AN EXCELLENT INTRODUCTION TO ARCHITECTURE BEING A BOOK OF Geometrical-Practice Which is the First Degree of all ARTS Wherein is Contained Variety of Examples of that Admirable Science Shewing and Describing the Making of several Figures in that Nature with ●●oper Names belonging 〈◊〉 Member and Figure and how to begin and end them after a plain and easie Manner it being of great use to all Artists and Workmen concerned in Building MORE ESPECIALLY Surveyors Architects Engineers Masons Carpenters Joyners Bricklayers Plaisterers Painters Carvers Glasiers c. In General for all that are Concerned or Delight to Practise with the Rule and Compasses LONDON Printed for Robert Pricke at the Balls in St. Pauls Church-yard next Cheap-side Where you may have that Excellent New Treatise of Architecture designed by John Mauclere according to Vitruvius And also Maps Copy-books Books of Beasts Birds Flowers Fruits Likewise Italian French and Dutch Prints 1679 To the READER GEometry is a Greek word which in its proper signification telleth us of no other thing then Measuring of the Earth Nevertheless by this word we are to understand the Principal Part of the Mathematicks which is a Science that hath for its Object Quantity continued A continued Quantity is that whereof all the Parts are joined together as are all sorts of Extensions of Greatness and of Dimensions And these Dimensions consist principally either in Lines Angles Superficies or Bodies which are to be considered not according to the Qualitie of the Matter but according to the Extension of the Parts Geometry is divided into the Theorick and the Practick The Theorick is the Science which causeth us to conceive and demonstrate the truth of Geometrical Propositions And the Practick is the Art which guideth the hand in its Operation Geometry had its beginning amongst the Egyptians which were compelled to invent it for to remedie the disorder that hapned ordinarilie within their Grounds by the overflowing of the River Nilus which carried away all the Bounds and defaced all the Limit-marks of their Inheritances and so this Exercise which for the time consisted only in Measuring the Lands for to render to every one that which belonged to him was called the Measuring of the Earth or Geometrie But in process of time the Egyptians applied themselves to more subtile Enquiries and by degrees from an Exercise altogether Mechanical they brought forth this Excellent Science which hath deserved to hold one of the chiefest ranks amongst all others Geometry is not only profitable but we may say that it is altogether necessarie It is by this that the Astrologians do make their Observations by it they know the Extent of the Heavens the Duration of Times the Moving of the Stars the observation of the Seasons of the Years and Ages It is by this Means that the Geographers do cause us to see at one cast of an Eye the Greatness of the whole Earth the huge Extension of the Seas the Divisions of Empires Kingdoms and Provinces It is from this the Architects do take their just Measures in framing of publick Buildings as well as of particular Houses It is by the help of this Engineers do bring to pass all their intended Projects whereby they take the scituation and plat-form of Fortifications the Distance of Places and that they can at length carry their Measure through Spaces accessible only to the sight Persons of Qualitie whose Birth engageth them to the Wars are obliged to applie themselves to this Science It introduceth them not only to Fortification which teacheth them to build Bulwarks to defend strong Places but also to compose and set up Engines which may overthrow them and further also it brings them very much knowledge and skill in the Military Art how to set an Army in Order for Battel how to encamp and divide the Ground for the quartering and further it teacheth them to make Maps of Countreys and to take the Platform of Towns Forts and Castles to Measure all kinde of Dimensions both accessible and unaccessible to invent Projects and lastly it maketh them so expert and commendable for their Wit and Inventions as they can be for any strength or couragiousness in them All those that make Profession of entring upon Designs ought to know something of Geometry seeing that they cannot otherwise attain the Art of Architecture nor Perspective which are two Parts absolutely depending on that skill Geometry is established upon three sorts of Principles viz Definitions Axioms and Petitions 1. The Definitions are brief Explications of the Names and Terms 2. The Axioms are Sentences so true and so manifest that it is impossible to contradict them 3. And the Petitions are clear and intelligible Demands whereof the Execution and Practice requireth not any Demonstrations A Point FIrst you must understand that a Point is a Prick made with a Pen or Compass which cannot be divided into parts because it containeth neither length nor bredth in it A Line A Line is a right consecutive Imagination in length beginning at a Point and hath no bredth A Parallel WHen two lines are set or placed a little distance one from the other those two Lines according to the Latin phrase are called Parallel and by some Equidistances Superficies WHen these two Lines aforesaid are enclosed at each end with other Lines it is then called a Superficies and in like sort all spaces in what manner soever they are closed are called Superficies or Plains Perpendicular WHen there is a straight upright Line placed in the middle of a cross streight line then it is called a Perpendicular or Catheta line and the end of the Crosses or streight line on both sides of the Perpendicular are called streight Corners Acutus Obtusus WHen a leaning or streight Line is placed upon a streight line without Compass or Equallity as much as the same line bendeth so much shall the corner of the streight line be narrower below and the other so much broader as a right and even corner the straight corner in Latin is called Acutus which signifieth sharp and the wider Obtusus which signifieth dull Pyramidal A Corner or Point called Pyramidal and also Acutus in Latin is when two even long streight lines meet or joyn together at the upper end as the Figure declareth Triangle When such a Figure as aforesaid is closed together at the foot with a long streight line it is then called a Triangle because it hath three sharp corners 2. Triangle WHen a Triangle with two even streight lines is closed together with a longer line then these two are it shall have such forme as you may see in the Figure of the third Triangle 3. Triangle A Triangle which is made of three unlike lines will also have three unlike corners Quadrangle WHen two long and two direct down-right lines are joyned together at the four corners it is called Quadrangle with even sides or corners but when the four lines are all of unlike and contrary length then it is a

line or some other thing which a man would also divide into unequal parts according to the proportion of the shorter line then let the shortest line be A. B. and the greatest line A. C. now it is necessary that from the uppermost point A. you should make a corner as A. B. and A. A. Then take your longer line and set it with the end C. upon B. and let the other end rest at the hanging line A. A. then from every point of the uppermost line A. B. let a hanging line fall upon the line A. C. so that they may be equidistant with the line A. A. and where the said lines cut through each other there is the right division proportioned according to the smaller This rule shall not only serve the Architector for many things as I will partly shew but will also serve many Artificers to reduce their small works into greater FOr Example of the figure aforesaid I suppose Houses or Pieces of Land to be of divers wideness which should be narrower before then behinde Which Houses by Fire or War are so decayed that in the forepart between C. D. there were but some signs of division to be seen of the houses and behind the houses between A and B. no sign at all to be seen Now as the misfortune was past and that every man desired to have his part of his inheritance then the Architector as an Umpire according to the rule aforesaid should divide the longest line according to the proportion of the shortest to give every man his own as you may see by this Figure following THE Architector must have a well-proportioned Cornice which if he would make greater keeping the same proportion he may do it as he is formerly taught as in this Figure following is shewed by the short line marked A. B. and the longest line marked A. C. AN Architector or Workman must likewise learn to augment and make greater a hollowed Column which he may also do by the two lines aforesaid and although the Column should be a Dorica yet it is to be understood of all kinds of Columns This rule will also serve not only for the three Figures set down but also for as many as if I should shew them it would contain a whole book of them alone and therefore this shall suffice at this time for the Workman THe further that any material thing standeth from our sight so much it seemeth to lessen and diminish by means of the Air which consumeth our sight therefore when a man will make or place one thing above another against any place or wall and would have the same thing to shew above in the middle and beneath as great in one part as in the other it is convenient for him to follow this rule which is for that our sight runneth in circumference therefore a man must first chuse the place from whence he will see the same there placing a Center and then draw a quarter of a Circle from your eye upwards Which dividing in even parts you shall by the lines that go out of the Center through the Circle against the wall finde the unequal parts the which although upwards against the wall they shall seem greater yet in your sight they will shew all of one greatness By this rule you may also measure heights aiding your self with the numbers MAny men are of opinion that streight lines in what manner soever they are closed contain as many spaces one way as another that is to say if a man had a cord of fourty foot long and should lay it diversly in a round long three corner'd four square or five-corner'd forme but the superficies are not of one self-same space which may be seen by these four square Figures following for the first line holdeth on either side ten which is fourty and the space contains ten times ten which is an hundred The o●her line upon the two longest sides contains fifteen spaces and on the shortest sides five making fourty also but five times fifteen make but seventy and five IF the Quadrate stretcheth further out so that the two longer sides were eighteen a piece then the shortest sides must each have two to have fourty upon the line but the space should contain but six and thirty And hereby you see what a perfect forme may do against an imperfect And this rule the Workman shall use that be may not be deceived when he will change one forme into another IF a man should make three Points which should not stand upon a right line and desiring to have a circumference made the Compass must pass along upon each of these Points To do it from the point one to the point two he must draw a line and from the point two to the point three another which two lines shall each of them be divided into two equal parts and setting the squires half way in them as you see it in the Figure by that Cross it will shew you the Center wherein you must set one foot of the Compass and with the other draw the Circle through all the said points YOu may find the Center of three points another way without your Compass making a two-corner'd superficie from the one point to the other through the which corners two straight lines being drawn long enough downwards where they cross one over the other they will shew you the Center of the three points BUt for that a Workman holds this to be a superfluous speech and a thing of no moment it may be that a Workman may have a piece of a round work to do which he is to perfect and make full round by this rule he may find the Center Circumference and Diameter thereof as the Figure sheweth WE finde in Antiquities and also in modern works many Pillars or Columns which beneath in the joynts at the-Bases are broken asunder which is because their Bases were not well made according to their corners or else because they are not rightly placed so that they have more weights upon them on the one side then on the other whereby the Cantons break which the Workman by knowledge of the lines and help of Geometry may prevent in this manner that is he must make the pillar round underneath and his Base hollow inward so that when you place the Pillar by the lead it may presently settle it self without any hurt To finde this roundness you must set the one point of the Compass upon the highest part of the pillar that is under the A. and the other point thereof upon B. and then draw or winde it about to C. and that shall be the roundness making the hollowing of the Base according to the same measure you may do the like with the Capital as you may see in the Pillar by it IF a Workman will make a Bridge Bowe or any other round Arched piece of work which is wider then a half Circle although Masons practise this with their lines whereby they

make such kinde of works which shew well to mens sight yet if the Workman will follow the right Theorick and reason thereof he must observe the order heretofore shewed When he hath the wideness of the height then he must make half a Circle out of the middle after that upon the same Center he must make another lesser Circle which must be no greater then he will make the height of the Bowe or Arch then he must divide the greatest Circle in equal parts which must all be drawn with lines to the Center then you must hang out other Perpendiculars upon your Lead and where the lines that go to the Center cut through the lesser Circle from thence you must draw the cross lines toward the Perpendicular and where they close together there the Bowe or Arch which is made shall be closed as by the points or pricks here under is shewed BUt if you desire to make the Bowe or Arch lower then you must follow the rule aforesaid and make the innermost Circle so much less which is to be understood that the more parts that you make of the greater Circle so much the easier you shall draw the crooked lines which you would have from this rule there are many others observed as hereafter you shall see CAlling the former rule to minde I devised the manner how to forme and fashion divers kinds of vessels by the same and I think it not amiss to set down some of them This only is to be marked that as wide as you will make the vessels within so great you must make the inner most Circle The rest the skilful Workman may mark by the Figures that is how the lines are drawn to the Center and the Parables and out of the small Circle The Perpendiculars hanging the vessels are formed the foot and the neck may be made as the Workman will BUt if you will make the body of the vessel thicker then you must make the half Circle so much the greater and make the belly hanging down under it to touch the great Circle by the falling of the Perpendiculars upon the cross line as by these Figures 3.4.5 it is shewed whereby a man by this meanes may make divers vessels differing from mine The necks and covers of these vessels are within the small Circles the other members and Ornaments are alwayes to bee made according to the will of the ingenious workman IT is an excellent thing for a man to study or practise to do any thing with the Compasse whereby in time men may find out that which they never imagined as this night it happened unto me for that seeking to find a neerer rule to make the forme of an Egge then Albertus Durens hath set downe I found this way to make an Antick vessell placing the foot beneath at the foot of an Egge and the necke with the handles above upon the thickest part of the Egge But first you must frame the Egge in this manner Make a streight cross of two lines and divide your cross line in ten equal parts that is on each side five Then set the Compass upon the Center A and with the other foot thereof draw in two parts that is to C. making half a Circle upwards That done set one foot of the Compass upon the point marked B. and with the other draw in the uttermost point C. drawing a piece of a Circle downwards toward the Perpendicular and doing the like on the other side you must make a point below Then take the half of the half Circle above that two parts and place it at the undermost point of the Perpendicular upwards above O where the Center to close the Egge shall stand the rest under shall be for the foot the neck without doubt may be made two parts high and the rest according to the Workmans pleasure or according to the Figure here set down YOu may also make another forme of a Cup or vessel after the rule aforesaid But from the point A. which doth shew the bredth of the foot and the wideness of the mouth you must make your Circle upwards from C. unto the two Perpendiculars where the body shall be closed up The neck standing above it shall be two parts high but the rest of the Workmanship shall be made according to the will and device of the Workman BY this means you may make other different kinds of Cups or vessels but these that follow you must make in this so●t you must divide your cross line in twelve parts through the point A. making two Perpendiculars to shew the foot and the neck then setting one foot of the Compass upon B. and the other foot upon I. drawing a piece of a Circ●e downwards towards the Perpendicular and the like being done on the other side to the Figure of 2. then place your Compass upon the point C. and touching the sides 3. and 4. then the bottom of the vessel will be closed up then place the Compass upon the point between I. and A. and it will be the roundness of the vessel above the other four parts serve for the neck of the vessel with the rest of the work A Man may make a vessel only by a Circular forme making therein a circular cross and dividing every line into six parts the half-circle shall be the belly of the vessel and a sixt part upward for a Freese that there may be more place to beautifie it another part shall be the ●eg●t of the neck and another part the corner and for the foot although it be but half a part high it may well go a sixth part without the round and although I have set down but six manner of cups or vessel yet according to the rule aforesaid a man may make an infinite number of vessels and a man may alter them by their Ornaments whereof I say nothing that you may see the line the better A Man may make Oval formes in divers fashions but I will only set down four To make this first Figure you must set two perfect Triangles one above the other like a Rombus and at the joyning of them together you must draw the lines through to 1. 2. 3. 4. and the corners A. B. C. D. shall be the four Centers then set one foot of the Compass upon B. and the other upon I and draw a line from thence to the Figure 2. After that from the point A. and 3. to 4. you must also draw a line which being done set the one end of the Compass in the point C. and then draw a piece of a Circle from 1. to 3. and again the Compass being in the Center D. draw a piece of a Circle from 2. to 4. and then the forme is made You must also understand that the nearer that the Figures come to their Centers so much the longer they are and to the contrary the further that they are from their Centers the rounder they are yet they are no perfect Circles because

hereof may take each piece and alter it into a Quadrangle and after into a Quadrate as hereafter shall be shewed and he shall find it true AN Architector must also undergo other Burthens for that he must know how to divide a piece of ground that no man may be hindred thereby As for Example if there were a piece of ground that lay three-corner'd wise with unequal parts having on the one side thereof a Well but not in the middle and this ground or three-corner'd piece of Land is to be divided into two equal parts in such sort that each of them may have the use of the Well it must be done in this manner I make a Triangle marked A. B. C. and the Well is marked with G. Now divide the line B. C. with a dark line in the two equal parts as the Letter D. sheweth and then drawing a line from D. to A. then the Triangle is divided into two equal parts but both of them cannot yet come to the Well then draw another line from the Well G. to A. and from the point D. you must set an Equidistancie against G. A. marked with E. and drawing from G. which is the Well the black line to the letter E it will divide the ground in two even several parts and each of them shall have the VVell at the end of his Ground for that part A. B. G. E. containeth in it just as many feet or roods as that part which is marked G. E. C. I Shewed before how a man should make a four square Superficies once as great again as it is but it may fall out that a man is to make it but half as great again or more or less as he thinketh good or as occasion serveth which the Architector is also to learn of necessitie Which to shew I set down a right four square thing marked A. B C D which I will have three quarters greater the same three quarters I set by the side thereof so that the same with the Quadrate together make a Quadrangle A. E. C. G. To bring this Quadrangle into a right Quadrate you must lengthen the line A. E. yet a quarter longer or from the side of the Quadrangle E. G and place F. there then upon the line A. F. make half a Circle which line will shew you the one side of the Quadrate which you seek for which Quadrate being made will contain as much in it as the Quadrangle already made And in this manner you may change all Quadrangles which are long four corner'd pieces of work into a just and true Quadrate NOw to prove that which I said before you must join the Quadrangle with the Quadrate together in one square Superficie as Q. R. S. T. and from the corner R. to the corner S. draw a Diagonus and it is certain that that Diagonus will make two even parts Now Euclides saith that when a man taketh any even parts from even parts the rest of the parts also remain alike then take the Triangle K. L. and the Triangle M. N. which are both alike the right four corner'd superficie P. is of the same greatness that the longer superficie O is AGain you may easily change a Quadrate into a Quadrangle as long or as narrow as you desire to have it doing thus Make your Quadrate A. B. C. D and lengthen your Line A. B. and the Line B. C. Which done then set the length of the Quadrangle which you desire to have upon the line A. G. Then from the point G. draw a line alone by the corner of the Quadrate D. to the line C. F. and there you find the shortest line of the Quadrangle and so to the contrary you shall by the least side of the Quadrangle finde the longest also as you may also prove by the aforesaid Figure for when you take away the Triangles M. N. and O. P. which are both alike then the two parts which are K. L. are also alike AN Architector may by chance have a piece of work of divers unequal sides come to his hands which he is to put ino a Quadrangular or Quadrate forme to know what it containeth and specially when it belongeth to more then one man whether it be Land or any other thing For although the Architector or Surveyor of Land could not skill of Arithmetick or Ciphering yet this rule cannot fail him nor any other man that desireth to find out the deceit of a Taylor Thus I say then let it be what forme soever it will I set down this hereafter following First then seek the greatest Quadrate or Quadrangle that you can take out of it that done seek yet another Quadrate or Quadrangle as big as you can take out of it out of the rest of the said work and if you can after that make more Quadrates or Quadrangles out of it I mean all with right corners take them out also but if you can find no more in it then make Triangles also as big as ●●u can of which Triangles as you are taught before you may make Quadrangles and let every piece severally be marked with Characters as in the Figure following may be seen LEt by Example your many corner'd Figures first be marked with the great Quadrangle with these Letters A. B. C. D. and then with a less Quadrangle as E. F. G. H. the rest are all Triangles Now set the greatest Quadrangle L. in a place by it self and then the other marked with M. which set upon it that the two corners or sides may be alike which done lengthen the line E. F. and the line E. G. and where they stay or touch under the great Quadrangle L. there set an I from this I. a Diagonal line being drawn through the corners B. H. the same line shall be drawn to the point that by the shutting of the Characters B. M. L. D. will shew you another Quadrangle of the like quantity that the Quadrangle M. is so that the whole Quadrangle D. C. L. M. containeth the two aforesaid Quadrangles Touching the Triangles when you have changed the same according to your former instruction into Quadrangles as you may see by the Triangle N so may you put that Quadrangle also in the greatest Quadrangles for less trouble The great Quadrangle A. L. M. C. is once again placed above with the small Quadrangle O. P. Q. R. set upon it and the Diagonal line is placed behind the greater which is L. M. T. S both marked with N. so that the Quadrangle A. C. S. T. containeth three Quadrangles L. M. N. and as many more as there are you may in this sort bring them all in one Quadrangle if there falleth out any crooked lines the skilful Architector or Workman may almost bring them into a square and those Quadrangles if need be may also be reduced into perfect four squares as aforesaid WHen a man hath a line or other things of unequal parts and there is also another longer

they have more then one Center FOr the making of the second Oval you must first make three Circles as you see here drawing where the four streight lines stand the four Centers shall be I. K. L. M. Then placing one point of the Compass in K. yon must draw a line with the other point from the Figure of 1. to 2. Again without altering the Compass you shall set the one foot of the Compass in I. and so draw a piece of a Circle from the figure 3. to the figure 4. and that maketh the Compass of the Circle This Figure is very like the form of an Egge THE third forme is made by two foure corner'd squares drawing Diagonen lines in them which shall shew the two Centers G. H. and the other two corners E and F. Then draw a piece of a Circle from F. to the figure 1. and so to 2. Do the like from E. to 3. and 4. which done from the points G. and H. make the two sides from 1. to 3 and from 2. to 4. and so shut up the Ovale IF you will make this fourth Oval draw a line at pleasure as A. B. then set one foot of the Compasses at C. and strike a Circle then remove the Compasses and set one foot at D and strike another Circle then set one foot of the Compasses at E. and close up the line from G. to H. then set one foot at F and close the line from ● to K. And although our Authour saith there are four forms of Ovals yet this last figure is of the same form as the first only this is easier to make TOuching the Circles there are many Figures which are round and yet some have 5. 6. 7. 8 9. and 10. corners c. But at this time I will speak only of these three principally because they are most common THis Octogonus or eight points is drawn out of a right four corner'd square drawing the Diagonus which will shew you the Center then set one foot of your Compass upon the corners of the Quadrate and leading the other foot through the Center directing your Circle toward the side of the Quadrate there your eight points shall stand to make it eight corner'd and although a man might only do it by the Circle making a cross therein and dividing each quarter in two yet it will not be so well and therefore this is a surer and more perfect way THe Hexagonus that is the sixt-corner'd Circle is easiest made in a Circle for when the Circle is made you may divide the Circumference in six parts equally without stirring the Compass and drawing the line from one Point to another the six corners are made BUt the Pentagonus that is five-corner'd is not so easily to be made as the others are because it is of an uneven number of corners notwithstanding you may make it in this manner when the Circle is made then make a streight cross therein then divide the one half of the cross line in two parts as it is marked with the Figure 1. then place one foot of the Compasses at the Figure 1. and the other foot under the Figure 2. draw downward to the Figure 3. resting that foot and reaching the other to the aforesaid place under 2. and you will have the length of every side of the Pentagonus In this Figure also you shall find the Diagonus that is ten corners for from the Center to the Figure 3. that shall be one side thereof you may also make a sixteen-corner'd Figure out of this wideness 3. 4 and place a particular line upon the point 1. And Albertus Durens saith that the same also will serve to make a seven-corner'd Figure THis figure will serve such men as are to part a Circumference into unequal parts how many soever they be but not to bring the Reader into confusedness with making of many formes I will only set down this divided into nine corners which shall serve for an example of all the rest which is thus Take the quarter of the Circle and divide it into nine parts and four of these parts will be the ninth part of the whole Circumference you must also understand the same so if you divide a Quadrate into eleven twelve or thirteen parts c. for that always four of these parts be the just wideness of your parts required THere are many Quadrangle Proportions but I will here set down but seven of the principallest of them which shall best serve for the use of the Workman FIrst this forme is call'd a right four-corner'd Quadrate THe second forme or figure in Latin is called Sexquiquarta that is which is made of a four-corner'd Quadrate and an eighth part thereof joyned unto it THe third Figure in Latin is called a Sexquitertia that is made of a four-squar'd Quadrate and a third part thereof joyned unto it THe fourth is called Diagonea of the line Diagonus which line divideth the four-squar'd Quadrate cross through the middle which Diagonal line being toucht from under to the end thereof upwards with the Compass and so drawn will shew you the length of the Diagonal Quadrangle but from this proportion there can be no rule in number well set down THE fifth Figure is called a Sexquialtera that is a four square and half of one of the four squares added unto it THe sixth is called Superbitienstertias that is a four square and two third parts of one of the four squares added thereunto THE seventh and last Figure is called Dupla that is double for it is made of two four square formes joyned together and we finde not in any Antiquities any forme that passeth the two four squares unless it be in Galleries Entries and other to walk in and some Gates Doors and Windows have stood in their heights but such as are wise will not pass such lengths in Chambers or Halls MAny Accidents like unto this may fall into the Workmans hand which is that a man should lay a sieling of a house in a place which is fifteen foot long and as many foot broad and the rafters should be but fourteen foot long and no more wood to be had then in such case the binding thereof must be made in such sort as you see it here set down that the rafters may serve and this will also be strong enough IT may also fall out that a man should finde a Table of ten foot long and three foot broad with this Table a man would make a door of seven foot high and four foot wide Now to do it a man would sawe the Table long-wise in two parts and setting them one under another and so they would be but six foot high and it should be seven and again if they would cut it three foot shorter and so make it four foot broad then the one side shall be too much pieced Therefore he must do it in this sort Take the Table of ten foot long and three foot broad

and mark it with A. B. C. D. then sawe it Diagonal-wise that is from the corner C. to B. with two equal parts then draw the one piece there of three foot backwards towards the corner B. then the line A. F. shall be four foot broad and so shall the line E. D. also hold four foot broad by this means you shall have your door A. E. F. D. seven foot long and four foot broad and you shall yet have the three-corner'd pieces marked E. B. G and C. F. and C. left for some other use IT hapneth many times that a Workman hath an eye or round Window to make in a Church as in ancient times they used to make them and he doubted of the greatness thereof which if he will make after the rules of Geometry he must first measure the bredth of the place where he will set it and therein he must make a half Circle which half Circle being inclosed in a Quadrangle then he shall finde the Center by two Diagonal lines then he must draw two lines more which shall reach from the two lowermost corners above the Center and touch the just half of the Circle above and where the said lines cut through the Diagonal lines there you must make two Perpendicular lines which Perpendicular lines shall shew the wideness of the desired window the list about it may be made the sixth part of the Diameter being round in bredth IF a Workman will make a gate or door in a Temple or a Church which is to be proportioned according to the Place then he must take the wideness within the Church or else the bredth of the wall without if the Church be small and have Pilasters or Pillars within it then he may take the wideness between them and set the same bredth in a four square that is as high as broad in which four square the Diagonal lines and the two other cross cutting lines will not only shew you the wideness of the door but also the places and points of the ornaments of the same door as you see here in this Figure And although it should fall out that you have three doors to make in a Church and to that end cut three holes yet you may observe this proportion for the smallest of them And although gentle Reader the cross cutting thorow or dividing is innumerable yet for this time lest I should be too tedious I here end my Geometry FINIS A CATALOGUE of some Books and Prints as are Printed for Robert Prick and are to be sold at his Shop in White-cross-street and likewise at the Golden Lion at the Corner of New-Cheapside near Bethlehem A New Treatise of Architecture according to Vitruvius Wherein is discoursed of the five Orders of Columns viz. The Tuscan Dorick Ionick Corinthian and Composite Divided into seven Chapters Which declare their different Proportions Measures and proper Names according to the Practice of the ancient Architects both Greeks and Romans as also of their Parts general and particular necessary in the building of Temples Churches Palaces Castles Fortresses and all other Buildings with their Dependents As Gates Arches-Triumphant Fountains Sepulchres Chimneys Cross-bard Windows Portals Platforms and other Ornaments serving as well for the beautifying of Buildings in Cities as for necessary Fortifications of them Designed by Julian Mauclerc Lord of Ligneron Mauclerc Brossandiere and Remanguis Whereunto are added the several Measures and Proportions of the famous Architects Schamozzi Palladio and Vignola with some rules of Perspective The whole represented in fifty large Prints enriched with the rarest Ornaments of Antiquity and Capitals of extraordinary greatness with their Architraves Frieses and Cornishes proportionable A New Book of Architecture wherein is represented fourty Gates and Arches Triumphant Composed of different Inventions according to the Five Orders of Columns viz. The Tuscane Do●ick Ionick Corinthian and Composite By Alexander Francine Florentine Engineer in Ordinary to the French King With a Discription of each Figure The Art of Fair Building Represented in several Vprights of Houses with their Ground-plots fitting for persons of several Qualities Wherein is divided each Room and Office according to their most convenient occasion with their Heights Depths Lengths and Breadths according to Proportion With Rules and Directions for the placing of Doors Windows Chimneys Beds Stairs and other conveniencies with their just measures for their best advantage both of Commodiousnes Health Strength and Ornament Also a Description of the Names and Proportions of the Members belonging to the framing of the Timberswork with Directions and Examples for the placing of them By Pierre le Muet Architect in Ordinary to the French King and Surveyor of his Designs and Fortifications in the Province of Picardy A Book of Architecture containing Cieling-pieces Chimney-pieces and several sorts useful for Carpenters Joyners Carvers Painters invented by J-Barber GETHINGS Redivivus or the Pens Master-piece Being the last Work of that Eminent and Accomplished Master in this Art Containing Examples of all curious Hands written and now in practice England and the Neighboring Nations With necessary Rules and Directions towards the attaining of Fair Writing Also Directions for making the best Pens and several sorts of very good Ink as black red green yellow and purple and how to write with Gold and Silver and to polish it to make it glister Likewise how to Etch or Engrave a Coat of Arms Figure or Posie on Silver Copper Brass Iron or hardned steel With an Appendix Shewing the exact manner of making all sorts of Bonds Letters of Attorney Releases Scripture-Stories in large sheets as Adam and Eve Abraham offering up his son Isaac Elisha fed by Ravens with the woman of Samaria the Judgment of Solomon between the two Harlots Susanna and the two Flders Queen Esther c. and several others of the and New Testam