Instructions Given in the Drawing School Established by the Dublin Society: Course of mathematicks. System of the physical world. System of the moral world. Plan of the military art. Plan of the marcantile arts. Plan of naval art. Plan of mechanic arts. The elements of EuclidA. M'Culloch, 1769 - Mathematics |
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Page vi
... second Class studies Algebra , the 11th and 12th Books of Euclid , spherical Trigonometry , conic Sections , and the general Principles of Aftronomy . The third Class goes on in Aftronomy and Perspective , read a Part of Sir Ifaac ...
... second Class studies Algebra , the 11th and 12th Books of Euclid , spherical Trigonometry , conic Sections , and the general Principles of Aftronomy . The third Class goes on in Aftronomy and Perspective , read a Part of Sir Ifaac ...
Page vii
... second the Art of finding again , by the Means of Magnitudes infinitely small , the finite Quantities to which they belong ; the first as it were resolves a Quantity , the last restores it to its first State ; but what one resolves ...
... second the Art of finding again , by the Means of Magnitudes infinitely small , the finite Quantities to which they belong ; the first as it were resolves a Quantity , the last restores it to its first State ; but what one resolves ...
Page ix
... second Degree by Means of dental Geo- the Right - line and Circle : This Theory produces important and curious metry . Remarks upon the positive and negative Roots , upon the Position of the Lines which express them , upon the different ...
... second Degree by Means of dental Geo- the Right - line and Circle : This Theory produces important and curious metry . Remarks upon the positive and negative Roots , upon the Position of the Lines which express them , upon the different ...
Page xi
... second Part The fecond Part of the inverse Method of Fluxions , which treats of fluxional Quantities , including two or more variable Quantities , com- mences by shewing how to find the Fluents of such fluxional Quantities as require no ...
... second Part The fecond Part of the inverse Method of Fluxions , which treats of fluxional Quantities , including two or more variable Quantities , com- mences by shewing how to find the Fluents of such fluxional Quantities as require no ...
Page xviii
... second King of Egypt , encouraged this Science ; in his Time flourished Hypar- chus , Calimachus , Apollonius , Aratus , Bion , Theocrites , Conon . Julius Cafar was very curious in making Experiments and Observations , as it appears by ...
... second King of Egypt , encouraged this Science ; in his Time flourished Hypar- chus , Calimachus , Apollonius , Aratus , Bion , Theocrites , Conon . Julius Cafar was very curious in making Experiments and Observations , as it appears by ...
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Common terms and phrases
ABCD alfo alſo altitude arch Axis bafe baſe becauſe Bodies Cauſe chords circle Comet cone Conſequently cylinder demonſtrated DEMONSTRATION deſcribe diameter Diſtance draw the ſtraight Earth ECAUSE Ecliptic equal Equator equiangular equimultiples fame manner fame multiple fides AC fimilar fince firſt folid Force given Glaſs Gravity Hypothefis impoſſible interfect inverſe Jupiter leaſt leſs Likewife magnitude Meridian Moon moſt Motion neceſſary Newton Nodes Number Obſervations oppoſite Orbit parallelepiped parallelogram paſs paſſes thro Perihelion plane plle Poſition Prep priſm produced proportional PROPOSITION pyramid Quadratures ratio Rays rectilineal figure reſpect Rgle right angles ſame Saturn ſecond ſegment ſenſible ſerve ſhall ſhewing ſhewn ſhould ſide ſmall ſphere ſquare ſuch ſuppoſed Syſtem Tangent THEOREM theſe Theſis thoſe Tides tion triangle true Anomaly Wherefore whoſe
Popular passages
Page 8 - Let it be granted that a straight line may be drawn from any one point to any other point.
Page 4 - A circle is a plane figure contained by one line, which is called the circumference, and is such that all straight lines drawn from a certain point within the figure to the circumference, are equal to one another.
Page 164 - When of the equimultiples of four magnitudes (taken as in the fifth definition), the multiple of the first is greater than that of the second, but the multiple of the third is not greater than the multiple of the fourth ; then the first is said to have to the second a greater ratio than the third magnitude has to the fourth : and, on the contrary, the third is said to have to the fourth a less ratio than the first has to the second. VIII. " Analogy, or proportion, is the similitude of ratios.
Page 165 - When four magnitudes are continual proportionals, the first is said to have to the fourth the triplicate ratio of that which it has to the second, and so on, quadruplicate, &c., increasing the denomination still by unity, in any number of proportionals.
Page 241 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees ; and each degree into 60 equal parts, called minutes ; and each minute into 60 equal parts, called seconds ; and these into thirds, etc.
Page xxviii - ... bodies that are within the sphere of their activity, and consequently, that not only the sun and moon have .an influence upon the body and motion of the earth, and the earth upon them, but that...
Page 165 - When three magnitudes are proportionals, the first is said to have to the third the duplicate ratio of that which it has to the second.
Page 226 - Equiangular parallelograms have to one another the ratio which is compounded of the ratios of their sides.
Page xiv - Oh! qui m'arrêtera sous vos sombres asiles? Quand pourront les neuf Sœurs, loin des cours et des villes, M'occuper tout entier, et m'apprendre des deux Les divers mouvements inconnus à nos yeux, Les noms et les vertus de ces clartés errantes Par qui sont nos destins et nos mœurs différentes.
Page xxviii - Now what these several degrees are I have not yet experimentally verified; but it is a notion which, if fully prosecuted, as it ought to be, will mightily assist the astronomers to reduce all the celestial motions to a certain rule, which I doubt will never be done true without it.