| Horatio Nelson Robinson - 1860 - 468 lapas
...equilateral and mutually equiangular. Spherical triangles on the same sphere, or on equal spheres, in which~ the sides and angles of the one are equal to the sides and angles of the other, each to each, but are not themselves capable of superposition, am called... | |
| Horatio Nelson Robinson - 1880 - 228 lapas
...equilateral and mutually equiangular. Spherical triangles on the same sphere, or on equal spheres, in which the sides and angles of the one are equal to the sides and ingles of the other eacn to each, but are not themselves capable of superposition, a\ called... | |
| 1920 - 932 lapas
...and parallel with В the lines А В and OD, divides the square into two equal rectangles, because the sides and angles of the one are equal to the corresponding sides and angles of the other. The one rectangle is called the north half of the square, because the northern boundary of the half... | |
| Edward Vermilye Huntington, Louis Albert Fischer - 1916 - 196 lapas
...supplement of the corresponding side in the other. In two symmetrical triangles, the sides and angles of one are equal to the corresponding sides and angles of the other, but arranged in the reverse order (like right-handed and left-handed gloves) . GEOMETRICAL CONSTRUCTIONS... | |
| Lionel Simeon Marks - 1916 - 1922 lapas
...supplement of the corresponding side in the other. In two symmetrical triangles, the sides and angles of one are equal to the corresponding sides and angles of the other, but arranged in the reverse order (like right-handed and left-handed gloves). GEOMETRICAL CONSTRUCTIONS... | |
| Edward Vermilye Huntington - 1918 - 226 lapas
...supplement of the corresponding side in the other. In two symmetrical triangles, the sides and angles of one are equal to the corresponding sides and angles of the other, but arranged in the reverse order (like right-handed and left-handed cloves). GEOMETR1CAL CONSTRUCT1ONS... | |
| Henry Parker Manning - 1921 - 320 lapas
...fourth-dimensional object were cut crosswise its section would be a cube; that is, a four-dimensional object BC Fig. 2. Fig. 3. is bounded on all sides by solids....fit exactly together. But, mind, we could not do it otherFig 5 wise than by lifting. Hence, these two triangles could never be fitted together by the mathematicians... | |
| 1924 - 738 lapas
...supplement of the corresponding side in the other. In two symmetrical triangles, the sides and angles oí one are equal to the corresponding sides and angles of the other, but arranged in the reverse order (like right-handed and left-handed glovea) . GEOMETRICAL CONSTRUCTIONS... | |
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