UC-NRLF SB ESb = & Y OF CALIFORNIA LIBRARY OF THE UNIVERSITY OF CALIFORNIA 5 i: Y OF CALIFORNIA LIBRARY OF THE UNIVERSITY OF CALIFORNIA DF CUIFORNI* IIBRARK OF THE UKIVERSITY OF CUIFORXIi f UNIVERSITY OF CALIFORNIA LIBRARY OF THE UNIVERSITY OF CALIFORNIA 3N UNIVERSITY OF CALIFORNIA LIBRARY OF THE UNIVERSITY OF CALIFORNIA 2^ UNIVERSITY OF CALIFORNIA LIBRARY OF THE UNIVERSITY OF CALIFORNIA &ara jftatjjematica; OR, A COLLECTION OP TREATISES ON THE MATHEMATICS AND SUBJECTS CONNECTED WITH THEM, JFrom ancient inetiitctf JWanuscrtpts. EDITED BY JAMES ORCHARD HALLIWELL, ESQ., F.R.S., F.S.A. &c. &c. OF JESUS COLLEGE, CAMBRIDGE. " I see not how the history of any science is to be conducted through the middle-age period, but by the assistance of the works of science of the middle-age writers, though the contents of them, as works of science, may have now become of little value." Rev. J. Hunter's Monastic Libraries, Pref. p. xi. LONDON: JOHN WILLIAM PARKER, WEST STRAND; J. & J. J. DEIGHTON, & T. STEVENSON, CAMBRIDGE. 1839. CAMBRIDGE : PRINTED BY METCALFE AND PALMER, TRINITY STREET. Q/53 TO THOMAS STEPHENS DAVIES, ESQ. F.R.S. L.&E. Royal Military Academy, Woolwich. MY DEAR SIR, I claim the privilege of inscribing this book to you, because, as my first public effort in literature, it is — whether good for anything or not — the most sincere present I can make to my best and most valued friend. It may seem rather irrelevant to the purposes of a dedica- tion, if I allude to the early mathematics of your own country. It may not be generally known, that many of the men of science who adorned the walls of the University of Oxford in the middle ages, were Welchmen : and I mention this, because the title of a work lately announced has excited a question relative to the existence of materials requisite for writing a history of the early progress of science in that principality. I am not surprised at the question when I take into consideration, that a man — or rather a boy — who arro- gates to himself the title of the Welch mathematical repre- sentative of England, once said in the dining-hall of my own College, when a dispute about Demoivre's theorem had arisen, that *' he thought Demoivre a very clever man, having IV DEDICATION. written some praiseworthy articles on the expansion of series in the Philosophical Magazine !" How would the manes of Gwdion, Gwyn, and Idris be horrified, were they to hear of such a desecration of the sacred rights of history ! You, I am sure, will be pleased to see the labours of some of your predecessors brought to light. They will serve to give additional lustre to the exertions of the best geometrician in England; and the transcriber will feel himself invigorated by the hope of being able to fill up a chasm in history, being convinced that he has left the meritorious labours of later writers — Anderson, Fermat, Simson, and Play fair — in better and more able hands. Believe me, my dear Sir, ever to remain, Yours, most faithfully, JAMES ORCHARD HALLIWELL. JESUS COLLEGE, CAMBRIDGE. March 1st, 1839. PREFACE. I HAVE thought it unnecessary to enter very fully into the history of the several treatises in this volume, because it will be done at large in my history of early English Mathematics, now in the course of rapid preparation for the press. The following notes on some of them may not prove unacceptable. I. Johannes de Sacro-Bosco de Arithmetica. Often occurs in MSS. without his name; MSS. Harl. 3647. 3843. 4350. Bib. Reg. 12 C. xvii. Arund. 343. Cott. Cleop. B. vi. f. 234. Publ. Cantab. li. I. 15. (1692). An English translation — Ashm. 396. The present text is taken from a MS. in my own library, purchased at the sale of the Library of the Abbate Canonici of Venice. III. A Treatise on the Numeration of Algorism. — This is taken from a single leaf of vellum, found loose in an old MS. on astronomy in my possession : from Dr, Clarke's library. IV. Bourne's Treatise on Optical Glasses. — -The other work he mentions in his dedication, as having been in- scribed to Lord Burghley, is in the British Museum. MS. Sloan. 3651. V. Johannes Robyns de Cometis. — From a MS. in my own library, Other copies, Bib. Reg. 12 B. xv. and Trin. Coll. Cantab, inter MSS. Gal. O. I. 11. VIII. A Merchant's Account Table.— This table is ex- ceedingly curious, conducted partly similar to an abacus, the cyphers at the bottom being used to guide the manual calculator. Vi PREFACE. IX. Carmen de Algorismo. — A MS. of the Massa Compotiinthe British Museum (Harl. 3902), by Alexander de Villa Dei, possesses an introduction to the work by some other author : it is there stated that the same author com- posed Doctrinale et Algorismum Metricum. M. Chasles informs me that a MS. of this tract in the French King's Library (7420. A.) has the following colophon at the end : Explicit Algorismus editus a Magistro Alexandra de Villa Dei. This is, I think, quite sufficient to prove him to be the author. MSS. of it are very numerous : I will mention a few for guidance. MSS. Bib. Reg. 8 C. iv. 12 E. i. 12 F. xix. Cot. Vitell. A. i. (first chapter). Trin. Coll. Cant. O. v. 4. ii. 45. i. 31. S. John. F. 18. Publ. Mm. iii. 11. (2310). li. i. 13. (1690.) i. 15. (1692). Bodl, 57. Fairf. 27. Digb. 15. 22. 81. 97. 98. 104. 190. Bodl. 4to. D. 21. Jur. Fragments MSS. Sloan. 513. 1620. 2397.— Many copies of it occur in the Catalogue of the Library of the Dover Monastery (MS. Bodl. 920.) made in 1389.— Fid. Monast. iv. p. 532. MS. Digb. 104, has Ambrosinusfor Algorismus in the first line. MS. Sloan. 513, has the following colophon — " Explicit traetatus algorismi turn satis breve et bono commento secundum Saxton. Qui scripsit carmen sit benedictus. Amen ! Nomen scriptoris Galfridus plenus Amoris." Whose name is here latinized I know not, but I am not inclined to give much credit to it. XII. The Preface to an Almanac for 1430. —It was pointed out to me by a friend, that some portions of this are evidently plagiarized from Chaucer's preface to his tract on the Astrolabe. CONTENTS. PAGE I. Johannis de Sacro-Bosco Tractatus de Arte Nu- merandi 1 II. A method used in England in the fifteenth cen- tury for taking the altitude of a steeple or inaccessible object 27 III. A Treatise on the Numeration of Algorism 29 I V. A Treatise on the properties and qualities of glasses for optical purposes, according to the making, polishing, and grinding of them. — By WILLIAM BOURNE 32 V. Johannis Robyns de Cometis Commentaria 48 VI. Two Tables : one shewing the time of high water at London bridge, and the other the duration of moon-light. From a MS. of the 13th century. 55 VII. A Treatise on the mensuration of heights and dis- tances 57 VIII. An Account Table for the use of merchants 72 IX. Alexandri de Villa Dei Carmen de Algorismo. ... 73 X. Prefatio Danielis de Merlai ad librum de naturis superiorum et inferiorum 84 Vlll CONTENTS. XI. Proposals for some inventions in the Mechanical Arts 86 XII. The Preface to a calendar or almanac for the year 1430 89 XIII. Johannis Norfolk in artem progressionis summula. 94 XIV. Appendix 107 JOANNIS DE SACRO-BOSCO TRACTATUS DE ARTE NUMERANDI. OMNIA quae a primseva rerum origine pro- cesserunt ratione numerorum formata sunt,1 et quemadmodum sunt, sic cognosci habent : unde in universa rerum cognitione, ars numerandi est operativa. Hanc igitur scientiam numerandi compendiosam edidit philosophus nomine Algus,2 unde algorismus nuncupatur, vel ars numerandi, 1 "Omnia quaecunque a primseva rerum natura constructa sunt, numerorum videntur ratione formata." — JBoetii Arith. lib. i. cap. 2, Edit. Par. 1521, fol. 8. Vid. Hen. Welpii Arith. Prac- tica, 4to. Colon. 1543. Enchiridion Algorismi per Joannem Huswirt, 43 - DE ARITHMETICS. 13 32, et haec est summa totius multiplicationis. Similiter quando digitus multiplicat seipsum. Quando an tern digitus multiplicat numerum compositum, ducendus est digitus in utramque partem numeri composite, ita quod digitus in digitum per primam regulam, et digitus in articu- lum per secundam regulam ; postea producta conjungantur simul, et erit summa totius multi- plicationis. Quando articulus multiplicat articu- lum, ducendus est digitus a quo denominatur ille articulus in digitum a quo denominatur reliquus. Quando articulus multiplicat numerum compositum, ducendus est digitus articuli in utramque partem numeri compositi ; conjungan- tur producta, et patebit summa totius. Quando numerus compositus multiplicat numerum com- positum, ducenda est utraque pars numeri multi- plicands in utramque partem numeri multipli- cand! et sic ducetur digitus bis, quia semel in digitum et semel in articulum. Articulus similiter bis, quia semel in digitum et iterum in articulum : hie tamen ubique articulus non ad principales extenditur articulos. Si igitur velis aliquem numerum vel per se vel per alium multiplicare, scribe numerum multiplicandum in superiori or- dine per suas differentias, numerum vero multi- plicantem in inferior! per suas differentias, ita tamen quod priina figura inferioris ordinis sit sub ultima superioris. Hoc facto, ducenda est ultima multiplicands in ultimam multiplicand!. Ex illo igitur ductu aut excrescit digitus, aut 14 SACRO-BOSCO articulus, aut numerus compositus. Si articulus, ex directo figurae multiplicantis scribatur cifra, et transferatur articulus versus sinistram. Si digitus, ex directo super positionem figurae multi- plicantis scribatur digitus excrescens. Si nume- rus compositus, ex directo figurae multiplicantis scribatur digitus illius numeri compositi, et sinis- tretur articulus, ut prius. Hoc autem facto, ducenda est ultima numeri multiplicantis in ulti- mam multiplicandi, et quicquid hide excreverit, negociandum est, ut prius ; et sic fiat de omni- bus aliis numeri multiplicantis, donee perveniatur ad primam multiplicantis, quae ducenda est in ultimam multiplicandi, et ex illo ductu aut ex- crescit digitus, aut articulus, aut numerus com- positus. Si digitus, loco superioris deletae scri- batur digitus excrescens ; si articulus, loco supe- rioris deletae scribatur cifra et sinistretur articulus: si numerus compositus, loco superioris deletce scribatur digitus qui est pars illius numeri com- positi et sinistretur articulus, ut prius. Hoc autem facto, anteriorandae sunt figurae numeri multiplicantis per unam differentiam, ita quod prima multiplicantis sit sub penultima multipli- candi, reliquis similiter per unum locum anterio- ratis. Quo facto, ducenda est figura ultima multiplicantis in illam figuram sub qua est prima figura multiplicantis, et ex illo autem ductu aut excrescit digitus, aut articulus, aut numerus com- positus. Si digitus, ex directo figurae suprapositae addatur : si articulus, transferatur versus sinis- DE ARITHMETICA. 15 tram, et figura direct! supraposita relinquatur intacta ; si numerus compositus, addatur digitus suprapositae figurae et sinistretur articulus. Si- militer quaelibet figura nnmeri multiplicands in penultimam multiplicandi donee perveniatur ad primum multiplicands, ubi operandum est ut prius, vel quemadmodum determinatur de primis; deinde anteriorandae sunt figurae per unicam difFerentiam, ut prius. Nee cessandus est a tali anterioratione nee a tali ductu. Quovis quae- libet figura numeri multiplicands ducatur in quamlibet figuram numeri multiplicandi. Si autem contingat quod prima figura numeri multiplicands sit cifra et ei supponatur figura significativa, loco illius superioris deletae scri- benda est cifra. Si autem contingat quod cifra sit inter prirnam figuram et ultimam multiplicandi, anteriorandus est ordo figura- rum per duas differentias, quamvis ex duc- tione alicujus figurae in cifram nihil resultat. Ex perdictis ergo patet quod si prima figura numeri multiplicandi sit cifra, sub ea non debet fieri anterioratio. Sciendum autem quod in mul- tiplicatione et divisione et radicum extractione competenter potest relinqui spacium vacuum inter duos ordines figurarum, ut ibi scribatur, quod pervenit addendum aut subtrahend um ne aliquid memoriae intercidatur.2 2 Vid. Piscatoris Compendium Arithmeticae, 12mo. Lips. 2. Ursini Systema Arithmeticae, 1' ;h. Pract. Methodus facilis, 12mo. i de Arte Supputandi, 4to. Lond. 1522. 1592. Ursini Systema Arithmeticae, 12mo. Colon. 1619. Frisii Arith. Pract. Methodus facilis, 12mo. Colon. 1592. Tonstallus 16 SACRO-BOSCO VII. — Divisio. Divisio3 numeri per numerum est, propositis duobiis numeris, majorem in tot partes distribuere quot sunt imitates in minori. Notandum ergo quod in divisione, tres numeri sunt necessarii ; scilicet, numerus dividendus ; numerus dividens, sive divisor ; et numerus denotans quotiens. Numerus autem dividendus semper debet esse major, vel saltern par divisori, si debeat fieri divisio per integra. Si velis igitur aliquem numerum per alium dividere, scribe numerum dividendum in superiori ordine per suas differen- tias, divisorem vero in inferiori ordine per suas differentias, ita quod ultima divisoris sit sub ultima dividendi, penultima sub penultima, et sic de aliis, si competenter fieri possit. Sunt autem duae causae quare ultima sub ultima in- ferioris ordinis non possit collocari, quia aut ultima inferioris ordinis non possit subtrahi ab ultima superioris quod est minor inferiori, aut quse licet ultima superioris possit subtrahi a sua superiori : reliquo tamen non possunt subtrahi a figuris sibi suprapositis, si ultima inferioris sit par figurse suprapositae. His itaque ordinatis, 3 "Numeratio conjuncta, est multiplicatio aut divisio: mul- tiplicatio est, qua multiplicands toties addatur, quoties unitas in multiplicante continetur, et habetur factus : divisio est, qua divisor subducitur a dividendo quoties in eo continetur, et habetur quoties." — Rami Arithmetica, Edit. 1581, pp. 11 et 14-. DE ARITHMETICS. 17 incipiendum est operari ab ultima figura numeri divisoris, et videndus est quotiens, possit ilia subtrahi a figura sibi supraposita, et reliquae a residue sibi supraposito, si aliquid fuerit resi- duum. Viso ergo quotiens, figurae inferioris ordinis possint subtrahi a suis superioribus, scribendus est numerus denotans quotiens ex directo supraposito illius figurae sub qua est prima figura numeri divisoris, et per illam divi- dendse sunt omnes figurae inferioris ordinis a suis superioribus. Si autem contingat post anterio- rationem quod non quotiens, possit subtrahi ultima figura divisoris a figura sibi supraposita super figuram sub qua est prima divisoris, recte scribenda est cifra in ordine numeri denotantis quotiens, et anteriorandae sunt figurae, ut prius ; similiter faciendum est ubicunque contingit in numero dividendo quod divisor non possit subtrahi a numero dividendo, ponenda est cifra in ordine numeri denotantis quotiens et anteriorandae sunt figurae, ut prius : nee cessandum est a ductu numeri denotantis quotiens in divisorem, nee a ductu divisoris subtrahendae donee prima divisoris sit subtracta a prima dividendi : quo facto, aut aliquid erit residuum aut nihil : si aliquid sit residuum, reservetur exterius et scri- batur in tabula et erit semper unius divisoris. Cum igitur facta fuerit talis divisio, et probare volueris utrum benefeceris, multiplica numerum denotantem quotiens per divisorem et redibunt eaedem figurae quas prius habuisti, si nihil fuerit c 18 SACRO-BOSCO residuum; sed si aliquid fuerit residuum, tune cum additione residui redibunt eaedem figurae quas prius habuisti ; et ita probat multiplicatio divisionem, et econtrario. Sed si facta multi- plicatione, dividatur productum per multipli- cantem, exibunt in numero denotante quotiens figurae numeri multiplicands VIII. — Progression Progressio est numerorum secundum aequales excessus ab unitate vel binario sumptorum ag- gregatio ut universorum summa compendiose habeatur. Progressionum alia naturalis sive continua, alia intercisa sive discontinua. Natu- ralis est quando incipitur ab unitate et non omittitur in accensu aiiquis numerus, ut 1.2. 3.4.5.6. et csetera ; et sic numerus sequens superat numerum precedentem unitate. Inter- cisa est quando omittitur numerus aiiquis, ut 1.3.5.7.9. et csetera. Similiter a binario possunt incipi, ut 2.4.6.8. et sic numerus sequens superat precedentem numerum in duo- bus unitatibus. Notandum quod progressionis naturalis duae sunt regulae, quarum prima est 4 " Progressio est numerorum sequaliter distantium in unam summam collectio. Progressio arithmetica continua sive naturalis est ubi post primum characterem nullus intermittitur. Progressio arithmetica discontinua sive intercisa, est figuris aequaliter inter- ceptis numerorum ordo." Hudaldrichus de Arithmetica, 12mo. Frid. 1550, p. 70. Vid. Glareanus de Algorismo, 12mo. Par. 1558, p. 20. DE ARITHMET1CA. 19 tails ; quando progressio naturalis terminatur in numerum parem, per medietatem ipsius mul- tiplica numerum proximum totali superiorem ; verbi gratia, 1.2.3.4. multiplica quinarium per binarium, et exibunt decem, summa totius progressionis. Secunda regula talis est; quando progressio naturalis terminatur in numerum im- parem, sume majorem partem illius imparis et per illam multiplica totalem numerum; verbi gratia, 1.2.3.4.5. multiplica quinarium per ipsum trinarium, et resultabunt quidenarius, summa totius progressionis. Similiter de pro- gressione intercisa duse dantur regulse, quarum prima talis est ; quando progressio intercisa terminatur in numerum parem, per medietatem illius multiplica numerum proximum medietati superiorem, ut, 2.4.6. multiplica quaternariem per ternarium, et resultabunt duodecim, summa totius progressionis. Secunda regula talis est; quando progressio intercisa terminatur in nu- merum imparem, multiplica majorem portionem per se ipsam ; verbi gratia, 1.3.5. multiplica ternarium per se et exibit nonenarius, summa totius progressionis. IX. — Perambulum ad Radicum Extractionem. Sequitur de radicum extractione, et primo in quadratis : unde videndum est qui sit numerus quadratus et quse sit radix numeri, et quid sit radicem ejus extrahere. Primo notandum tamen c2 20 SACRO-BOSCO est haec divisio ; numerorum alias linearis, alius artificialis, alius solidus. Numerus linearis est qui consideratur tamen penes processum, non habito respectu ad ductionem numeri in nume- rum, et dicitur linearis, quia unicum tantum habet numerum, sicut linea unicam habet di- mensionem, longitudinem sine latitudine. Nu- merus superficialis est qui resultat ex ductu numeri in numerum, et dicitur superficialis quia habet duos numeros denotantes sive mensurantes ipsum, sicut superficies duas habet divisiones ; scilicet, longitudinem et latitudinem. Sed scien- dum est qui dupliciter potest numerus duci in numerum aut semel aut bis : si numerus semel ducatur in numerum hoc erit in seipsum vel in alium. Sciendum quod si ducatur in se semel, fit numerus quadratus, qui, diversum scriptus per unitates, habet quatuor latera sequalia admo- dum quadranguli. Si ducatur in alium, fit nume- rus superficialis et non quadratus, ut binarius ductus in ternarium constituit senarium, nume- rum superficialem, et non quadrat um ; unde patet quod omnis numerus quadratus est superficialis et non convertitur. Radix autem numeri quad- rati est ille numerus qui ita ducitur in se, ut bis duo sunt quatuor. Quaternarius igitur est pri- mus numerus quadratus, et binarius est ejus radix. Si autem numerus bis ducatur in numerum, facit numerum solidum, ut dicitur, sicut solidus corpus tres habet dimensiones ; scilicet, longitudinem et latitudinem et spissitudinem. Ita numerus iste DE ARITHMETICA. 21 tres habet numeros ducentes in se. Sed numerus potest bis duci in numerum dupliciter, qui quot in seipsum aut in alium. Si igitur numerus bis ducatur in se vel semel in se et postea in suum quadratum sit numerus cubicus, et dicitur nume- rus cubicus ab nomine cubi quod est solidus. Est autem cubus quidam corpus habens sex super ficies, solidos octo angulos, et duodecim latera. Si autem aliquis numerus bis ducatur in alium fit numerus solidus et non cubicus ; ut bis tria bis constituerunt duodecim. Unde patet quod omnis numerus cubicus est solidus, sed non con" vertitur. Ex predictis igitur patet quod idem numerus est radix numeri quadrati et cubici, non tamen illius radicis idem est quadratus et cubicus. Cum igitur ex ductu unitatis in se semel vel bis nihil perveniat nisi unitas, sicut dicit Boetius in arithmetica sua, quod omnis unitas potentialiter est numerus omnis, nullus autem auctus. Notan- dum autem quod inter quoslibet quadratos proxi- mos continget reperire unicum medium propor- tionate, quod pervenit ex ductu radicis numeri quadrati in radicem alterius. Item inter quos- libet duos cubicos proximos est reperire dicitur medium proportionale, scilicet, minus medium et majus. Minus medium pervenit ex ductu radicis majoris cubici in quadratum minoris. Majus medium est, si ducatur radix minoris cubici in quadratum majoris. Cum igitur ultra summam numerorum solidorum in arte prsesenti, non fiat processus, autem quatuor limites nume- 22 SACRO-BOSCO rorum distinguuntur : est enim limes numerorum ejusdem naturae extremis contentorum terminis, continua ordinatio ; unde primus limes est novem digitorum continua progressio. Secundus novem articulorum principalium est tertius centenario- rum. Quartus novem millenariorum tres limites et resultant incomposites per digitorum appo- sitionem super quam cubum articulorum trium predictorum, ut si alter alteri proponatur. Sed per finalis termini rationem ex millenariorum re- ceptione super se semel per modum quadrato- rum, aut bis per modum solidorum, resultat penultima et ultimus limes. X — Extractio radicum in quadratis. Radicem numeri quadrati extrahere est, pro- posito aliquo numero, radicem quadrati invenire, si numerus propositus quadratus fuerit. Si nu- merus vero non fuerit quadratus, tune radicem extrahere est maximi quadrati sub numero pro- posito contenti invenire. Si velis igitur radicem alicujus numeri quadrati extrahere, scribe numer- um ilium per suas differentias,et computanumerum figurarum, utrum sit par vel impar. Si par, incipiendum est operari sub penultima. Si impar, ab ultima ; et, ut breviter dicatur, incipiendum est a figura posita in ultimo loco impari ; sub ultima igitur figura in impari loco posita, inveni- endus est quidam digitus, qui ductus in se deleat totum sibi suprapositum respectu sui vel inquan- DE ARITHMETICA. 23 turn vicinius potest ; tali igitur invento, ducto digito et a superior! subtracto, duplandus est ille digitus, et duplatum ponendum est sub proxima superioris versus dextram et ejus duplum sub illo. Quo facto, inveniendus est quidam digitus sub proxima figura ante duplatum, qui ductus in duplatum deleat totum suprapositum respectu duplati ; deinde ductus in se deleat totum supra- positum respectu sui vel inquantum vicinius potest: vel potest ita subtrahi digitus ultimo inventus ut ducatur in duplatum vel duplata et postea in se ; deinde ilia duo producta simul addantur, ita quod prima figura ultimi producti ponatur ante primam primi producti et superiora addatur primae, et sic de aliis, et subtrahatur simul a totali numero respectu digiti inventi. Si autem contingit quod non possit aliquis digitus inveniri post anteriorationem, ponenda est cifra sub tertia figura versus dextram, et anteriorandum est primum duplatum cum suo subduplo : non cessandum est a talis digiti inventione, nee a digiti inventi duplatione, nee a duplatorum anteriorati- one, nee a subdupli subduplo positione, donee sub prima figura inventus sit quidam digitus, qui ductus in omnes duplatos deleat totum supra- positum respectu sui vel inquantum vicinius potest. Quo facto, aut aliquid erit residuum aut nihil ; si nihil constat, quamvis propositus fuerit quadratus et ejus radix est digitus ultimo inventus cum subduplo vel cum subduplis, ita quod proponatur: si vero aliquid fuerit residuum, 24 SACRO-BOSCO constat quod numerus propositus non fuerit quadratus. Sed digitus ultimo inventus cum subduplo vel subduplis est radix maximi quadrati sub numero proposito contenti. Si velis ergo probare utrum beneficeris necne, multiplica digi- tum ultimo inventum cum subduplo vel cum subduplis per eundem digitum, et redibunt eaedem figurae quas prius habuisti, si non fuerit resi- duum ; sed si aliquid fuerit residuum, tune cum additione illius redibunt eaedem figuree quas prius habuisti. XL — Extractio radicum in cubicis. Sequitur de radicum extractione in cubicis : videndum est quid sit numerus cubicus et quse sit radix ejus, et quid sit radicem cubicam ex- trahere. Est igitur numerus cubicus, sicut patet ex predictis, qui pervenit ex ductu alicujus nu- meri bis in se vel semel in suum quadratum : radix numeri cubici est ille numerus qui ita ducitur bis in se vel semel in suum quadratum. Unde patet quod numerus cubicus et quadratus eandem habuit radicem sicut supra dictum est. Radicem autem cubicam extrahere est numeri propositi radicem invenire cubicam, si numerus propositus sit cubicus : si vero non sit cubicus, tune radicem cubicam extrahere est maximi cubici sub numero proposito contenti radicem cubicam invenire. Proposito igitur aliquo nu- mero, cujus radicem velis extrahere cubicam; DE ARITHMETICA. 25 primo computandse sunt figurse per quartas vel sub loco ultimo millenarii inveniendus est quidam digitus qui ductus in se deleat totum suprapositum respectu sui vel inquantum vici- nius potest. Quo facto, triplandus est ille digitus et triplatum ponendum est sub proxima figura tertia versus dextram et ejus subtriplum sub subtriplo. Deinde inveniendus est quidam digitus sub proxima figura ante triplatum, qui cum subtriplo ductus in triplatum, deinde cum subtriplo ductus in productum deleat totum suprapositum respectu triplati. Deinde ductus in se deleat totum suprapositum respectu sui vel inquantum vicinius potest : hoc facto, trip- landus est ille digitus iterum et ponendum est triplatum sub tertia figura ut prius, et ejus triplatum sub eo ; postea anteriorandum est primum triplatum cum subtriplo per duas diffe- rentias. Deinde inveniendus est quidam digitus ante triplatus sub proxima figura, qui cum sub- triplis ductus in triplata et postea sine subtriplis ductus in productum deleat totum suprapositum respectu sui vel inquantum vicinius potest. Nee cessandum est a talis digiti inventione, nee a digiti inventi triplatione, nee a triplatorum an- terioratione per suas differentias, nee a subtripli subtriplo positione, nee a tali multiplicatione, nee a subtractione, donee perventum fuerit ad primam figuram sub qua inveniendus est quidam digitus qui cum subtriplis ductus in triplata, deinde sine subtriplis ductus in productum deleat 26 SACRO-BOSCO DE ARITHMETICA. totum suprapositum respectu sui vel inquantum vicinius potest. Notandum est quod productum perveniens ex ductu digit! inventi in se possunt addi et similiter simul contrahi a tali numero supraposito in respectu digiti inventi : hoc facto, aut aliquid erit residuum aut nihil : si nihil, con- stat quod numerus propositus fuit cubicus, et ejus radix est digit us ultimo in vent us propositus cum subtriplis vel subtriplo, quae radix si ducatur in se et postea in productum erunt eaedem figurae quas prius habuisti. Si vero fuerit residuum, reservetur idem exterius in tabula, et constat quod ille numerus non fuit cubicus. Sed digitus ultimo inventus cum subtriplo vel subtriplis est radix maximi cubici sibi numero proposito con- tenti, quae radix si ducatur in se et postea in productum est maximus cubicus sub numero pro- posito contentus, et si illo cubico addatur residuum in tabula, erunt eaedem figurae quae prius fuerunt. Si autem aliquis digitus post anteriorationem, non inveniri possit, tune ponenda est cifra sub quarta figura versus dextram et anteriorandae sunt figurae ut prius. Notandum est, et quod si in numero proposito non est aliquis locus mil- lenarii, incipiendum est operari sub prima figura. De extractione radicum dicta sufficiant. A METHOD USED IN ENGLAND IN THE FIFTEENTH CENTURY FOR TAKING THE ALTITUDE OF A STEEPLE OR INACCESSIBLE OBJECT.5 MS. LANSD. MUS. BRIT. 762. FOL. 23. B. HERE foloweth a rule howe a maim stondyng in a playne by a steple or such another thynge of height by lokyng vponn it shall knowe the certentie of the height thereof. First, let a mann consider by his estimacioun howe farre he stond- eth from it be it xx, xxx, or xl fadam, And thereaboute as he demeth the certentie let hym stonde and there pitche a staffe the vpper poynte thereof to be juste with his yie, he stondyng upp righte therby. And thann let hym leye hym 5 It is scarcely necessary to observe that this method of pro- ceeding could only have been practised by the more ignorant classes : the English mathematicians of that period were skilful in the application of the quadrant, and all other then known scientific instruments, as may be seen from their numerous works which still remain in manuscript in the various public and private collections of Great Britain. Fuller quaintly remarks, " I never did spring such a covye of mathematicians all at once, as I met with at this time." — History of the Worthies of England, Edit. 1811. Vol. II. p. 28 A RULE FOR MEASURING ALTITUDES. downe alonge upp righte beyonde the staffe from the steple warde his feet juste to the staffe, and whann the staffe so stondeth he lying as is afore- said, as his yie on the hyghest poynte of the staffe is juste with the height of the heighest poynte of«the steple. Than the juste space from his yie as he lyith to the foote of the steple, that is to saye to that parte of the foote which is as litill as the top therof is the juste mesure of the height of the said steple. And if the staff stonde not juste let hymm remeve it till his yie he lying as is aforesaid with the highest poynte of the staf accorde with the highest poynte of the steple. A TREATISE NUMERATION OF ALGORISM, FROM A MS. OF THE HTH CENTURY. To alle suche even nombrys the most have cifrys as to ten. twenty, thirtty. an hundred, an thousand and suche other, but ye schal vnder- stonde that a cifre tokeneth nothinge but he maketh other the more signiflcatyf that comith after hym. Also ye schal vnderstonde that in nombrys composyt and in alle other nombrys that ben of diverse figurys ye schal begynne in the ritht syde and so rekene backwarde and so he schal be wryte as thus — 1000. the cifre in the ritht side was first wryte and yit he tokeneth nothinge no the secunde no the thridde but thei maken that figure of 1 the more signyficatyf that comith after hem by as moche as he born oute of his first place where he schuld yf he stode ther 30 THE NUMERATION tokene but one. And there he stondith nowe in the ferye place he tokeneth a thousand as by this rewle. In the first place he tokeneth but hyrn- self. In the secunde place he tokeneth ten times hymself. In the thridde place he tokeneth an hundred tymes himself. In the ferye he tokeneth a thousand tymes himself. In the fyftye place he tokeneth ten thousand tymes himself. In the sexte place he tokeneth an hundred thousand tymes hymself. In the seveth place he tokeneth ten hundred thousand tymes hymself, &c. And ye schal vnderstond that this worde nombre is partyd into thre partyes. Somme is callyd nom- bre of digitys for alle ben digitys that ben withine ten as ix, viii, vii, vi, v, iv, iii, ii, i. Articules ben alle thei that mow be devyded into nombrys of ten as xx, xxx, xl, and suche other. Composittys be alle nombrys that ben componyd of a digyt and of an articule as fourtene fyftene thrittene and suche other. Fourtene is componyd of four that is a digyt and of ten that is an articule. Fyftene is com- ponyd of fy ve that is a digyt and of ten that is an articule and so of others But as to this rewle. In the firste place he tokeneth but himself that is to say he tokeneth but that and no more. If that he stonde in the secunde place he tokeneth ten tymes himself as this figure 2 here 21. this is oon and twenty. This figure 2 stondith in the secunde place and therfor he tokeneth ten tymes himself and ten tymes 2 is OF ALGORISM. 31 twenty and so forye of every figure and he stonde after another toward the lest syde he schal tokene ten tymes as moche more as he schuld token and he stode in that place ther that the figure afore him stondeth : lo an example as thus 9634. This figure of foure that hath this schape 4 tokeneth but himself for he stondeth in the first place. The figure of thre that hath this schape 3 tokeneth ten tyme himself for he ston- deth in the secunde place and that is thritti. The figure of sexe that hath this schape 6 tokeneth ten tyme more than he schuld and he stode in the place yer the figure of thre stondeth for ther he schuld tokene but sexty. And now he tokeneth ten tymes that is sexe hundrid. The figure of nyne that hath this schape 9 tokeneth ten tymes more than he schulde and he stode in the place ther the figure of 6 ston- deth inne for thanne he schuld tokene but nyne hundryd. And in the place that he stondeth inne nowe he tokeneth nine thousand. AHe the hole nombre of these foure figurys. Nine thousand sexe hundrid and foure and thritti. A TREATISE ON THE PROPERTIES AND QUALITIES OF GLASSES FOR OPTICAL PURPOSES, ACCORDING TO THE MAKING, POLISHING, AND GRINDING OF THEM. BY WILLIAM BOURNE. FROM MS. LANSD. MUS. BRTT. 121. EPISTLE DEDICATORY. To the Right Honorable, and hys singular good Lorde, Sir Wilyam Cicil, Baron of Burghley, Knight of the moste noble order of the garter, Lorde Highe Treasurer of Englande : Mr. of the Courte of Wardes and Liverys, Chancelour of the Vniversity of Cambridge, and one of the Queens Majestie's Honorable Privy Counsell. Right Honorable, fynding myself moste deepely bounde, vnto youre Honour, in dyvers respects : And allso youre Honours moste excellent and worthy skilles, and knowledge in all notable, laudable and noble experiences of learning in all maner of causes : And allso, for that of late youre honour hathe had some conference and BOURNE ON OPTIC GLASSES. 33 speache with mee, as concerning the effects and qualityes of glasses, I have thought yt my duty to furnish your desyer, according vnto suche simple skill, as God hathe given me, in these causes, Whiche ys muche inferiour vnto the knowledg of those, that ys learned and hathe red suche authors, as have written in those causes, and also have better ability and tyme, to seke the effects, and quality thereof, then I have, eyther elles can, or may, by the meanes of my small ability, and greate charge of children : Whiche (otherwyse) yt ys possible that I shoulde have bene better able to have done a nomber of thinges, that now I must of force leave, that perhapps shoulde have bene. And allso aboute seaven yeares passed, vppon occasyon of a cer- tayne written Booke of myne, which I delivered your honour, Wherein was set downe the nature and qualitye of water : As tuchinge ye sinckinge or swymminge of thinges. In sort youre Honoure had some speeche with mee, as touching measuring the moulde of a shipp. Whiche gave mee occasyon, to wryte a litle Boke of Statick.6 Whiche Booke since that tyme, hath beene profit- able, and helpped the capacityes, bothe of some sea men, and allso shipp carpenters. Therefore, I have now written this simple, and breefe note, of the effects, and qualityes of glasses, according vnto the several formes, facyons, and makyngs 6 The work here alluded to is probably his "Treasure for Travellers," which was published at London in 1578. D 34 THE PROPERTIES AND QUALITIES of them, and allso the foylinges of them. That ys to saye, the foyle or using of them, that yow may not looke thorowe the Glass: Whiche causeth the Glass to cast a beame vnto your eye, acord- ing vnto the shape, or forme of any thinge, yt standeth against yt. And allso the polishing and grynding of glasse, whiche causeth sondry effects: As in ye readinge hereafter dothe ap- peare the merveylous nature and operation of glasses &c. I humbly desyring your Honour, to take this simple rude matter in good parte: And to accept yt as my good Will, allthoughe that the matter ys of none importance. By your Honoures, dutyfully to Commande, W. BOURNE. CHAPTER I.— Introduction. Whereas the eye ys the principall member of the body neyther the Body in respect, coulde not moove any distance, but vnto perrill, yf yt were not for the sighte of the Eye, whose quality ys moste wonderfull, and hathe the largest prehemi- nence of all the members of the body. For that the Eye ys able to discerne and see any thinge, how farr down that the distance ys from yow : Yf the thinge bee of magnitude or bignes, corres- pondent vnto the distance. Now, this quality of the sighte of the Eye ys of no quantity or bignes : OF GLASSES FOR OPTICAL PURPOSES 35 But onely the quality of the eye ys to see, and begynneth at a poynte, withoute any quantity or bignes. As for example you may knowe yt by this : Pricke a hoale in any thinge, with the poynte of a fine needle, and then holde that vnto your Eye, and beholde any thinge thorowe the hole, and you may see a greater thinge, if that yt bee any distance from yow : yow may beholde a whole towne, beeynge a greate distance from you, &c. And for that perspective ys the dis- cerning of any thinge either substancyall or acci- dentall, accordinge to the bignes, and distance, and hath his boundes, betweene too righte lynes, from a poynte : And so extending infinitely from the sight of the Eye, yt showeth yt self according to the quantity or bignes, correspondent vnto the distance. And for that perspective ys muche amplifyed and furdered by the vertue and meanes of Glasses, I do thinke yt good to shewe the pro- perty of glasses : And suche, as touchinge the nature and quality of glasses, commonly called Lookinge Glasses. Whiche are those sortes of Glasses, that have a ffoyle, layde on the backe syde thereof, that causeth the same glasse to cast from yt a beame or shadowe, accordinge vnto the forme of that thinge that standeth ageanst yt shewynge yt vnto the sighte of the eye. Whereof there ys three severall sortes, accordinge vnto the sundry makinge and polisshinge of these glasses : I do not meane sondry sortes of stuffe, ffor that theare ys some sortes of lookinge glasses D 2 36 THE PROPERTIES AND QUALITIES that are made of metalles, which are commonly called steele glasses. But I do meane three son- dry sorts of forms of making them. As in the one sorte, the beame will shewe ytself accordinge to the bignes, as yt ys : And in the other sorte yt will shewe ytself less, as in the order of the making of yt, the face of a man shall not shewe ytself as broade as the nayle of youre hande. And so accordingly you may make the glasse to shewe the face, at what bignes you lyst, vntill that yt shall shewe the face at inst the bignes thereof. And the thirde sorte of the making of glasses as you may make the glasse, in sorte, that you will make the face as bigg as the whole glasse, howe broade soever that the glasse ys, yow standing at some one assigned distance. CHAPTER II. In what forme to make Glasses, for to have yt shewe yt self, according to the bignes of the thinge. For to have a Glasse (to shewe the beame vnto the eye of that biggnes that the thinge ys) That glasse must bee made flatt and playne ; and being well polysshed, and smoothe, and well foyled on the back syde. Then you standinge righte with the middle thereof, you shall receave a beame vnto your eye of the trewe forme and shape of OF GLASSES FOR OPTICAL PURPOSES. 37 your face, or any thinge, that standeth directly right against yt. But yf that you do stande any thinge oblique, or awrye, so shall you receave the beame, or see any thinge that maketh the lyke triangle, eyther acute, or sharpp, and obtuse or broade ; Accordinge vnto the angle : that commeth from youre eye, vnto the glasse. So shall you receave, or see that beame, accordinge vnto the angle on the other syde, whatsoever that yt bee, howe farr soever that thinge ys in distance from the place, or neare hande. CHAPTER III. In what forme to make glasses for to have them shewe the forme or facyon of any thinge Jess in bignes then yt ys. To have a glasse to make any thinge shewe smaller then yt ys, That must be in the makinge thereof made hillye or bossy out- wardes, and to have the foylle layde on the hollowe or concave syde, and so yt may bee made, that youre face showe in the beame that commeth to the eye, as small as you lyst, or any syse that ys less than your face at your pleasure. And for to have yt shewe very smalle, then let yt be made half a globe, or boawle, as smalle as a Tennys balle, and so the foylle layde on the concave or hollowe syde. So 38 THE PROPERTIES AND QUALITIES shall the beame that ys cast vnto your eye, shewe your whole face, not to be so bigg as the nayle of your fingeres, and so you may make y t to bee hilly, or bossy outewardes, to have any thinge to shewe of what syse, that you lyst. For if that yt bee made as half a boawle or globe, Then of what syde soever you doo stande, you shall see you re owne face, or any thinge that standeth right as you do stande : And to bee in swellenes accordinge to the forme of the hylling or bossing outwardes. And allso as many tymes, that you doo see looking glasses, which make the face longer or broder then the forme or proportyon of your face, the reason thereof ys, that yt hilleth or bosseth more one way, then yt dothe another way. And that way that yt bendeth moste outewardes, that way yt maketh moste narrowest, and that way, that the glasse ys moste myghtest, that way yt sheweth the face moste longest. For yf that a glasse were made righte one way, and rounde outwardes the other way, and the foyle layde on the hollow syde, Then that Glasse woulde make the face, the streighte way, the inst lengthe of the face, and the other way narrowe accordinge vnto the roundinge of the glasse. So that all sortes of Lookinge glasses, that dothe bosse or hyll owtewardes, dothe shewe the thinge less then yt ys, accordinge vnto the bendinge hilling or bossinge outwarde. OF GLASSES FOR OPTICAL PURPOSES. 39 CHAPTER IV. \ In what manor of forme to make Lookinge Glasses, to make any thinge shewe bigger then ytys. To make lookinge Glasses for to shewe any thinge bigger then yt ys, That Glasse muste bee made very large : for elles yt will not conteyne any quantitye in sighte ; and this glasse must bee Concave inwardes, and well pollyshed of the hollowe or concave syde : and then the foylle must bee layde on that syde that doth swell, as a hyll, and bosse outwarde. And then this glasse, the property of yt ys, to make all thinges which are scene in yt to seem muche bigger then yt ys to the syghte of the Eye, and at some appoynted distance, from the glasse, accordinge to the forme of the hollowness, the thinge will seeme at the biggest, and so yow standinge nearer the thinge will seeme less, vnto the sighte of the eye : so that, accordinge vnto the forme of the concavity or hollownes, and at some appointed distance from hym that looketh into the glasse, And yf that the glasse were a yearde broade, the beame that shoulde come vnto his eye, shall showe his face as broade, as the whole glasse, And to see his face in this glasse, hee must stande righte with the middle of the glasse, &c. And these sortes of glasses ys very necessary for 40 THE PROPERTIES AND QUALITIES perspective : for that yt maketh a large beame, whereby that a small thinge may be scene, at a greate distance from you: and especially to bee amplified by the ayde of other glasses, &c. CHAPTER V. In what order to make a glass, that yow may looke thorow, that shall forther your sighte, and to have a small thynge to seem bigg, which ys very necessary for perspective: And yt may bee so made, that you may discerne a small thinge, a greate distance, and specyally by the ayde of other glasses. And nowe furdermore, as I have shewed before, the forme, and facyon of glasses, that dothe reflect a beame from the glasse, commonly called Lookinge Glasses : So in lyke manner I will shewe you the makinge of Glasses called perspec- tive glasses, that do helpe sighte, by the meanes of the beame, that pearceth commonly thorowe the glasse. And first for makinge of the smallest sorte of them, commonly called spectacle glasses. These sortes of glasses ys grounde vppon a toole of Iron, made of purpose, somewhat hollowe, or concave inwardes. And may be made of any kynde of glasse, but the clearer the better. And so the Glasse, after that yt ys full rounde, ys made fast with syman vppon a smalle block, OF GLASSES FOR OPTICAL PURPOSES- 41 and so grounde by hande, vntill that yt ys bothe smoothe and allso thynne, by the edges, or sydes, but thickest in the middle. And then yt ys the quality or property of the Glasse that ys cleare, to shewe all thinge, that ys seene through yt, to seeme bigger and perfecter, then that yow may see yt withoute the Glasse, and the thynner vnto the sydes and edges. And the thicker that yt ys in the middle, the bigger or larger any thinge sheweth vnto the eye, and yf that the glasse bee very cleare, the more perfecter, &c. And now allso in lyke manner for to make a glasse for perspective, for to beholde, and see any thinge, that ys of greate distance from yow, which ys very necessary : for to vie we an army of men, or any castle, or forte, or such other lyke causes. Then they must prepare very cleare, and white Glasse that may bee rounde, and beare a foote in diameter ; as fyne and white Vennys Glasse. And the larger, the better : and allso yt must bee of a good thicknes, and then yt must bee grounde vppon a toole fitt for the purpose. Beynge sett fyrst vppon a syman block, and firste, grynde on the one syde, and then on ye other syde, vntill that the sydes bee very thynn, and the middle thicke. And for that yf the glasse bee very thicke, then yt will hynder the sighte. Therefore yt must bee grounde vntill that the myddle thereof bee not above a quarter of an ynche in thickness : and the sydes or edges very thynne, and so polysshed or cleared. And so 42 THE PROPERTIES AND QUALITIES sette in a frame meete for the purpose for use : so that yt may not be broken. And so this glasse being made in this forme, Then yt wille have three marvellous operacyons, or qualityes, as hereafter you shall see. CHAPTER VI. The first, and the Principall quality of this Glass, and ys, as touchinge perspective. The quality of the Glasse, (that ys made as before ys rehearsed) ys, that in the beholding any thinge thorowe the glasse, yow standinge neare vnto the Glasse, yt will seeme thorow the glasse to bee but little bigger, then the propor- tion ys of yt : But as yow do stande further, and further from yt, so shall the perspective beame, that commeth through ye glasse, make the thinge to seeme bigger and bigger, vntill suche tyme, that the thinge shall seeme shall seeme 7 of a marvellous bignes : Whereby that these sortes of glasses shall muche proffet them, that desyer to beholde those things that ys of great distance from them : And especially yt will be much amplifyed and furdered, by the receavinge of the beame that commeth thorow the glasse, somewhatt 7 This repetition of the words " shall seeme " is evidently a mistake, but being in the original MS. I have retained it in the text. OF GLASSES FOR OPTICAL PURPOSES 43 concave or hollowe inwardes and well polysshed as I will hereafter furder declare. CHAPTER VII. The seconde quality of this glass made in the forme before declared. The quality of this Glass ys, if that the sunne beames do pearce throughe yt, at a certayne quantity of distance, and that yt will burne any thinge, that ys apte for to take fyer : And this burnynge beame, ys somewhat furder from the glasse, then the perspective beame. CHAPTER VIII. The thyrde quality of this kynde of Glass, that ys grounde, and made in that for me before declared > ys to reverse, and turne that thyng that yow do beholde, thorowe ye glass, to stande the contrary way. And yf that yow doo beholde any thinge thorowe this Glasse, and sett the glasse furder from yowe then the burninge beame, and Sv, extendinge after that what distance that yow list, all suche thinges, that yow doo see or beholde, thoroughe the glasse, the toppes ys turned downwardes. Whether that yt bee trees, hilles, shippes on the water, or any other thinge what- 44 THE PROPERTIES AND QUALITIES soever that yt be : As yf that yt were people, yow shall see them thoroughe the Glasse, theyre heades downwardes, and theyre feete vpwardes, theire righte hande turned to theyre lefte hande, &c. So that this kynde of Glasse beynge thus grounde hathe three marvellous qualityes. For at some assigned, or appoynted distance, accord- inge vnto the gryndinge of the Glasse, bothe in his diameter, and thicknes in the middle, and thinnes towardes the sydes. That (beholdinge any thinge thorowe the glasse) yt shall make the best perspective beame : So that the thinge that yow doo see thorowe shall seeme very large and greate : and more perfitter withall. And allso standing further from the glasse yow shall discerne nothinge thorowe the glasse : But like a myst, or water : And at that distance ys the burninge beame, when that yow do holde yt so that the sunne beames dothe pearce thorowe yt. And allso yf that yow do stande further from the glasse, and beholde any thinge thorowe the glasse, Then you shall see yt re- versed and turned the contrary way, as before ys declared. So that accorclinge vnto youre severall standinge, nearer, or furder from the Glasse, beholding any thinge thorowe yt. Suche, yt hathe his perspective beame : and then stand- inge furder from the glasse, and then all thinges seen thorowe, shall shewe vnto the sighte of your eye, cleene turned, and reversed another way, whatsoever that yt bee. OF GLASSES FOR OPTICAL PURPOSES. 45 CHAPTER IX. The effects what may bee done with these two last sortes of glasses: The one concave with a foyle, vppon the hylly syde, and the other grounde and pollisshed smoothe, the thickest in the myddley and thinnest towordes the edges or sydes. For that the habillity of my purse ys not able for to reache, or beare the charges, for to seeke thorowly what may bee done with these two sortes of Glasses, that ys to say, the hollowe or concave glasse : and allso that glasse, that ys grounde and polysshed rounde, and thickest on the myddle, and thynnest towardes the sydes or edges, Therefore I can say the lesse vnto the matter. For that there ys dyvers in this Lande, that can say and dothe knowe muche more, in these causes, then I : and specially Mr. Dee, and allso Mr. Thomas Digges, for that by theyre Learninge, they have reade and scene many moo auctors in those causes : And allso, theyre ability ys suche, that they may the better mayntayne the charges : And also they have more leysure and better tyme to practyze those matters, which ys not possible for mee, for to knowe in a nombre of causes, that thinge that they doo knowe. But notwithstanding upon the smalle proofe and ex- peryence those that bee but vnto small purpose, 46 THE PROPERTIES AND QUALITIES of the skylles and knowlledge of these causes, yet I am assured that the glasse that ys grounde, beynge of very cleare stuffe, and of a good large- nes, and placed so, that the beame dothe come thorowe, and so reseaved into a very large con- cave lookinge glasse, That yt will shewe the thinge of a marvellous largeness, in manner vncredable to bee beleeved of the common people. Wherefore yt ys to bee supposed, and allso, I am of that opinyon, that havinge dy vers, and sondry sortes of these concave lookinge glasses, made of a great largeness, That suche the beame, or forme and facyon of any thinge beeynge of greate distance, from the place, and so reseaved fyrste into one glasse : and so the beame reseaved into another of these concave glasses : and so reseaved from one glasse into another, beeynge so placed at suche a distance, that every glasse dothe make his largest beame. And so yt ys possible, that yt may bee helpped and furdered the one glasse with the other, as the concave lookinge glasse with the other grounde and polysshed glasse. That yt ys lykely yt ys true to see a smalle thinge, of very greate distance. For that the one glasse dothe rayse and enlarge, the beame of the other so wonderfully. So that those things that Mr. Thomas Digges hathe written8 that his 8 "My father by his continual paynfull practises, assisted with demonstrations Mathematicall, was able, and sundrie times hath by proportionall Glasses duely situate in convenient angles, not onely discovered things farre off, read letters, numbred OF GLASSES FOR OPTICAL PURPOSES. 47 father hathe done, may bee accomplisshed very well, withowte any dowbte of the matter : But that the greatest impediment ys, that yow can not beholde, and see, but the smaller quantity at a tyme. peeces of money with the very coyne and superscription thereof, cast by some of his freends of purpose vppon Downes in open fieldes, but also seven myles of declared what hath been doon at that instante in private places." — Pref. to Pantometria. Edit. 1571. Sig. A. iii. b. JOHANNIS ROBYNS DE COMETIS COMMENTARIA. DEDICATIO. AD invictissimum principem Henricum ejusdem nominis octavum, Serenissimum Anglorum Re- gem, de cometis commentaria Johannis Robyns sui Alumni, et socii Collegii Omnium Animarum, Oxoniae. Quanquam omnes philosophise partes (Princeps Illustrissime) turn utiles, turn jucundse sint ; ea tamen philosophise portio, quae de caelis, caelo- rumque motibus ordine ac influentiis agit, caeteris loiige praestantior, multo jucundior, et pene divinum quid nobis esse videtur. Id quod luculentius apparebit, si de his, quse in aliis phi- losophise partibus tractantur, pauca dixerimus. Et primam a crassissimo, et infimo elemento, scilicet terra, orationem inchoabimus, quae in media mundi sede collocatur, cernitur solida HOBYNS DE COMETIS, 49 globosa, et undique nutibus suis conglobata ; floribus, herbis, arboribus, frugibus ornata, quorum omnium incredibilis multitudo insatiabili varietate distinguitur. Adde etiam fontium geli- das perhennitates ; liquores perlucidos amnium; riparum vestitus viridissimos ; speluncarum con- cavas altitudines ; saxorum asperitates ; impen- dentium montium sublimitates ; immensitates- que camporum. Adde etiam reconditas auri, argenti, metallorumque venas, infinitamque vim marmoris. Quae vero, et quam varia genera bestiarum, vel cicurum, vel ferarum ! qui volu- crum lapsus ! atque cantus ! qui pecudum pas- tus! quse vita silvestruum ! Quid jam de homi- num genere loquar ! qui quasi cultores terrse constituti, nee patiuntur earn immanitate bellu- arum efferari, nee stirpium asperitate vastari. Quorumque operibus agri, insulae, littoraque collucent, distincta tectis et urbibus. Jam de liquidibus et fusilibus elementi (maris inquam) pulchritudine pauca dicamus oportet. Cujus quidem maris speqiem, et animantium quae in eodem continentur, satis admirari nequeo. Nam ipsum mare undique terram circumfluens, conti- nentes, insulas, peninsulas, et isthmos efficit, et quatenus diversas alluit regiones, et diversa sor- titur nomina ; ut mare Britannicum, Gallicum, Libicum, Punicum, et caetera. Ac ita quidem terram appetens circumquaque littoribus claudit, et quasi una ex duabus naturis conflata videatur. Quid de piscibus, belluisque marinis dicam? E 50 ROBYNS DE COMETIS. Quot genera, quamque disparia, partim submer- sarum, partim fluitantium, partim innatantium belluarum, partim ad saxa nativis testis inhaeren- tium? De quarum generatione, proprietatibus, et natura, Aristoteles omnium philosophorum facile princeps in historia naturali acutissime disputat. Exinde mari finitimus est aer ; cujus suprema portio purior quidem, et sincerior, coeli orbiculationem (sicuti et ipse ignis) subsequitur. Media vero aeris plaga quae (ut doctiores sen- tiunt) non parum frigescit, aptior deputatur locus, ubi vapores elevati in nubes concrescant. Inibi etiam fulmina, fulgetra, et tonitruum sedes sibi peculiares vendicant. At infima aeris regio, quae partim terrae, partim aquatico elemento conterminata junctaque cernitur, avium volatus sustinet, et salutarem, vitalemque spiritum ani- mantibus quidem terrestribus ministrat. Jam ab acre ad ignem postea nostra demigrabit oratio, qui, ex elementis in supremo ac maxime sublimi loco constitutus, aerem in sua concavitate fovens, orbiculariter complectitur. Sicut aer aquam, et aqua terram undique circuit, nisique una pars terrae propter vitam quorundam animantium tuendam aquis discooperta relinquitur. Neque sentiendum est, qua deus et natura inaniter, ac superflue hoc quartum corpus simplex scilicet ignem superaddiderunt. Aeris enim caliditas ab aquae terraeque frigiditate ilico consumeretur, nisi superior ignea vis calefactiva aerem refocil- laret. Praeterea terrae siccitas ab aere et aqua ROBYNS DE COMETIS. 51 facillime obrueretur, nisi ignis vim suam arescen^ tern emittens, aeris humiditatem deliniret. Hac- tenus succincte de elementis, caeterisque corpo- ribus,qu8e infra sphaeram activorum et passivorum continentur, Quarum rerum scientia, si (ut revera est) jucunda et delectabilis fuerit, quid de illorum corporum cognitione, quae coelestia aeter- naque esse feruntur sentiendum est ? A quorum influentiis et virtutibus turn elementata (ut ita dicamus) suum regimen sortiuntur. Ab istis enim orbis terrarum plagae ac regiones habitatae quibusdam certis temporum vicibus suas magnas hyemes et restates (ut Aristotelico utar verbo) recipiunt. Magna autem aestas dicitur cum aliqua provincia ex nimia siccitate et fervore ita sterilescit, ut diutius inhabitatores fovere ne- queat. Versa ince, magnam hiemem alicujus regionis appellamus, cum humectantes coelorum influentiae sic in eadem regione saeviunt, ut terra fluctibus et aquis penitus obruatur ; id quod ab aliquibus vocatur diluvium particulare : et non solum istae prodigiosae mutationes ccelorum con- stellationibus tanquam causis attribuuntur, verum etiam quae diversae regiones diversa progignunt, corporum ccelestium benignitati aut asperitati pri^ mitus ascribitur. Quaelibet enim terras habitabilis portio, suos fructus et fruges, arbores, herbas, ac frutices, lapides etiam pretiosos et mineralia, pro coeli qualitate et influentiis producit. Quid de fertilitate et abundantia, pace atque tranquilli- tate, fame, bello, pestilentia, etbrutorum animan» 52 ROBYNS DE COMETIS. tium strage dicam? quid de sectis, legibus, civitatibus, imo et regnis integris loquar ? Quo- rum omnium faelicitas et infaelicitas, mala, damna, et infortunia, successiones, prosperitates, et bona, dispositive saltern a coelorum constellationibus dependent. Nee minorem certe potestatem in liquido elemento (inquam) in mari influentiae ccelestes exercent. Maris enim fluxus, et refluxus aestuosi, in istis fretorum angustiis, a virtutibus lunae demanant. Praeterea piscium et marinarum belluarum ortus, et interitus, augmentations, diminutiones, et alterationes ; necnon eorundem copia, ac penuria, astrorum virtutibus (omnium doctissimorum consensu) ascribuntur. At in aere quam manifestum imperium habent sidera, quo- rum prassentia vel absentia efficitur, ut idem aer nunc fulgentissima luce splendescat, nunc obscu- rus et tenebrosus relinquatur. Sol etenim exori- ens, suis clarissimis radiis aerem illustrans, diem conficit, et cum primum a nobis recesserit subter cardinem occidentalem , subrepta nox, quippe quae nil aliud est, quam ut aer (propter solis sub orizonte dilapsum) tenebris offundatur. Rursus et a solis cursu sub zodiaco quatuor anni tempora, ver, aastas, autumnus, et hyems pro- ficiscuntur. In quibus equidem temporibus sol aerem et caetera elementa turn tristitia quadam contrahit, turn vicissim ita laetificat, ut cum ipso coelo exhilarata esse videantur. Nolim hie in cseterarum stellarum (quaa erraticae dicuntur) ratione, ordine et influentiis multus videri, qua- ROBYNS DE COMETIS. 53 rum tantus est concentus ut cum summa Saturni infrigidet, media Martis accendat, his interjecta Jovis Stella temperet et illuminet, infraque Martem tres soli obediunt; Luna, Venus, et Mercurius. Et hae omnes stellae quas errores appellamus, iisdem vagantur spatiis, quibus et sol, et eodem modo circa terram agitatae oriuntur, et occidunt, quarum motus nunc incitantur, nunc retardantur, suisque aspectibus et influentiis, (secundum quod sub variis discurrant signis) quatuor anni tempora nunc calidiora, nunc frigidiora, nunc humidiora, nunc sicciora redeunt : qua contemplatione nihil pulchrius, nihil admirabilius esse potest. Quid de gelu, nive, grandine, ventis, pluvia tonitruo, fulmine, fulgetro, stellis item caducis et per aerem discurrentibus dicam ? quad omnia ab astrorum constellationibus progrediuntur. Pos- tremo et ilia crinita sidera famosa quidem et portentosa ccelestium stellarum vires, causain suae generations, et, si rarius spectantur, aeque natu- raliter sibi, vendicant, atque ea quae ab oculis quotidie videntur. Sed plebei quamvis numerosa rerum naturalium multitude recitari possit, qua- rum causae secretiores et magis abditae sunt, tamen ob insolitam ipsius rei faciem maximopere cometas admirantur. De quibus siquidem cometis tua sacrosancta majestas voluit, ut a nobis quse- dam commentaria in lucem aederentur. Id quod non hac quidem de causa factum erat (certissime scio) ut in his nostris perlegendis, tua sacrosancta majestas quidpiam eruditionis exhauriret, sed 54 ROBYNS DE COMETIS. aliorum consulens utilitati. Ut qui harum rerum (de quibus tractamus) minus essent periti ex nostris commentariis aliquid saltern adipisci pos- sent. Non enim incognitum est (eruditissime Princeps) quam singularis in scientiis mathe- maticis tua fuerit doctrina. Id quod ex illis disputationibus manifestissime mihi perspectum erat, quas de cometarum naturis et effectibus turn Woydstokia?, turn Bokynghamiae nobiscum habuisti, quis enim invenire poterat argutius, quis colligere veruosius, quis explicare venustius ? In aliis vero scientiis et potissime theologia (serenissime Rex) quam praestantissima tua fuerit cognitio, nihil dicturus sum. Opera enim ea quae a tua sacrosancta majestate edita sunt, sufficienter ostendunt. In quibus equidem operibus (ut illud quod sentio ingenue dicam) nee Augustino, nee Hieronimo caedere videris. Nam quam caste quam nitide, quam polite omnia mihi disputantur, solidi, succi, et nervorum plena, sed temperabo me a laudibus. Scio etenim, scio (laudatissime Princeps) quam nolunt laudari hi, qui laudes maximse merentur omnium. \_From what is here given the nature of the work may be seen, and I do not think it as a whole necessary to be printed in this place. — ED.] TWO TABLES: ONE SHEWING THE TIME OF HIGH WATER AT LONDON BRIDGE, AND THE OTHER THE DURATION OF MOON LIGHT. FROM A MS. OF THE 13TH CENTURY. Bib. Cott. Mus. Brit. Jul. D. vii. Fol. 45, b. FLOD AT LONDON BRIGGE. QUANTUM LUNA LUCET IN NOCTE. ^EtasLunae. 1 1 a o Minuta. h-3 CO 1 t o Minuta. 1 3 48 16 3 48 2 4 36 17 4 36 3 5 24 18 5 24 4 6 12 19 6 12 5 7 0 20 7 0 6 7 48 21 7 48 7 8 36 22 8 36 8 9 24 23 9 24 9 10 12 24 10 12 10 11 0 25 11 0 11 11 48 26 11 48 12 12 36 27 12 36 13 1 24 28 1 24 14 2 12 29 2 12 15 3 0 30 3 0 jEtas Luna?. g o W Minuta. JEtasLuna?. 1 Minuta. 1 10 48 16 11 12 2 1 36 17 10 24 3 2 24 18 9 36 4 3 12 19 8 48 5 4 0 20 8 0 6 4 48 21 7 12 7 5 36 22 6 24 8 6 24 23 5 36 9 7 12 24 4 48 10 8 0 25 4 0 11 8 48 26 3 12 12 9 36 27 2 29 13 10 24 28 1 36 14- 11 12 29 0 48 15 12 0 30 0 0 A TKEATISE ON THE MENSURATION OF HEIGHTS AND DISTANCES FROM A MS. OF THE HTH. CENTURY. Bib. Sloan. Mus. Brit. 213. xiv. Fol. 120. Nowe sues here a Tretis of Geometri wherby you may knowe the heghte, depnes, and the brede of mostwhat erthely thynges. Geometri9 es saide of j?is greke worde geos. J?at es erthe on englisch. and of }?is greke worde 9 Vid. MS. Bib. Reg. Mus. Brit. 17 A. 1. f. 2b-3. " The clerk Euclyde on J>is wyse hit fonde Thys craft of gemetry yn Egypte londe Yn Egypte he tawghte hyt ful wyde, Yn dyvers londe on every syde. Mony erys afterwarde y vnderstonde Gher }>at j>e craft com ynto )>ys londe. Thys craft com ynto England, as y ghow say, Yn tyme of good kyng Adelstones day." This notice of the introduction of Euclid's Elements into Eng- land, if correct, invalidates the claim of Adelard of Bath, who has always been considered the first that brought them from abroad into this country, and who flourished full two centuries MENSURATION OF HEIGHTS AND DISTANCES. 57 metros. Jrat es mesure on englisch. J?an es geome- tri als erthly mesure. for it es one of J?e sevene science techyng to mesure }?e erth in heght. depnes and brede. and length. THIS TRETIS ES DEPARTED IN THRE. f>at es to say. hegh mesure. after the "good kyng Adlestone." Adelard translated the Elements from the Arabic into Latin, and early MSS. of the translation occur in so many libraries, that we may fairly conclude that it was in general circulation among mathematicians for a considerable time after it was written. Tiraboschi was the first who remarked, that the translation attributed to Campanus, was in reality Adelard's, with a commentary by the former, (Libri Hist, des Mat. torn. n. p. 48) ; there are also several MSS. in the titles to which this is expressly stated, (MS. Bib. Bodl. Seld. Arch. B. 29. MS. Bodl. 3623. MSS. Paris, Lat. 7213, 7214, 7215. MS. Harl. Mus. Brit. 5266 : " per Adelar- dum Bathoniensum de Arabico in Latinum translatus, cum Com- mento Campani Novariensis."). In the Library of Queens' Col- lege, Cambridge, there was formerly a MS. entitled " Geometria Euclidis cum Commentario Adelardi" (Lelandi Collect, tom.iii. p. 19), and Chasles (Aperfu Historique, p. 509,) mentions one in the library of the Dominicans of St. Marc at Florence, under the same title ; this would appear to intimate that the com- mentary is also by Adelard, and many MSS. in which the name of Campanus does not appear, contain the commentary, (MS. Oxon. in Coll. S. Trin. 30, iv. MS. Harl. Mus. Brit. 5404. MS. Bib. Pub. Cant. Dd. 12, 61). Doctor John Dee, in the Catalogue of his Collection of MSS. (MS. Harl. 1879. MS. Bib. Trin. Coll. Cant. Collect. Gal. O. 4, 20. MS. Ashm. 1142.) gives the title of one, in which the books of Euclid on Optics and Catoptrics, as well as the Elements, appear under Adelard's name. There have been two independent notices of the plagiarism of Campanus ; one by Charles Butler, (the author of the " In- troduction to the Mathematics," 8vo. 1814,) in some MS. papers in the Editor's possession : the other by the Author of the article Geometry, in the " Penny Cyclopaedia." 58 MENSURATION OF playne mesure. and depe mesure. First foryi shewe we hegh mesure. fat es to say howe any thynge fat has heght may be met howe hegh it es. and f is may be done in many maneres. first f erfor schewe howe it may be done by f e quad- rant. When you wille wite f e heghte of any thyng fat you may negh. biholde fan f e heght of fat thyng by bothe holes of f e quadrant and come toward and go froward til f e perpendicle fat es to say f e threde whereon f e plumbe henges falle vpon f e mydel lyne of f e quadrant. fat es to say f e 45 degre. fan take als mykel lande behynde ye as fro f ethen to f e erthe and marke wele fat place, fan mete howe many fete are bytwene f i mark and f e fondement of fat thyng whos heght you sekest. and sekirly so many fote heght it es. Also when you wilt wite f e heght of any thynge by f e quadrant, biholde f e heght of fat thyng by bothe f e holes, and byholde vpon what place of fe quadrant fe perpendicle falles. for oufer it wille falle on j? e vmbre toward or on f>e vmbre froward. and if it falle vpon ]?e vmbre toward biholde vpon whilk poynte of fat vmbre fe perpendicle falles. fan mesure fe distaunce fat es to say f e space betwene ye and fat thyng whos heght you sekes, and when you has so done fan multiply you by 12 fat same mesure. fan al fat comes of fat multiplyeng departe you by f e nonmbre of f e poyntes of f e vmbre. and to alle fat comes f ereof set f e quantite of fin heghte. and set al fis togydere. and fan you has fe HEIGHTS AND DISTANCES, 59 heght of f e thyng whos heght you sekes. If peraventure f e perpendicle falle vpon f e vmbre froward biholde fan f e poyntes f ereof and torne fern into f e poyntes of f e vmbre toward and do furth fan as we taght byfore and f us sekirly you sale have f e heght of f e thyng whos heght you sekes. namely so f e space be playne bitweene f e and it. Note you fat f e quadrat. fat es to say 4 square whilk es descryvede fat es to say schewed in f e quadrant has tuo sides, fat es to say f e side of f e vmbre toward, and f e side of f e vmbre froward. and af er of f ese 2 sides es depar- ted in 12 even parties. When you holdes f e cone of fe quadrant. fat es to say f e cornel of f e quadrant even vpryght in whilk cornel es j?e nayle whereby J?e perpendicle henges. fan \ e circum- ferens. fat es to say f e cumpasse es toward f e erth. fan fat side of fe quadrat whilk es nere ye es called f e vmbre toward and fat of er side es called f e vmbre froward. and f e 12 departynges of aif er of f o sides are called poyntes. fan es a poynte f e twelft parte of any thyng. namely of ouf er side of f e quadrat in f e quadrant. Also when f e heght of f e sonne es more fan 45 degres. fan f e perpendicle falles vpon f e vmbre toward. And ageynward when f e heght of f e sonne es less fan 45 degrees, fan f e perpendicle falles vpon f e vmbre froward. When sothly f e heght of f e sonne es even 45 degrees, fan fe perpendicle falles even vpon fe 45 whilk es fe medil lyne. If you may noght negh f e thyng fat you wolde 60 MENSURATION OF mesure for letting of water or summe of er thyng bitwene. fan biholde f e heght f ereof by bothe f e holes, and biholde fe nonmbre of fe poyntes of f e vmbre toward, namely vpon whome f e per- pendicle falles. fan set D for a mark in fat place where you stondes pan. go ferre or nerre fat thyng whos heght you sekes. and fat by an evene lyne and beholde este f e forsaide heght by bothe holes, fan fere stondyng seke f e nonmbre of f e poyntes of f e vmbre toward, and set fere C for anofer mark, fan mesure howe many fete are bitwene f ise tuo markes D and C and kepe fat wele in f i mynde. fan abate f e lesse nonmbre of f ese tuo in f e vmbre toward fro f e more and kepe wele fe difference bytwene fo tuo nonmbres. fan multiplie by twelve fe distaunce bitwene f e forsaide D and C and alle fat comes of fat multeplyeng departe you by fe distaunce of fe poyntes. and to fat fat leves over, set als mykel as fro f ethen to f e erthe and fan sekirli you has f e heght of fat thynge. bot loke f e holes of f i quadrant be right straite and elles you may lightly be deceyvede. Peraventure you standes in an aley. and fe thyng fat you wolde mete es vp on an hegh hille. first fan biholde fe heghte of fe hille by both fe holes of fe quadrant, and fat by tuo stondynges of D and C as we taght nowe next bifore. and marke fat wele in f i mynde. fan biholde in f e same wise f e heght of the hille and of fat same thyng togedire. fan abate fe heght of fe hille HEIGHTS AND DISTANCES. 61 fro al fat remenant and fan sekirly hast ou fe heght of fat thyng. If peraventure fe contry es hilly. fan do fat fe perpendicle falle even vpon fe begynnyng of fe side of fe vmbre froward. fan se by bothe holes in fe thyng to be mesured fe poynte fat es called A and do as we taght bifore. and fat leves after fi wirkyng es f e heght fro A poynte to fe heght of f e thyng : bot fan salt you noght set f ereto \ e heght of f i stature. Parcas you woldest mesure f e heght of a thyng by the schadowe fereof. fan abyde til f e sonne be in fe heght of fyve and fourti degrees, fan mesure fe vmbre of fat thyng and fat es f e heght f ereof. If you wilt mesure f e heght of any thyng by f e schadowe fat es to say f e vmbre f ereof in ilk houre fan do fus. mesure fe vmbre fat es to say f e schadowe of fat thyng. and multiply fat by 12 and al fat departe fan by fe poyntes of f e vmbre toward, and f e nonmbre howe ofte euer it be es fe heght of fat thyng if fe per- pendicle falle vpon fe vmbre toward. If fe perpendicle falle vp fe poyntes of fe vmbre froward. fan multeply f e vmbre. fat es to say f e schaddowe by f e poyntes of fat vmbre. and al fat departe by 12 and fe nonrabre howe oft it be. es fe heght of fat thyng. Or if you wilt, lede f e poyntes of f e vmbre froward into fe poyntes of fe vmbre toward, and fan multeply fe vmbre. fat es to say fe schaddowe of fat thyng by 12 and fan al fat departe by fe 62 MENSURATION OF poyntes of fe vmbre ladde. Whilk after fe ledying are poyntes of f e vmbre toward. Take fe poyntes of the vmbre fus. late fe sonne benies passe by bothe holes, and mark where fe perpendicle falles. fan counte fe poyntes fro fe begynnyng of fe side of f e vmbre to fe touche of fe perpendicle. and fo are fe poyntes of fe vmbre. fat es to say fe scha- dowe. What poyntes ever yei be. whefer of f e vmbre toward or froward. When any thynge es whose hight you wilt mesure by f e schad- dowe f ereof and a jerde. fan rere even vp a jerde vpon fe playne grounde were fe ende of f e schadowe of fat thyng whilk you wille mesure, so rere it fat f e one parte of fame jerde falle vpon fat schadowe. and f e of er part of fat jerde falle withouten. and mark f e place in fe jerde where fe schadowe begynnes to touche it. and by fe quantite of the jerde whilk es bitwene f e touche of f e schadowe in fe jerde and fe playne. multeply fe quan- tite of al fe schadowe whilk es bitwene fe lower party of f e thyng to be mesured and f e toppe of f e schadowe in f e playne. and depart fan al fat by f e quantite of f e schadowe whilk es bitwene f e toppe of f e schadowe and fe £erde. and f e nonmbre fat fan comes es f e heght of fat thyng. Also if you wilt mesure fe heght of a thyng by fe schadowe in ilk houre of f e day. take a jerde of two fote longe or thre, and on a playne rayse it even vp. and HEIGHTS AND DISTANCES. 63 fan mesure fe schadowe of it. fan mesure fe schadowe of fat thyng to be mesuride. and multiply fat by f e length of f e jerde. and fan departe al fat by f e schadowe of f e gerde and fat nonmbre howe ofte it be es f e heght of fat thyng. If you wilt have f e heght of any thyng wantyng grounde. as if you be in an house and wolde wite howe ferre were any thyng beyng in fe rofe. Take a table and rayse it vp a litel fro fe erthe. so fat you may se fat ilk thyng bitwene f e erthe and fat table, fan take a reulure and continu it to f e table, fat es to say side to side, and fan se by al fe reulure fe thyng to be mesurede. and fan drawe a lyne in f e table by f e reu- lure. este do fe same in anofer site, fat es to say place of fe table, and make anofer lyne. fan mesure f e heght whilk es bitwene f e hy- here parte of f e table and f e erthe. and fat mesure sale be callede fe heght kept, fan set fe table on fe erthe and take tuo thredes and put fat one in fat one lyne. and fat of er threde in fat of er lyne. fan make a mark fere as f ise tuo thredes metes, fan mesure f e length bitwene f e mark and fe table, and set fereto f e heght kept, and fan hast ou fe heght of fat thyng. If you wilt mesure fe heght of any thyng withouten quadrant and withouten schadowe. rayse evene vp a rodde on a playne ageyne fat thyng and go toward it and fro ward it til f i sight beme passe by f e heght of f e gerde 64 MENSURATION OF and of fat thyng. fan loke1 ho we mikil es bi- twene f i fote and f e grounde of fat f yng in f e tyme of beholdynge. and to fat length set f e space fro f ethen to f e erthe. fan multiply al fat by f e length of f e gerde. and fan departe al fat by f e space bitwene ye and f e jerde and f ere- with fe quantite fro fethen to fe erthe. and fat es f e heght. Also when you wilt mesure f e heght of any thing by two jerds, even cor- neldly joyned, take a j^erde even to f e length of fi stature, and anofer jerde, tuo so longe als fat in fe myddel of f e lengere jerde, set fe schortere even corneldely fan f is instrument f us made layde by f e playne ground til by f e toppes of bothe f e jerdes you se f e toppe of the f ing to be mesured, fan make fere a mark and set fereto fi stature, and fan set fe marke fere, and so heigh es fat thyng howe mekil length es bitwene f e grounde of fat thyng and f e latter mark, bot forgete noght fat perpendicle or equi- pendy, fat es to say, even hangere lolle by f e toppe of f e longer rodde to schewe when fin instrument es even vpright, and when it bagges Ensample, f e stature of f e matere be called AB, fe jerde doubling it CD fe jerde evene cor- neldy joyned to it AE, and the foundement of f e f yng F, fan I say f e height of the f yng es BF, with fe quantite of BC. When you standes by a walle of a castelle or toure, and you wolde mesure f e heght of it with outen defaute, make 1 MS. loloke. HEIGHTS AND DISTANCES. 65 a quadrat or quarterd. fat es to say a table even foure square of wode or brasse of what quantite you wilt, and ay f e more it be. f e better it es. and loke it be over alle square, in f e manner of ABCD and put a chippe of what length you wilt in f e cornelle B and anofer in f e cornelle C and f e f ird in f e cornel D and loke f ei be fast on fat quadrat fat evenly f ei stande raysed vp. and f e side of f e quadrat bitwene A and B mote be persede reulefully. in whilk persyng put a chippe like f e ofer thre. bot it sale be moveable fro A to B and f is chippe sale hight E and wite you that A es f e right cornel vpward. B f e left cornel vpward. C fe left cornel don ward. D f e right cornel donward. When f e face of f e quad- rat es torned toward ye. and f ese chippes I calle eighen as in f e quadrant, fan loke even vp by C and B chippis or eighne to f e heyest of f e toure. So fat fe quadrat joyne to fe walle. and fat highest of f e toure sale hight F loke f e side AB be departed on 30 or 40 or howe fele you wilt, and in f e same manere departe J?e side AD. fan move J?e chippe E hedire and J? edire til you se J?e hiest F ageyne thurgh chippes D, E noght chaunging J?e rafer place BC fan biholde where \ e chippe E stondes bitwene A and B and loke howe mekil fat part es EA to AD and so mekil part es DC to CBF and howe ofte EA es in AB so ofte es CD in CBF forfi multiply DA in AB and fat comes f ereof departe by AE and fat nonmbre howe ofte it be es f e heght of CBF and F 66 MENSURATION OF fat you have al the heght fro F to f e erthe. me- sure f e length AC to f e erth. whilk length set to f e heght CBF and fat comes is f e verey heght. If you wilt mesure f e heght of any thyng by a myrure. lay f e myrure in f e playne grounde, and go toward and froward til you se f e toppe of fat thing in f e mydel of fat myrure. fan mul- tiply f e playne bitwene f e foundement of fat thyng to be mesured and f e myrure by f e space fro f ethen to f e erthe. and fat comes f ereof de- parte by f e space bytwene f i fote and f e myroure and f e nonmbre howe ofte it be es f e heght of fat thyng. Also als fro f ethen to f e erthe has it to f e space bytwene f i fote and f e myrure so f e heght of fat thyng has it to f e playne. Whilk es bitwene f e rote of fat thyng to be mesured and f e myrure and so ageyne. Nowe we have taght to mesure the heght of a thynge whilk es the first parte of oure tretis. We wil teche to mesure the playne. for that es the se- conde parte. When you wilt mesure f e length of any playne with f e quadrant stonde in one ende of f e playne and byholde fat of er by bothe holes, and holde f e cone, fat es to say f e cornelle of f e quadrant nere fin eigh. and f e compas toward f e playne to be mesured. fan when you sees f e of er ende of fat playne take f e nonmbre of f e poyntes of f e vmbre froward whilk f e perpendicle kyttes, fan multeply HEIGHTS AND DISTANCES. 67 f e distaunce. fat es to say f e space fro f ethen to f e erthe by 12 and departe fat comes f ereof by f e nonmbre of f e vmbre of f e poyntes froward rafer had. and f e nonmbre howe ofte it be es f e quantite of f e length of fat playne. Parcas f e playne whose length you wolde mesure es noght evene nor even distondyng to fin orisont. fat es to say to f e ende of fin sight, bot fat playne es lift vp and croked. fan biholde f e crokidnes f ereof by f e holynge. fat es to say fe eyghne of f e quadrant, whilk fus you schalt do. set vpright tuo jerdes of one length in f e endes of f e playne to be mesurede. fan biholde f e toppes of f ise thynges by bothe f e eyghne of f e quadrant, fan loke howe fele poyntes fe perpendicle kyttes. and fat of f e vmbre froward. if parcas f e perpen- dicle falle vpon fe poyntes of f e vmbre toward, fan torne fern into f e poyntes of f e vmbre fro- ward. fan kepe f ise poyntes. Est se f e ende of fat playne by bothe fe eyghen of fe quadrant, and loke howe fele poyntes of f e vmbre froward f e perpendicle kyttes. fan set f ese poyntes to f e poyntes rafer kept, if you stonde in a lowere place aftere fan you did bifore. and if you stonde in an heighere. fan take away f e poyntes rafer kept, fan do with f ise poyntes as you did with f e poyntes in f e next Chapitere bifore in mesuryng of an evene playne. fat es to say multeply f e dis- taunce fro f ethen to f e erthe by 12 and depart fat comes f ereof by f e poyntes of f e vmbre fro- ward. and fe nonmbre howe ofte it be es fe 68 MENSURATION OF quantite of f e length of fat playne. When you wilt mesure f e playne of lande or water withouten f e quadrant, take pan tuo gerdes and rayse fat one even vp right on f e playne. and calle f e playne BE and f e jerde vp raysed AB in whilk jerde set evene corneldly anof er jerde even dis- tonding to f e playne and pis jerde sale hight CD fan beside f e jerde vp raised AB set fin eigh and biholde f e ende of f e playne to be mesurede. and mark by whilk place of fat of er jerde CD f i sight bem passes, and calle fat poynte E fan by f e quantite of f e seconde jerde CD multeply f e first gerde AB and departe fat comes f ereof by f e quantite of AC and fan comes f e length of f e playne. When you wilt wite whilk es f e brede of a ryvere. kast a table vpon f e grounde nere f e ryvere. fan biholde f e ende of fat of er side f e ryver by a reulure vpon f e table. And drawe a lyne by fe reulure on fe table. Est se fe for- saide ende by f e same reulure in an of er place of f e table, and fere make anof er line, fan go in a playne place and lay a threde on fat one lyne. and anof er threde on fat of er lyne and continu fern even til f ei come to gidere. and howe mykel distaunce fat es to say space es fro f e metyng of fe thredes to fe table so brode es fe ryvere. When you wilt mesure f e brede of a ryvere by a quadrat, make fi quadrat ABCD as it es saide bifore of mesuryng of heght by f e quadrant, fan set f e quadrat beside f e ryvere and loke by CB f e ende on fat of qer side f e ryvere. and calle fat HEIGHTS AND DISTANCES. 69 ende F and B es f e ende on f is side f e ryvere. pan go fro B poynte by an evene lyne with f is quadrat, and fat f e reulure of fat lyne be oc- thogonyely. fat es to say even corneldly bytwene B and F til yu se est f e ende F by f e poyntes or chippes D, B in f e quadrat, and calle G f e mark in fe place of fe seconde site, fat es to say stondynge fan howe mekil length es bitwene B and G so mekil as fe brede bytwene B and F. Also when you stondes by a ryvere and wille me- sure fe brede of it. put fis quadrat vpon fe erche nere f e ryvere. and biholde by f e lyne CB f e ende on fat of er side f e ryvere whilk es called F. fan move E hedire and f idere til you se f e same ende F by DE noght changyng fe first place of BC. fan biholde where E stondes bi- twene A and B fan multiply DA into AB and de- parte fat comes f ereof by AE and f e nonmbre fat comes howe oft it be es f e brede of f e ryvere whilk es BF. When you wilt mesure a playne by a mesure. fan rayse vp right on f e playne a rod of f e length fro fin eigh to f e erche. and calle fat rod AB. on fat rod hange a litel myrure. and ay f e lesse f e better, and f e place on f e rod where f e myroure hanges calle C and f e playne to be mesurede sale hight AD. fan stonde you vpon f o playne bitwene f e myrure and f e ende of f e length of fe playne. and loke in fe myrure movyng toward and froward f e myrure til you se fe ende of fe playne in fe mydille of the myrure. fat place of f e playne where you stondes 70 MENSURATION OF you sale calle it E. fan multiply f e length of f i stondynge fro f e jerde by f e quantite bytwene f e myrure and f e playne. and departe fat comes f ereof by f e distaunce of f e myrure fro f e hyere parte of f e rod. and fat nonmbre howe ofte it be es f e length of fat playne. as f us. multiply AE in AC and depart fat comes f ereof by f e lyne CB. and f e nonmbre fat comes f ereof es f e length of f e playne. Nowe we have taght to mesure the playnes of ilk erihly thyng whilk es the secunde parte of this tretyse. So we teche to mesure the depnes. for that es the thrid parte and laste of this boke. When you wille mesure f e depnes of a welle. loke fro fat one side of f e welle to }?e ende of f>at oj?er syde in f>e bothome of f>e same welle with Ipe quadrant, and holde J?e cornel of }?e quadrant nere fine eigh. and f>e circumferens toward J?e welle and take hede what es f>e nonmbre of f>e poyntes of }?e vmbre toward vpon whilk j?e perpendicle falles. fan mesure \ e diameter of J? e pit or welle. fat es to say f e mouthes brede. and multiply fat by 12 and depart fat comes f ereof by f e nonmbre of f e forsaide poyntes and howe ofte fat nonmbre be. it es f e depnes of fat pitte. Also for f e same, rayse vp a table on f e mouthe of f e welle. fan put vpon f e table a reulure whereby biholde you f e ende on f e bothome f ereof. fan make f er a lyne by fat reulure. est put f e reulure in anof er place HEIGHTS AND DISTANCES. 71 of pe table, and pan se by pat reulure pe forsaide ende. and pere make anoper lyne by pe reulure in pat table. pan lay pe table vpon pe playne grounde. and lay on pise tuo lynes tuo thredes even til pei mete, pan mesure pe distaunce bitwene pe metyng of po thredes and pe table, and so depe es pe welle Also for J>e same.rayse even vp on }?e mouthe of )?e well swilk a quadrat as we spak of bifore. J?an by CB loke J?e ende in J?e bothome of J?e welle. and |?at sale hight F. pan move E toward and fro ward til by DE you se est F noght chaungynge J?e first place BC. }?an biholde where E stondes bytwene AB. pan multiply DA in AB and departe pat comes pereof by AE. and pat nonmbre howe oft it be es pe depnes of pe welle. whilk es BF. Nowe oure tretis of geometri es thus endid. AN ACCOUNT TABLE FOR THE USE OF MERCHANTS. FROM A MS. OF THE FOURTEENTH CENTURY. Bib. Sloan. Mm. Brit. 213. — 0 0 10 0 0 0 0 0 0 0 0 0 11 9 8 7 6 5 4 3 0 2 0 2 1 0 3 — — pen yes 0 _ 0 0 — — 0 0 0 0 0 0 1 0 0 2 11 10 9 8 7 6 5 4 3 1 0 12 13 schilJynges — — T5 0 e 3 & S — 0 X 0 0 ferthynges | —"• 0 0 0 0 14 15 schyllynges m 0 c 0 X 1 — m 0 0 0 c 0 0 0 X m c X 0 0 0 0 0 0 0 0 0 0 0 0 16 0 0 0 0 0 2 17 0 0 0 0 0 0 0 3 0 0 18 0 0 0 0 0 0 0 0 0 0 4 19 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 5 — — - — " ~~~~ 0 0 0 0 0 0 6 0 0 0 0 0 0 0 0 0 0 0 7 0 0 0 0 0 0 0 0 0 0 0 0 8 0 0 0 0 0 0 0 0 0 0 9 This es tabil marchaunte for alle manere acountes. CARMEN DE ALGORISMO, H.EC algorismus ars praesens dicitur;2 in qua Talibus Indorum3 fruimur bis quinque figuris. 0. 9. 8. 7. 6. 5. 4. 3. 2. 1. Primaque significat unum: duo vero secunda: Tertia significat tria : sic precede sinistra Donee ad extremam venias, quse cifra vocatur ; Quae nil significat; dat significare sequenti. Quaelibet illarum si primo limite ponas, Simpliciter se significat : si vero secundo, 2 " Haec praesens ars dicitur algorismus ab Algore rege ejus inventore, vel dicitur ab algos quod est ars, et rodos quod est numerus ; quae est ars numerorum vel numerandi, ad quam artem bene sciendum inveniebantur apud Indos bis quinque (id est decem) figurae." Comment. Thomce de Novo-Mercatu. MS. Bib. Reg. Mus. Brit. 12 E. 1. 3 "Has necessariae figurae sunt Indorum characteros." MS. de numeratione. Bib. Sloan. Mus. Brit. 513, fol. 58. "Cum vidissem Yndos constituisse ix literas in universe numero suo propter dis- positionem suam quam posuerunt, volui patefacere de opere quod sit per eas aliquidque esset levius discentibus, si Deus voluerit. Si autem Indi hoc voluerunt et intentio illorum nihil novem literis fuit, causa quae mihi potuit. Deus direxit me ad hoc. Si vero alia dicam praeter earn quam ego exposui, hoc fecerunt per hoc quod ego exposui, eadem tarn certissime et absque ulla dubitatione poterit inveniri. Levitasque patebit aspicientibus et discentibus." MS. Bibl. Publ. Cant. 1869, Ii, vi.5. 74 CARMEN DE ALGORISMO. Se decies : sursum procedas multiplicando. Post prsedicta scias breviter quod tres numerorum Distinctse species sunt; nam quidam digit! sunt; Articuli quidam; quidam quoque compositi sunt. Sunt digiti numeri qui semper infra decem sunt ; Articuli decupli digitorum ; compositi sunt Illi qui constant ex articulis digitisque. Ergo, proposito numero tibi scribere, primo Respicias quis sit numerus ; quia si digitus sit, Una figura satis sibi ; sed si compositus sit, Primo scribe loco digitum post articulum ; atque Si sit articulus, in primo limite cifram, Articulum vero tu in limite scribe sequenti. Quolibet in numero, si par sit prima figura, Par erit et totum, quicquid sibi continuatur ; Impar si fuerit, totum sibi fiet et impar. Septem4 sunt partes, non plures, istius artis ; Addere, subtrahere, duplareque dimidiare ; Sextaque dividere est, sed quinta est multiplicare ; Radicem extrahere pars septima dicitur esse. Subtrahis aut addis a dextris vel mediabis ; A leva dupla, divide, multiplicaque ; 4 En argorisme devon prendre Vii especes .... Adision subtracion Doubloison mediacion Monteploie et division Et de radix enstracion A chez vii especes savoir Doit chascun en memoire avoir Letres qui figures sont dites Et qui excellens sont ecrites. MS. Seld. Arch. B. 26. CARMEN DE ALGORJSMO. 75 Extrahe radicem semper sub parte sinistra.5 Addere si numero numerum vis, ordine tali Incipe; scribe duas primo series numerorum Primam sub prima recte ponendo figuram, Et sic de reliquis facias, si sint ibi plures. Inde duas adde primas hac conditione : Si digitus crescat ex additione primorum, Primo scribe loco digitum, quicumque sit ille ; Sed si compositus, in limite scribe sequenti Articulum, primo digitum ; quia sic jubet ordo. Articulus si sit, in primo limite cifram, Articulum vero reliquis inscribe figuris ; Et per se scribas si nulla figura sequatur. Si tibi cifra superveniens occurrerit, illam Dele suppositam ; post illic scribe figuram: Postea procedas reliquas addendo figuras. A numero numerum si sit tibi demere cura, Scribe figurarum series, ut in additione ; Majori numero numerum suppone minorem, Sive pari numero supponatus numerus par. Postea si possis a prima demere primam, Scribas quod remanet, cifram si nil remanebit. Sed si non possis a prima demere primam ; Procedens, unum de limite deme sequenti ; Quod demptum pro denario reputabis ab illo, Subtrahe totalem numerum quern proposuisti. Quo facto, scribe super quicquid remanebit, Facque nonenarios de cifris, cum remeabis, Occurrant si forte cifrae, dum demeris unum ; Postea procedas reliquas demendo figuras. 5 Vide p. 11. 76 CARMEN DE ALGORISMO. An subtractio sit bene facta probare valebis, Quas subtraxisti primas addendo figuras. Nam, subtractio si bene sit, primas retinebis, Et subtractio facta tibi probat additionem. Si vis duplare numerum, sic incipe ; solam Scribe figurarum seriem, quamcumque voles tu ; Postea procedas primam duplando figuram ; Inde quod existit, scribas, ubi jusserit ordo, Juxta praecepta quse dantur in additione. Nam si sit digitus, in primo limite scribe ; Articulus si sit, in primo limite cifram, Articulum vero reliquis inscribe figuris ; Vel per se scribas, si nulla figura sequatur : Compositus si sit, in limite scribe sequenti Articulum, primo digitum; quia sic jubet ordo : Et sic de reliquis facias, si sint ibi plures. Incipe sic, si vis aliquem numerum mediare : Scribe figurarum seriem solam, velut ante ; Postea procedas medians, et prima figura Si par aut impar videas ; quia si fuerit par, Dimidiabis earn, scribens quicquid remanebit ; Impar si fuerit, unum demas mediare, Quod non prsesumas, sed quod superest mediabis ; Inde supertactum, fac demptum quod notat unum ; Si monos, dele ; sit ibi cifra post nota supra. Postea procedas hac conditione secunda : Impar6 si fuerit, hinc unum deme priori, Inscribens quinque, nam denos significabit Monos prsedictam : si vero secunda sit una, Ilia deleta, scribatur cifra ; priori 6 t. e. figura secundo loco posita. CARMEN DE ALGORISMO. 77 Tradendo quinque pro denario mediate ; Nee cifra scribatur, nisi deinde figura sequatur : Postea procedas reliquas mediando figuras, Ut supra docui, si sint tibi mille figurse. Si mediatio sit bene facta probare valebis, Duplando numerum quern primo dimidiasti. Si tu per numerum numerum vis multiplicare, Scribe duas, quascunque velis, series numerorum ; Ordo turn servetur, ut ultima multiplicand! Ponatur super anteriorem multiplicands ; A leva reliquae sunt scriptse multiplicands. In digitum cures digitum si ducere, major Per quantum distat a denis respice, debes Namque suo decuplo tocies delere minorem ; Sicque tibi numerus veniens exinde patebit. Postea procedas postremam multiplicando, Recte multiplicans per cunctas inferiores, Conditione tamen tali ; quod multiplicantem Scribas in capite, quicquid processerit inde ; Sed postquam fuerit haec multiplicata, figurse Anteriorentur seriei multiplicands ; Et sic multiplica, velut istam multiplicasd, Quse sequitur numerum scriptum quibusque figuris. Sed cum multiplicas, primo sic est operanduro, Si dabit articulum tibi multiplicatio solum ; Proposita cifra, summam transferre memento. Sin autem digitus excreverit articulusve, Articulus supraposito digito salit ultra ; Si digitus autem, ponas ipsum super ipsam, Subdita multiplicans hanc quse super incidit illi Delebit penitus, et scribens quod venit inde ; 78 CARMEN DE ALGORISMO. Sed cum multiplicat aliam positam super ipsam, Adjunges numerum quern probet ductus earum ; Si supraposita cifra debet multiplicare, Prorsus earn delet, scribi quod loco cifra debet, Sed cifra multiplicans aliam posita super ipsam, Sitque locus supra vacuis super hanc cifra fiet ; Si supra fuerit cifra semper pretereunda est ; Si dubites, an sit bene multiplicatio facta, Divide totalem numerum per multiplicantem, Et reddet numerum emergens inde priorem. Si vis dividere numerum, sic incipe primo ; Scribe duas, quascunque velis, series numerorum ; Majori numero numerum suppone minorem, Nam docet ut major teneat bis terve minorem; Et sub supprima supprimam pone figuram, Sic reliquis reliquas a dextra parte locabis ; Postea de prima primam sub parte sinistra Subtrahe, si possis, quocies potes adminus illud, Scribens quod remanet sub tali conditione ; Ut toties demas demendas a remanente, Quse serie recte ponuntur in inferiori, Unica si, turn sit ibi decet hac operari ; Sed si non possis a prima demere primam, Procedas, et earn numero suppone sequenti; Hanc uno retrahendo gradu comites retrahantur, Et, quoties poteris, ab eadem deme priorem, Ut toties demas demendas a remanente, Nee plusquam novies aliquem tibi demere debes, Nascitur huicnumerusquociens supraquesequentem Hunc primo scribas, retrahens exinde figuras, Dum fuerit major suppositus inferiori, CARMEN DE ALGOR1SMO. 79 Et rursus fiat divisio more priori ; Et numerum quotiens supra scribas pereunti, Si fiat saltus retrahendo cifra locetur, Et pereat numero quotiens, proponas eidem Cifram in numerum pereat vis, dum locus illic Restat, et expletus divisio non valet ultra : Dum fuerit numerus minor inferiore seorsum Ilium servabis ; hunc multiplicand© probabis, Si bene fuisti, divisor multiplicetur Per numerum quotiens ; cum multiplicaveris, adde Totali sumrnse, quod servatum fuit ante, Redditurque tibi numerus quern proposuisti ; Et si nil remanet, hunc multiplicatio reddet. Cum ducis numerum per se, qui pervenit inde Sit tibi quadratus, ductus radix erit ejus, Nee numeros omnes quadrates dicere debes, Est autem omnis numerus radix alicujus. Cum voles numeri radicem quaerere, scribi Debet ; deinde notes si sit locus ultimus impar, Estque figura loco talis scribenda sub illo, Quae, per se ducta, numerum tibi destruit ilium, Vel quantum poteris ex huic delebis eadem ; Et retrahendo duples retrahens duplando sub ilia Quae primo sequitur, duplicatur per duplacatam, Post per se minuens sub ea saliendo. Post his propones digitum, qui, more priori Per precedentes post per se multiplicatus, Destruit in quantum poterit numerum remanentem, Et sic procedas retrahens duplando figuram, Reponendo novam donee totum peragatur, Subdupla propriis servare docetque duplatis ; 80 CARMEN DE ALGORISMO. Si det compositum numerum duplacio, debet Inscribi digitus a dextra parte propinqua, Articulusque loco quo non cedebat duplicando ; Si dabit articulum, sit cifra loco pereunte Articulusque locum tenet unum, duplanda recessit ; Si donet digitum, sub prima pone sequente, Si supraposita fuerit duplicata figura Major proponi debet tantum modo cifra, Has retrahens solito propones more figurarum, Usque sub extrema ita fac retrahendo figuras, Si totum debes numerum quern proposuisti, Quadratus fuerit de dupla quern duplicasti, Sicque tibi radix illius certa patebit, Si de duplatis sit juncta supprima figura ; Si radicem per se multiplices habeasque Propositum primo, bene te fuisse probasti ; Non est quadratus, si quis restat, sed habuentur Radix quadrati qui stat major sub eodem ; Vel quicquid remanet tabula servare memento ; Hoc casu radix per se quoque multiplicetur, Et sic quadratus sub primo major habetur, Huic addas remanens, et prius debes habere ; Si locus extremus fuerit par, scribe figuram Sub pereunte loco per quam debes operari, Quse quantum poterit supprimas destruat ambas, Vel penitus legem teneas operando priorem, Si suppositum digitus in fine repertus, Omnino delet illic scribi cifra debet, A leva si qua sit ei sociata figura ; Si cifrae remanent in fine pares decet harum Radices, numero mediam propone partem, CARMEN DE ALGORISMO. 81 Tali quesita radix patebit arte reperta. Per numerum recte si nosti multiplicare Ejus quadratum, numerus qui pervenit inde Dicetur cubicus; primus erit radix ejus; Nee numeros omnes cubicatos dicere debes, Est autem omnis numerus radix alicujus ; Si cures cubici radicem quaerere, primo Inscriptum numerum distinguere per loca debes ; Quae tibi mille notant a mille notante supprima Junctum, summes operandi parte sinistra, Illic et scribas digitum, qui multiplicatus In semet cubicae suprapositum sibi perdat, Et si quid fuerit adjunctum parte sinistra Si non omnino quantum poteris inveniendo, Hunc triplans retrahe saltern, faciendo sub illo Quod manet a digito deleto ; terna figura Sibi propones quae sub triplo asocietur, Et cum subtriplo per earn tripla multiplicatur ; Hinc per earn solam productum multiplicabis, Postea totalem numerum, qui pervenit inde A suprapositis respectu tolle triplatae Addita supprimo cubicae tune multiplicetur, Respectu cujus, numerus qui progredietur Ex cubito ductu suprapositis adimetur ; Tune ipsam dele triples saltum faciendo, Semper sub terna, retrahens alias triplicatas Ex hinc triplatis aliam propone figuram, Quae per triplatas ducatur more priori ; Primo sub triplis sibi junctis, postea per se, In numerum ducta, productum de triplicates : Utque prius dixi numerus qui prevenit inde G 82 CARMEN DE ALGORISMO. A suprapositis has respiciendo trahatur, Huic cubicae junctum supprimo multiplicabis, Respectuque sui, removebis de remanente, Et sic procedas retrahendo triplando figuras. Et proponendo nonam, donee totum peragatur, Subtripla sub propriis servare decet triplicatis ; Si nil in fine remanet, numerus datus ante Est cubicus; cubicam radicemsub tripla probent, Cum digito juncto quern sub primo posuisti, Huic cubicae ducta, numerum reddant tibi primum. Si quid erit remanens non est cubicus, sed habetur Major sub primo qui stat radix cubicati, Servari debet quicquid radice remansit, Extracto numero, decet hoc addi cubicato. Quo facto, nnmerus reddi debet tibi primus. Nam debes per se radicem multiplicare Ex hinc in numerum duces, quod pervenit inde Sub primo cubicus major sic invenietur ; Illi jungatur remanens, et primus habetur, Si per triplatum numerum nequeas operari ; Cifram propones, nil vero per hanc operari Sed retrahens illam cum saltu deinde triplatam, Propones illi digitum sub lege priori, C unique cifram retrahes saliendo, non triplicabis, Namque nihil cifrae triplacio dicitur esse ; Aut tu cum cifram pertraxeris autem triplicatam, Huic cum subtriplo semper servare memento : Si det compositum, digiti triplacio debet Illius inscribi, digitus saliendo super ipsam ; Quae manet a digito deleto, terna figura ; Articulus jungitur cum triplata pereunte, CARMEN DE ALGORISMO. 83 Sed facit hunc scribi per se triplacio prima, Quae si det digitum per se facit scribi ilium ; Consumpto numero, si solae fuit tibi cifrae Triplatae, propone cifram saltum faciendo, Cumque cifram retrahe triplatam,scribendo figuram, Propones cifrae, sic procedens operare, Si tres vel duo series sint, pone sub una, A dexttis digitum servando prius documentum. G'2 PREFATIO DANIELIS DE MERLAI AD LIBRUM DE NATURIS SUPERIORUM ET INFERIORUM. Bib. ArundeL Mus. Brit. 377. PMlosophia magistri Danielis de Merlai ad Johannem Norwicensem episcopum. Cum dudum ab Anglia me causa studii ex- cepissem et Parisius aliquandiu moram fecissem, videbam quosdam bestiales in scholiis gravi auc- toritate sedes occupare, habentes coram se scamna duo vel tria et descriptos codices importabiles aureis literis Ulpiani traditiones representantes : necnon et tenentes stilos plumbeos in manibus, cum quibus asteriscos et obelos in libris suis quadam reverentia depingebant : qui dum propter inscientiam suam locum statue tenerent, tamen volebant sola taciturnitate videri sapientes : sed tales cum aliquid dicere conabantur infantissimos ripperiebam. Cum hoc, inquam, in hunc modum se habere Deprehenderem, ne et ego simile dam- num incurrerem, artes que scripturas illuminant DE NATURIS SUPERIORUM ET INFERIORUM. 85 non in transitu salutandas vel sub compendio pretereundas mecum sollicita deliberatione trac- tabam. Sed quoniam doctrina Arabum, que in quadruvio fere tota existit, maxime his diebus apud Toletum celebratur, illuc ut sapientiores mundi philosophos audirem,festinantur properavi. Vocatus vero tandem ab amicis et invitatus ut ab Hyspania redirem, cum pretiosa multitudine librorum in Angliam veni. Cumque nunciatum esset mini quod in partibus illis discipline libe- rales silentium haberent, et pro Ticio et Seio penitus Aristotiles et Plato oblivioni darentur, vehementer indolui, et tamen ne ego solus inter Romanos Graecus remanerem, ubi hujusmodi stu- dium florere didiceram, iter arripui. Sed in ipso itinere obviam honorem Dominum meum et prin- cipem spiritualem Johannem Norwicensem epis- copum qui me honorifice ut eum decebat reci- piens ; valde meo congratulabatur adventui. PROPOSALS FOll SOME INVENTIONS IN THE MECHANICAL ARTS. MS. Lansd. 101. A Note of sundry sorts of Engynes. 1583. 1. First a carriedge with his properties to carry or drawe fyve hundreth weight with one mans strength. 2. An ingen of wonderfull strength to pull downe parcullices or irone gatts. 3. A chaine of yron non licke it in strength of his bidgnes. 4. A paire of gripes to the same chaing belong- ing of strange fashone. 5. A gine to hoyste or pull vp earth to make rampiors. 6. A scaffolde to be removed. 7. A device to remove any burden of 10 tonne weight without horse or beast. 8. An ingen to lanch shippes. 9. A float to pase men over waters. INVENTIONS IN THE MECHANICAL ARTS. 87 10. A bridg to be carried for passing an army of men ordenaunce and such licke carriges over any ryvers, &c. 11. A myll to grine by water winde or men for forte castell or towne of warr. i 12. A crane to hoyst vp 10 or 20 tonne weight. 13. A gynne to hoyst vp any cannon and laie him in his carriage by one man onley. 14. An ingen for clensing or taking away of any shelves or shallow places in the river of Terns or any such river the same device maie serve for clensing of diches about citties or towns pondes or any such licke standing waters. 15. A water myll to rune longer then before tyme. 16. A winde myll and not to turne the bowse about. 17. To make water workes for fountains cun- ditts and suche licke. 18. To make pipes of lead 6 or 7 foot long without sauder. 19. To make a boat to goe fast one the water without ower or saile.7 7 This was a favourite project about this time. In a few "speciall breife remembrances" of some "pleasante serviceable and rare inventions as I have by longe studie and chargeable practice founde out," addressed to Queen Elizabeth by Ralphe Rabbard, I find one headed " The rarest engyne that ever was invented for sea service;" and this is described as follows: — " A vessell in manner of a Tally or Talliote to passe upon the seas and ryvers without oars or sayle against wynde and tyde, swifter than any that ever hath bynne scene, of wonderfull 88 INVENTIONS IN THE MECHANICAL ARTS. 20. To preserve a boat from drowning and the people that be therein. effect bothe for intelligence and many other admirable exploytes almost beyonde the expectation of man :" MS. Lansd. 121. Now see Bourne's Inventions or Devises, a book deserving the parti- cular attention of all those who are interested in the history of mechanical inventions. Edmund Jentill, in 1594, proposed a " device wonderfull strange," similar to the above : it was one of the inventions which he offered to discover to Lord Burghley, on his release from prison, for counterfeiting foreign coin : — MS. Lansd. 77 and 113. THE PREFACE TO A CALENDAR OR ALMANAC FOR THE YEAR 1430. MS. Harl. 937. MY soverayne maistres. certen evydens have done me to vnderstonde jour abylyte to lerne scyens partyculere, and als wele consyder I jour desyre in specyal to lerne a certen conclusyons of j?e new kalender. I say a certen conclusyons for ]?ys cawse for sum of j?aim profundely to be expressyd or lerned for defawte of termes convenyent in ower moder langage beyn to stronge to a tendyr wytte to comprehende J?at is not elevate be processe and cowrse of scoles. J?erefor als myche as j?e grete phylosophyr sayth he wrappyth hym in hys frende fat condescendyth to J?e ryjtfull prayer of hys frende me and mor mevyth me syth I .... bondene to make satisfactyon to jour desire prayng ever dyscrete persone f>at f>is redyth or heryth to have my rude endytyng excusyd and 90 THE PREFACE TO my superfluyte of wordes for two cawses. fe furste cawse for so curyos and harde sentens in obscure termes is full tedyos to sy th a tender wy tte to cousayne. f e secunde cawse is for sothely me semythe better to wryte and twyse teche one gode sentens fen ones forgoten. levyng f erfore all vayn preambles of superfluyte fat papyr ful- fyllyjte with owtyn fruyte fis lesone I jyfe 50 w fyrste fat in jour gerus beyn xii moneth. January February March Aprile May June July Auguste Septembre Octobre Novembre Decembre. And ccc and sexty days and 5 and sex odde howres qwyche odde howres gedyrd togeder 4 jerus makyth 24 howres fat is a day naturale so fat in fis jere fat is clepyt lyp jere beyng ccc and sexty and sex days. In everych jere we vse a new letter fat Sonday gothe by. In fe lyp jere we occupy twene f e furste servyth fro new jerus day to seynt mathye day. f e secunde tellyth us owre soneday f e remnande of f e gere. jour pryme schal be to jow a specyal doctour of dyverse conclusyons querfore in latyn he is clepyt f e golden nownbur and begynnyjt at one and rennyth to xix and turnyth ajayn to one, and so in case fat one were pryme f is jere next jere schulde 2 be pryme and f e 3 jere 3. so rennyng jere be jere to xix and ajayn to one and so abowte with owten ende. In fe fyrst table of jowre kalendere by f e reede letters in f e firste lyne joyned to f e blake letters in f e secunde lyne schal ge knowe f e lyp jere qwen it fallyth. In A CALENDAR FOR 1430. 91 f e 3 lyne beyn wryten primes frome one to xix and turnyth ajayn. Seche fen jour prime of f e jere fat je be in jonyd to f e domynycale letter of f e same jere and fen may je se by f e rede letters in f e fyrst lyne qwenus it be lyp gere, or how nere je be, f is ensample. I jyffe jow f e gere of owre lorde a.mccccxxx in qwych gere f is kalendere to gow was wryten. Went prime by 6 and gowre letter domynycale was A qwyche beyn jonyd and wryten to geder in fe hede and fe begynnyng of f is sayd table. fen behalde how f e next gere folowyng schal 7 be prime and G domynycale. And f e next gere after schal 8 be prime and be lyp gere as ge may se by J?e reede letter F jonyd to j?e blak letter E so f>at in j?is lyp gere schal F be domynycale letter fro pe Circumscycyon J?at is clepyd newjerus day vnto seynt Mathye day. and fen schal E be gour sonday letter to f>e gerus ynde as I sayd beforne. J?is doctryne kepe Jmrghe alle pe forsayd table. Amonge J>e blak letters in J?e same lyne beyn wryten reede letters qwyche teches J?e indyccyon |?at is a terme ful necessary to }?aim f>at lyste knaw }?e verray and certene date of j?e Pope bulles and of f>e olde Imperyale wrytynge of Rome, gyf it lyke gow to wytte in qwat Jndyccyon ge be in Take gour prime and gour domynycale letter of fe same gere fat ge beyn in qwyche letter in case fat it be rede calle fat f e first Jndyccyon and fe next letter fe secunde jndiccion and so rennyng vnto xv and gen agayn to one at fe 92 THE PREFACE TO next reede letter, jif it be a blake letter J?at jour prime fallyth one cownte fro f>e next goyng beforus and so mony is J?e jndiccyon fat ge seche forgete not f is lesone. A table fat next folowyjt is callyd f e table of f e 5 festes moveyabylle fat is to say qwen septuagesime commeygt in fat is f e sonday be- fore lentyn qwen Allia is closyd vp. Also fis table tellyjt qwen lentyn fallyth qwen Eysterday. qwen f e Rogacyons and qwen qwytesoneday. It techygt also how mony weykes be fro Crystemes- day to lentyn how mony wekes and days fro qwytesonday to mydsommerday And how mony fro Whytesonday to fe advente on fis maner. Tak fe prime of fe jere fat je be in. in fe fyrste lyne wryten with reede. and J?e domynycale letter next folowyng in J?e secunde lyne. and folowe stryght forthe in to J?e lyne of J?at thynge wryten in J?e heyde J>at ge desyre. and by J?e nownbur J?at je fynde schalle je knaw fat ge desyre. Vnderstonde wele {?is ensample. Aftyr crystynmesse j?e gere of owre lorde a.m.cccc.xxx. I was aferde of lentyn and lokyd in my kalender for septuagesime and lentyn how nere }?ai were and soghte my prime in }?e fyrste lyne ]?at hap- pynd to be 7 }?e same tyme. and toke my do- mynycale letter j?at was G next following. J?o turnyd I forth fro }?is G streght in to nexte lyne f>at haythe Septuagesime writyn in J?e hede and I fonde 28 J?ere wryten J?ereby demyd I fat septuagesime sonday schal falle ge 28 day A CALENDAR FOR 1430. 93 of J?e moneyth of Januare wrytyn in J?e hede. f>o loked I forthermore in f>e next lyne that hayth lentyn wryten in f»e hede and J?ere I fonde 18 wryten and j?ereby I demyd J?at first sonneday of lentyn schulde be on J?e 18 day of J>e moneyth of February nexte wrytyn above jyt I loked for- thermore in J?e next lyne for Esterday and fonde J?ere 1 wryten and J?en wyste I J?at Esterday schulde be on j?e firste day of pe moneythe of Aprile wrytyn next above, and jow take ensample as I have do and loke ge kepe J?e same thurghe alle J?e table. JOHANNIS NORFOLK IN ARTEM PROGRESSIONS SUMMULA, MS. Harl. 3742. In artem progressions continue et discontinue secundum magistrum Johannem Norefolk incipit summula. Non invenientes sed doctrinam tradita inde numerorum progressione ab Algore rege quondam Castellie suo in Algorismo de integris perficere curantes. occultas aliorum tradiciones si que fu- erint penitus omittentes dummoda tales nostra assidua percunctacione non obstante re maxima nobis miranda ante nostram edicionem in nostras manus visuras nos nusquam recepisse fatemur testimonium tamen fide dignorum nostrorum ami- corum nobis possibilitatem operis concludebat eo quod tales regulas utilem artem progressionis concernentes ante nostra tempora fuisse editas testabantur. Oportunum igitur apud nos indi- cavimus cum ars tarn preciosa arithmeticeque sciencie prefulgida margarita conspectibus ho- minum se non presentabat sed quorundam forte inpericia incarcerata atque poreis oblata sciolos IN ARTEM PROGRESSIONS SUMMULA. 95 latebat circa possibilitatem operis novarumque regularum edicionem divino auxilio primitus in- vocato petitisque auctoritatibus et favoribus eorum quibus incurribit hujusmodi summulas corrigere operas exiles soleritur impendere et eas sic collectas nostro calamo rudique stilo de- scriptas. Primo ad honorem Dei beatissime virginis Marie et omnium suorum sanctorum ac ad profectum animarum omnium fidelium defunctorum quarum collegio Oxonie primus vicecustos exciteramus et ad ceteras hujusmodi scienciam diligentes plenius promulgare cura- vimus. Reverendam ergo tuam benevolenciam quiscunque es o carissime has nostras regulas exiles exiliterque collectas placito vultu bonoque animo ut acceptare digneris benigne rogamus. Est namque opus harum regularum omnium nu- merorum proportionalitate aliqua comperatorum sive plures paucioresve fuerunt ut in his exem- plis. 1. 2. 4. 8. 16. 32. vel sic. 5. 6. 7. 8. vel sic. 4. 8. 12. 16. vel sic. 1. 2. 3. 4. 5. 6. et sic ad quo- titatem unitatum sive percussionum horologii quas sonat horologium ad 12 horas vel ad quar- tern partem diei naturalis et similibus quid re- sultans fuerit levi arificio explicare. Fiat obse- cramus legitimum kalendare ergo in anima tua o lector honorande hoc scriptum exiguum magna tamen solertia et industria compilatum nee desit tibi spes enarrandi quid ex predictis numeris re- sultat et omnibus consimilibus proportionalitate aliqua comperatis cum regule satis sufficienter 96 JOHANNIS NORFOLK sunt tradite et nomen auctoris publice prefato est monstratum preambulo. Sic ergo karissime incipe et mente tua recollige tria documenta generalia que tractatus presentis processimi ple- nissime facilitabunt. Primum documentum est quod scias quid progressio sit et quod sectionem patitur in continuam et discontinuam prout pos- terius apercius clarescet. Secundum documentum est ut bene consideres quod omnium numerorum ordinate se in progressione habencium aliqua proportionalitas reperta nee quid ex talibus ar- tificiose poterit certificari propter infinite vari- abilitatis talem. Tercium est quod non deficiat tibi spes perveniendi in finem premissum per hanc artem facillimam cum de omnibus numeris proportionalitate geometrica ordinatis ac de qui- busdam arithmetica proportionalitate magis fa- mose reperibilibus dantur regule sequentes solum omittentes numeros inusitatos arithmetica tamen proportionalitate constitutes ac omnes numeros musica,_ proportionalitate collectos turn facilius sit enarrare qui ex talibus numeris resultat quam hujusmodi numeros artificiose reperire et com- ponere et hec tria documenta nota diligentissime. Specificantes modo predicta tria documenta ge- neralia dicamus primo quod progressio est nu- merorum diversorum ordinata collectio et dicitur ordinata pro tanto quod si aliqua collectione numerus minor sequatur majorem ut hie. 12 65. 413. ibi non est ratio progressio judicanda quamvis enim metaphorica progressio nuncupanda IN ARTEM PROGRESSIONS SUMMULA. 97 est omnis numerorum collectio a minore inci- piendo terminando in majorem numerum ipsa tamen proprie dicitur progressio cum numeri quadam proportionalitate colliguntur istud nam- que evidentissimum est cum apud omnes maxime indicatur progressionem naturalem esse incipiendo computare ab unitate ascendendo ad alios nume- ros natural! ordine succedentes et ibi aliqua pro- portionalitas inter terminos reperta est et que postea apparebit. Progressio sic proprie suinpta dividitur in continuam et discontinuam progressio continua est numerorum diversorum ordinata collectio nullo numero alium superexcrescente nisi sola unitate et ista potest indrunter contin- gere vel incipiendo ab unitate vel ultra unitatem ut sic. 1. 2. 3. 4. 5. vel sic. 3. 4. 5. 6. et caetera. Progressio vero discontinua est numerorum di- versorum ordinata collectio uno alio supraex- crescente plusquam unitate servata tamen ut prius in progressione continua proportionalitate geometrica et hoc indrunter incipiendo ab uni- tate vel altro numero quocunque ut hie. 1. 4. 7. 10. 13. et caetera. vel sic. 5. 7.9. 11. 13. 15. et caetera. Et quia progressio proprie dicta ut dictum est constat ex numeris geometrica pro- portionalitate covintis ne tractatus iste neces- sariis videatur deficere superfluisve habundare quorum utrumque collectoris impericie ascri- bendum esset videndum est de proportionalitate quid sit et ejus speciebus quae etiam species ejus. ad hanc artem magis pertinet que vero abji- H 98 IN ARTEM PROGRESSIONS SUMMULA. cienda. Est namque proportionalitas duarum proportionum aut plurimum in simul compera- torum habitudo hujus autem tres sunt species scilicet geometrica arithmetica arismonica sive musica proportionalitas geometrica est quando sunt tres termini aut plures et equales est ex- cessus secundi ad primum sicut tertii ad se- cundum et quarti ad tercium et caetera si tanti fuerint ut hie. 1. 2. 3. 4. 5. 6. vel sic. 2. 4. 6. 8. vel sic. 2. 7. 12. 17. 22. et caetera. Proportio- nalitas vero arithmetica est quando sunt tres ter mini vel plures et equalis est proportio inter primum et secundum et secundum ad tertium et tercium ad quartum ut hie. 1. 2. 4. 8. 16. vel sic. 1. 3. 9. 27. et caetera. Sed proporcionalitas mu- sica sive arsmonica est quando sunt tres termini insimul proporcionalitati et equalis est proporcio tercium ad primum sicut est proporcio excessus tercii ad secundum ad excessum secundi ad primum ut hie. 3. 4. 6. vel sic. 6. 8. 12. vel sic. 12. 16. 24. hiis sic brevissime recitatis per nos dicamus quod in omnibus numeris propor- cionalitate geometrica proporcionalitatis hec ars habet locum sive plures fuerint sic pauciores eciam in numeris famosioribus arithmetica pro- porcionalitate comperatis ut in numeris propor- cionalitate duplica collectis omittentes alias spe- cies ejusdem proporcionalitatis sicut omittimus omnes species arsmonica proporcionalitate inte- gritas ob id quod superius docetur documento tertio. Hiis sic specificatis inducamus primam IN ARTEM PROGRESSIONS SUMMULA. 99 regulam primo de numero geometrica proporcion- alitate adunatis et ubi progressio continua est que hec est. Numero locorum secundum progres- sionem continuam exeunte sub numero pari per minus medium multiplicetur numerus locorum et habetur quod queritur haec namque regula gene- ralis est ut ostendent exempla posita in prima tabula in fine tractatus hujus et quamvis hsec re- gula viris maturis aliqualiter arithmetice sciencie noticia inbutis satis lucid a est ut tamen juvenes et minus provecti per earn sapiant sic earn delu- cidamus ut ejus aliarumque regularum recitan- darum noticie perfectus habeantur primo notanda sunt quid nominis horum quinque terminorum scilicet numerus locorum vel loca numerorum numerus par numerus impar majus medium minus medium eiis quinque terris nostro more declaratis facilime perquiritur sensus regule pre- cedentis ac cuj usque quatuor regularum sequen- cium. Sic vero incipientes dicamus quod non probabile aliquem pro eadem morula sive eodem .... plures numeros recitare et sic numerum primo recitatum dicimus esse in primo loco et secundo recitatum numerum dicimus esse in secundo loco et sic de aliis quibuscumque reci- tandis conformiter sicut si numeri diversi scribi debeant oportet quod variis locis scribantur et de eiis idem indicare quoad loca quare citissime cognoscitur numerus locorum seeundum numera- cionem numerorum enumeratorum. De secundo et tercio ternimis in simul licet annotare quia 100 IN ARTEM PROGRESSIONIS SUMMULA. cognito quid sit numerus par tanquam suura privatum cognoscitur numerus inpar qui aliam cognicionem non habet quam per suum positivum ut docet aristolus. Est autem numerus par ut notat Boycius in sua arithmetica et est sua prima definitio illius quilibet numerus qui potest in duo equalia nullo medio intercedente dividi ab hac namque condicione deficit numerus impar ut constat quia quamvis quinarius dividi potest in duos binaries etiam in duo equalia tamen aliqua unitas integrans quinarium intercidit cum duo et tria faciunt quinque. Ceterum restat declarare quid minus medium quidve majus medium sit promissum ut impleatur pro quorum noticia est primo animadvertendum quid sit medium. Est namque medium quod equaliter distat ab extremis et sicut facilime ymaginatur medium ubi loca numerorum numerantur numero impari ut hie 1. 2. 3. 4. 5. 3. est medium vel sic ubi loca numerorum numerantur a numero pari saltern ultra binarium inveniendi sunt duo tales numeri quorum minor numerus mius medium dicitur et major numerus majus medium nuncupatur ut hie. 2. 3. 4. 5. numerus locorum est quatuor minus medium. 3. majus medium. 4. aut sic. 5. 8. 11. 14. 4. est numerus locorum ut prius minus medium est. 8. majus medium est. 11. hiis sic cognitis evidens est prima regula prius recitata de progressione continua et sequitur secunda regula de progressione continua eadem facilitate que hec est. Numero locorum secundum pro- IN ARTEM PROGRESSIONS SUMMULA. 101 gressionem continuam existente sub numero impari per medium multiplicetur numerus lo- corum et habetur quod queritur sine aliqua sub- tractione vel additione et hec regula certissima est perfectus a nobis jam duabus regulis ad progressionem continuam pertinentibus succe- dunt. 3. regule spectantes ad progressionem discontinuam et quia in tali progressione minor erat difficultas nobis certitudinem regularum uti- }ium invenire ut tamen posteri nostri eas regulas citissime cognoscant quas nostris magnis laboribus a diu percuntavimus licet ipse aliquibus obscuris terminis a nobis primo dentur declarationibus tamen nostris levissime conceptis quilibet me- diocri ingenii capacitate fultus ipsas poterit faci- lime experiri et est prima regula talis. In pro- gressione discontinua numero locorum exeunte sub numero pari et si eorum numerorum excessus nominatus fuerit a numero irnpari per majus medium intelligibile inter numeros mediales mul- tiplicetur numerus locorum et subtrahatur medie- tas numeri locorum et habetur quod queritur hanc autem regulam assumpto hoc exemplo. 5. 10. 15. 20. sic delucidamus nam in exemplo dato numerorum loca esse sub numero pari nul- lius ambigit et unumquemque numerum exce- dere suum numerum in medietate precedentem per 5. 3. qui est numerus imper nulli dubium est tune constat quod inter duos numeros media- les qui sunt 10. et 15. quatuor numeros ordine naturali intelligi posse videlicet 11. 12. 13. 14. 102 IN ARTEM PROGRESSIONS SUMMULA. eorumque numerorum subintellectorum majus medium esse 13 hie vero numerus 13. multi- plicandus est per numerum locorum scilicet 4. et subtrahatur 2. qui est medietas numeri lo- corum et patet summa ideo vero dicitur 13. medium intelligibile quia non expresse inter numeros exemplo positos invenitur sed quadam solertia per intellectus indagacionem experitur ac eciam quod majus medium sit consimiliter indicatur. Hiis sic declaratis sequitur secunda regula que hec est. Si progressione discon- tinua numerus locorum fuerit par eorumque numerorum excessu exeunte sub numero pari per medium intelligibilem inter numeros medi- ales multiplicetur numerus locorum et habetur summa quesita hanc autem regulam duobus exemplis declaramus sic primum exemplum. 2. 4. 6. 8. in quo exemplo medium intelligi- bile est 5. qui ductus in numerum locorum exurgunt 20 ut evidet qui est summa totalis. Exemplum secundum prefate regule in quo exemplo numerus excessus est 4. medium vero intelligibilem 11. cum inter duos numeros mediales scilicet 9. et 13. ordine naturali in- tercipiuntur hii tres numeri scilicet 10. 11. 12. aut intelligi possunt quorum medium est 11. ut dictum est per quod multiplicetur numerus locorum et habetur numerus ex omnibus resul- tans. Ultima regula secundum genus propor- cionalitatis geometrice et habita in ordine est hec progressione discontinua numero locorum ex- IN ARTEM PROGRESSIONS SUMMULA. 103 eunte sub numero impari per medium multi- plicetur numerus locorum et habetur quod que- ritur exemplum 6. 8. 10. per 8. multiplicetur numerus locorum qui est tercia et exurgunt. 24. Et quia prius promissum est regulas fieri de quibusdam numeris arithmetica proporcio- nalitate comparatis hanc solam regulam dispo- suimus pro numeris magis famosis et sunt illi numeri qui proporcione dupla inter se comperan- tur ut hie 1. 2. 4. 8. 16. 32. et cetera et est regula talis. Si plures numeri proporcionalitate arith- metica comperati ubi posterior suum inmediate priorem proporcione dupla excedit insimul com- perentur dupletur ultimus et a resultante sub- trahatur primus et habetur quod queritur evidet hec regula in exemplo posito nam dupatur 32. resultant 64. a quibus subtrahatur unitas que est primus numerus et resultant 63. et hec regula generalis est in omnibus talibus sive ab unitate incipiatur sive non sive vero loca numerorum paria fuerint sive non de aliis autem numeris secundum hoc genus proporcionalitatis dicimus nunc ut dictum est prius documento tertio. et sic perfectus est iste tractatus brevissimus in collegia animarum Oxonie anno domini millesimo quadrin- gentesimo quadragesimo quinto quod Norfolk scrip- tor ac compilator hujus tractatus. Explicit. Nil amplius restat ad perfeccionem hujus sum- mule colligere et scribere quam quod anteadictum 104 IN ARTEM PROGRESSIONS SUMMULA. est sed solum regulas prescriptas ad facilitatem prospicere volencium recolligere cum tabulis exemplarium ac consulere quod lectores ejusdem perfecte sint in arte multiplicationis per intel- lectum ideo sequitur tabula subscripta et deo gratias. Prima regula. Numero locorum secundum progressionem continuam exeunte sub numero pari per minus medium multiplicetur numerus locorum et ad- datur medietas numeri locorum et habetur quod queritur. Exemplum prime regule. 1.2.3.4.5.6.7.8.9.10. 11 . 12. (2.3.4.5.6.7. vel sic 6.7.8.9. 10. 11. Vel sics (3.4.5.6.7.8. vel sic 19 . 20 . 21 . 22. Secunda regula. Numero locorum secundum progressionem continuam exeunte sub numero impari per medi- um multiplicetur numerus locorum et habetur quod queritur sine aliqua subtraccione vel addi- cione. Exemplum secunde regule. 1 . 2 . 3 . 4 . 5 . vel sic 5 . 6 . 7 . 8 . 9 . 10 . 1 1. vel sic 12. 13. 14. 15. 16. vel sic 21 . 22 . 23 . 24 , 25 . 26 . 27. IN ARTEM PROGRESSIONS SUMMULA. 105 Tercia regula. In progressione discontinua numero locorum exeunte sub numero pari et si eorum numerorum excessus nominatus fuerit a numero impari per majus medium intelligibilem inter numeros medi- ales multiplicetur numerus locorum et subtra- hatur medietas numeri locorum et habetur quod queritur. Exemplum tercie regule. .5. 10. 15 .20.25.30. vel sic 2.5. 8. 11. velsic 3. 10. 17.24.31.38. vel sic 3.6.9. 12. Quarto, regula. * Numerus locorum si progressione discontinua fuerit par eorumque numerorum excessu exeunte sub numero pari per medium intelligibilem inter numeros mediates multiplicetur numerus locorum et habetur quod queritur. Exemplum quarte regule. 5 .9. 13. 17. velsic 3.5.7 .9. vel sic 2 . 4 . 6 . 8 . 10 . 12. vel sic 3 . 7 . 1 1 . 15. Quint a regula. Numero locorum secundum progressionem discontinuam exeunte sub numero impari per medium multiplicetur numerus locorum et habe- tur quod queritur. Exemplum quinte regule. 4.6.8. vel sic 3. 5. 7 .9. 11 . 13. 15. vel sic 12. 14. 16. velsic 3. 7. 11.15. 19.23.27, 106 IN ARTfiM PROGRESSIONS SUMMULA. Sexta regula sed est de numeris arithmetica proportionalilate collectis. Si plures numeri ubi posterior suum immediate precedentem proportione dupla excedat insimul compareiuur dupletur ultimus et a resultante subtrahitur primus et habetur quod queritur. Exemplum sexte regule. 12 . 4 . 8 . 16 . 32. vel sic 2.4.8. 16. Explicit tabula exemplariiim summule super progressione continua et discontinua secundum Norefolk. . ut Cod. Arund 343. fol. l.w. Xfl frti miruttur funt -AX -w^' iu^-fcT^p tt" c - dwctinf Jodr^nf tt/T^- fcytu-HX • fomf ^/louxx:- tyienf- vncid-- Ainu^tcu.- due//A f £. ulu( cer^trC- H f c APPENDIX. I. A few Observations on the Numerical Contractions found in some manuscripts of the Treatise on Geometry by Boetius. THE remarks which follow have not, as far as I am aware, found a place in any prior publication ; I intend them to form an appendix to the interesting chapter on the same subject presented to the literary world by M. Chasles. I could not have connected the following pages in the form of a continuous history, without introducing much that is already known ; I have, therefore, considered it advisable to place my notes under distinct articles, with- out any attempt at arrangement. 1. It is very probable that the well-known passage on the Abacus, in the first book of the Geometry of Boetius, is an interpolation. For in a MS. once belonging to Mr. Ames, no such passage appears ; and in another, now in the library of Trinity College, it is also wanting: again, no such contractions occur in any copy of the Treatise on 108 APPENDIX. Arithmetic* by the same author; although, in the libraryf just mentioned, there is a list of them, on a fly-leaf to a MS. of that work, in a hand-writing of the fourteenth century, which is thus headed : Primus igin ; andras ; ormis ; quarto subit arbas ; Quinque quinas ; termas ; zenis ; temenias ; celentis. and over these names the contractions are written, as well as Roman numerals explaining them. 2. There are two MSS. in the Bodleian Library which merit particular attention. One, MS. Hatton. 112, pos- sesses two distinct treatises on arithmetic on this system : the first is very extensive, but anonymous; the rubrication to the preface of the other is as follows : Incipit pre- fatio libri Abaci quce junior Berhelinus edidit Parisiis, Domino suo Amulio. In both these treatises, as well as in the other MS., local position is clearly pointed out. 3. VossiusJ attributes them to a Grecian origin; Huet§ derives them from the Hebrew; and the Bodleian MSS. refer them to Syria and Chaldea. It is scarcely neces- sary to observe, that there is no connection between these numerals and those among the contractions of Tyro and Seneca. 4. M. Chasles has confused the sipos and celentis, the latter of which was seldom used as a cipher. In the second Bodleian MS. we read, inscribitur et in ultimo figura 0, sipos nomine. Que licet numerum nullum significet : turn ad alia qucedam utilis est. In • the * Most of the MSS. of this work that I have examined are very old, — generally prior to the thirteenth century. Only one MS. that I am ac- quainted with (Bib. Burn. 275.) contains Arabic numerals. It may also be remarked here, that a treatise on arithmetic in verse, by one Leopald (Bib. Arund. 339.) possesses numerals whose forms are, as far as 1 know, unique. But this tract will receive its due attention in a proper place. •f* R. xv. 16. There are also a few pages on arithmetic, which contain the following account of its rise among the ancients : Hanc igitur artem nume- randi apud Grecos Samius Pitagoras et Aristoteles scripserunt, diffusiusque Nicomachus et Euclides ; licet et alii in eadem floreunt, ut Erastosthenes et Crisippus. Apud Latinos primus Apuleius, delude Boecius. % Observationes ad Pomponiam Melam. 4to. Hag. Com. 1658, p. 64. § Demonstratio Evangelica. Prop. iv. p. 173. E. APPENDIX. 109 Lansdown collection (842) in the British Museum, is a very beautiful MS. of the whole works of Boetius : what renders it more interesting in the present inquiry, is the contraction for the sipos without the drawing of an abacus, which curiously illustrates the difficulty of the transition from numerical operations, by means of that in- strument, to local position without distinguishing boun- daries. 5. The Metz MS. in the Arundel collection, referred to by Mr. Hallam, is probably an abridgment of one or more extensive treatises on the subject : the author says, quicquid ab abacistis excerpere potui compendiose collegi, componens inde mihi certas regulas, que volentibus ad hanc disciplinam attingere non inutiles. He quotes Boetius. 6. The following verses occur in a MS.* of the four- teenth century on arithmetic : Unus adest igin ; andras duo ; tres reor armin ; Quatuor est arbas ; et per quinque fore quinas ; Sex calcis ; septem zenis ; octo zenienias ; Novem celentis ; per deno sume priorem. And a list of the contractions is given on the preceding page of the same volume. 7. The fractional notation appears to be as curious as the integral, but the contractions are not quite so arbi- trary, and a regular system is evidently followed up throughout. It is for the most part merely an adapta- * Bib. Trin. Coll. Cant, inter MSS. Gal. O. 2. 45. f. 33b. Chasles has given verses to tbe same import, but he does not mention the source whence he has obtained them. There is every reason to think that the sipos was a later improvement, and the Met? MS. contains no allusion to it. Mr. Barn- well, of the British Museum, informs me, that a short tract on celentis was once pointed out to him in a MS. volume belonging to that establishment, but no reference to it being in any of the catalogues, I have not been fortunate enough to find it. 110 APPENDIX. tion of the Roman weights to numerical computation ; for instance, taking as for unity, we have— f-2- deunx fa dextans ^2 dodrans ~ bisse ^2- septunx T6T semis T\ quicunx T\ triens T\ quadrans TV sextans TV uncia The uncia was also divided into twelve portions, but differently — i semiuncia ^ duella $ sicilius £ sexcula £ dragma —$ hemissecla TV tremissis -^ scrupulus TV obulus TV bissiliqua •sV ceraces T^ siliqua To these was added the •±fa*h part of the uncia : ut usque ad minimum extremum diatessaron et diapente sympho- niarum tonorum semitonorumque intervallis distinclarum, harum fractionum denominatio conscenderet vel conteti- deret. Zambertus gives the contractions, qvce sepissime inveniuntur in antiquis libris.* In the Metz MS. the contraction for the as is omitted. Several examples of reckoning time by this method occur in the classical writings, especially in Pliny, f as also in some MSS. of the eleventh and twelfth centuries in the British Museum. Bede wrote a tract on this fractional notation, and he adds, hcec ponder um vocabula, vel characteres non modo ad pecuniam mensurandam, verum ad qucevis corpora, sive tempora dimelienda, conveniunt. A MS. in the Public Library (Kk. v. 32) contains an explanation in * Euclidis Elementa ex Campano a Zamberto, fol. Par. 1516, p. 248. t Archaeologia, vol. xxvi. p. 159. Vid. Bedae Opera. Edit. Bas. 1563, t. i., col. 101, Ul, et 182. MS. Arund. Mus. Brit. 25, f. 124, et 356, f. **. APPENDIX. Ill Saxon, which very much coincides with that given by Bede, and would appear to be taken from it. It would be impossible, with the few materials yet bropght to light, to conjecture with any great probability how far these Boeiian contractions may have influenced the introduction, or co-operated with the Arabic system to the formation, of our present numerical notation. It appears to me highly probable that the two systems became united, because the middle age forms of the figure five coincide with the Boetian mark for the same numeral, and those of two others are very similar. The idea of local position, again, may have had an indepen- dent European origin ; the inconveniences of the abacus on paper would have suggested it by destroying the distinguishing boundaries, and inventing an arbitrary hieroglyphic for the representation of an empty square. 112 APPENDIX, II. NOTES ON EAKLY ALMANACS; THE following short paper has been compiled from notes collected at various times, and without any intention of placing a dissertation on the subject before the public. I mention this merely to suggest to the reader that no connected history of almanacs has been attempted, and that it will be unfair to view what is here placed before him as any other than an attempt to abridge the labour of a suc- cessor who might wish, at some future period, to dive more deeply into the subject. The early history of almanacs is involved in much ob- scurity. The Egyptians, indeed, possessed instruments answering most of the same purposes : but the log calendars are the most ancient almanacs, properly so called. Ver- steganf derives their name from a Saxon origin, viz. al-mon-aght, or the observation of all the moons, that being the purpose for which they were originally made : an eastern origin would appear to me to be more probable. They are doubtless of high antiquity, and, if we can be guided by the errors of the more modern ones in their * This has been printed in the "Companion to the British Almanac" for 1839; to the kindness of Mr. Knight, the publisher of that useful perio- dical, I am indebted for power to reprint it here. f Restitution of decayed intelligence, p. 6,4. APPENDIX. 113 ecclesiastical computation, we might refer them to the second or third century.* Gruter has delineated one at Rome, and which is said to have been used by the Goths and Vandals : this was cut in elm, though most are in box, and some few in fir, brass, horn, &c. Each of these calendars contains four sides, for the four quarters of the year, and gives the golden numbers, epacts, dominical letter, &c. The numerical notation is imperfect but curi- ous ; dots are put for the first four digits, a mark similar to the Roman numeral V, for five ; this mark, and additional dots for the next four, and the algebraical sign 4- for ten. Specimens of these logs may be seen in the British Museumf ; and, as they are not uncommon, it is unnecessary to enter into further detail. Before I commence with written almanacs, it will be neces- sary to remark the distinction between astronomical and ecclesiastical calendars, the first of which contain astrono- mical computations, and the other lists of saints' days, and other matters relative to the church ; sometimes, indeed, both are found united, although the latter claim a higher antiquity, being prefixed to most ancient Latin manuscripts of the Scriptures. The folding calendars were, perhaps, the most ancient forms of them, and merit particular attention. Several of these are in the British Museum5{ and at Oxford ; one of them was written in the year 1430, and is in English; but the writer confesses his inability to find suitable expressions • MS. Harl., Mus. Brit., 5958. t MSS. Harl., 197, 198. The last of these is a modern one used in Derbyshire or Staffordshire, and cut, probably, in the latter part of the 17th century : the other one is much earlier, though perhaps not of very high antiquity. Others may be seen in the Ashmolean Museum, and in St. John's College, Cambridge. I refer to Dr. Plott's History of Staffordshire for a very good description of them. (See also Brady's Clavis Calendaria.) I Cotton Rolls, viii. 26; MSS. Harl. 937, 3812, 5311; MSS. Sloan. 996, 2250 ; which last is the calendar of John Somers, afterwards mentioned. There is also one in the Ashmolean collection at Oxford in singularly fine preservation. 114 APPENDIX. for the technical terms which were derived for the most part from Arabic, for defawle of terms coavenyent in our moder langage. In the Pepysian library at Cambridge there is one printed by Wynkin de Worde, in octo-decimo, which, in its original form, folds up from a small folio sheet of vellum ; it bears the date of 1523.* The standard almanacs emanated from Oxford, the seat of British science throughout the middle ages : in fact, before Newton's time, Cambridge was a blank, and the only scientific names that cheer the pages of the history of its early literature are Holbroke of St. Peter's College, Buckley of King's, and Dee of St. John's : the first known by his astronomical tables, the second by a plagiarism of a method of extracting the roots of fractions from Robert Record, and the third a memorable instance of one of the greatest men of his time uniting the pure truths of science with the grossest absurdities. All three were astrologers,f owing, perhaps, more to the place of their education than to the individuals themselves. There has been some dispute relative to the authenticity of Roger Bacon's calendar, of which there is a MS. in the British Museum : the following is an exact transcript of the commencement : — " Kalendarium sequens extractum est a tabulis tholetanis . anno domini . 1292 . factus ad meridiem civitatis tholeti que in Hispania scita est cujus meridianus non multum distat a meridiano medii puncti Hibernie in quo . 3 . con- tinentur." f. 2. If we retain factus, it cannot be translated, but, for- tunately, the other MS. at Oxford has factum, and this must evidently be the true reading. Professor Peacock * Hartshorne's ' Book Rarities of Cambridge.' t Holbroke is admitted by all to have been an astrologer. Buckley wrote a treatise which involves the principles (MS. Bib. Reg. 12 A. xxv.) ; and with respect to Dr. Dee, no doubt can arise. APPENDIX. 115 writes factis, but there is not, as far as I know, any MS. authority for it. With respect to the author of it, the Bodleian MS., in a coeval rubric, states the calendar to have been written a fratre Rogero Bacon ; while the Cotton MS., not having any original title, is ascribed to Roger Bacon, in a hand of the 17th century : both of the MSS. belong to the 14th century. In the Harleian collection (No. 941) is a MS. on the length of the days throughout the year, stated to have been made at Oxyn- forde be the new kalendere and proved in all the univer- sity: this new kalendere may possibly refer to Roger Bacon's ; but there are not sufficient data to enable us to attain an approach to certainty. The calendar of John Somers, of Oxford, written in 1380, was one of the most popular of the time: there is generally appended to it, Tabula docens algorismum legere, cujus utilitas est in brevi satis spatio numerum magnum comprehendere. Et quia numeri in kalendario positi vix excedunt sexaginta, ultra illam summam non est protensa* Several English translations of this tract are among the Ashmolean MSS. We have likewise in MS. Almanack Profacii Judei, which is very ancient. Walter de Elvendene wrote a calendar in 1327,f and Nicholas de Lynna published another in 13864 Sometimes these calendars are found in rolls. In the library at Lambeth Palace is a very curious calendar in the English language, written in 1460 ; at the end is a table of eclipses from 1460 to 1481 ; but a very perfect volvelle is most worthy of notice, because those instruments are generally found imperfect. In the Cot- tonian collection is another English calendar, written about * MS. Bib. Cott. Mus. Brit. Vespas. E. vii. f. 4. t MS. Sloan. Mus. Brit. 286. J MS. Ashm. Oxon. 5. 116 APPENDIX. 1450, but so much damaged by the fire that the nature of it cannot be seen. In Trinity College, Cambridge, there is a MS., said to have been composed in 1347, and entitled, An Almanak, translated in perpetuite, out of Arabike into Latin ; and in the same library I find The Ejfe- merides of John of Mounte Riol, a German Prince of Astronomy ers. Professor Leslie mentions a very beautiful calendar in the library of the university of Edinburgh, with the date of 1482: he does not appear to be aware that they were common in MS. libraries, and he greatly overrates its value. There was printed at Hackney, in 1812, a small octavo volume, containing an account of an English almanac for the year 1386 : it contains a very large portion of astrono- mical and medical matter, but appears to be of little interest, save that it is the earliest one in English I have ever heard of. The contents of this calendar are as follow : — 1. The houses of the planets and their properties. 2. The exposition of the signs. 3. Chronicle of events from the birth of Cain. In 1325 there was a grete hungur in England ; in 1333 a great tempest ; in 1349 the first, in 1361 the second, and in 1369 the third pestilence. It is curious to remark the clumsy method of expressing numbers consisting of more than two figures: for instance, we have 52mcc20 put for 52,220. This shows that the Arabic notation was even then but imperfectly understood among the common people. 4. To find the prime numbers. 5. Short notes on medicine. 6. On blood-letting. 7. A description of the table of the signs, and moveable feasts. 8. Quantitates diei artificialis. APPENDIX. 117 The extracts from this calendar are wretchedly trans- cribed, and evidently by one who was totally unacquainted with MSS. The clock or albion of Richard de Walingford, of St. Alban's, answered the purpose of a calendar. * This clock made, says Bale, who appears to have seen it, magno labors, may ore sumptu, arte vero maxima, was considered the greatest curiosity of its time. In his account of it, which still remains in manuscript, we have the following definitions : — Albion est geometricum instrumentum : al- manac ctutem arismetricum. Peter Lightfoot's celebrated astronomical clock at Glastonbury may have been something of the same sort. Peter de Dacia, about 1300, published a calendar, of which there is a very early MS. in the Savilian library at Oxford : the condiciones planetarum are thus stated — Jupiter atque Venus boni, Saturnusque malignus ; Sol et Mercurius cum Luna sunt mediocres. The homo signorum, so common in later calendars, probably originated with him. The earliest almanac printed in England was the Sheape- heard's Kalender, translated from the French, and printed by Richard Pynson, in 1497. It contains a vast portion of extraneous matter. The following verses on the planets will, at the same time, give a good idea of the nature * In one almanac of the commencement of the 17th century (MS. Harl. 5937. Bagford Collect., s. 139) is a very singular method for finding the hour of the day, if in the country and without any watch. I refer to it merely out of charity to those right-hearted enthusiastic antiquaries who do not stick at trifles in pursuing researches that can in any way illustrate the customs of our ancestors in the good old times. To those who only value the researches of antiquaries in proportion as they are likely to furnish some evident tan- gible utility, I would willingly spare their time in recurring to a method which, though it might excite their ridicule, could never, from its nature, be brought into practice in the present age. 118 APPENDIX. of the astrological information in this and other calendars of the period : — " Some hot, some colde, some moyst, some dry, If three be good, foure be worse at the most. Saturne is hyest and coldest, being full, old, And Mars, with his bluddy sweide, ever ready to kyll ; Jupiter very good, and Venus maketh lovers glad, Sol and Luna is half good and half ill, Mercury is good and will verily And hereafter shalt thou know; Whiche of the seven most worthy be, And who reigneth hye, and who a lowe ; Of every planets propertie, > Which is the best among them all, That causeth welth, sorrowe, or sinne, Tarry and heare sone thou shalt, Speake softe, for now I beginne." Afterwards follow some prognostications of the weather. The following method to knowe what wether shall be all the yere after the chaunge of every moone by the prime dayes, is taken from a MS. in Lambeth Palace : — fl Sondaye pryme, drye vvether. Mondaye pryme, moyst wether. Teusdaye pryme, cold and wynde. Wenesdaye pryme, mervelous. Thursdaye pryme, sonne and clere. Fry day e pryme, fay re and fowle. Saturday e pryme, rayne." Prognostications of the weather were early matters of reproach — " Astronomyers also aren at ere whittes ende, Of that was calculed of the clymat the contrye thei fyndeth. And in Heber's library was a little tract of three leaves, entitled fA Mery Prognostication '— " For the yere of Chryste's incarnacyon, A thousande fyve hundreth fortye and foure. This to prognosticate I may be bolde, That whan the new yere is come, gone is the olde." APPENDIX. 119 Henry VI II. issued a proclamation against such false prognostications as this tract was intended to ridicule, but sMU no printer ventured to put his name to it. Not long after to believe them was a crime ; " as for astro- logicall and other like vaine predictions or abodes," says Thomas Lydiat, " I thanke God I was never addicted to them." * Johannes de Monte-Regio, in 1472, composed the earliest European almanac that issued from the press ; and, before the end of that century, they became com* mon on the Continent. In England they were not in general use until the middle of the sixteenth century. Most of the best mathematicians of the time were em- ployed in constructing them ; but, before the end of the following century, almanac-makers began to form a distinct body, and, though they often styled themselves " studentes in the artes mathematicall," very few of them were at all celebrated in the pure sciences. It may not be wholly irrelevant here to make some few observations on the memory-rhymes found in some almanacs of the present day, and which date their origin to a much earlier period. The well-known lines, used by many for recalling to their recollection the number of days in each month, I find in Winter's Cambridge Alma- nac for 1635, under the following slightly-varied form — " Aprill, June, and September, Thirty dales have as November ; Ech month else doth never vary From thirty-one, save February ; Wich twenty-eight doth still confine, Save on Leap-yeare, then twenty-nine." And the nursery-rhjmes, commencing " Multiplication is my vexation," were certainly made before 1570.f * MS. Bodl. 662. t Professor Davies's Key to Hutton's Mathematics, p. 17. 120 APPENDIX. The early history of ecclesiastical computation is inti- mately connected with that of calendars. Dionysius Exiguus was one of the first who wrote on the subject : after him, Bede, Gerlandus, Alexander de Villa Dei, and Johannes de Sacro-Bosco, were the most celebrated. The Massa Compoti of Alexander de Villa Dei, so common in MS., is perhaps the most singular tract on the subject that has come down to us : his reason for the title of the book is exceedingly curious : — Sicut de multis laminis ceris in conflatorio massa una efficitur, ideo librum istum vocari volui massam compoti. I cannot conclude without mentioning the ' Almanac and Prognostication' of Leonard Digges, which was so often reprinted in the latter half of the sixteenth century: it is filled with the most extravagant astrological absur- dities, and a table of weather predictions. With respect to the latter, however, I have had the curiosity to test its accuracy for some months in comparison with our two celebrated weather almanacs, and, on the average, have found it to be quite as " neare the marke " as either of them. THE END. CAMBRIDGE : PRINTED BY METCALFE AND PALMER, TRINITY STREET. CORRECTIONS AND ADDITIONS. P. 2, 1. 31. — For idem, read eandem. P. 3, 1. 13. — For muneri, read nuraeri. P. 6, 1. 20. — For nonenarii, read novenarii, and in other places. P. 7, 1. 18. — For supponatur, read supraponatur. P. 11, . 25, 29. — For vide, read vid. P. 12, . 22. — For quinam, read quando. P. 15, . 21. — For perdictis, read praedictis. P. 19, . 11. — For quidenarius, read quindenarius. P. 19, . 25. — For perambulum, read prseambulum. P. 26, . 15. — Sibi ; so in the manuscript, but evidently sub. p. 29, . 4.— For 14, read 15. P. 30, . 2, 6, 7 ; P. 31, 1. 1, 13. — It will be readily seen that y is in- serted in these places for th, the Saxon character having been mistaken by the printer. P. 51, 1. 17. — For ince, read vice. I may mention here, that it was pointed out to me by .an eminent classical scholar, that a portion of this preface is plagiarised from Cicero. P. 54, 1. 18. — Caedere ; 50 in the manuscript, but evidently cedere. P. 55.— This table has been previously noticed, and in part printed by J. W. Lubbock, Esq., in Phil. Trans. I was not aware of this when my own -transcript was passing through the press, or it would have been acknowledged in the proper place. P. 55, Second table, 1. 1.— For 10, read 0. P. 56. I am not quite certain that the poetry quoted at the bottom of the page refers to Euclid the Geometer. P. 57, 1. 17. — For Bathoniensum, read Bathoriiensem. P. 73, 1. 21. — For nihil, read in his. P. 73, 1. 22. — For potuit, read patuit. P. 84, 1. 12. — For descriptos, read desuper. P. 85, 1. 16. — For principem, read patrem. NOTE. The foregoing volume was published at three several times: the first part (pp. 1 — 48) appeared on the 1st of June, 1838 ; the second (pp. 49 — 96) on the 1st of October, 1838 ; and the remainder on the 1st of June, 1839. Some parts of the volume were printed without the Editor's final corrections, which will account for a few oversights ; and it ought to be particularly remarked, that in no instance has the regular correction of the errors in the MSS. from which these tracts are printed been attempted. BY THE SAME AUTHOR. I. — A Brief Account of the Life, Writings, and Inventions of SIR SAMUEL MORLAND, Master of Mechanics to Charles the Second. 8vo. Camb, 1838. II Two Essays : I. An Inquiry into the Nature of the Nu- merical Contractions found in a passage on the Abacus in some Manuscripts of the Geometry of Boetius. II. Notes on Early Calendars. 8vo. Lond. 1839. Ill The Travels of SIR JOHN MAUNDEVILE, Knt. to the Holy Land, and other parts of Asia, in the 14th century. Reprinted from the edition of 1725. With an Introduction, additional Notes, and Glossary. 8vo. Lond. 1839. IFORNIA LIBRARY OF THE UNIVERSITY OF CALIFORNIA LIBRARY OF TH UNIVERSITY OF CALIFORNIA LIBRARY BERKELEY Return to desk from which borrowed. This book is DUE on the last date stamped below. iUov'^ ££& CIR.AIJG 6 A JG 06 1991 REC'D U> DEC 5^962 05(70 CWC W* r NOV i 3 'M - 'NOV12 1977 BEC.CIR.Wy 29*91 LD 21-100w-9,'481B399sl6)476 ) FY OF CALIFORNIA LIBRARY OF THE UNIVERSITY OF CALIFORNIA LIBRA LIBRARY OF THE UNIVERSITY OF CALIFORNIA