Svg Elements Parsing
Project description
svgelements
Parsing for SVG Files, Path, Matrix, Angle, Length, Color, Point and other SVG and CSS Elements. The SVG spec defines a variety of elements which generally interoperate. In order to have a robust experience with SVGs we must be able to correctly deal with the parsing and interactions of these elements.
This project began as part of meerK40t
which does SVG loading of files for laser cutting. It attempts to more fully map out the SVG specification, objects, and paths, while remaining easy to use and largely backwards compatible.
License
This module is under a MIT License.
Installing
pip install svgelements
Then in a script:
from svgelements import *
Requirements
None.
However, some common additions do modify the functionality slightly. If scipy
is installed then the arc length code quickly provide the exact correct answer. Some of the SVGImage code is able to load the images if given access to PIL/Pillow.
Compatibility
svgelements
is compatible with Python 3+. Support for 2.7 was dropped at Python 2 End-Of-Life January 1, 2020.
We remain nominally backwards compatible with svg.path
, passing the same robust tests from that project. There may be number of breaking changes. However, since svgelements
permit a lot of leeway in what is accepted and how it's accepted it will have a huge degree of compatibility with projects seen and unseen.
Philosophy
The goal of this project is to provide SVG spec-like elements and structures. The SVG standard 1.1 and elements of 2.0 will be used to provide much of the decisions making for implementation objects. If there is a question on implementation and the SVG documentation has a methodology, that is the preferred methodology.
The primary goal of this project is to make a more robust version of svg.path
including other elements like Point
and Matrix
with clear emphasis on conforming to the SVG spec in all ways that realworld uses for SVG demands.
svgelements
should conform to the SVG Conforming Interpreter class (2.5.4. Conforming SVG Interpreters):
An SVG interpreter is a program which can parse and process SVG document fragments. Examples of SVG interpreters are server-side transcoding tools or optimizer (e.g., a tool which converts SVG content into modified SVG content) or analysis tools (e.g., a tool which extracts the text content from SVG content, or a validity checker).
Real world functionality demands we must correctly and reasonably provide reading, transcoding, and manipulation of SVG content.
Overview
The versatility of the project is provided through through expansive and highly intuitive dunder methods, and robust parsing of object parameters. Points, PathSegments, Paths, Shapes, Subpaths can be multiplied by a matrix. We can add Shapes, Paths, PathSegments, and Subpaths together. And many non-declared but functionally understandable elements are automatically parsed. Such as adding strings of path_d characters to a Path or multiplying an element by the SVG Transform string elements.
While many objects perform a lot of interoperations, a lot many svg elements are designed to also work independently.
Point
Points define a single location in 2D space. The Point class is intended to take a wide variety of different initial definitions to wrap them into being a point.
- Point(x,y)
- (x,y)
- [x,y]
- "x, y"
- x + yj (complex number)
- a class with .x and .y as methods.
Most objects requiring a point will wrap that object with the included Point class meaning any of these initial arguments is acceptable. Including independent x and y parameters, a tuple of x and y, a list of x and y, a string that parses akin to points within polyline
objects, complex numbers with a real x and imag y values. And any class with .x
or .y
attributes.
>>> Point(10,10) * "rotate(90)"
Point(-10,10)
Matrix
Matrices define affine transformations of 2d space and objects.
- Matrix.scale(s)
- Matrix.scale(sx,sy)
- Matrix.scale(sx,sy,px,py)
- Matrix.rotate(angle)
- Matrix.rotate(angle, px, py
- Matrix.skew_x(angle)
- Matrix.skew_x(angle, px, py)
- Matrix.skew_y(angle)
- Matrix.skew_y(angle, px, py)
- Matrix.translate(tx)
- Matrix.translate(tx, ty)
- Transform string values.
- "scale(s)"
- "scale(sx,sy)"
- "translate(20,20) scale(2)"
- "rotate(0.25 turns)"
- Any valid SVG or CSS transform string will be accepted as a matrix.
>>> Matrix("rotate(100grad)")
Matrix(0, 1, -1, 0, 0, 0)
The matrix class also supports Length translates for x, and y. In some instances CSS transforms permit length transforms so "translate(20cm, 200mm)" are valid tranformations. However, these will cause issues for objects which require non-native units so it is expected that .render() will be called on these before they are used in some manner.
Path
Paths define sequences of PathSegments that can map out any path element in SVG.
- Path() object
- String path_d value.
>>> Path() + "M0,0z"
Path(Move(end=Point(0,0)), Close(start=Point(0,0), end=Point(0,0)))
Angle
Angles define various changes in direction.
- Angle.degrees(degree_angle)
- Angle.radians(radians_angle)
- Angle.turns(turns)
- Angle.gradians(gradian_angles)
- CSS angle string.
- "20deg"
- "0.3turns"
- "1rad"
- "100grad"
>>> Point(0,100) * "rotate(1turn)"
Point(0,100)
>>> Point(0,100) * "rotate(0.5turn)"
Point(-0,-100)
Color
Colors define object color.
- XHTML color names: "red", "blue", "dark grey", etc.
- 3 digit hex: "#F00"
- 4 digit hex: "#FF00"
- 6 digit hex: "#FF0000"
- 8 digit hex: "#FFFF0000"
- "RGB(r,g,b)"
- "RGB(r%, g%, b%)"
>>> Circle(stroke="yellow")
Circle(center=Point(0,0), r=1, stroke="#ffff00")
Length
Lengths define the amount of linear space between two things.
- "20cm"
- "200mm"
- "3in"
- Length('200mm')
Examples
Parse an SVG file:
>>> svg = SVG(file)
>>> list(svgelements())
Make a PathSegment
>>> Line((20,20), (40,40))
Line(start=Point(20,20), end=Point(40,40))
Rotate a PathSegment:
>>> Line((20,20), (40,40)) * Matrix.rotate(Angle.degrees(45))
Line(start=Point(0,28.284271247462), end=Point(0,56.568542494924))
Rotate a PathSegment with a parsed matrix:
>>> Line((20,20), (40,40)) * Matrix("Rotate(45)")
Line(start=Point(0,28.284271247462), end=Point(0,56.568542494924))
Rotate a PathSegment with an implied parsed matrix:
>>> Line((20,20), (40,40)) * "Rotate(45)"
Line(start=Point(0,28.284271247462), end=Point(0,56.568542494924))
Rotate a Partial Path with an implied matrix: (Note: The SVG does not allow us to specify a start point for this invalid path)
>>> Path("L 40,40") * "Rotate(45)"
Path(Line(end=Point(40,40)), transform=Matrix(0.707106781187, 0.707106781187, -0.707106781187, 0.707106781187, 0, 0), stroke='None', fill='None')
>>> abs(Path("L 40,40") * "Rotate(45)")
Path(Line(end=Point(0,56.568542494924)), stroke='None', fill='None')
Since Move() is a qualified element we can postpend the SVG text:
>>> (Move((20,20)) + "L 40,40")
Path(Move(end=Point(20,20)), Line(start=Point(20,20), end=Point(40,40)), stroke='None', fill='None')
Define the entire qualified path:
>>> Path("M 20,20 L 40,40")"
Path(Move(end=Point(20,20)), Line(start=Point(20,20), end=Point(40,40)))
Combine individual PathSegments together:
>>> Move((2,2)) + Close()
Path(Move(end=Point(2,2)), Close())
Print that as SVG path_d object:
>>> print(Move((2,2)) + Close())
M 2,2 Z
Scale a path:
>>> Path("M1,1 1,2 2,2 2,1z") * "scale(2)"
Path(Move(end=Point(1,1)), Line(start=Point(1,1), end=Point(1,2)), Line(start=Point(1,2), end=Point(2,2)), Line(start=Point(2,2), end=Point(2,1)), Close(start=Point(2,1), end=Point(1,1)), transform=Matrix(2, 0, 0, 2, 0, 0), stroke='None', fill='None')
Print that:
>>> print(Path("M1,1 1,2 2,2 2,1z") * "scale(2)")
M 2,2 L 2,4 L 4,4 L 4,2 Z
Reverse a scaled path:
>>> p = (Path("M1,1 1,2 2,2 2,1z") * "scale(2)")
>>> p.reverse()
Path(Move(end=Point(2,1)), Line(start=Point(2,1), end=Point(2,2)), Line(start=Point(2,2), end=Point(1,2)), Line(start=Point(1,2), end=Point(1,1)), Close(start=Point(1,1), end=Point(2,1)), transform=Matrix(2, 0, 0, 2, 0, 0), stroke='None', fill='None')
>>> print(p)
M 4,2 L 4,4 L 2,4 L 2,2 Z
Query length of paths:
>>> QuadraticBezier("0,0", "50,50", "100,0").length()
114.7793574696319
Apply a translations:
>>> Path('M 0,0 Q 50,50 100,0') * "translate(40,40)"
Path(Move(end=Point(0,0)), QuadraticBezier(start=Point(0,0), control=Point(50,50), end=Point(100,0)), transform=Matrix(1, 0, 0, 1, 40, 40), stroke='None', fill='None')
>>> abs(Path('M 0,0 Q 50,50 100,0') * "translate(40,40)")
Path(Move(end=Point(40,40)), QuadraticBezier(start=Point(40,40), control=Point(90,90), end=Point(140,40)), stroke='None', fill='None')
Query lengths of translated paths:
>>> (Path('M 0,0 Q 50,50 100,0') * "translate(40,40)").length()
114.7793574696319
>>> Path('M 0,0 Q 50,50 100,0').length()
114.7793574696319
Query a subpath:
>>> Path('M 0,0 Q 50,50 100,0 M 20,20 v 20 h 20 v-20 h-20 z').subpath(1).d()
'M 20,20 L 20,40 L 40,40 L 40,20 L 20,20 Z'
Reverse a subpath:
>>> p = Path('M 0,0 Q 50,50 100,0 M 20,20 v 20 h 20 v-20 h-20 z')
>>> print(p)
M 0,0 Q 50,50 100,0 M 20,20 L 20,40 L 40,40 L 40,20 L 20,20 Z
>>> p.subpath(1).reverse()
Path(Move(start=Point(100,0), end=Point(20,20)), Line(start=Point(20,20), end=Point(40,20)), Line(start=Point(40,20), end=Point(40,40)), Line(start=Point(40,40), end=Point(20,40)), Line(start=Point(20,40), end=Point(20,20)), Close(start=Point(20,20), end=Point(20,20)))
>>> print(p)
M 0,0 Q 50,50 100,0 M 20,20 L 40,20 L 40,40 L 20,40 L 20,20 Z
Query a bounding box:
>>> QuadraticBezier("0,0", "50,50", "100,0").bbox()
(0.0, 0.0, 100.0, 50.0)
Query a translated bounding box:
>>> (Path('M 0,0 Q 50,50 100,0') * "translate(40,40)").bbox()
(40.0, 40.0, 140.0, 90.0)
Query a translated path's untranslated bounding box.
>>> (Path('M 0,0 Q 50,50 100,0') * "translate(40,40)").bbox(transformed=False)
(0.0, 0.0, 100.0, 50.0)
Add a path and shape:
>>> print(Path("M10,10z") + Circle("12,12", 2))
M 10,10 Z M 14,12 A 2,2 0 0,1 12,14 A 2,2 0 0,1 10,12 A 2,2 0 0,1 12,10 A 2,2 0 0,1 14,12 Z
Add two shapes, and query their bounding boxes:
>>> (Circle() + Rect()).bbox()
(-1.0, -1.0, 1.0, 1.0)
Add two shapes and query their length:
>>> (Circle() + Rect()).length()
10.283185307179586
>>> tau + 4
10.283185307179586
Etc.
Elements
The elements are the core functionality of this class. These are svg-based objects which interact in coherent ways.
Path
The Path element is based on regebro's code and methods from the svg.path
project. The primary methodology is to use different PathSegment classes for each segment within a pathd code. These should always have a high degree of backwards compatibility. And for most purposes importing the relevant classes from svgelements
should be highly compatible with any existing code.
For this reason svgelements
tests include svg.path
tests in this project. And while the Point class accepts and works like a complex
it is not actually a complex. This permits code from other projects to quickly port without requiring an extensive rewrite. But, the custom class allows for improvements like making the Matrix
object easy.
Path(*segments)
Just as with svg.path
the Path
class is a mutable sequence, and it behaves like a list.
You can add to it and replace path segments etc:
>>> path = Path(Line(100+100j,300+100j), Line(100+100j,300+100j))
>>> path.append(QuadraticBezier(300+100j, 200+200j, 200+300j))
>>> print(path)
L 300,100 L 300,100 Q 200,200 200,300
>>> path[1] = Line(200+100j,300+100j)
>>> print(path)
L 300,100 L 300,100 Q 200,200 200,300
>>> del path[1]
>>> print(path)
L 300,100 Q 200,200 200,300
>>> path = Move() + path
>>> print(path)
M 100,100 L 300,100 Q 200,200 200,300
The path object also has a d()
method that will return the
SVG representation of the Path segments:
>>> path.d()
'M 100,100 L 300,100 Q
200,200 200,300'
The d() parameter also takes a value for relative:
>>> path.d(relative=True)
'm 100,100 l 200,0 q -100,100 -100,200'
More modern and preferred methods are to simply use path_d strings where needed.
>>> print(Path("M0,0v1h1v-1z"))
M 0,0 L 0,1 L 1,1 L 1,0 Z
And to use scaling factors as needed.
>>> (Path("M0,0v1h1v-1z") * "scale(20)").bbox()
(0.0, 0.0, 20.0, 20.0)
A Path
object that is a collection of the PathSegment objects. These can be defined by combining a PathSegment with another PathSegment initializing it with Path()
or Path(*segments)
or Path(<svg_text>)
.
Subpaths
Subpaths provide a window into a Path object. These are backed by the Path they are created from and consequently operations performed on them apply to that part of the path.
>>> p = Path('M 0,0 Q 50,50 100,0 M 20,20 v 20 h 20 v-20 h-20 z')
>>> print(p)
M 0,0 Q 50,50 100,0 M 20,20 L 20,40 L 40,40 L 40,20 L 20,20 Z
>>> q = p.subpath(1)
>>> q *= "scale(2)"
>>> print(p)
M 0,0 Q 50,50 100,0 M 40,40 L 40,80 L 80,80 L 80,40 L 40,40 Z
or likewise .reverse()
(notice the path will go 80,40 first rather than 40,80.)
>>> q.reverse()
>>> print(p)
M 0,0 Q 50,50 100,0 M 40,40 L 80,40 L 80,80 L 40,80 L 40,40 Z
Segments
There are 6 PathSegment objects:
Line
, Arc
, CubicBezier
, QuadraticBezier
, Move
and Close
. These have a 1:1 correspondence to the commands in a pathd
.
>>> from svgelements import Path, Line, Arc, CubicBezier, QuadraticBezier, Close
All of these objects have a .point()
function which will return the
coordinates of a point on the path, where the point is given as a floating
point value where 0.0
is the start of the path and 1.0
is end.
You can calculate the length of a Path or its segments with the .length()
function. For CubicBezier and Arc segments this is done by geometric approximation and for this reason may be very slow. You can make it faster by passing in an error
option to the method. If you don't pass in error, it defaults to 1e-12
. While the project has no dependencies, if you have scipy
installed the Arc.length() function will use to the hypergeometric exact formula contained and will quickly return with the exact answer.
>>> CubicBezier(300+100j, 100+100j, 200+200j, 200+300j).length(error=1e-5)
297.2208145656899
CubicBezier and Arc also has a min_depth
option that specifies the
minimum recursion depth. This is set to 5 by default, resulting in using a
minimum of 32 segments for the calculation. Setting it to 0 is a bad idea for
CubicBeziers, as they may become approximated to a straight line.
Line.length()
and QuadraticBezier.length()
also takes these
parameters, but they unneeded as direct values rather than approximations are returned.
CubicBezier and QuadraticBezier also have is_smooth_from(previous)
methods, that checks if the segment is a "smooth" segment compared to the
given segment.
Unlike svg.path
the preferred method of getting a Path from a pathd
string is
as an argument:
>>> from svgelements import Path
>>> Path('M 100 100 L 300 100')
Path(Move(end=Point(100,100)), Line(start=Point(100,100), end=Point(300,100)))
PathSegment Classes
These are the SVG PathSegment classes. See the SVG specifications <http://www.w3.org/TR/SVG/paths.html>
_ for more information on what each
parameter means.
-
Move(start, end)
The move object describes a move to the start of the next subpath. It may lack a start position but not en end position. -
Close(start, end)
The close object describes a close path element. It will have a length if and only if the end point is not equal to the subpath start point. Neither the start point or end point is required. -
Line(start, end)
The line object describes a line moving straight from one point to the next point. -
Arc(start, radius, rotation, arc, sweep, end)
The arc object describes an arc across a circular path. This supports multiple types of parameterizations. The given default there is compatible withsvg.path
and has a complex radius. It is also valid to divide radius intorx
andry
or Arc(start, end, center, prx, pry, sweep) where start, end, center, prx, pry are points and sweep is the radians value of the arc distance traveled. -
QuadraticBezier(start, control, end)
the quadratic bezier object describes a single control point bezier curve. -
CubicBezier(start, control1, control2, end)
the cubic bezier curve object describes a two control point bezier curve.
Examples
This SVG path example draws a triangle:
>>> path1 = Path('M 100 100 L 300 100 L 200 300 z')
You can format SVG paths in many different ways, all valid paths should be accepted::
>>> path2 = Path('M100,100L300,100L200,300z')
And these paths should be equal:
>>> path1 == path2
True
You can also build a path from objects:
>>> path3 = Path(Move(100 + 100j), Line(100 + 100j, 300 + 100j), Line(300 + 100j, 200 + 300j), Close(200 + 300j, 100 + 100j))
And it should again be equal to the first path::
>>> path1 == path3
True
Paths are mutable sequences, you can slice and append::
>>> path1.append(QuadraticBezier(300+100j, 200+200j, 200+300j))
>>> len(path1[2:]) == 3
True
Note that there is no protection against you creating paths that are invalid. You can for example have a Close command that doesn't end at the path start:
>>> wrong = Path(Line(100+100j,200+100j), Close(200+300j, 0))
>>> wrong.d()
'L 200,100 Z'
Matrix (Transformations)
SVG 1.1, 7.15.3 defines the matrix form as:
[a c e]
[b d f]
Since we are delegating to SVG spec for such things, this is how it is implemented in elements.
To be compatible with SVG 1.1 and SVG 2.0 the matrix class provided has all the SVG functions as well as the CSS functions:
- translate(x,[y])
- translateX(x)
- translateY(y)
- scale(x,[y])
- scaleX(x)
- scaleY(y)
- skew(x,[y])
- skewX(x)
- skewY(y)
Since we have compatibility with CSS for the SVG 2.0 spec compatibility we can perform length translations:
>>> Point(0,0) * Matrix("Translate(1cm,1cm)")
Point('1cm','1cm')
Do note, however that this isn't an intended purpose. Points are expected in native units. You should render the Matrix prior to using it. This means you must give it the correct units to translate the information from one form to another.
>>> Point(0,0) * (Matrix("Translate(1cm,1cm)").render(ppi=96.0))
Point(37.795296,37.795296)
We can also rotate by turns
, grad
, deg
, rad
which are permitted CSS angles:
>>> Point(10,0) * Matrix("Rotate(1turn)")
Point(10,-0)
>>> Point(10,0) * Matrix("Rotate(400grad)")
Point(10,-0)
>>> Point(10,0) * Matrix("Rotate(360deg)")
Point(10,-0)
A large goal of this project is to provide a more robust modifications of Path objects including matrix transformations. This is done by three major shifts from svg.path
s methods.
- Points are not stored as complex numbers. These are stored as Point objects, which have backwards compatibility with complex numbers, without the data actually being backed by a
complex
. - A matrix is added which conforms to the SVGMatrix Element. The matrix contains valid versions of all the affine transformations elements required by the SVG Spec.
- The
Arc
object is fundamentally backed by a different point-based parameterization.
The objects themselves have robust dunder methods. So if you have a path object you may simply multiply it by a matrix.
>>> Path(Line(0+0j, 100+100j)) * Matrix.scale(2)
Path(Line(start=Point(0,0), end=Point(100,100)), transform=Matrix(2, 0, 0, 2, 0, 0), stroke='None', fill='None')
Or rotate a parsed path.
>>> Path("M0,0L100,100") * Matrix.rotate(30)
Path(Move(end=Point(0,0)), Line(start=Point(0,0), end=Point(100,100)), transform=Matrix(0.154251449888, -0.988031624093, 0.988031624093, 0.154251449888, 0, 0))
Or modify an SVG path.
>>> str(Path("M0,0L100,100") * Matrix.rotate(30))
'M 0,0 L 114.228,-83.378'
The Matrix objects can be used to modify points:
>>> Point(100,100) * Matrix("scale(2)")
Point(200,200)
>>> Point(100,100) * (Matrix("scale(2)") * Matrix("Translate(40,40)"))
Point(240,240)
Do note that the order of operations for matrices matters:
>>> Point(100,100) * (Matrix("Translate(40,40)") * Matrix("scale(2)"))
Point(280,280)
The first version is:
>>> (Matrix("scale(2)") * Matrix("Translate(40,40)"))
Matrix(2, 0, 0, 2, 40, 40)
The second is:
>>>> (Matrix("Translate(40,40)") * Matrix("scale(2)"))
Matrix(2, 0, 0, 2, 80, 80)
This is:
>>>> Point(100,100) * Matrix("Matrix(2,0,0,2,80,80)")
Point(280,280)
SVG Transform Parsing
Within the SVG.elements() schema objects SVG elements. The transform
tags within objects are combined together. These are automatically applied if reify=True
is set.
SVG Dictionary Parsing
>>> node = { 'd': "M0,0 100,0, 0,100 z", 'transform': "scale(0.5)"}
>>> print(Path(node['d']) * Matrix(node['transform']))
M 0,0 L 50,0 L 0,50 Z
SVG Viewport Scaling, Unit Scaling
There is need in many applications to append a transformation for the viewbox, height, width. So as to prevent a variety of errors where the expected size is far vastly different from the actual size. If we have a viewbox of "0 0 100 100" but the height and width show that to be 50cm wide, then a path "M25,50L75,50" within that viewbox has a real size of length of 25cm which can be quite different from 50 (unit-less value).
This conversion is done through the Viewbox
object. This operation is automatically done for SVG.elements() objects.
Viewbox objects have a call to .transform()
which will provide the string for an equivolent transformation for the given viewbox.
The Viewbox.transform()
code conforms to the algorithm given in SVG 1.1 7.2, SVG 2.0 8.2 'equivalent transform of an SVG viewport.' This will also fully implement the preserveAspectRatio
, xMidYMid
, and meetOrSlice
values.
SVG Shapes
Another important SVG elements are the shapes. While all of these can be converted to paths. They can serve some usages in their original form. There are methods to deform a rectangle that simple don't exist in the path form of that object.
- Rect
- Ellipse
- Circle
- Line (SimpleLine)
- Polyline
- Polygon
The Line shape is converted into a shape called SimpleLine to not interfere with the Line(PathSegment).
A Shape is said to be equal to another Shape or a Path if they decompose to same Path.
>>> Circle() == Ellipse()
True
>>> Rect() == Path('m0,0h1v1h-1z')
True
Rect
Rectangles are defined by x, y and height, width. Within SVG there are also rounded corners defined with rx
and ry
.
>>> Rect(10,10,8,4).d()
'M 10,10 L 18,10 L 18,14 L 10,14 Z'
Much like all the paths these shapes also contain a .d()
function that produces the path data for them. This could then be wrapped into a Path().
>>> print(Path(Rect(10,10,8,4).d()) * "rotate(0.5turns)")
M -10,-10 L -18,-10 L -18,-14 L -10,-14 Z
Or simply passed to the Path:
>>> print(Path(Rect(10,10,8,4)) * "rotate(0.5turns)")
M -10,-10 L -18,-10 L -18,-14 L -10,-14 L -10,-10 Z
Or simply multiplied by the matrix itself:
>>> print(Rect(10,10,8,4) * "rotate(0.5turns)")
Rect(x=10, y=10, width=8, height=4, transform=Matrix(-1, 0, -0, -1, 0, 0), stroke='None', fill='None')
And you can equally decompose that Shape:
>>> (Rect(10,10,8,4) * "rotate(0.5turns)").d()
'M -10,-10 L -18,-10 L -18,-14 L -10,-14 L -10,-10 Z'
Matrices can be applied to Rect objects directly.
>>> from svgelements import *
>>> Rect(10,10,8,4) * "rotate(0.5turns)"
Rect(x=10, y=10, width=8, height=4, transform=Matrix(-1, 0, -0, -1, 0, 0), stroke='None', fill='None')
>>> Rect(10,10,8,4) * "rotate(0.25turns)"
Rect(x=10, y=10, width=8, height=4, transform=Matrix(0, 1, -1, 0, 0, 0))
Rotated Rects produce path_d srings.:
>>> Rect(10,10,8,4) * "rotate(14deg)"
Rect(x=10, y=10, width=8, height=4, transform=Matrix(0.970295726276, 0.2419218956, -0.2419218956, 0.970295726276, 0, 0))
>>> (Rect(10,10,8,4) * "rotate(14deg)").d()
'M 7.28373830676,12.1221762188 L 15.046104117,14.0575513836 L 14.0784165346,17.9387342887 L 6.31605072436,16.0033591239 Z'
This also works with rx
and ry
:
(Note: the path will now contain Arcs)
>>> (Rect(10,10,8,4, 2, 1) * "rotate(0.25turns)").d()
'M -10,12 L -10,16 A 2,1 90 0,1 -11,18 L -13,18 A 2,1 90 0,1 -14,16 L -14,12 A 2,1 90 0,1 -13,10 L -11,10 A 2,1 90 0,1 -10,12 Z'
You can also decompose the shapes in relative modes:
>>> (Rect(10,10,8,4, 2, 1) * "rotate(0.25turns)").d(relative=True)
'm -10,12 l 1.77636E-15,4 a 2,1 90 0,1 -1,2 l -2,0 a 2,1 90 0,1 -1,-2 l -1.77636E-15,-4 a 2,1 90 0,1 1,-2 l 2,0 a 2,1 90 0,1 1,2 z'
Ellipse & Circle
Ellipses and Circles are different shapes but since a circle is a particular kind of Ellipse much of the functionality here is duplicated.
While the objects are different they can be checked for equivalency:
>>> Ellipse(center=(0,0), rx=10, ry=10) == Circle(center="0,0", r=10.0)
True
SimpleLine
SimpleLine is renamed from the SVG form of Line
since we already have Line
objects as PathSegment
.
>>> s = SimpleLine(0,0,200,200)
>>> s
SimpleLine(x1=0.0, y1=0.0, x2=200.0, y2=200.0)
>>> s *= "rotate(45)"
>>> s
SimpleLine(x1=0.0, y1=0.0, x2=200.0, y2=200.0, transform=Matrix(0.707106781187, 0.707106781187, -0.707106781187, 0.707106781187, 0, 0))
>>> abs(s)
SimpleLine(x1=0.0, y1=0.0, x2=2.842170943040401e-14, y2=282.842712474619, stroke='None', fill='None')
>>> s.d()
'M 0,0 L 2.84217094304E-14,282.842712475
Polyline and Polygon
The difference here is polylines are not closed while Polygons are closed.
>>> p = Polygon(0,0, 100,0, 100,100, 0,100)
>>> p *= "scale(2)"
>>> p.d()
'M 0,0, L 200,0, L 200,200, L 0,200 Z'
and the same for Polyline:
>>> p = Polyline(0,0, 100,0, 100,100, 0,100)
>>> p *= "scale(2)"
>>> p.d()
'M 0,0, L 200,0, L 200,200, L 0,200'
You can just append a "z" to the polyline path though.
>>> Path(Polyline((20,0), (10,10), 0)) + "z" == Polygon("20,0 10,10 0,0")
True
CSS Length
The conversion of lengths to utilizes another element Length
It provides conversions for mm
, cm
, in
, px
, pt
, pc
, %
. You can also parse an element like the string '25mm' calling Length('25mm').value(ppi=96) and get the expected results. You can also call Length('25mm').in_inches()
which will return 25mm in inches.
>>> Length('25mm').in_inches()
0.9842525
Color
Color is another important element it contains an 'int' as 'value' in the form of an ARGB 32-bit integer. It will parse all the SVG color functions.
If we get the fill or stroke of an object from a node be a text element. This needs to be converted to a consistent form. We could have a 3, 4, 6, or 8 digit hex. rgb(r,g,b) value, a static dictionary name or percent rgb(r,g,b). And must be properly parsed according to the spec.
>>> Color("red").hex
'#ff0000'
>>> Color('red').red
255
>>>Color('hsl(120, 100%, 50%)')
Color('#00ff00')
>>> c = Color('hsl(120, 100%, 50%)')
>>> c.blue = 50
>>> c
Color('#00ff32')
In addition you can set various properties of a particular color. Check distances to other colors.
>>> Color.distance('red', 'lightred')
25.179356624028344
>>> Color.distance('red', 'blue')
403.97524676643246
>>> Color('red').distance_to('blue')
403.97524676643246
Angle
Angle is backed by a 'float' and contains all the CSS angle values. 'deg', 'rad', 'grad', 'turn'.
>>> Angle.degrees(360).as_radians
Angle(6.283185307180)
The Angle element is used automatically with the Skew and Rotate for matrix.
>>> Point(100,100) * Matrix("SkewX(0.05turn)")
Point(132.491969623291,100)
Point
Point is used in all the SVG path segment objects. With regard to svg.path
it is not back by, but implements all the same functionality as a complex
and will take a complex as an input. So older svg.path
code will remain valid. While also allowing for additional functionality like finding a distance.
>>> Point(0+100j).distance_to([0,0])
100.0
The class supports complex
subscribable elements, .x
and .y
methods, and .imag
and .real
. As well as providing several of these indexing methods.
It includes a number of point functions like:
move_towards(point,float)
: Move this point towards the other point. with an amount [0,1]distance_to(point)
: Calculate the Euclidean distance to the other point.angle_to(point)
: Calculate the angle to the given point.polar_to(angle,distance)
: Return a point via polar coords at the angle and distance.reflected_across(point)
: Returns a point reflected across another point. (Smooth bezier curves use this).
This for example takes the 0,0 point turns 1/8th of a turn, and moves forward by 5cm.
>>> Point(0).polar_to(Angle.turns(0.125), Length("5cm").value(ppi=96))
Point(133.626550492764,133.626550492764)
Acknowledgments
The Path element of this project is based in part on the regebro/svg.path
( https://github.com/regebro/svg.path ) project. It is also may be based, in part, on some elements of mathandy/svgpathtools
( https://github.com/mathandy/svgpathtools ).
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