Location: Tong_2011_V1 @ a03f680a6922 / Experiments / Figure_5 / Fig5B_art.dig

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_5/Fig5B_art.dig
Compare... Download Source 

<?xml version="1.0" encoding="UTF-8"?>
<!DOCTYPE engauge>
<Document VersionNumber="12.1" AxesPointsRequired="0">
    <Image Width="309" Height="219"><![CDATA[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]]></Image>
    <CoordSystem>
        <General CursorSize="3" ExtraPrecision="1"/>
        <Coords Type="0" TypeString="Cartesian" Coords="0" ScaleXTheta="0" ScaleXThetaString="Linear" ScaleYRadius="1" ScaleYRadiusString="Log" 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="5" StartX="-100" StepX="50" StopX="100" DisableY="0" CountY="11" StartY="0" StepY="100" StopY="1000" Color="0" ColorString="Black"/>
        <GridRemoval Stable="False" DefinedGridLines="False" CloseDistance="10" CoordDisableX="0" CoordDisableXString="Count" CountX="6" StartX="-89.8359" StepX="29.5583" StopX="57.9557" CoordDisableY="0" CoordDisableYString="Count" CountY="9" StartY="-260.022" StepY="133.137" StopY="805.073"/>
        <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&#9;point&#9;663" Ordinal="1" IsAxisPoint="True" IsXOnly="False" Index="680">
                    <PositionScreen X="41.8924" Y="18.5838"/>
                    <PositionGraph X="-90" Y="1000"/>
                </Point>
                <Point Identifier="Axes&#9;point&#9;665" Ordinal="2" IsAxisPoint="True" IsXOnly="False" Index="680">
                    <PositionScreen X="41.5774" Y="168.514"/>
                    <PositionGraph X="-90" Y="1"/>
                </Point>
                <Point Identifier="Axes&#9;point&#9;667" Ordinal="3" IsAxisPoint="True" IsXOnly="False" Index="680">
                    <PositionScreen X="286.317" Y="169.144"/>
                    <PositionGraph X="60" Y="1"/>
                </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&#9;point&#9;668" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="42.8373" Y="65.2009"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;669" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="62.9961" Y="50.7118"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;670" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="86.9346" Y="34.9628"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;671" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="114.338" Y="48.192"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;672" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="133.867" Y="64.256"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;673" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="150.876" Y="75.2803"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;674" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="173.239" Y="86.9346"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;675" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="199.697" Y="97.6439"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;676" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="221.116" Y="105.518"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;677" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="246.63" Y="112.763"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;678" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="270.568" Y="118.433"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;679" Ordinal="11" IsAxisPoint="False" IsXOnly="False" Index="680">
                        <PositionScreen X="285.372" Y="122.212"/>
                    </Point>
                </CurvePoints>
            </Curve>
        </CurvesGraphs>
    </CoordSystem>
</Document>