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Encyclopedia Britannica - Main :: SOU-STE |
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SPHERE (Gr. vclsa?pa, a ball or globe) , in geometry, the solid or surface traced out by, the revolution of a semicircle about its diameter ; this is essentially Euclid's definition;' in the modern geometry of surfaces it is defined as the quadric surface passing through the circle at infinity. Every point is equidistant from a fixed point within the surface; this point is the " centre," the constant distance the " radius," and any line through the centre and intersecting the sphere is a " diameter ." All sections of theThe surfaces formed by revolving a circle about any chord also received attention at the hands of the Greeks. According to Heron and Geminus they were discussed under the name spire by Perseus (c. 200100 B.C.), their sections were termed spiral sections, and are probably the same as the hippopede of Eudoxus. The surface and solid traced by the revolution of the lesser segment of a circle is termed a " spindle." An " anchor ring " or " tore " results when a circle revolves about an axis
latitude
standing
cone
spherical sector " and " spherical cone
4ar2. Archimedes gave his results in the treatise IIepl rue sotiaipas Kett roD KvatvIpou: he left unfinished the problem of dividing a sphere into segments whose volumes are in a given ratio. A solution by means of the parabola
In analytical geometry, the equation to the sphere takes the forms x2+y2+z2=a2, and r=a, the first applying to rectangular Cartesian co-ordinates, the second to polar, the origin being in both cases at the centre of the sphere. If the centre be (a, p, y), the Cartesian equation becomes (x a)2 + (y R)2 + (z -7)2 = a2; consequently the general equation is x2+y2 + z2 + 2Ax+ 2By+2Cz+D =0, and it is readily shown that the 'co-ordinates of the centre are (A, B, C), and the radius A2+B2+C2D. A sphere can therefore be described so as to satisfy four given conditions. Systems of spheres have characters analogous to those of systems of circles. If r, ri be the radii of two spheres, d the distance between the centres, and the angle at which they inter-sect, then d2=r2+'rig + 2rri cos (g; hence 2rri cos p=d2 r2 rig. This function
function
axis
The geometry of the sphere was studied by the Greeks; Euclid, in book xii. of his Elements, discusses various properties of the sphere, and in book xiii. he shows how to inscribe the five regular polyhedra within it. But with the sole exception of proving that the volumes of spheres are in the triplicate ratio of their diameters, a theorem probably due to Eudoxus, no mention is made of its mensuration. This subject was investigated by Archimedes, who, by his " method of exhaustions," derived the principal results. He showed that the surface of a segment is equal to the area of the circle whose radius equals the distance from the vertex to the base of the segment; that the surface of the entire sphere is equal tp the curved surface of the circumscribing cylinder, and to four times the area of a great circle of the sphere; and that the volume is two-thirds that of the circumscribing cylinder. To Zenodorus (c. 200100 B.c.) is due the important problem in maxima and minima that for a given surface the sphere is the solid of maximum volume. Calling the radius r, and denoting by it the ratio of the circumference to the diameter of a circle, the volume is 3irr', and the surface cuts the four spheres at right angles; this "orthotomic " sphere corresponds to the orthogonal circle of a system of circles. The investigation of triangles and other figures drawn
celestial
cal). In " geodesy," and the cognate subject " figure of the earth," the matter of greatest moment with regard to the sphere is the determination of the area of triangles drawn
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