8460 



Integral Calculus. Volumes 



8460 



calculation for solids derived from ellipsoid. 



Dienger, J. Grunert Arch. 12 (1849) 81-. 

 of revolution. Collignon, E. As. Fr. 



C. E. 10 (1881) 196-. 

 wave surface. Roberts, W. (vm) A. Mt. 



4 (1861) 345-; (v) C. B. 55 (1862) 503. 

 and centroid of class of solids, formula for. 



Lobatto, R. (vm) Amst. N. Ws. Ntk. Vh. 

 2 (1854) 121-. 



of class of solids. Grunert, J. A. Grunert 

 Arch. 31 (1858) 481-. 



conical and cylindrical ungulse. Timmer- 

 mans, J. A. Quetelet Cor. Mth. 2 (1826) 

 149-. 



heaps of ore. Heyse, G. Karsten Arch. 



5 (1832) 511-. 



wedge. Hube, K. (vi Adds.) Krk. 



Boczn. Uniwers. 8 (1823) 115-. 



cylinder cut by plane oblique to base. 

 Eilles, J. Arch. Mth. Ps. 42 (1864) 

 186-. 



(Eilles). Lobatto, R. 



Arch. Mth. Ps. 43 (1865) 235-. 

 determination by help of centroid. Blazek, G. 



Wien SB. 46 (Ab. 2) (1863) 342-. 

 , in Loba6evskij's geometry. Simon, M. 



Mth. A. 42 (1893) 471-. 

 of ellipsoid, geometrical determination. Ma- 



thiot, 0. L. Des Moines Anal. 8 (1881) 



124-. 

 equal, division of ellipsoid into. Weddle, T. 



Mathematician 2 (1847) 302-. 

 generated by closed contour in any motion. 



Koenigs, G. Liouv. J. Mth. 5 (1889) 321-. 



turning about all straight lines 



of space, distribution. Koenigs, G. C. B. 

 106 (1888) 927-. 



contour rigidly connected with trihedron 



of curve. Koenigs, G. C. B. 107 (1888) 

 474-. 



revolving arc of circle. Noel, J. N. 

 Quetelet Cor. Mth. 6 (1830) 61-. 



Guldin's rule. Grunert, J. A. Grunert Arch. 

 32 (1859) 348-. 



, extension. Richter, P. B. Z. Mth. 

 Ps. 37 (1892) 172-. 



theorem. Bordoni, A. [1826] Mod. Mm. 

 S. It. 20 (1828) 86-. 



, extensions. Jung, G. Bm. B. Ac. 

 Line. T. 7 (1883) 97-. 



, generalisation. Fabry, . [1887-90] 



Mntp. Ac. Mm. 11 (1892) 257-. 

 , . Kuscow, . N. A. Mth. 17 (1898) 



209-. 

 integrals, classification. Geometrical definition 



of surfaces capable of cubature. Marie, M. 



C. B. 80 (1875) 757-. 

 of loci of connected points. Elliott, E. B. 



[1882] L. Mth. S. P. 14 (1883) 62-. 



paraboloid, geometrical determination. 

 Mathiot, 0. L. Des Moines Anal. 10 (1883) 

 46. 



of revolution, extension of theorem of 

 Archimedes to. Haedicke, H. Dingier 237 

 (1880) 165, 328. 



pedal surfaces. Hirst, T. A. C. B. 55 

 (1862) 572- ; Phil. Trans. (1863) 13-. 



of portion of elliptic cone cut off by two planes. 



Unferdinger, F. Arch. Mth. Ps. 41 (1864) 



178-. 

 right circular cone between a circular 



and a hyperbolic segment. Zambelli, A. 



Yen. Aten. At. 12 (1875) 267-. 



prismatoid, formula. Becker, J. C. [1877] 

 Z. Mth. Ps. 23 (1878) 412-. 



between ruled surface and two parallel planes. 



Terrier, L. [1874] Neuch. S. Sc. Bll. 10 



(1876) (App.) 6-. 

 of ruled surfaces. Haillecourt, A. Bordeaux 



Ac. Act. 39-40 (1877-78) 155-. 



segment of surface, 2nd degree, bounded by 

 parallel planes. Booth, J. Ph. Mg. 20 

 (1842) 472-. 



segments, and frusta of quadrics. Un- 

 ferdinger, F. [1869] Wien Sb. 60 (1870) 

 (Ab. 2) 631-. 



ship-shaped bodies. Grunert, J. A. Grunert 

 Arch. 13 (1849) 443-. 



skew surface. Boulanger, A. N. A. Mth. 

 16 (1897) 171-. 



solid bounded by hyperbolic paraboloid. 

 Kawalki, W. [1899] Hamb. Mth. Gs. Mt. 



3 (1900) 400-. 



, formula of " three levels" for. Goulard, 

 . Mathesis 17 (1897) 105-. 



generated by motion of plane in space. 



Christiansen, C. (xn) Ts. Mth. 1 (1865) 

 163 -. 



solids of revolution. Sinram, T. Hamb. 

 Mth. Gs. Mt. 1 (1889) 20-. 



, J. Wilson's method. Clark, T. Glasg. 



Ph. S. P. 2 (1844-48) 161-. 



spherical segment. Les Enfants, J. Les 

 Mondes 3 (1882) 173-. 



surface, 4th degree, pedal of hyperboloid. 

 Tortolini, B. [1847] Mod. S. It. Mm. 24 

 (1848) 378-. 



of revolution given in polar coordinates. 



Boije af Gennas, . Ts. Mt. Fys. 3 (1870) 

 193-. 



surfaces and lengths of arcs of figures 

 described by straight line. Schumann, A. 

 Z. Mth. Ps. 25 (1880) 87-. 



of revolution generated by conies, and 

 areas of conies. Gaboardi, S. Brugnatelli 

 G. 10 (1827) 266-. 



, sections of which parallel to plane 

 are quadratic functions of distance. Wein- 

 meister, . Arch. Mth. Ps. 17 (1900) 

 190-. 



and surfaces of 2 solids of revolution. Dostor, 

 G. Arch. Mth. Ps. 68 (1882) 421-. 



of truncated cone by indeterminate coefficients. 

 Ivon, L. N. A. Mth. 2 (1843) 23-. 



ungulse. Lehrnus, (Dr) . (vin) Z. Bauw. 



4 (1854) 573-. 



various bodies. Stamkart, F. J. (vm) 

 Amst. N. Ws. Ntk. Vh. 2 (1854) 187-. 



zones of equal height of solids of revolution, 

 formulas. Winkhaus, W. Crelle J. 44 (1852) 

 375. 



630 



