118 



CATALOG UK. — MATHEMATICS, GEOMETRV, 



JpoUoiilm on tangencies.by Lawson. 4. R. S. 



Apoltonim de sectione rationis et spatii. 8. 



Burrow's restitution of ApoUonius on incli- 

 nations. 4. R. S. 



Archimedes a Barrow. 4. London, l675. 

 Extr. Ph. tr. 1675. X. 



*Archimedes. f. Oxford. R. I. 



Gregorii geometriae pars universalis. Pavia, 

 16G8. 

 Extr.Ph.tr. lf)68. 111,685. 



P</rJ/cs elemens de geometric. 12. Par. 1671- 



Extr. Ph. tr. 1671. VI. 3064. 



Brackenridge exercitatio geonietrica. 4. 

 Ash's demonstration of some propositions of 



Euclid. Ph. tr. 1684. XIV. 6/2. 

 Simson de Pappi et Euclidis porismatis. Ph. 



tr. 1723. XXXIII. 330. 

 Stewart on a geometrical proposition of Pap- 

 pus. Ed. ess. I. 141. 

 Stetcart Propositiones geomctricae. 8. 

 Simpson's geometry. 8. Lond. 1768. R.I. 

 Emerson's cyclomathesis. II. 

 Bossiit Elemens de geomelrie. 



Ace. A. P. 1775. H.55^ 

 LeIj/veM sur la proportion de la diagonale au 



cote. 8. R. S. 

 Glenie on the division of lines, surfaces, and 



solids. Ph. tr. 1776. 73. 

 Honmf castle's geometry. 8. London. 

 Playfair on porisms. Ed. tr. III. 154. 

 Wallace on porisms. Ed.tr. IV. 107. 

 Hauff on parallel lines. Hind. Arch. III. 74. 



Employs Eucl. X. I. 

 Mascheroni Geemetrie du compas, par Ca- 



rette. Par. 1797. 

 Xacrojo: Elemens de geometric. 8. Par. 1799. 



R.I. 

 Carnot Geometric de position. 4. Par. 1803, 



R.I. 

 Limrick on the 12th axiom of Euclid. As. 



Hes. VII. 449. 



2 



MENSURATION. 



See geometrical instruments. 



•|-Coliins on a chorographical problem. Ph. tr. 

 1671. VI. 2087. 



Chorographic problems. Ph. tr. 1685. XV. 

 1231. 



Perks, Gregory, and Wallis, on squaring por- 

 tions of lunes. Ph. tr. I699. XXI. 411. 



Robarts on the comparative magnitude of 

 points. Ph. tr. 1712. 470. 



Euler on dikes. N. C. Petr. IX. i. 362. 



Stedman on triangles described in circles. 

 Ph. tr. 1775. 296. 



Horsley de polygonis circulo inscriptis. Ph. 

 tr. 1775. 301. 



Hutton's treatise on mensuration. 4. New- 

 castle, 1770. R. I. 



Bonny castle's mensuration^ 12. 



S. E. IX. 80. The square of the area of any plane surface 

 ii equal to the sum of the squares of any three orthogonal 

 plane projections of the surface. 



TniGONOMETRY AND POLYGONOMETEY. 



See Circle. 



Murdoch's trigonometry abridged. Ph. tr. 



1758. 538. 

 Simson's Euclid. 

 Emerson's cyclomathesis. III. 

 Lexell's polygonometrical theorem. Ph. tr. 



1775. 281. 

 Hutton's demonstration of the polygofial 



theorem. Ph. tr. 1776. 200. 

 Hutton's project for a new division of the 



quadrant, in parts of the radius. Ph. tr. 



1784. 21. 

 *Cagnoli Trigonoinelria piana e sferica. 4. 



Par. 1786. R.S. 

 Cagnoli Traite de trigonometric. 4. R. I. 

 Cagnoli's trigonometrical propositions. See. 



Ital. VII. 1. 



