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A circle of a sphere is a circle that lies on a sphere. Such a circle can be formed as the intersection of a sphere and a plane, or of two spheres. Circles of a sphere are the spherical geometry analogs of generalised circles in Euclidean space. A circle on a sphere whose plane passes through the center of the sphere is called a '' great circle'', analogous to a Euclidean straight line; otherwise it is a small circle, analogous to a Euclidean circle. Circles of a sphere have radius less than or equal to the sphere radius, with equality when the circle is a great circle. A circle of a sphere can also be characterized as the locus of points on the sphere at uniform distance from a given center point, or as a spherical
curve In mathematics, a curve (also called a curved line in older texts) is an object similar to a line, but that does not have to be straight. Intuitively, a curve may be thought of as the trace left by a moving point. This is the definition that ...
of constant curvature.


On the earth

In the geographic coordinate system on a globe, the parallels of
latitude In geography, latitude is a coordinate that specifies the north– south position of a point on the surface of the Earth or another celestial body. Latitude is given as an angle that ranges from –90° at the south pole to 90° at the north po ...
are small circles, with the
Equator The equator is a circle of latitude, about in circumference, that divides Earth into the Northern and Southern hemispheres. It is an imaginary line located at 0 degrees latitude, halfway between the North and South poles. The term can al ...
the only great circle. By contrast, all meridians of
longitude Longitude (, ) is a geographic coordinate that specifies the east– west position of a point on the surface of the Earth, or another celestial body. It is an angular measurement, usually expressed in degrees and denoted by the Greek let ...
, paired with their opposite meridian in the other hemisphere, form great circles.


Related terminology

The diameter of the sphere which passes through the center of the circle is called its axis and the endpoints of this diameter are called its poles. A circle of a sphere can also be defined as the set of points at a given angular distance from a given pole.


Sphere-plane intersection

When the intersection of a sphere and a plane is not empty or a single point, it is a circle. This can be seen as follows: Let ''S'' be a sphere with center ''O'', ''P'' a plane which intersects ''S''. Draw perpendicular to ''P'' and meeting ''P'' at ''E''. Let ''A'' and ''B'' be any two different points in the intersection. Then ''AOE'' and ''BOE'' are right triangles with a common side, ''OE'', and hypotenuses ''AO'' and ''BO'' equal. Therefore, the remaining sides ''AE'' and ''BE'' are equal. This proves that all points in the intersection are the same distance from the point ''E'' in the plane ''P'', in other words all points in the intersection lie on a circle ''C'' with center ''E''. This proves that the intersection of ''P'' and ''S'' is contained in ''C''. Note that ''OE'' is the axis of the circle. Now consider a point ''D'' of the circle ''C''. Since ''C'' lies in ''P'', so does ''D''. On the other hand, the triangles ''AOE'' and ''DOE'' are right triangles with a common side, ''OE'', and legs ''EA'' and ''ED'' equal. Therefore, the hypotenuses ''AO'' and ''DO'' are equal, and equal to the radius of ''S'', so that ''D'' lies in ''S''. This proves that ''C'' is contained in the intersection of ''P'' and ''S''. As a corollary, on a sphere there is exactly one circle that can be drawn through three given points. The proof can be extended to show that the points on a circle are all a common angular distance from one of its poles.Hobbs, Prop. 310 Compare also
conic section In mathematics, a conic section, quadratic curve or conic is a curve obtained as the intersection of the surface of a cone with a plane. The three types of conic section are the hyperbola, the parabola, and the ellipse; the circle is a ...
s, which can produce ovals.


Sphere-sphere intersection

To show that a non-trivial intersection of two spheres is a circle, assume (without loss of generality) that one sphere (with radius R) is centered at the origin. Points on this sphere satisfy :x^2 + y^2 + z^2 = R^2. Also without loss of generality, assume that the second sphere, with radius r, is centered at a point on the positive x-axis, at distance a from the origin. Its points satisfy :(x-a)^2 + y^2 + z^2 = r^2. The intersection of the spheres is the set of points satisfying both equations. Subtracting the equations gives :\begin (x-a)^2 - x^2 & = r^2 - R^2 \\ a^2 - 2ax & = r^2 - R^2 \\ x & = \frac. \end In the singular case a = 0, the spheres are concentric. There are two possibilities: if R = r, the spheres coincide, and the intersection is the entire sphere; if R \not= r, the spheres are disjoint and the intersection is empty. When ''a'' is nonzero, the intersection lies in a vertical plane with this x-coordinate, which may intersect both of the spheres, be tangent to both spheres, or external to both spheres. The result follows from the previous proof for sphere-plane intersections.


See also

* Line-plane intersection * Line–sphere intersection


References

*


Further reading

*{{cite book , title=Solid Geometry , url=https://archive.org/details/solidgeometry01comsgoog , first1=M., last1=Sykes, first2=C.E., last2=Comstock, publisher=Rand McNally , year=1922, page
81
ff Rotational symmetry Spherical curves Circles