Geometric Types
PostgreSQL 9.6.4 Documentation | |||
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Geometric data types represent two-dimensional spatial objects. Table 8-20 shows the geometric types available in PostgreSQL .
Table 8-20. Geometric Types
Name | Storage Size | Description | Representation |
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point | 16 bytes | Point on a plane | (x,y) |
line | 32 bytes | Infinite line | {A,B,C} |
lseg | 32 bytes | Finite line segment | ((x1,y1),(x2,y2)) |
box | 32 bytes | Rectangular box | ((x1,y1),(x2,y2)) |
path | 16+16n bytes | Closed path (similar to polygon) | ((x1,y1),...) |
path | 16+16n bytes | Open path | [(x1,y1),...] |
polygon | 40+16n bytes | Polygon (similar to closed path) | ((x1,y1),...) |
circle | 24 bytes | Circle | <(x,y),r> (center point and radius) |
A rich set of functions and operators is available to perform various geometric operations such as scaling, translation, rotation, and determining intersections. They are explained in Section 9.11 .
8.8.1. Points
Points are the fundamental two-dimensional building block for geometric types. Values of type point are specified using either of the following syntaxes:
( x , y ) x , y
where x and y are the respective coordinates, as floating-point numbers.
Points are output using the first syntax.
8.8.2. Lines
Lines are represented by the linear equation A x + B y + C = 0, where A and B are not both zero. Values of type line are input and output in the following form:
{ A, B, C }
Alternatively, any of the following forms can be used for input:
[ ( x1 , y1 ) , ( x2 , y2 ) ] ( ( x1 , y1 ) , ( x2 , y2 ) ) ( x1 , y1 ) , ( x2 , y2 ) x1 , y1 , x2 , y2
where ( x1 , y1 ) and ( x2 , y2 ) are two different points on the line.
8.8.3. Line Segments
Line segments are represented by pairs of points that are the endpoints of the segment. Values of type lseg are specified using any of the following syntaxes:
[ ( x1 , y1 ) , ( x2 , y2 ) ] ( ( x1 , y1 ) , ( x2 , y2 ) ) ( x1 , y1 ) , ( x2 , y2 ) x1 , y1 , x2 , y2
where ( x1 , y1 ) and ( x2 , y2 ) are the end points of the line segment.
Line segments are output using the first syntax.
8.8.4. Boxes
Boxes are represented by pairs of points that are opposite corners of the box. Values of type box are specified using any of the following syntaxes:
( ( x1 , y1 ) , ( x2 , y2 ) ) ( x1 , y1 ) , ( x2 , y2 ) x1 , y1 , x2 , y2
where ( x1 , y1 ) and ( x2 , y2 ) are any two opposite corners of the box.
Boxes are output using the second syntax.
Any two opposite corners can be supplied on input, but the values will be reordered as needed to store the upper right and lower left corners, in that order.
8.8.5. Paths
Paths are represented by lists of connected points. Paths can be open , where the first and last points in the list are considered not connected, or closed , where the first and last points are considered connected.
Values of type path are specified using any of the following syntaxes:
[ ( x1 , y1 ) , ... , ( xn , yn ) ] ( ( x1 , y1 ) , ... , ( xn , yn ) ) ( x1 , y1 ) , ... , ( xn , yn ) ( x1 , y1 , ... , xn , yn ) x1 , y1 , ... , xn , yn
where the points are the end points of the line segments comprising the path. Square brackets ( [] ) indicate an open path, while parentheses ( () ) indicate a closed path. When the outermost parentheses are omitted, as in the third through fifth syntaxes, a closed path is assumed.
Paths are output using the first or second syntax, as appropriate.
8.8.6. Polygons
Polygons are represented by lists of points (the vertexes of the polygon). Polygons are very similar to closed paths, but are stored differently and have their own set of support routines.
Values of type polygon are specified using any of the following syntaxes:
( ( x1 , y1 ) , ... , ( xn , yn ) ) ( x1 , y1 ) , ... , ( xn , yn ) ( x1 , y1 , ... , xn , yn ) x1 , y1 , ... , xn , yn
where the points are the end points of the line segments comprising the boundary of the polygon.
Polygons are output using the first syntax.
8.8.7. Circles
Circles are represented by a center point and radius. Values of type circle are specified using any of the following syntaxes:
< ( x , y ) , r > ( ( x , y ) , r ) ( x , y ) , r x , y , r
where ( x , y ) is the center point and r is the radius of the circle.
Circles are output using the first syntax.