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STOICHIOMETRY (Gr. vrocxeia, fundamen...
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See also:STOICHIOMETRY (Gr. vrocxeia, fundamental parts, or elements, µErpov, measure) , in See also:chemistry, a See also:term introduced by
See also:Benjamin See also:Richter to denote the determination of the relative amounts in which acids and bases neutralize one another; but this See also:definition may be extended to include the determination of the masses participating in any chemical reaction. The See also:work of Richter and others who explored this See also: Before considering this See also:matter, however, we will show how it is possible to obtain the equivalent of elements whose oxides are not suitable for exact analysis. No better example can be found than See also:Stas's classical determination of the atomic weight of See also:silver and of other elements.2 It will be seen that the routine necessary to the chemical determination of equivalents consists in employing only such substances as can be obtained perfectly pure and stable (under the experimental conditions), and that the reactions chosen must be such as to yield a See also:series of values by which any particular value can be checked or corrected. Stas's experiments can be classified in five series. The See also:object of the first series was to obtain the ratio Ag: 0 by means of the ratios KCI :0 and Ag: KCI. The ratio KCI:O was determined by de-composing a known weight of See also:potassium chlorate (a) by See also:direct heating, (b) by heating with hydrochloric See also:acid and weighing the residual chloride. The reaction may be written for our purpose in the form: KC1O,=KC1+3O; in See also:case a the oxygen is liberated as such; in case b it oxidizes the hydrochloric acid to See also:water and See also:chlorine oxides. The See also:equation shows that one KCl is equivalent We may here See also:state that the equivalent weight of oxygen on this basis is 8.000, i.e. one half of its atomic weight. This matter is considered below. 2 The formulae used in the following See also:paragraph were established before Stas began his work; and as oxygen is taken as 16, the results are atomic and not equivalent weights.to 30, and hence if x grams of chlorate yields y grams of chloride, then the ratio KC1:O=y/3(x—y). Taking 0 as 16 and the experimental value of x and y, Stas obtained KCI :O =74.9502. To find the ratio of Ag: KCI, a known weight of silver was dissolved in nitric acid and the amount of potassium chloride necessary for its exact precipitation. was determined. The reaction may be written as AgNO3+KC1=AgC1+KNO3, which shows that one Ag is equivalent to one KCI. The value found was Ag: KCl =1.447110. The ratio Ag: 0 is found by combining these values, for Ag:O=KCI:OXAg:KC1 = 74.9502 X 1.44710 = 107•940I. In the second series the ratios AgCI.O and AgCI:Ag were obtained, the first by decomposing the chlorate by heating, and the second by synthesizing the chloride by burning a known weight of the See also:metal in chlorine See also:gas and weighing the resulting chloride, and also by dissolving the metal in nitric acid and precipitating it with hydrochloric acid and ammonium chloride. These two sets yield the ratio Ag : 0, and also the ratio Cl : 0, which, combined with the ratio KCI : 0 obtained in the first series, gave the atomic weight of potassium. The third and See also:fourth series resembled the second, only the bromate and bromide, and iodate and iodide were worked with. The experiments gave additional values for Ag: 0 and also the atomic weights of See also:bromine and See also:iodine. The fifth series was concerned with the ratios Ag2SO4 : Ag; Ag2S : Ag and Ag2S: 0. The first was obtained by reducing silver sulphate to the metal by hydrogen at high temperatures; the second by the direct See also:combination of silver and See also:sulphur, and also by the interaction of silver and sulphuretted hydrogen; these ratios on combination gave the third ratio Ag2S:O. These experiments besides giving values for Ag:O, yielded also the atomic weight of sulphur. There is no need to proceed any further with Stas's work, but it is sufficient to say that the See also:general routine which he employed has been adopted in all chemical deterni inations of equivalent weights. The derivation of the atomic from the equivalent weight may be effected in several ways. The simplest are perhaps by means of See also:Dulong and See also:Petit's See also:law of atomic heats (and by See also:Neumann's See also:extension of this law), and by See also:Mitscherlich's See also:doctrine of isomorphism. Dulong and Petit's law may be stated in the form that the product of the specific See also:heat and atomic weight is approximately 6.4, or that an approximate value of the atomic weight is 6.4 divided by the specific heat. This application may be illustrated in the case of mercury. We have seen above that the red oxide yields a value of about 95 for the equivalent; but a See also:green oxide is known which contains twice as much metal for each part of oxygen, and therefore in this compound the equivalent is about 190. The specific heat of mercury, however, is 0'033, and this number divided into 6.4 gives an approximate atomic weight of 194. More accurate analyses show that mercury has an equivalent of See also:loo in the red oxide and 200 in the green; Dulong and Petit's law shows us that the atomic weight is 200, and that the element is divalent in the red oxide and monovalent in the green. For exceptions to this law see CHEMISTRY: § See also:Physical. The application of isomorphism follows from the fact that chemically similar substances crystallize in practically identical forms, and, more important, form mixed crystals. If two salts yield mixed crystals it may be assumed that they are similarly constituted, and if the See also:formula of one be known, that of the other maybe written down. For example See also:gallium sulphate forms a See also:salt with potassium sulphate which yields mixed crystals with potash See also:alum; we therefore infer that gallium is trivalent like See also:aluminium, and therefore its atomic weight is deduced by multiplying the equivalent weight (determined by converting the sulphate into oxide) by three. General chemical resemblances yield valuable See also:information in fixing the atomic weight after the equivalent weight has been exactly determined. Gases.—The generalization due to See also:Avogadro—that equal volumes of gases under the same conditions of temperature and pressure contain equal See also:numbers of molecules—may be stated in the form that the densities of gases are proportional to their molecular weights. It therefore follows that a comparison of the See also:density of any gas with that of hydrogen gives the ratio of the molecular weights of the two gases, and if the molecular contents of the gases be known then the atomic weight is deter-minable. Gas reactions are available in many cases for solving the question whether a See also:molecule is monatomic, diatomic, &c. Thus from the combination of equal volumes of hydrogen and chlorine to form twice the See also:volume of hydrochloric acid, it may be deduced that the molecule of hydrogen and of chlorine contains two atoms (see ATOM) ; and similar considerations show that oxygen, See also:nitrogen, See also:fluorine, &c., are also diatomic. Physical methods may also be employed. For instance, in monatomic gases the ratio of the specific heat at See also:constant pressure to the specific heat at constant volume is 1.66; in diatomic gases 1.42; with other values for more complex molecules (see MOLECULE). This ratio may be determined directly by finding the velocity of See also:sound in the gas (See also:Kundt) or by other methods, or indirectly by finding the specific heats separately and then taking the ratio. It is found that the gases just mentioned are diatomic, whereas See also:argon, See also:helium, neon and the related gases, and also mercury and some other metals when in the gaseous See also:condition. are monatomic. A knowledge of the atomicity of a gas combined with its density (compared with oxygen and hydrogen) would therefore give its atomic weight if Avogadro's law were rigorously true. But this is not so, except under extremely See also:low pressures, and it is necessary to correct the observed densities. The correction involves a detailed study of the behaviour of the gas over a large range of pressure (presuming the densities are already corrected to o°), and may be conveniently written in the form a=_' vd(dv) . Thus if D be the observed relative densities of a gas to hydrogen at o° and under normal atmospheric pressure, ax and aH the coefficients of the gas and hydrogen, then the true density, or ratio of molecular weights, is DX (I+ax)/(t+aH)• See also:Lord See also:Rayleigh and D. See also:Berthelot have corrected several molecular weights in this See also:fashion. The importance is well shown in the modification of See also:Morley's observed density of oxygen, viz. 15.90, which, with Rayleigh's values of ao = — 0.00094 and a,1 = + 0.000J3, gives the corrected density as 15.88. And this value is the atomic weight, for both hydrogen and oxygen molecules contain two atoms. Compound gases can also be experimented with. For example See also: If we dissolve say m grams of a substance of molecular weight M in too grams of the solvent and observe the See also:elevation in the boiling point, then M is given by M = mD/d. Similar considerations apply to the freezing points of solutions. In this case D = 0.02 T2/w, where T is the absolute freezing point of the pure solvent and w the latent heat of solidification. To apply these principles it is only necessary therefore to determine the freezing (or boiling) point of the solvent (of which a known weight is taken), add a known weight of the solute, allow it to dissolve and then See also:notice the fall (or rise) in the freezing (or boiling point), from which values, if the molecular depression (or elevation) be known, the molecular weight of the dissolved substance is readily calculated. The following are the molecular depressions and elevations (with the freezing and boiling points in brackets) of the commoner solvents. Molecular depressions: See also:aniline (6°), 58.7; See also:benzene (5.4°),50.0; acetic acid (17.0°), 39.0; See also:nitrobenzene (5.30), 70.0; phenol (400), 72; water (o°), 18.5. Molecular elevations: acetic acid (118.1°), 25.3; See also:acetone (56°), 17.1; See also:alcohol (78°), 11.7; See also:ether (35°), 21'7; benzene (79°), 26.7; See also:chloroform (61°), 35.9; See also:pyridine (115°), 29.5; water (loo°), 5.1. The apparatus used in cryoscopic measurements is usually that devised by See also:Beckmann (Zeit. phys Chem. ii. 307). The working part consists of a See also:tube 2–3 See also:ems. in See also:diameter, bearing a See also:side tube near the See also:top; the tube is fitted with a See also:cork through which pass a See also:differential thermometer of a range of about 6° and graduated in 5oths or looths, and also a stout See also:platinum See also:wire to serve as a stirrer. The See also:lower part of the tube is enclosed in a wider tube to serve as an See also:air-jacket, and the whole is immersed in a large See also:beaker. The thermometer is adjusted so that the freezing point of the pure solvent comes near the top of the See also:scale. A weighed quantity of the solvent is placed in the inner tube, and the beaker is filled with a freezing mixture at a temperature a few degrees below the freezing point of the solvent. The thermometer is inserted and both solvent and freezing mixture are stirred. When the temperature is about 0.3° below the correct freezing point the tube is removed from the beaker and the stirring continued. There ensues a further fall in the thermometer See also:reading until See also:ice separates, whereupon the temperature rises to the correct freezing point. The ice is then melted and the operation repeated so as to obtain a mean value. A known weight of the substance is introduced through the side tube, and the freezing point determined as with the pure solvent. The difference of the readings gives the depression; and from this value, knowing the weight of the solute and solvent, and also the molecular depression, the molecular weight can be calculated from the formula given above. - In the boiling point apparatus of Beckmann the solvent is contained in a tube fitted with side tubes to which See also:spiral condensers can be attached; the See also:neck of the tube carries a stopper through which passes a delicate differential thermometer, whilst the bottom is perforated by a platinum wire and contains See also:glass beads, garnets or platinum See also:foil to ensure regular boiling. The tube is surrounded by a jacket mounted on an See also:asbestos See also:box, so that the heating is regular. In conducting a determination the thermometer is adjusted so that the boiling point of the pure solvent is near the bottom of the scale. A known weight of the solvent is placed in the tube, the thermometer is inserted (so that the liquid completely covers the bulb), and the condensers put into position. The liquid is now cautiously heated, and when the thermometer becomes stationary the boiling point is reached. The temperature having been read, the apparatus is allowed to cool slightly, and the observation repeated. A known weight of the substance is now introduced, and the solution so obtained treated in the same fashion as the See also:original solvent. A different See also:procedure wherein the boiling tube is heated, not directly, but by a stream of the vapour of the pure solvent, was proposed by Sakurai (Journ. Chem. Soc., 1892, 61, p. 994). Sakurai's apparatus has been considerably modified, and the form now principally used is essentially due to Landsberger (Ber., 1898, 31, p. 461). The boiling See also:vessel is simply a See also:flask fitted with a delivery tube, which is connected with the measuring tube. This consists of a graduated tube fitted with a stopper through which passes a thermometer and an inlet tube reaching nearly to the bottom. The measuring tube is surrounded by an See also:outer tube which has an exit to a See also:condenser at the side or bottom, communication being made between the measuring tube and jacket by a small hole near the top of the former. In outline the operation consists in placing some solvent in the measuring tube and passing in vapour until the condensed liquid falls at the See also:rate of one drop per second or two seconds. The temperature is then read off. A known weight of the substance is introduced and the boiling point determined as before; but immediately the temperature is read the tube must be disconnected, so that no more vapour passes over and so alters the concentration of the solution. Two methods are in use for determining the quantity of the solvent. Landsberger weighed the tube; See also: 97, p. 1184) both the weight and volume can be determined. Whilst the calculations in both the Beckmann and Sakurai-Landsberger methods are essentially the same the " molecular elevations " differ according as one deals with loo grams or too ccs. of solvent. In all these methods it is necessary to carefully choose the solvent in See also:order to avoid See also:dissociation or association. For example, most salts are dissociated in aqueous solution; and acids are bi-molecular in benzene but normal in acetic acid. Other methods are available for dissolved substances such as measurements of the osmotic pressure, lowering of the vapour pressure and diminution of solubility, but these are little used. Mention may also be made of See also:Ramsay and See also:Shield's method of finding the molecular weights of liquids from See also:surface tension measurements. Additional information and CommentsThere are no comments yet for this article.
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