diffusion coemcients of lithium,' sodium,' potassium, rubidium3 chlorides have been determined in dilute aqueous solutions by the conductometric method devised in this Laboratory. The present communication contains the differential diffusion coefficient of cesium chloride in the dilute solution range. Theoretical Considerations.-The theory of Onsager and Fuoss4leads to the equation

where the limiting slope S ( 9 ) is given by

(5) TABLE I QUANTITIES USEDIN THEORETICAL CALCULATIONS T 298.16 XO1 77.277

S(f) VO

D in which the mobility term, E/c, for 1-1 electrolytes is represented by

and the thermodynamic term (1 by

w

=1-

1.1514 Str)&

(I

+A'vW

+ c(b In y * /

x

76.34" 3.00" 0.000"

X02

a B

10-3"

x

108

Ref. 5.

I n Table I the specific quantities used in the theoretical calculations are listed. Substitution of these data in equations 2 , 3, 4 and 5 leads to the following numerical expressions

(?) X 1020

= 41.273

- 0'000593 (1 + $5Sdc)

+

18.959~$(0.9858~/5)(2a)

+

4.606 BC

- c\l.(d)

(3)

I n these equations, 9 is the diffusion coefficient in cm.2, set.-', T is the absolute temperature, c is the concentration in moles per liter and y* is the activity coefficient on the molar concentration scale. D is the dielectric constant of the water, and qo its viscosity. The equivalent conductances of the cation and anion are Xol, and Xo2, respectively, and ho is their sum. S(f) is the limiting slope of the Debye and Hiickel theory. A1@ = A d ? = Ka in which I' is the ional concentration, K the reciprocal radius, "a" the mean distance of approach of the ions, and A = 35.56 X 10s/(DT)'/z. The quantity +(A' = 2.0463 - 1.1996d2 (4a) Experimental Results.-Comparisons of the experimental results with those computed by equa-

2.05

5 2.00 X

Q

1.95

RbCl CSCl

I

(1) H. S. Harned and C. L. Hildreth, Jr., TEfs JOURNAL, 78, 650

(1951). (2) H. S. Harned and R. L. Nuttall, ibid., 69, 737 (1947); 71, 1460 (1949). For results a t 4O, see H. S. Harned and C. A. Blake, Jr., ibid., 72, 2265 (1950). (3) H. S. Harned and M. Blander, ibid., 75, 2853 (1953). (4) L. Onsager and R. M. Fuoss, J . Phrs. Chcm., 86, 2689 (1932). (5) H. S. Harned and B. B. Owen, "The Physical Chemistry of Electrolytic Solutions," 2nd Ed., Reinhold Publ. Corp., New York, N. Y.,1950, p. 130. (6) Reference 6,p. 179.

1.90 0

KC1 0.04

0.08

0.12

C"E. Fig. 1.-Diffusion coefficients of potassium, rubidium and cesium chlorides a t 25". The limiting theoretical equation is represented by the straight lines and the complete theoretical result by the curved lines. (7)

W. E. Voirenet, Jr., Dissertation, Yale Univerrity,

June, 19S1.

4220

J. L. PAULEY A N D M. K. TESTERMAN

Vol. 76

tions 1, 2a and 3a are given in Table 11. In the to the limiting value Do and all the values are last column values of D = Dabs (D ,- Do)calc. within A0.27, of this mean. This confirmation are recorded. The mean value of D is equal of the adequacy of the theory a t concentrations up to 0.01 molar is in accord with similar agreement TABLE I1 found for lithium, sodium, potassium and rubidium CALCULATED AND OBSERVED DIFFUSION COEFFICIENTSO F chlorides. CESIUMCHLORIDE AT 25 I n Fig. 1, the observed and calculated diffusion a, x 1w .n x 105 coefficients of potassium, rubidium and cesium C (obs.) (calcd.) 73‘ x 105 chlorides have been plotted against the square root 0.0000 ... (2.046) (2,046) of the concentration. The straight lines represent ,00122 2.007 2,010 2,043 the limiting equation 4a and the solid lines the val,00131 2,012 2.009 2.049 ues derived from the theory. It is to be noted that .00134 2.011 2.008 2.049 the diffusion coefficient of rubidium chloride is .00179 2,002 2.002 2.04F about 0.57, higher than that of cesium chloride. .0026G 1.990 1.994 2.042 This result is in complete accord with the recent .00275 1.988 1.993 2.041 values of the limiting conductances obtained by Dr. .00314 1.994 1.991 2.049 Walter E. Voisenet, Jr., in this Laboratory. ,00368 1.990 1.987 2.049 This investigation was supported in part by the .00849 1 965 1.963 2.048 Atomic Energy Commission under Contract AT.0 1287 1.946 1.950 2.042 (30-1)-1375.

+

Mean

2.040

[CONTRIBUTIOX FROM

L-EWHAVEN,CONN.

THE r S I V E R S I T Y O F

ARKANSAS]

Basic Salts of Lead Nitrate Formed in Aqueous Medial BY J. L. PAULEY AND 11.K. TESTERMAN RECEIVEDFEBRUARY 6, 1954 Conductometric and potentiometric titrations, analyses and solubility determinations were carried out on the system created by the addition of 1 N NaOH t o 0.1 N Pb(N0s)z. Precipitates with compositions which correspond to the empirical formula Pb(NO&.Pb(OH)z and Pb(N0&6Pb(OH)z were formed. No Pb( OH)z was found even appreciably past the equivalence point. The results are in opposition t o other published data.

Introduction The addition of a solution of sodium hydroxide to a solution of lead nitrate might be expected to form a precipitate of lead hydroxide followed by dissolution of the precipitate with the formation of sodium plumbite. It has been found that the above system is not as simple as i t was believed to be and discrepancies arise which have an important bearing upon the titration of systems containing the Pb++, NOS- and OH- ions as well as the preparation of lead salts in an aqueous medium in the presence of nitrate ions. An examination of the literature reveals that numerous compounds of Pb, NO3 and OH groups are p r ~ p o s e d . ~ -The ~ formulas of many of the proposed compounds were deduced by indirect means and considerable confusion exists on certain points. Also, many of the proposed compounds were formed under very special conditions. Britton studied the precipitation of lead salts by hydroxyl ions but made assumptions as to the composition of the precipitates formed. For the compounds formed in aqueous media, Berton’s work3 is of greatest interest. He stated that the titration of Pb(N03)Z with NaOH produced compounds

with compositions in agreement with the following empirical formulas 3Pb( N03)2,Pb(OH)s Pb(N03)2,Pb(OH)2 Pb( NOa)2,3Pb(OH)z

The system resulting from the addition of 1 N NaOH to an aqueous solution of 0.1 N Pb(NOJ2 was studied conductometrically, potentiometrically and analytically by the authors in an attempt to verify Berton’s data. Experimental

The conductance of the above system was mcasured as a function of the addition of carbonate-free sodium hydroxide to the lead nitrate a t 25’. Sufficicnt time elapsed bctwecn the additions of sodium hydroxide and the conductance mcasurement t o ensure equilibrium. The results of this investigntion are presented in Fig. 1, in which the conductivity has been corrected for the dilution effect produced by the addition of the NaOH solution. The graph shows a gradual decrcasc in conductivity until the region of the 6,’s fraction of thc equiv:ilcncc point is rcnched, where a very sharp minimum is 1‘11countered. This minimum suggests the formation of n compound whose composition corresponds to the &/o fraction of the equivalence point. Further, n white precipitate forms upon the addition of the first drop of S a O H solution and remains throughout the course of the titration. This fact, eouplcd with the gradually decreasing conductivity of the solution during the initix! additions of sodium hydroxide, (1) Presented before the Southwest-Southeast Regional Meeting of suggests the precipitation of some other compound, whosc the American C h e n x a l Society, New Orleans, La., 1953. solubility is greater than t h a t of the 6 / 6 compound. (2) V. J. W.Mellor, “A Comprehensive Treatise on Inorganic and These results are in disagreement with the data published Theoretical Chemistry,” Vol. 7, Longmans and Co , New York, N. Y., by Bertona in t h a t he reports three breaks in the conductance 8078. us. ml. of NaOH curve which occur a t tlic ‘/g and 3 / 4 (3) A. Berton, Compl. reud., 220, 693 (1043). fractions of the equivalence point. (4) 13. T. S. Britt& and F.H. Meek, J. Chem. SOL, 183 (1932).