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usual course, the full moons of the fourteenth year of the cycle will happen about sixteen hours later; which not amounting to a day, the Golden Number remains as before. But in the year 1900, the same full moons become about sixteen hours still later: the Golden Number 14 must therefore be put on one day to March 22d ; and the full moon will be advanced in that day about eight hours. In the year 2000, being a bissextile year in the ordinary course, the full moons will fall nearly eight hours sooner; which might make it necessary to put back the Golden Number 14 to March 21st; if it were not that the full moon had been somewhat advanced in March 21st, previously to the first sixteen hours additional. And this, in fact, takes place afterwards, as appears from the numbers in the third column of the 2d General Table, (by which the changes of the Golden Numbers in the calendar are indicated,) going forwards and backwards, thus, 3, 4, 5, 4; and again 8,9, 8, 9, &c. · The changes of the Golden Numbers in the calendar are indieated by the third columm of numbers in the second General Table, thus: The situation of the Golden Numbers in the year 1600, being marked by 0, in the year 1700 it will be marked by 1 ; that is, the Golden Numbers wust be advanced one day in the calendar, to rectify the inaccuracy before mentioned. In the year 1800, no alteration need be made ; but in the year 1900, to 2199 inclusive, the Golden Numbers must be again advanced; and again in the year 2200: and after the Golden Numbers have been thus advanced twenty-nine days, they will again stand in their original order; that is, in the year $500, they will be in the same situations as in the year 1600. · Upon an examination of the construction of the tables and rules for tinding the full moon on which Easter depends, and especially the second and third General Tables, it becomes obvious that they are not calculated to give the true time of full moon; because all the calculations are made from a consideration of the mean time of the several periodic revolutions. - The term of one lunation, or 29d. 12h. 44' 2" 48", is not the true periodic time of the moon in the heavens, which continually varies; it is merely the mean time of a synodic revolution.
The term of nineteen years, also, is taken at an average, though evidently of different duration, according to the variable number of leap years which enter into it. Then a comparison is instituted between this cycle and two hundred and thirty-five lunations; at the end of which, it appears, the moon returns again to its changes at the same time, within about an hour and a half. This difference is neglected till a hundred years have elapsed, when it causes the full moon to fall eight hours earlier, at the beginning of the century which has its first year bissextile, and sixteen hours later in those · VOL. XVIIJ. NO. XXXVI.
centuries which have not their first year bissextile ; and, then, an average correction is applied, which, on the whole, preserves a mean correspondence between nineteen years and two hundred and thirty-five lunations.
Such is the construction of the Tables, and such the method by which the full moon affecting Easter is determined from them. Though vot so correct as they might be made, it does not strike us that any revision could render them perfect. In the present state, however, they are as accurate as ever they were supposed to be by those who understand them. It is expressly stated in the Table to find Easter from the year 1900,' that the corrections occasionally applied, are, in order that the ecclesiastical full moons may fall nearly on the same days with the real full moons. Whence, then, this unusual and passionate attack on the present mode of computing the anniversaries of the Gospel History?' as if a conviction of the fallibility of the Tables' were something new- as if some ' progressively increasing error' were just now beginning to take effect, and that it was become absurd to argue in favour of a perseverance in our present scheme of computing ecclesiastical time!
No longer ago than the year 1815, the very same disagreement between the day of full moon given in the Almanack, and that determined by the ecclesiastical tables, took place, which has occurred in the present year. By an inspection of the Almanack for the year 1815, it appears that the Easier full moon fell on March 25th. This was the eleventh year of the lunar cycle, for which the day of the ecclesiastical full moon is given by the Golden Number 11, on March 24th, a difference in the tables precisely the same as that now so much noticed, but not producing the same effect, because the 25th of March, 1815, did not happen to be Sunday.
These obvious, though different effects of the same cause might easily have been predicted, in the year 1815: and it argues a want of knowledge of the subject, to give the alarm subsequently to the certain effect, by a tardy denunciation of the cause which accidentally produced it. • With respect to the writer's proposal of determining Easter from the astronomical full moon, such a method is liable to more material objection than that now in use. For, since the changes of the moon occur at the same point of absolute time throughout the world, but the account of time differs according to the longitude of the place, an hour for fifteen degrees,—the astronomical full moon may occur on different days, in two places of the same kingdom. If, for instance, the full moon happen at London on Sunday March 24d, so early as () h. 10 minutes A. M., the same will happen at Dublin un Saturday March 21st, at about 11 h. 45 minutes P.M. In this case,
· Easter would be celebrated in England a week later than in Treland. Such want of uniformity is, we conceive, far more objectionable than the defect which occurs under the present system of ecclesiastical computation.
As the consideration of the accuracy of our computed year, compared with the true periodic time of the sun, though unconnected with the fixing of Easter, has been introduced into the subject, and never rightly stated, we shall conclude this brief article with an account of the present state of the calendar, and of the further correction which would render it perfect.
The true annual period of the sun, or the time it takes to return to the same equinox, according to La Place, is 365.242222 days, or 365 days, 5 hours, 48 minutes, 48 seconds, within the fiftieth part of a second. This term is also stated by Vince, in his Astronomy, as the length of the year, from the best observations.
The Julian year, consisting of 365 days, with one day added every fourth year, is, on an average, 365 days 6 hours. If the correct time be subtracted from this, there will remain a balance of 11 minutes, 12 seconds annual excess, in the Julian computation above the true.
In the year 325, when the Council of Nice appointed Easter-day to be celebrated on the first Sunday after the first full moon next after the vernal equinox, this equinox fell on the 21st of March. Such would, evidently, not continue to be the case, in subsequent years, on account of the excess, before mentioned, in the computed year, of 11 minutes, 12 seconds. In the year 1582, 1257 years after the Nicene council, this error had accumulated to 11' 12" X 1257, or 9 days, 18 hours, 38 minutes; nearly ten days. Therefore, to restore the equipos to the 21st of March, it was become necessary to omit ten days from the calendar, which was accordingly done, by order of Pope Gregory. And in the year 1752, 1427 years after the Nicene council, when the Gregorian account was adopted in England, the error had accumulated to Il 12" X 1427, or 11 days, 2 hours, 22 minutes: eleven days were, therefore, rejected from the calendar; and the verval equinox was restored to the 21st of March.
It is observable, that in the statute 24 Geo. II. ch. 29, made for correcting the calendar then in use, the definition of Easter is so far changed, from that given of it at the Council of Nice, that the consideration of the vernal equinox is wholly omitted. It remains, however, a criterion of the accuracy of our computed year; since the sun being at the vernal equinox, in one year on the 21st of March, if the computed year perfectly coincided with the solar year, it would always return to that equinox at the same instant. With the view of thus keeping the account of time correct, by
retaining the equinox at the 21st of March, another important regulation of Pope Gregory was adopted. The ordinary course of leap years was interrupted, by an omission of the intercalary day in every hundredth year except the four hundredih: thus three days were suppressed from the computation of time in four centuries, and the computed year became, on an average, three hundred and sixty-tive days, five hours, forty-nine minutes, twelve seconds ;* leaving still a balance of twenty-four seconds annual excess, in the Gregorian computation above the true. They, however, so nearly coincide, that the excess will not amount to a day till 3600 years have elapsed; and the equinox will, upon the whole,+ not take place twenty-four hours sooner than it did in the year 1752, before the year 5352. This is, indeed, sufficiently accurate for all purposes; for a great number of centuries must elapse before the equinox will be so far removed from the 21st of March, as to be sensible to the agriculturist.
The correction, which would have rendered the Julian computation perfect, will appear from the consideration, that the annual excess of eleven minutes, twelve seconds, exactly amounts to seven days in nine hundred years. I If, therefore, when the calendar was reformed, it had been determined, instead of the present omission of three days in every four hundred years, six days in every eight hundred years, and so on, that seven days should be omitted in the course of every nine hundred years, the computed average year would have exactly coincided with the solar, and the equinox been fixed to the same day for ever.
Art. XIII. The Secret and True History of the Church of Scot
land, from the Restoration to the year 1678. By the Rev. Mr. James Kirkton, &c. With an Account of the Murder of Archbishop Sharp. By James Russell, an actor therein. Edited from the MS. by Charles Kirkpatrick Sharpe. 4to. Edinburgh. THIS work may be rather considered as containing valuable
materials for the history of a dark and turbulent period, than as being itself such. It has been repeatedly quoted by Wodrow, Laing, and other historians of the period, and carries with it a degree of authenticity scarcely pretended to by other authors of the lime. After remaining for more than a century in manuscript, it has been edited, as has happened in some other cases, by a gentleman who, although a curious inquirer into the history of that calamitolis period, and therefore interested in the facts recorded in the text, seems neither to feel nor to profess much value for the tenets, nor respect for the person, of his author. Various motives have been suggested for Mr. Charles Kirkpatrick Sharpe undertaking a task which at first sight seems inconsistent with his opinions. Some have supposed that it was meant as a requital of the ruse de guerre of the artful Whig who constituted himself editor of the Jacobite Memoirs of Scotland, written by the well-known Lockheart of Carnwath, and gave them to light in order to have an opportunity to stigmatize the author and his party. This was the more readily credited in Scotland, as Mr. Sharpe is allied to that family. Others, discovering another concatenation, have supposed that the editor sought some opportunity, if not to vindicate the memory of his celebrated namesake the Archbishop of St. Andrews, at least to throw out a few sarcasms against the enthusiasts by whom he was assassinated. On our side of the Tweed these would be deemed fanciful and whimsical motives for undertaking the very laborious and troublesome task of such a publication; but in Scotland, it would seem the ancient bond of “kith, kin, and ally,' still possesses, or is supposed to possess, considerable influence.
* 365 days 6 hours X 400 = 146 100 days in 400 Julian years. From which three days being subtracted, as in the Gregorian account, there remain, in 400 Gregorian years, 146097 days, or 365 days 5 hours 49' 12" in one average Gregorian year.
+ On account of the correction of the year being applied on an average, the vernal aquinox, in fact, takes place on the 20th of March in a leap year, and on the first year after leap year; and on the 21st in the two reinaining years. # 11' 19" : 1440' X 7, the minutes in 7 days :: 1 year : 900 years.
Upon inquiry, however, we cannot learn that our ingenious editor claims any relationship to the slaughtered prelate; and we are reluctantly compelled to assign the labour which he has undertaken on the present occasion to the ordinary motives of an active and inquiring mind, which, after finding amusement in extensive and curious researches into the minute particulars relating to an obscure period of history, seeks a new source of pleasure in arranging and communicating the information it has acquired. Unlike the miser, the antiquary tinds the solitary enjoyment of gazing upon and counting over his treasures deficient in interest, and willingly displays them to the eyes of congenial admirers. Perhaps we might add to this motive the malicious pleasure of a wag, who delights to present the ludicrous side of a subject, which, like Bottom's drama, forms a lamentable tragedy full of very pleasant mirth. Accordingly, when his author grows so serious as to be tedious, the notes of the editor seldom fail to be particularly diverting, and rich in all those anecdotes which illustrate character and manners, anecdotes thinly scattered through a wearisome mass of dull and dusty books and manuscripts, which only the taste of an accomplished man, united with the industry of a patient antiquary, could have selected and brought together. We propose, before concluding this Article, to say something more of the tone and spirit in which these com