@csn_chile/table_status/.cache/d6/7c2d17b16cb53e61413e67be2be552.json

test new data structure

{"id":"../node_modules/d3-polygon/src/cross.js","dependencies":[{"name":"/home/david/Proyectos/websocketdatamanager/websocketdatamanager/wsjs/package.json","includedInParent":true,"mtime":1575307700296},{"name":"/home/david/Proyectos/websocketdatamanager/websocketdatamanager/wsjs/node_modules/d3-polygon/package.json","includedInParent":true,"mtime":1574793505388}],"generated":{"js":"\"use strict\";\n\nObject.defineProperty(exports, \"__esModule\", {\n  value: true\n});\nexports.default = _default;\n\n// Returns the 2D cross product of AB and AC vectors, i.e., the z-component of\n// the 3D cross product in a quadrant I Cartesian coordinate system (+x is\n// right, +y is up). Returns a positive value if ABC is counter-clockwise,\n// negative if clockwise, and zero if the points are collinear.\nfunction _default(a, b, c) {\n  return (b[0] - a[0]) * (c[1] - a[1]) - (b[1] - a[1]) * (c[0] - a[0]);\n}"},"sourceMaps":{"js":{"mappings":[{"generated":{"line":8,"column":0},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":1,"column":0}},{"generated":{"line":9,"column":0},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":2,"column":0}},{"generated":{"line":10,"column":0},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":3,"column":0}},{"generated":{"line":11,"column":0},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":4,"column":0}},{"generated":{"line":12,"column":0},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":15}},{"name":"a","generated":{"line":12,"column":18},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":24}},{"generated":{"line":12,"column":19},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":15}},{"name":"b","generated":{"line":12,"column":21},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":27}},{"generated":{"line":12,"column":22},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":15}},{"name":"c","generated":{"line":12,"column":24},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":30}},{"generated":{"line":12,"column":25},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":15}},{"generated":{"line":12,"column":27},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":5,"column":33}},{"generated":{"line":13,"column":0},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":2}},{"generated":{"line":13,"column":9},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":9}},{"name":"b","generated":{"line":13,"column":10},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":10}},{"generated":{"line":13,"column":11},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":11}},{"generated":{"line":13,"column":12},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":12}},{"generated":{"line":13,"column":13},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":11}},{"generated":{"line":13,"column":14},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":10}},{"name":"a","generated":{"line":13,"column":17},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":17}},{"generated":{"line":13,"column":18},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":18}},{"generated":{"line":13,"column":19},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":19}},{"generated":{"line":13,"column":20},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":18}},{"generated":{"line":13,"column":21},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":9}},{"name":"c","generated":{"line":13,"column":26},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":26}},{"generated":{"line":13,"column":27},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":27}},{"generated":{"line":13,"column":28},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":28}},{"generated":{"line":13,"column":29},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":27}},{"generated":{"line":13,"column":30},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":26}},{"name":"a","generated":{"line":13,"column":33},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":33}},{"generated":{"line":13,"column":34},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":34}},{"generated":{"line":13,"column":35},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":35}},{"generated":{"line":13,"column":36},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":34}},{"generated":{"line":13,"column":37},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":9}},{"generated":{"line":13,"column":41},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":41}},{"name":"b","generated":{"line":13,"column":42},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":42}},{"generated":{"line":13,"column":43},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":43}},{"generated":{"line":13,"column":44},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":44}},{"generated":{"line":13,"column":45},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":43}},{"generated":{"line":13,"column":46},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":42}},{"name":"a","generated":{"line":13,"column":49},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":49}},{"generated":{"line":13,"column":50},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":50}},{"generated":{"line":13,"column":51},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":51}},{"generated":{"line":13,"column":52},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":50}},{"generated":{"line":13,"column":53},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":41}},{"name":"c","generated":{"line":13,"column":58},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":58}},{"generated":{"line":13,"column":59},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":59}},{"generated":{"line":13,"column":60},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":60}},{"generated":{"line":13,"column":61},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":59}},{"generated":{"line":13,"column":62},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":58}},{"name":"a","generated":{"line":13,"column":65},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":65}},{"generated":{"line":13,"column":66},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":66}},{"generated":{"line":13,"column":67},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":67}},{"generated":{"line":13,"column":68},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":66}},{"generated":{"line":13,"column":69},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":41}},{"generated":{"line":13,"column":70},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":6,"column":2}},{"generated":{"line":14,"column":0},"source":"../node_modules/d3-polygon/src/cross.js","original":{"line":7,"column":1}}],"sources":{"../node_modules/d3-polygon/src/cross.js":"// Returns the 2D cross product of AB and AC vectors, i.e., the z-component of\n// the 3D cross product in a quadrant I Cartesian coordinate system (+x is\n// right, +y is up). Returns a positive value if ABC is counter-clockwise,\n// negative if clockwise, and zero if the points are collinear.\nexport default function(a, b, c) {\n  return (b[0] - a[0]) * (c[1] - a[1]) - (b[1] - a[1]) * (c[0] - a[0]);\n}\n"},"lineCount":null}},"error":null,"hash":"9bed6bb8f5a70653395c8881de16fa8c","cacheData":{"env":{}}}