a history of science-1-第44章
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probable。 This proposition granted; the rotation of the earth on its axis follows as a necessary consequence in explanation of the seeming motion of the stars。 Here; then; was the heliocentric doctrine reduced to a virtual demonstration by Aristarchus of Samos; somewhere about the middle of the third century B。C。 It must be understood that in following out the; steps of reasoning by which we suppose Aristarchus to have reached so remarkable a conclusion; we have to some extent guessed at the processes of thought… development; for no line of explication written by the astronomer himself on this particular point has come down to us。 There does exist; however; as we have already stated; a very remarkable treatise by Aristarchus on the Size and Distance of the Sun and the Moon; which so clearly suggests the methods of reasoning of the great astronomer; and so explicitly cites the results of his measurements; that we cannot well pass it by without quoting from it at some length。 It is certainly one of the most remarkable scientific documents of antiquity。 As already noted; the heliocentric doctrine is not expressly stated here。 It seems to be tacitly implied throughout; but it is not a necessary consequence of any of the propositions expressly stated。 These propositions have to do with certain observations and measurements and what Aristarchus believes to be inevitable deductions from them; and he perhaps did not wish to have these deductions challenged through associating them with a theory which his contemporaries did not accept。 In a word; the paper of Aristarchus is a rigidly scientific document unvitiated by association with any theorizings that are not directly germane to its central theme。 The treatise opens with certain hypotheses as follows: 〃First。 The moon receives its light from the sun。 〃Second。 The earth may be considered as a point and as the centre of the orbit of the moon。 〃Third。 When the moon appears to us dichotomized it offers to our view a great circle 'or actual meridian' of its circumference which divides the illuminated part from the dark part。 〃Fourth。 When the moon appears dichotomized its distance from the sun is less than a quarter of the circumference 'of its orbit' by a thirtieth part of that quarter。〃 That is to say; in modern terminology; the moon at this time lacks three degrees (one thirtieth of ninety degrees) of being at right angles with the line of the sun as viewed from the earth; or; stated otherwise; the angular distance of the moon from the sun as viewed from the earth is at this time eighty…seven degreesthis being; as we have already observed; the fundamental measurement upon which so much depends。 We may fairly suppose that some previous paper of Aristarchus's has detailed the measurement which here is taken for granted; yet which of course could depend solely on observation。 〃Fifth。 The diameter of the shadow 'cast by the earth at the point where the moon's orbit cuts that shadow when the moon is eclipsed' is double the diameter of the moon。〃 Here again a knowledge of previously established measurements is taken for granted; but; indeed; this is the case throughout the treatise。 〃Sixth。 The arc subtended in the sky by the moon is a fifteenth part of a sign〃 of the zodiac; that is to say; since there are twenty…four; signs in the zodiac; one…fifteenth of one twenty…fourth; or in modern terminology; one degree of arc。 This is Aristarchus's measurement of the moon to which we have already referred when speaking of the measurements of Archimedes。 〃If we admit these six hypotheses;〃 Aristarchus continues; 〃it follows that the sun is more than eighteen times more distant from the earth than is the moon; and that it is less than twenty times more distant; and that the diameter of the sun bears a corresponding relation to the diameter of the moon; which is proved by the position of the moon when dichotomized。 But the ratio of the diameter of the sun to that of the earth is greater than nineteen to three and less than forty…three to six。 This is demonstrated by the relation of the distances; by the position 'of the moon' in relation to the earth's shadow; and by the fact that the arc subtended by the moon is a fifteenth part of a sign。〃 Aristarchus follows with nineteen propositions intended to elucidate his hypotheses and to demonstrate his various contentions。 These show a singularly clear grasp of geometrical problems and an altogether correct conception of the general relations as to size and position of the earth; the moon; and the sun。 His reasoning has to do largely with the shadow cast by the earth and by the moon; and it presupposes a considerable knowledge of the phenomena of eclipses。 His first proposition is that 〃two equal spheres may always be circumscribed in a cylinder; two unequal spheres in a cone of which the apex is found on the side of the smaller sphere; and a straight line joining the centres of these spheres is perpendicular to each of the two circles made by the contact of the surface of the cylinder or of the cone with the spheres。〃 It will be observed that Aristarchus has in mind here the moon; the earth; and the sun as spheres to be circumscribed within a cone; which cone is made tangible and measurable by the shadows cast by the non…luminous bodies; since; continuing; he clearly states in proposition nine; that 〃when the sun is totally eclipsed; an observer on the earth's surface is at an apex of a cone comprising the moon and the sun。〃 Various propositions deal with other relations of the shadows which need not detain us since they are not fundamentally important; and we may pass to the final conclusions of Aristarchus; as reached in his propositions ten to nineteen。 Now; since (proposition ten) 〃the diameter of the sun is more than eighteen times and less than twenty times greater than that of the moon;〃 it follows (proposition eleven) 〃that the bulk of the sun is to that of the moon in ratio; greater than 5832 to 1; and less than 8000 to 1。〃 〃Proposition sixteen。 The diameter of the sun is to the diameter of the earth in greater proportion than nineteen to three; and less than forty…three to six。 〃Proposition seventeen。 The bulk of the sun is to that of the earth in greater proportion than 6859 to 27; and less than 79;507 to 216。 〃Proposition eighteen。 The diameter of the earth is to the diameter of the moon in greater proportion than 108 to 43 and less than 60 to 19。 〃Proposition nineteen。 The bulk of the earth is to that of the moon in greater proportion than 1;259;712 to 79;507 and less than 20;000 to 6859。〃 Such then are the more important conclusions of this very remarkable papera paper which seems to have interest to the successors of Aristarchus generation after generation; since this alone of all the writings of the great astronomer has been preserved。 How widely the exact results of the measurements of Aristarchus; differ from the truth; we have pointed out as we progressed。 But let it be repeated that this detracts little from the credit of the astronomer who had such clear and correct conceptions of the relations of the heavenly bodies and who invented such correct methods of measurement。 Let it be particularly observed; however; that all the conclusions of Aristarchus are stated in relative terms。 He nowhere attempts to estimate the precise size of the earth; of the moon; or of the sun; or the actual distance of one of these bodies from another。 The obvious reason for this is that no data were at hand from which to make such precise measurements。 Had Aristarchus known the size of any one of the bodies in question; he might readily; of course; have determined the size of the others by the mere application of his relative scale; but he had no means of determining the size of the earth; and to this extent his system of measurements remained imperfect。 Where Aristarchus halted; however; another worker of the same period took the task in hand and by an altogether wonderful measurement determined the size of the earth; and thus brought the scientific theories of cosmology to their climax。 This worthy supplementor of the work of Aristarchus was Eratosthenes of Alexandria。
ERATOSTHENES; 〃THE SURVEYOR OF THE WORLD〃 An altogether remarkable man was this native of Cy