The Elements of Euclid, Viz: The Errors, by which Theon, Or Others, Have Long Ago Vitiated These Books, are Corrected; and Some of Euclid's Demonstrations are Restored. Also the Book of Euclid's Data, in Like Manner Corrected. the first six books, together with the eleventh and twelfthJ. Nourse, London, and J. Balfour, Edinburgh, 1775 - 520 sider |
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Resultat 1-5 av 49
Side 313
... given in that book , as in this : But indeed there is " scarce any need of ... species of compound ratio . But Theon has made it the 5th def . of B. 6 ... given , but they retain also Theon's , which they ought to have left out ...
... given in that book , as in this : But indeed there is " scarce any need of ... species of compound ratio . But Theon has made it the 5th def . of B. 6 ... given , but they retain also Theon's , which they ought to have left out ...
Side 367
... species , which have cach of their angles given , and the ratios of their fides given . IV . Points , lines , and spaces , are faid to be given in position , which have always the same situation , and which are either actually exhibited ...
... species , which have cach of their angles given , and the ratios of their fides given . IV . Points , lines , and spaces , are faid to be given in position , which have always the same situation , and which are either actually exhibited ...
Side 396
... given c : But as LM to MN , so is GH to HK ; wherefore the ratio of GH to HK is given . 39 . PROP . XLII . Sce N. IF each of the fides of a triangle be given in magni- tude ; the triangle is given in species . Let each of the fides of ...
... given c : But as LM to MN , so is GH to HK ; wherefore the ratio of GH to HK is given . 39 . PROP . XLII . Sce N. IF each of the fides of a triangle be given in magni- tude ; the triangle is given in species . Let each of the fides of ...
Side 397
... given : And the points D , E are given ; therefore each of the straight lines DE , EF , FD is given e in magnitude ; wherefore the triangle c 29. dat . DEF is given in species d ; and it is fimilare to the triangled 42. dat . ABC ...
... given : And the points D , E are given ; therefore each of the straight lines DE , EF , FD is given e in magnitude ; wherefore the triangle c 29. dat . DEF is given in species d ; and it is fimilare to the triangled 42. dat . ABC ...
Side 398
... given in species . Let the fides of the triangle ABC have given ratios to one an- other , the triangle ABC is given in species . Take a straight line D given in magnitude ; and because the ratio of AB to BC is given , make the ratio ...
... given in species . Let the fides of the triangle ABC have given ratios to one an- other , the triangle ABC is given in species . Take a straight line D given in magnitude ; and because the ratio of AB to BC is given , make the ratio ...
Andre utgaver - Vis alle
The Elements of Euclid: The Errors, by which Theon, Or Others, Have Long Ago ... Robert Simson Uten tilgangsbegrensning - 1762 |
The Elements of Euclid: The Errors by which Theon, Or Others, Have Long ... Robert Simson Uten tilgangsbegrensning - 1827 |
The Elements of Euclid: The Errors, by which Theon, Or Others, Have Long Ago ... Robert Simson Uten tilgangsbegrensning - 1781 |
Vanlige uttrykk og setninger
alfo alſo angle ABC angle BAC bafe baſe BC is equal BC is given becauſe the angle becauſe the ratio biſected Book XI cafe cauſe circle ABCD circumference cone confequently conſtruction cylinder demonſtration deſcribed diameter drawn EFGH equal angles equiangular equimultiples Euclid exceſs fame multiple fame ratio fame reaſon fides fides BA fimilar firſt folid angle fore given angle given in magnitude given in poſition given in ſpecies given magnitude given ratio given ſtraight line gnomon greater join leſs line BC oppoſite parallel parallelepipeds parallelogram paſs perpendicular priſm proportionals propoſition pyramid Q. E. D. PROP rectangle contained rectilineal figure right angles ſame ſecond ſegment ſhall ſhewn ſide ſolid ſpace ſphere ſquare of AC THEOR theſe thoſe triangle ABC vertex wherefore
Populære avsnitt
Side 32 - If two triangles have two angles of the one equal to two angles of the other, each to each, and one side equal to one side, viz. either the sides adjacent to the equal...
Side 165 - D ; wherefore the remaining angle at C is equal to the remaining angle at F ; Therefore the triangle ABC is equiangular to the triangle DEF.
Side 170 - 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 10 - When several angles are at one point B, any ' one of them is expressed by three letters, of which ' the letter that is at the vertex of the angle, that is, at ' the point in which the straight lines that contain the ' angle meet one another, is put between the other two ' letters, and one of these two is...
Side 55 - If a straight line be divided into two equal parts, and also into two unequal parts; the rectangle contained by the unequal parts, together with the square of the line between the points of section, is equal to the square of half the line.
Side 32 - ... then shall the other sides be equal, each to each; and also the third angle of the one to the third angle of the other. Let ABC, DEF be two triangles which have the angles ABC, BCA equal to the angles DEF, EFD, viz.
Side 45 - To describe a parallelogram that shall be equal to a given triangle, and have one of its angles equal to a given rectilineal angle.
Side 211 - AB shall be at right angles to the plane CK. Let any plane DE pass through AB, and let CE be the common section of the planes DE, CK ; take any point F in CE, from which draw FG in the plane DE at right D angles to CE ; and because AB is , perpendicular to the plane CK, therefore it is also perpendicular to every straight line in that plane meeting it (3.
Side 38 - F, which is the common vertex of the triangles ; that is, together with four right angles. Therefore all the angles of the figure, together with four right angles, are equal to twice as many right angles as the figure has sides.
Side 304 - Thus, if B be the extremity of the line AB, or the common extremity of the two lines AB, KB, this extremity is called a point, and has no length : For if it have any, this length must either be part of the length of the line AB, or of the line KB.