D, are the eight corners of the hexahedron which we found by construction (1). A circumscribed hexahedron being thus given, the principal axes of the ellipsoid, and their orientation, are found by the solution of a cubic equation. § 6. Another way of... Proceedings - Pàgina 99per Royal Society of Edinburgh - 1904Visualització completa - Sobre aquest llibre
| Royal Society of Edinburgh - 1904 - 776 pàgines
...six faces at their centres; or (2) draw AK, BK, CK, DK, and produce to equal distances KA', KB', KG', KD' beyond K. We thus find four points, A', B', C',...take us outside the boundary of our * Thomson and Tait's Natural Philosophy, § 156 ; Elements, § 136. t Thus we have an interesting theorem in the... | |
| William Thomson Baron Kelvin - 1910 - 581 pàgines
...distances KA , KB', KG', KD' beyond K. We thus find four points, A, .B', Cf, Df, which, with A,B, G, D, are the eight corners of the hexahedron which we...respects simpler, and which has the advantage that in its * Thomson and Tait's ' Natural Philosophy,' § 155 ; 'Elements,' § 136. t Thus we have an interesting... | |
| William Thomson Baron Kelvin - 1910 - 588 pàgines
...distances KA', KB", KC', KD' beyond K. We thus find four points, A', B', C', D', which, with A,B,C, D, are the eight corners of the hexahedron which we...respects simpler, and which has the advantage that in its * Thomson and Tait'a ' Natural Philosophy,' § 155 ; 'Elements,' § 136. t Thus we have an interesting... | |
| William Thomson Baron Kelvin - 1910 - 588 pàgines
...equal distances KA', KB', KC', KD7 beyond K. We thus find four points, A', B', C', D', which, with A,B, C, D, are the eight corners of the hexahedron which...respects simpler, and which has the advantage that in its * Thomson and Tait's ' Natural Philosophy,' § 155 ; 'Elements,' § 136. t Thus we have an interesting... | |
| 1902 - 734 pàgines
...distances KA', KB', K( ", KD' heyund K. We thus find four points, A', B', (',', I)', which, with A. B, 0, D, are the eight corners of the hexahedron which we...construction it does not take us outside the boundary of our fundamental tetrahedron, is as follows : — In the equilateral tetrahedron AoB0( '0D0 describe, from... | |
| Sir Joseph Larmor - 1929 - 596 pàgines
...distances KA', KB', KC', KD' beyond K. We thus find four points, A', B', C', D', which, with A,B,C, D, are the eight corners of the hexahedron which we...respects simpler, and which has the advantage that in its * Thomson and Tait's ' Natural Philosophy,' § 155 ; ' Elements,' § 136. t Tims we have an interesting... | |
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