- Author:
- Leyla <noroozbabaee@gmail.com>
- Date:
- 2022-05-10 14:01:08+12:00
- Desc:
- Adding Tong_2011 to PMR
- Permanent Source URI:
- https://models.cellml.org/workspace/85c/rawfile/a03f680a69226c515cd789723c8036028406852b/Experiments/Figure_2/Fig2D_art.dig
<?xml version="1.0" encoding="UTF-8"?>
<!DOCTYPE engauge>
<Document VersionNumber="12.1" AxesPointsRequired="0">
<Image Width="271" Height="182"><![CDATA[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]]></Image>
<CoordSystem>
<General CursorSize="3" ExtraPrecision="1"/>
<Coords Type="0" TypeString="Cartesian" Coords="0" ScaleXTheta="0" ScaleXThetaString="Linear" ScaleYRadius="0" ScaleYRadiusString="Linear" UnitsX="0" UnitsXString="Number" UnitsY="0" UnitsYString="Number" UnitsTheta="0" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsRadius="0" UnitsRadiusString="Number" UnitsDate="3" UnitsDateString="YYYY/MM/DD" UnitsTime="2" UnitsTimeString="HH:MM:SS"/>
<DigitizeCurve CursorInnerRadius="5" CursorLineWidth="2" CursorSize="1" CursorStandardCross="True"/>
<Export PointsSelectionFunctions="0" PointsSelectionFunctionsString="InterpolateAllCurves" PointsIntervalFunctions="10" PointsIntervalUnitsFunctions="1" PointsSelectionRelations="0" PointsSelectionRelationsString="Interpolate" PointsIntervalUnitsRelations="1" PointsIntervalRelations="10" LayoutFunctions="0" LayoutFunctionsString="AllPerLine" Delimiter="0" OverrideCsvTsv="False" DelimiterString="Commas" ExtrapolateOutsideEndpoints="True" Header="1" HeaderString="Simple" XLabel="x">
<CurveNamesNotExported/>
</Export>
<AxesChecker Mode="1" Seconds="3" LineColor="6"/>
<GridDisplay Stable="True" DisableX="0" CountX="4" StartX="-100" StepX="50" StopX="50" DisableY="0" CountY="4" StartY="-1.5" StepY="0.5" StopY="0" Color="0" ColorString="Black"/>
<GridRemoval Stable="False" DefinedGridLines="False" CloseDistance="10" CoordDisableX="0" CoordDisableXString="Count" CountX="9" StartX="-110.644" StepX="20.2151" StopX="51.0764" CoordDisableY="0" CoordDisableYString="Count" CountY="7" StartY="-1.34792" StepY="0.22331" StopY="-0.00806202"/>
<PointMatch PointSize="48" ColorAccepted="4" ColorAcceptedString="Green" ColorCandidate="7" ColorCandidateString="Yellow" ColorRejected="6" ColorRejectedString="Red"/>
<Segments PointSeparation="25" MinLength="2" FillCorners="False" LineWidth="4" LineColor="4" LineColorString="Green"/>
<Curve CurveName="Axes">
<ColorFilter CurveName="Axes" Mode="2" ModeString="Intensity" IntensityLow="0" IntensityHigh="50" ForegroundLow="0" ForegroundHigh="10" HueLow="180" HueHigh="360" SaturationLow="50" SaturationHigh="100" ValueLow="0" ValueHigh="50"/>
<CurveStyle CurveName="Axes">
<LineStyle Width="0" Color="8" ColorString="Transparent" ConnectAs="4" ConnectAsString="ConnectSkipForAxisCurve"/>
<PointStyle Radius="10" LineWidth="1" Color="6" ColorString="Red" Shape="1" ShapeString="Cross"/>
</CurveStyle>
<CurvePoints>
<Point Identifier="Axes	point	442" Ordinal="1" IsAxisPoint="True" IsXOnly="False" Index="465">
<PositionScreen X="30.2381" Y="17.3239"/>
<PositionGraph X="-100" Y="0"/>
</Point>
<Point Identifier="Axes	point	444" Ordinal="2" IsAxisPoint="True" IsXOnly="False" Index="465">
<PositionScreen X="31.183" Y="147.726"/>
<PositionGraph X="-100" Y="-1.2"/>
</Point>
<Point Identifier="Axes	point	446" Ordinal="3" IsAxisPoint="True" IsXOnly="False" Index="465">
<PositionScreen X="218.281" Y="147.726"/>
<PositionGraph X="50" Y="-1.2"/>
</Point>
</CurvePoints>
</Curve>
<CurvesGraphs>
<Curve CurveName="Curve1">
<ColorFilter CurveName="Curve1" Mode="2" ModeString="Intensity" IntensityLow="0" IntensityHigh="50" ForegroundLow="0" ForegroundHigh="10" HueLow="180" HueHigh="360" SaturationLow="50" SaturationHigh="100" ValueLow="0" ValueHigh="50"/>
<CurveStyle CurveName="Curve1">
<LineStyle Width="1" Color="1" ColorString="Blue" ConnectAs="0" ConnectAsString="FunctionSmooth"/>
<PointStyle Radius="10" LineWidth="1" Color="1" ColorString="Blue" Shape="1" ShapeString="Cross"/>
</CurveStyle>
<CurvePoints>
<Point Identifier="Curve1	point	447" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="81.2649" Y="18.5838"/>
</Point>
<Point Identifier="Curve1	point	448" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="96.069" Y="21.7336"/>
</Point>
<Point Identifier="Curve1	point	449" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="103.314" Y="29.2932"/>
</Point>
<Point Identifier="Curve1	point	450" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="109.613" Y="40.0025"/>
</Point>
<Point Identifier="Curve1	point	451" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="115.598" Y="50.7118"/>
</Point>
<Point Identifier="Curve1	point	452" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="121.267" Y="62.3661"/>
</Point>
<Point Identifier="Curve1	point	453" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="129.457" Y="82.5248"/>
</Point>
<Point Identifier="Curve1	point	454" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="134.812" Y="97.3289"/>
</Point>
<Point Identifier="Curve1	point	455" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="138.906" Y="108.038"/>
</Point>
<Point Identifier="Curve1	point	456" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="147.096" Y="120.637"/>
</Point>
<Point Identifier="Curve1	point	457" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="154.97" Y="126.622"/>
</Point>
<Point Identifier="Curve1	point	458" Ordinal="11" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="167.255" Y="120.637"/>
</Point>
<Point Identifier="Curve1	point	459" Ordinal="12" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="178.909" Y="105.518"/>
</Point>
<Point Identifier="Curve1	point	460" Ordinal="13" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="189.618" Y="91.0293"/>
</Point>
<Point Identifier="Curve1	point	461" Ordinal="14" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="199.068" Y="76.5402"/>
</Point>
<Point Identifier="Curve1	point	462" Ordinal="15" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="205.997" Y="65.5159"/>
</Point>
<Point Identifier="Curve1	point	463" Ordinal="16" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="211.982" Y="56.6964"/>
</Point>
<Point Identifier="Curve1	point	464" Ordinal="17" IsAxisPoint="False" IsXOnly="False" Index="465">
<PositionScreen X="217.966" Y="49.4519"/>
</Point>
</CurvePoints>
</Curve>
</CurvesGraphs>
</CoordSystem>
</Document>
