We must also ascribe to Halley the first correct application of the barometer to the measurement of the heights of mountains. Mariotte, who first enunciated the remarkable law that the elastic forces of gases are in the inverse proportion of the spaces which they occupy, had previously given a formula for the determination of these same heights, entirely wrong in principle, and inapplicable in practice. Halley, whose profound mathematical knowledge made him fully equal to the task, investigated and discovered the common formula, which, with some corrections for the temperature of the mercury in the barometer and the air without it, is in use at this day. We have already mentioned that Halley sailed to various parts of the earth with a view to determine the variation of the magnet. The result of his labours was communicated to the Royal Society in a map of the lines of equal variation and also of the course of the trade-winds. He attempted to explain the phenomena of the compass by supposing that the earth is one great magnet, having four poles, two near each pole of the equator; and further accounts for the variation which the compass undergoes from year to year in the same place, by imagining a magnetic sphere, interior to the surface of the earth, which nucleus or inner globe. turns on an axis with a velocity of rotation very little differing from that of the earth itself. This hypothesis has shared the fate of many others purely mathematical; that is, invented to show how the observed phenomena might be produced, without any ground of observation for believing that they really are so produced. If we put together the astronomical and geographical discoveries of Halley, and remember that the former were principally confined to those points which bear upon the subjects of the latter, we shall be able to find a title for their author less liable to cavil than that of the Prince of Astronomers, which has sometimes been bestowed upon him; we may safely say that no man, either before or since, has done more to improve the theoretical part of navigation, by the diligent observation alike of heavenly and earthly phenomena. We pass over many minor subjects, such as his improvement of the diving-bell, or his measurement of the quantity of fluid abstracted by evaporation from the sea, to come to an application of science in which he led the way, the investigation of the law of mortality. From observations communicated to the Royal Society of the births and deaths in the city of Breslau, he constructed the first table of mortality, which was in a great measure the foundation of the celebrated hypothesis of De Moivre, that the decrements of human life are nearly equal at all ages; that is, that out of eighty-six persons born, one dies every year, until all are gone. Halley's table, as might be expected, was not very applicable to human life in England, either then or now, but the effect of example is conspicuous in this instance. Before the death of Halley the tables of Kerseboom were published, and four years afterwards, those of De Parcieux. We will not enlarge on the purely mathematical investigations of Halley, which would possess but little interest for the general reader. We may mention, however, his method for the solution of equations, his Analogy of the Logarithmic Tangents to the Meridian Line, or sum of the secants,' his algebraic investigation of the place of the focus of a lens, and his improvement of the method of finding logarithms. From the latter we quote a sentence, which, to the reader, for whose benefit we have omitted entering upon any discussion of these subjects, will appear amusing enough, if indeed he does not shrink to see how much he has degenerated from his ancestors. After describing a process which contains calculation enough for most people, and which further directs to multiply sixty figures by sixty figures, he adds, "If the curiosity of any gentleman that has leisure would prompt him to undertake to do the logarithms of all prime numbers under 100,000 to 25 or 30 figures, I dare assure him that the facility of this method will invite him thereto; nor can anything more easy be desired. And to encourage him, I here give the logarithms of the first prime numbers under 20 to 60 places.' One look at these encouraging rows of figures would be sufficient for any but a calculating boy. No one who is conversant with the mathematics and their applications can read the life of the mathematicians of the seventeenth century without a strong feeling of respect for the manner in which they overcame obstacles, and of gratitude for the labour which they have saved their successors. The brilliancy of later names has, in some degree, eclipsed their fame with the multitude; but no one acquainted with the history of science can forget, how with poor instruments and imperfect processes, they achieved successes, but for which Laplace might have made the first rude attempts towards finding the longitude, and Lagrange might have discovered the law which connects the coefficients of the binomial theorem. But even of these men the same thing may one day be said; and future analysts may wonder how Laplace, with his paltry means of investigation, could account for the phenomenon of the acceleration of the moun's motion; and future astronomers may, should such a sentence as the present ever meet their eyes, be surprised that the observers of the nineteenth century should hold their heads so high above those of the seventeenth. VOL. III. K ALEXANDER POPE was born in London, June 8, 1688. His father was a merchant, of good family, attached to the Roman Catholic religion; and his own childish years were spent, first under the tuition of a priest, then at a Roman Catholic Seminary at Twyford, near Winchester. He taught himself to write by copying printed books, in the execution of which he attained great neatness and exactness. When little more than eight years old he accidentally met with Ogilby's Translation of Homer. The versification is insipid and lifeless; but the stirring events and captivating character of the story so possessed his mind, that Ogilby became a favourite book. When about ten years old he was removed from Twyford to a school at Hyde Park Corner. He had there occasional opportunities of frequenting the theatre; which suggested to him the amusement of turning the chief events in Homer into a kind of play, composed of a succession of speeches from Ogilby, strung together by verses of his own. In these two schools he seems, instead of advancing, to have lost what he had gained under his first tutor. When twelve years old he went to live with his parents at Binfield, in Windsor Forest. He there became acquainted with the writings of Spenser, Waller, and Dryden. For the latter he conceived the greatest admiration. He saw him once, and commemorates the event in his correspondence, under the words "Virgilium tantum vidi" but he was too young to have made ac quaintance with that master of English verse, who died in 1701. He studied Dryden's works with equal attention and pleasure, adopted them as a model of rhythm, and copied the structure of that author's periods. This was, however, so far from a grovelling imitation, that it enabled him to raise English rhyme to the most perfect melody of which it is capable. In the retirement of Binfield, Pope laboured successfully to make amends for the loss of past time. At fourteen years of age he had written with some elegance, and at fifteen had attained some knowledge of the Greek and Latin languages, to which he soon added French and Italian. In 1704 he began his pastorals, published in 1709, which introduced him, through Wycherley, to the acquaintance of Walsh, who proved a sincere friend to him. That gentleman discovered at once that Pope's talent lay less in striking out new thoughts of his own, than in easy versification, and in improving what he borrowed from the ancients. Among other useful hints, he pointed out that we had several great poets, but that none of them were correct; he therefore admonished him to make that merit his own. The |