170 lines
4.9 KiB
JavaScript
170 lines
4.9 KiB
JavaScript
// https://d3js.org/d3-path/ v3.1.0 Copyright 2015-2022 Mike Bostock
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(function (global, factory) {
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typeof exports === 'object' && typeof module !== 'undefined' ? factory(exports) :
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typeof define === 'function' && define.amd ? define(['exports'], factory) :
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(global = typeof globalThis !== 'undefined' ? globalThis : global || self, factory(global.d3 = global.d3 || {}));
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})(this, (function (exports) { 'use strict';
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const pi = Math.PI,
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tau = 2 * pi,
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epsilon = 1e-6,
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tauEpsilon = tau - epsilon;
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function append(strings) {
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this._ += strings[0];
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for (let i = 1, n = strings.length; i < n; ++i) {
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this._ += arguments[i] + strings[i];
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}
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}
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function appendRound(digits) {
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let d = Math.floor(digits);
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if (!(d >= 0)) throw new Error(`invalid digits: ${digits}`);
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if (d > 15) return append;
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const k = 10 ** d;
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return function(strings) {
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this._ += strings[0];
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for (let i = 1, n = strings.length; i < n; ++i) {
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this._ += Math.round(arguments[i] * k) / k + strings[i];
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}
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};
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}
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class Path {
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constructor(digits) {
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this._x0 = this._y0 = // start of current subpath
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this._x1 = this._y1 = null; // end of current subpath
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this._ = "";
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this._append = digits == null ? append : appendRound(digits);
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}
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moveTo(x, y) {
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this._append`M${this._x0 = this._x1 = +x},${this._y0 = this._y1 = +y}`;
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}
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closePath() {
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if (this._x1 !== null) {
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this._x1 = this._x0, this._y1 = this._y0;
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this._append`Z`;
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}
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}
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lineTo(x, y) {
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this._append`L${this._x1 = +x},${this._y1 = +y}`;
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}
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quadraticCurveTo(x1, y1, x, y) {
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this._append`Q${+x1},${+y1},${this._x1 = +x},${this._y1 = +y}`;
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}
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bezierCurveTo(x1, y1, x2, y2, x, y) {
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this._append`C${+x1},${+y1},${+x2},${+y2},${this._x1 = +x},${this._y1 = +y}`;
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}
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arcTo(x1, y1, x2, y2, r) {
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x1 = +x1, y1 = +y1, x2 = +x2, y2 = +y2, r = +r;
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// Is the radius negative? Error.
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if (r < 0) throw new Error(`negative radius: ${r}`);
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let x0 = this._x1,
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y0 = this._y1,
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x21 = x2 - x1,
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y21 = y2 - y1,
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x01 = x0 - x1,
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y01 = y0 - y1,
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l01_2 = x01 * x01 + y01 * y01;
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// Is this path empty? Move to (x1,y1).
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if (this._x1 === null) {
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this._append`M${this._x1 = x1},${this._y1 = y1}`;
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}
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// Or, is (x1,y1) coincident with (x0,y0)? Do nothing.
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else if (!(l01_2 > epsilon));
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// Or, are (x0,y0), (x1,y1) and (x2,y2) collinear?
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// Equivalently, is (x1,y1) coincident with (x2,y2)?
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// Or, is the radius zero? Line to (x1,y1).
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else if (!(Math.abs(y01 * x21 - y21 * x01) > epsilon) || !r) {
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this._append`L${this._x1 = x1},${this._y1 = y1}`;
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}
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// Otherwise, draw an arc!
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else {
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let x20 = x2 - x0,
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y20 = y2 - y0,
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l21_2 = x21 * x21 + y21 * y21,
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l20_2 = x20 * x20 + y20 * y20,
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l21 = Math.sqrt(l21_2),
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l01 = Math.sqrt(l01_2),
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l = r * Math.tan((pi - Math.acos((l21_2 + l01_2 - l20_2) / (2 * l21 * l01))) / 2),
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t01 = l / l01,
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t21 = l / l21;
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// If the start tangent is not coincident with (x0,y0), line to.
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if (Math.abs(t01 - 1) > epsilon) {
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this._append`L${x1 + t01 * x01},${y1 + t01 * y01}`;
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}
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this._append`A${r},${r},0,0,${+(y01 * x20 > x01 * y20)},${this._x1 = x1 + t21 * x21},${this._y1 = y1 + t21 * y21}`;
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}
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}
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arc(x, y, r, a0, a1, ccw) {
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x = +x, y = +y, r = +r, ccw = !!ccw;
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// Is the radius negative? Error.
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if (r < 0) throw new Error(`negative radius: ${r}`);
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let dx = r * Math.cos(a0),
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dy = r * Math.sin(a0),
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x0 = x + dx,
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y0 = y + dy,
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cw = 1 ^ ccw,
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da = ccw ? a0 - a1 : a1 - a0;
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// Is this path empty? Move to (x0,y0).
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if (this._x1 === null) {
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this._append`M${x0},${y0}`;
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}
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// Or, is (x0,y0) not coincident with the previous point? Line to (x0,y0).
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else if (Math.abs(this._x1 - x0) > epsilon || Math.abs(this._y1 - y0) > epsilon) {
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this._append`L${x0},${y0}`;
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}
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// Is this arc empty? We’re done.
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if (!r) return;
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// Does the angle go the wrong way? Flip the direction.
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if (da < 0) da = da % tau + tau;
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// Is this a complete circle? Draw two arcs to complete the circle.
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if (da > tauEpsilon) {
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this._append`A${r},${r},0,1,${cw},${x - dx},${y - dy}A${r},${r},0,1,${cw},${this._x1 = x0},${this._y1 = y0}`;
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}
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// Is this arc non-empty? Draw an arc!
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else if (da > epsilon) {
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this._append`A${r},${r},0,${+(da >= pi)},${cw},${this._x1 = x + r * Math.cos(a1)},${this._y1 = y + r * Math.sin(a1)}`;
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}
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}
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rect(x, y, w, h) {
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this._append`M${this._x0 = this._x1 = +x},${this._y0 = this._y1 = +y}h${w = +w}v${+h}h${-w}Z`;
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}
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toString() {
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return this._;
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}
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}
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function path() {
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return new Path;
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}
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// Allow instanceof d3.path
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path.prototype = Path.prototype;
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function pathRound(digits = 3) {
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return new Path(+digits);
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}
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exports.Path = Path;
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exports.path = path;
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exports.pathRound = pathRound;
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}));
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