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he values herein given; and as I doubt if better data could be obtained, I do not think that your space would be wasted by reproducing it, and affording your readers the opportunity of detecting any periodicity which may exist.

I now turn to the verification of Mr. Meldrum's conjectured connection between sun-spot and rainfall periodicity. But before giving the results I have obtained, I think it is

worthy of consideration whether the total precipitation over the surface of the globe can be expected to be increased by increased cyclonic energy. Increased rainfall surely means increased extraction of moisture from the air, and that involves one of two facts-(1) increased evaporation to supply the increased demand, or (2) rapid and great dessication of the atmosphere. Without expressing a dogmatic or fixed opinion, it certainly seems to me

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TABLE III. ABSTRACT OF RAINFALL OVER THE GLOBE, 1832-68, ARRANGED ACCORDING TO SUN-SPOT PERIODS.*

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1849

3674 23'7 40'5

29 I 2376

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Totals 1136 71 71191 725 72.6 1079 67 5 708 94 7 1619 776 175 8 1966 1139 541

27'3 249 33 5 20 31 339 57 5

42'0 316

67.6

72 4 514

18 4

64'9

40'8

42'5

62 4

254 20 6

48 2

58.7

60'0

40'5 65 5 22'0

23 1 12 6

36'8

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133 4 109'4

158.3

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Totals 967 64 7 94 4 1076 84.31389 873 62 2 1023 1131 90'S 2592 2036 856 777 56 21103

40°2 46'1 41 0 44 1 211 22 9

32 3 610 283 94'0

30 2 104'2

70 4 64 2 600

215 2125 16'1 28 7 20'5 15'4 28 1

41 6

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46'4 508

35 3

1573

315

39'8

26'5

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21 4 1379

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more likely that the effect of cyclones is simply to alter the locality of deposition, than its aggregate amount. Therefore I should by no means hold the connection disproved by series in which exactly opposite results obtain, and I am not myself sanguine as to direct proof being forthcoming

I do not quite agree with my distinguished friend Mr. Meldrum as to the "disturbing influence of continents." Their outlines and mountain ranges change not, and I am *Want of space compels us to omit a similar column referring to the rain

fall of Australasia,

aware of no evidence to show that the annual fluctuation of rainfall is disturbed by continents. Moreover, in the case of some of the smaller islands, we have illustrations in support of the views of Becquerel and the Hon. G. P. Marsh which would completely mask any influence indicated by Mr. Meldrum's statistics. I have no doubt that Mr. Meldrum knows the facts respecting the rainfall in the Isle of Ascension better than I do, and I think that perhaps upon reflection he will be inclined to slightly lessen his claims for the superiority of insular

stations.

I am aware of the rather "heavy" nature of the accompanying table, but the matter is one of much importance and entirely dependent on observed facts, therefore I think you will consider it worthy of the space it will occupy. I have condensed it as much as possible, and have, to the best of my knowledge, selected the most trustworthy and longest continued records at present in my hands. Having thus placed the data before your readers, it seems undesirable to occupy space with remarks as to my own opinion on the evidence; but I cannot help thinking that it is quite clear that the question must not rest where it is. The evidence is no doubt conflicting; but I cannot think that it is chance alone that has given us (from Table I.):—

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IN

Na lecture recently delivered in connection with the Liverpool Literary and Philosophical Society, Prof. Max Muller addressed himself to the phase of Mr. Darwin's theory, which deals with the possibility of the higher animals acquiring the faculty of articulate speech. He first cleared the ground by some general remarks on the previous phases of this old, old controversy touching the origin and destiny of man, referring to the contention between the Materialists and the Idealists, and to the durable impression left upon this controversy by Kant's wonderful "Criticism on Pure Reason," lamenting that Mr. Darwin and his followers should disregard the important conclusions resulting from previous controversies on this subject, and proceed as if their theory of evolution were new. Materialism, he said, is everywhere in the ascendant, while Idealism is almost become a term of reproach. In this riddle of mind and matter, the world is the theatre of a struggle for the primacy of mind over matter. But when the evolutionists contend that the development of the mind of man out of the mind of an animal is a mere question of time, the Professor felt inclined to treat the idea with impatience. Animals must be animals so long as they lack the faculty of abstracting general ideas. Darwin says: "I believe that animals have descended from at most four or five progenitors, and plants from an equal or lesser number. Analogy would lead us one step further, namely, to the belief that all animals and plants have descended from some one prototype. All organic beings have descended from some primordial form into which life was breathed by the Creator." Prof. Max Müller inferred that these four progenitors may be intended for the Radiata, Mollusca, Articulata, and Vertebrata; and said that Mr. Darwin holds firmly that man has been developed from some lower animal, that all animals have been so developed from the lowest to the highest order of organism, and that there is nothing peculiar in man which cannot be explained from germinal seeds or potential faculties existing in lower animals. This question of the descent of man may be called the controversy of the nineteenth

The following extracts have been forwarded to us by the lecturer, and are taken from the Liverpool Gazette.

66

century, and requires the whole knowledge of the century to answer it adequately. The lecturer, confining himself to the evolution theory as it affects language, essayed to show that between the language of animals and the language of man there is no natural bridge, and that to account for human language such as we possess would require a faculty of which no trace has ever been discovered in lower animals. If, as Mr. Darwin begs us to assume, there were a series of developments graduating insensibly from ape to man, it would of course be impossible to fix a definite point where the ape ended and the man began; but he asks us to assume that which does not exist, and without evidence to support this, of which there is none, the theory remains only a theory. Indeed, said the Professor, whenever the distance between two points in the chain of development seems too great, we are told again and again that we must only imagine a large number of intermitted beings representing gradations insensibly sloping up or sloping down, in order to remove all difficulty. So it is in the case between the monkey and the man. This point was illustrated most appositely by reference to the Hindoo notion that man is descended from the spirit of the Creator, through a series of links now extinct, the first descendant being 9-10ths God and 1-10th man, the second being 8-10ths God and 2-10ths man, and so on till man became 10-10ths man and ceased to be of the essence of the Great Spirit. Mr. Darwin's fallacy, he said, lurks in the very word development," for the admission of this insensible gradation through a series of organised beings would eliminate not only the difference between ape and man, but likewise the difference between peat and coal, between black and white, between high and low-in fact it would do away with the possibility of all definite knowledge. Mr. Darwin admits that articulate language is peculiar to man, but contends that animals have, in a lower stage of development, the identical faculties necessary to the invention of articulate expressions. To this he replied that no development of mental faculties has ever enabled any animal to connect one single definite idea with one single definite word. He gave various illustrations of the essential difference between the expression of emotions and the expression of ideas or abstract conceptions, and argued at length as to the impossibility of mere emotional signs and sounds developing into articulate speech; and he ridiculed the notion that the materials of language being given, all the rest was a mere question of time, a natural gradation from the neigh of the horse to the poetry of Goethe. Man and animals possess emotional language in common, because man is an animal; but animals do not possess rational language, because they are not man. This distinction between emotional and rational language, so far from being fanciful and artificial, is radical, as proved by various evidence, especially by the testimony of pathology in reference to certain brain diseases. Rational language is to be traced back to roots, and every root is the sign of a general conception or abstract idea of which the animal mind is incapable. Mr. Darwin has said there are savage languages which contain no abstract terms; but the names for common objects, such as father, mother, brother, &c., are abstract terms, and unless Mr. Darwin is prepared to produce a language containing no such names, his statement, said the lecturer, falls to the ground as the result of a misconception of the real nature of a general idea as distinguished from an emotion. This phase of the controversy lies within the Professor's peculiar domain, and he was able to entertain his audience with technical illustrations that in ordinary hands must have proved tedious, but in the hands of the most accomplished linguist of the day proved a source of wonder and amusement to his hearers. He concluded as he had begun, by maintaining that language is the true barrier between man and beast.

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heavy gun when fired, and the ball appeared to burst on the flash reaching the ground, exactly like a well-timed shell."

RECENT DISCOVERIES IN THE GREAT PYRA-
MID OF EGYPT-ANCIENT EGYPTIAN
WEIGHT

IN addition to the casing-stone of the Great Pyramid,
mentioned in NATURE of Nov. 28 as having recently
arrived in England, Mr. Dixon has also sent the following
articles found by him in newly-opened passages of the
Great Pyramid :-

1. A small double hook of bronze, with rivetted pins for attaching it to a handle.

2. A small rectangular rod of cedar, broken at one end, and some fragments.

3. A granite ball, supposed to be an ancient weight. Not the least curious and interesting part of Mr. Dixon's discovery is that of the passages or channels in which these articles were found. The publications of Prof. Piazzi Smyth and others have made us acquainted with the position of the King's Chamber in the central part of the Great Pyramid, with its coffer, and ascending passages leading from it; as well as with that of the Queen's Chamber, with its walls formed of the finest and whitest limestones, highly worked, this chamber having but one entrance by the horizontal passage leading to it, and its purpose proving such an enigma to our Astronomer Royal for Scotland. In examining the walls of the Queen's Chamber, with the view of ascertaining whether there existed any air channels communicating with it, similar to those of the King's Chamber, discovered by Colonel Howard Vyse in 1837, Mr. Dixon found, by inserting a wire between the joints

of the masor ry of the south wall, that there was a hollow space behind this part of the south wall.

On drilling a hole through the upper part of the second stone from the floor, about midway between the east and west walls, at five inches depth a cavity was found, and head and arm with a lighted candle. A passage or the hole was then enlarged sufficiently to admit a man's channel was thus disclosed, nearly nine inches by eight in rectangular section, which had been carefully cut through the stone to within five inches of the face of the wall in the Queen's Chamber, the end surface being accurately squared and finished off. This channel extended in a horizontal direction for the length of seven feet, and then ascended at an angle of about 32. The sides of the channel were found to be blackened with smoke, like the walls of the Queen's Chamber, and it was thought that a slight draught was perceptible. The bronze hook was discovered lying amongst a small heap of débris at the bottom of the ascending channel.

This channel on the south side of the Queen's Chamber having been discovered, which appeared to be precisely similar to the air channel of the King's Chamber, and to ascend at the same angle, an attempt was naturally made to find a corresponding channel behind the wall on the north side of the Queen's Chamber, though no indication of any such channel presented itself on the surface of the wall. After using measuring rods to mark a spot exactly opposite to the drilled hole on the south wall, a hole was bored in the north wall, and a similar cavity was at once found. By enlarging the opening as before, a second channel was discovered of the same dimensions, and which, after proceeding horizontally for seven feet, also ascended at an angle of about 32°.

The surface of the stone in the channel on the north side appeared to be as clean as when originally cut, and the cement of the joints was perfectly white.. There was

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No trace of any outlet or opening to either channel could be discovered on the exterior of the Pyramid. Experiments were made by firing a pistol in the ventilating channel of the King's Chamber, at the same time holding a lighted candle at the opening of the channel in the Queen's Chamber, and vice versa, with the view of ascertaining if there was any communication between them; but no such connection could be perceived.

Some borings were also made in the stones of the east and west walls of the Queen's Chamber, but without finding any cavity behind them. The discovery of these channels, which may be called "Dixon's Channels," in no way tends as yet to solve the enigma of the Queen's Chamber, but rather to increase the difficulties of the solution. The mystery of the interior of the Great Pyramid remains still to be fathomed.

1. The bronze hook (Fig. 1) is covered with green oxide of copper, but a small notch recently made in it with a file shows it to be of bronze or gun metal. The two pins have a large rivetted head on both sides. Its length is 18 inch, and the distance from the two extremities of the hooks is two inches. With a wooden handle attached by the two pins, it may have been used as a tool of some kind. It is probably the most ancient specimen of bronze now existing.

2. The fragment of the cedar rod (Fig. 2) is 5 inches in length, with a rectangular section of o'5 inch by 0'4 inch. Its sides are not accurately planed, and they bear parallel lines like file marks. It may possibly have formed

FIG. 2.- Fragment of cedar rod.

part of a measure of length; or it may have been part of the handle of the bronze hook, the remaining fragments showing that it must have been at least 3 inches longer. Tkere are no lines or marks upon it indicating a measure of length.

3. The gray granite ball (Fig. 3) has a mean diameter of 2 inches. Its form is that of an orange squeezed somewhat out of its natural shape. Its greatest diameter is 2.88 inches, and its least 265 inches. Its surface is uneven, and shows no mark of any tool, and it presents the appearance of having been roughly rounded by being shaken in a vessel with other stones. On the surface when found were several white spots of lime or plaster. In this condition it has been accurately weighed in the Standards Department, and its weight was found to be 8,324'97 grains. After this weighing, the lime or plaster was carefully removed and preserved, when the weight of the granite ball was found to be 8,322'4 grains, equivalent to 539 282 metric grammes.

It next remained for consideration how far the weight of this granite ball, which must have remained undisturbed in the Great Pryamid for not much less than 4000 years (the date more generally ascribed to the construction of the Great Pyramid, being 2200 B.C.) agrees with any of the ancient Egyptian weights.

According to Dr. Arbuthnot, as quoted by Dr. Young in his article "Weights" in the Enclycopædia Britannica, the ancient Egyptian Mina weighed 8,236 English grains, or 532 683 grammes, thus differing not very much from that of the granite ball. But later authorities do not agree with this weight of the Egyptian Mina. According to them the ancient weight nearest to that of the ball is the Babylonian Mina=544'5 grammes.

Prof. Miller, in his account of the New Standard Pound,

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measures is to be found in Don. V. Quiepo's Essai sur les systèmes Mètriques des Anciens Peuples (Paris, 1849)

which contains much curious and instructive information on the subject, as well as reference to the best existing authorities.

It would appear that very little is known of the system of Egyptian weights previous to the time of the Ptolemies, the first of whom, Ptolemy Lagus, one of the Generals of Alexander the Great, became King of Egypt, 323 B.C. It is also stated that there is no certainty of the existence of any Egyptian weights which were constructed much before that period. But there is evidence that the ancient system was continued by Ptolemy Lagus, when he reformed the Egyptian weights and measures, although it can hardly be imagined that the Egyptian unit of weight remained unaltered for nearly twenty centuries. The earliest systems of weights and measures not only in Egypt, but in Assyria and Phoenicia, were based on the same principle, that of the length of the cubit and of the foot, which were to each other in the proportion of 3 to 2. The Cubit was the unit of length measure; the measure of a cubic foot of water (Metretes) was the unit of capacity both for liquids and dry goods; the Talent or the weight of a cubic foot of water, was the larger unit of weight, whilst the Mina, either the 50th, 60th, or 100th part of the talent, and the Sicle or Shekel, either the 40th, 60th, or 100th part of the Mina, were the smaller units of weight.

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The great Alexandrian Talent of Ptolemy Lagus has been shown to have weighed 42°480 kilogrammes. The 60th part was the Mina 708 grammes, the 50th part of which was the Didrachma or Shekel 14 grammes. This was also the weight of the Jewish Shekel of the Sanctuary, often mentioned in the Old Testament. Another Talent was also in use which was half the weight of the Great Talent, its Mina weighed 354 grammes, and the Drachma 3'54 grammes. Don. V. Quiepo mentions the fact of there being now in the Louvre two ancient Egyptian standard weights of roughly rounded stone, weighing 35216, and 17675 grammes respectively, evidently Mina and half-mina weights, as well as a similarly rounded stone weight, marked with six lines of hieroglyphics, found to weigh 414 grammes; this is thought to be an Attic Mina, known to be used in Egypt in the time of the Ptolemies, the weight of which was 425 grammes. There are also in the Louvre three ancient Egyptian bronze weights, weighing respectively 3'57, 356, and 3'62 grammes, evidently drachma weights.

Let us now endeavour to ascertain the length of the Cubit at the period of the construction of the great Pyramid, and thence deduce the weight of the ancient Egyptian Mina. In this computation it will be desirable to make use of metric weight and measure, from their great convenience in expressing the measure of length, capacity, and weight, by the same significant figures. The weight of water in relation to its bulk will thus be taken as determined for the metric system, that is to say, of pure water at its maximum density.

The latest and most satisfactory information on the length of the Cubit during the construction of the Great Pyramid, is to be met with in the Notes of Sir Henry James, published in 1866, with reference to the measurements made in the previous year by Ordnance Surveyors. Herodotus, writing 450 B.C., says that "the Egyptian Cubit is equal to that of Samos" that is to say, to the Greek Cubit.

Now the length of the Greek Cubit has been satisfactorily ascertained from a recent measurement of the Hecatompedon of the Parthenon of Athens, being the platform on which the columns stand, and the exact length of 100 feet. The Greek foot has thus been found to be equal to 1216032 English inches, and, adding half its length (6'08016 inches), shows the length of the Greek cubit to be 18.2405 inches. This, therefore, was the length

of the Greek cubit 2,320 years ago, and, according to Herodotus, also the length of the Egyptian cubit.

But it has been considered by the greatest authorities that the length of the Egyptian cubit at the period of the construction of the Great Pyramid may be ascertained from the dimensions of the Pyramid itself.

Sir Isaac Newton, in his celebrated "Dissertation on Cubits," says that it is very probable that at first the Measure of the Great Pyramid was determined by some round number of Egyptian cubits.

According to the measurement of the four sides of the base of the Great Pyramid, as it must have stood when complete with its casing stones, the mean length of each side, as measured by Mr. Inglis in 1865 (Prof. Piazzi Smyth's "The Great Pyramid," vol. ii. p. 134), and by the Ordnance Surveyors in 1868, was 9,120 English inches, or 760 feet.

But 9,120 inches are precisely equivalent to 500 Egyptian or Greek cubits of 18'2415 inches.

From the measurements by Col. Vyse and Mr. Perring of the second and third Pyramids it would also appear that the same unit of length was used, the base of the second pyramid being a square of 700 Egyptian feet, and that of the third 350 Egyptian feet. Assuming, therefore, 500 ancient Egyptian cubits, or 750 Egyptian feet, to have been equal to 760 English feet, the Egyptian foot equals 1013 English foot, or 30'86 centimetres.

The Talent derived from the weight of water contained in this Egyptian foot would be equal to 29:3892 kilogrammes, and the Mina, its fiftieth part, would equal 58776 grammes. These weights agree very nearly with those of the ancient Phoenician weights, used as commercial weights in Egypt in the time of the Pharaohsviz., the Kikkar (equal to 29'360 kilogrammes) and the Mina of the market (equal to 587'213 grammes), as shown by Don V. Quiepo.

This common or profane cubit (equal to 18:2415 English inches, or 46'319 centimetres) is to be distinguished from the sacred cubit or cubit of Memphis, as it has been termed by Sir Isaac Newton, equal to 20628 inches, or 52 379 centimetres, which was derived by him from the interior dimensions of the Pyramid, and more particularly from the length and breadth of the King's Chamber, taken to be twenty and ten cubits respectively. The cubits cut on the Nilometer at Cairo now measure 20'699 English inches, or 52'559 centimetres, leaving no doubt of their being intended to be cubits of Memphis.

The double or Royal cubit of Memphis would thus, according to Isaac Newton, be 41256 English inches. An ancient Royal cubit found at Cairath, is now in the British Museum, the length of which has been found to be 41398 inches, or 105 118 centimetres, being exactly double the Nilometer cubit. It is divided into fourteen palms (of 2'956 inches, or 75 millimetres), and the palm into four digits (of 0739 inches, or 187 millimetres). The length of its cubit differs only o'071 inches from the length as deduced by Sir Isaac Newton.

The Chaldæo-Hebraic, or sacred Jewish Cubit was taken by Sir Isaac Newton to be longer than the cubit of Memphis, and thus to be equal to 24 84 English inches. This was the first result of his investigations, and it agrees with an actual measurement by Mersennus of 24.83 inches. This cubit was probably divided into six palms of 414 inches, ten of which would be very nearly equal to a Royal Cubit of Memphis, in terms of which the interior dimensions of the Great Pyramid appear to have been set out, as well as those of the second and third Pyramids.

It is very probable that the ancient cubit of Memphis, several of which have beer. found in buildings, was used in the measurement of buildings, whilst the cubit of 18-24 inches was employed for measuring land only.

The Egyptian foot corresponding with the cubit of Memphis, of 20628 inches, derived from the Great Pyra

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