Euclide's Elements: The Whole Fifteen Books Compendiously Demonstrated. With Archimedes Theorems of the Sphere and Cylinder, Investigated by the Method of IndivisiblesW. Redmayne, 1714 - 520 sider |
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Side 8
... space . 15. If to equal things , you add things unequal , the excess of the wholes fhall be equal to the excess of the additions . 16. If to unequal things equal be added , the excess of the wholes fhall be equal to the excess of those ...
... space . 15. If to equal things , you add things unequal , the excess of the wholes fhall be equal to the excess of the additions . 16. If to unequal things equal be added , the excess of the wholes fhall be equal to the excess of those ...
Side 77
... space AE D a defcribe a circle meeting with the circle given a 3.poft.Es in B , draw AB . Then is AB b = AE c — D. 3. 1 . Which was to be done . PRO P. II . Probl . z . D G b15.def.1 . c conftr . H In a circle given ABC to defcribe a ...
... space AE D a defcribe a circle meeting with the circle given a 3.poft.Es in B , draw AB . Then is AB b = AE c — D. 3. 1 . Which was to be done . PRO P. II . Probl . z . D G b15.def.1 . c conftr . H In a circle given ABC to defcribe a ...
Side 194
... there is no common mea- fure of them , as shall appear hereafter . III . Right lines are commenfurable in power , when the fame space does measure their fquares . 1 The AX 20 The mark of this commenfurability is ; as 194 ...
... there is no common mea- fure of them , as shall appear hereafter . III . Right lines are commenfurable in power , when the fame space does measure their fquares . 1 The AX 20 The mark of this commenfurability is ; as 194 ...
Side 195
... Space of one foot fquare does as well meafure ABq ( 36 ) as the rectangle Xr ( 20 ) to which the Square of the line CD ( 20 ) is equal . The fame note fometimes fignifies commenfurable in power only , " IV . Lines incommenfurable in ...
... Space of one foot fquare does as well meafure ABq ( 36 ) as the rectangle Xr ( 20 ) to which the Square of the line CD ( 20 ) is equal . The fame note fometimes fignifies commenfurable in power only , " IV . Lines incommenfurable in ...
Side 203
... space commenfurable to a rational fpace is rational too and all rational spaces are commenfurable def . 9 . one to another . But magnitudes whereof one is rational , the other irrational , are incommen- def . 7. & furable amongst ...
... space commenfurable to a rational fpace is rational too and all rational spaces are commenfurable def . 9 . one to another . But magnitudes whereof one is rational , the other irrational , are incommen- def . 7. & furable amongst ...
Andre utgaver - Vis alle
Euclide's Elements: The Whole Fifteen Books Compendiously Demonstrated: with ... Euclid Uten tilgangsbegrensning - 1751 |
Euclide's Elements: The Whole Fifteen Books Compendiously Demonstrated. With ... Euclid Uten tilgangsbegrensning - 1714 |
Euclide's Elements: The Whole Fifteen Books Compendiously Demonstrated ... Euclid,Isaac Barrow Uten tilgangsbegrensning - 1732 |
Vanlige uttrykk og setninger
ABC is given ABCD abfurd alfo given alſo altitude angle ABC angle BAC bafe baſe becauſe bifect circle commenfurable compounded Cone confequently conftr Coroll cube defcribed Demonftr diameter Dodecaedron drawn equilateral faid fame fecond feeing fegment fhall fide figure firft fome Forafmuch fore fphere fquare number fubtended fuch fuperficies fuppofed given by kind given by magnitude given by pofition given magnitude given reafon greater hath Icofaedron infcribed interfection leaft lefs likewife meaſure medial oppofite parallel parallelepipedon parallelogram pentagone perpendicular plane prifms PROP proportion pyramides rectangle refidual line right angles right line AB right line BC right line given Schol Scholium ſhall thefe thofe thoſe triangle ABC whence Wherefore whofe whole
Populære avsnitt
Side 26 - If two triangles have one angle of the one equal to one angle of the other and the sides about these equal angles proportional, the triangles are similar.
Side 406 - ... which, when produced, the perpendicular falls, and the straight line intercepted, without the triangle, between the perpendicular and the obtuse angle. Let ABC be an obtuse-angled triangle, having the obtuse angle ACB, and from the point A let AD be drawn...
Side 269 - A fphere is a folid figure defcribed by the revolution of a i'emicircle about its diameter, which remains unmoved. XV. The axis of a fphere is the fixed ftraight line about which the femicircle revolves. XVI. The centre of a fphere is the fame with that of the femicircle. XVII. The diameter of a fphere is any ftraight line which pafles through the centre, and is terminated both ways by the fuperficies of the fphere.
Side 2 - The radius of a circle is a right line drawn from the centre to the circumference.
Side 1 - Bounds) of a Line, are Points. IV. A Right Line, is that which lietb evenly between its Points.
Side 269 - ... be less than the other side, an obtuse angled ; and if greater, an acute angled cone. XIX. The axis of a cone is the fixed straight line about which the triangle revolves. XX. The base of a cone is the circle described by that side containing the right angle which revolves. XXI. A cylinder is a solid figure described by the revolution of a right angled parallelogram about one of its sides which remains fixed.
Side 26 - ... the fum of the remaining angles of the one triangle equal to the fum of the remaining angles of the other. 3 . If one angle in a triangle be right, the other two are equal to a right-angle.
Side 76 - ... the angular points of the figure about which it is defcribed, each thro' each. III. A rectilineal figure is faid to be infcribed in a circle, when all the angles of the infcribed figure are upon the circumference of the circle.
Side 77 - ... touch the circumference of the circle. IV A right-lined figure is faid to be defcribed about a circle, when all the fides of the figure which is circumfcribed touch the periphery of the circle V.
Side 269 - Right Lines that touch one another, and are •not in the fame Superficies: Or, a folid Angle is that which is contained under more than two plane Angles which are not in the fame Superficies, but being all at one Point.