Location: Tong_2011_V1 @ a03f680a6922 / Experiments / Figure_5 / Fig5D_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/Fig5D_art.dig
Compare... Download Source 

<?xml version="1.0" encoding="UTF-8"?>
<!DOCTYPE engauge>
<Document VersionNumber="12.1" AxesPointsRequired="0">
    <Image Width="327" Height="227"><![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="5" StartX="-100" StepX="50" StopX="100" DisableY="0" CountY="5" StartY="0" StepY="0.25" StopY="1" Color="0" ColorString="Black"/>
        <GridRemoval Stable="False" DefinedGridLines="False" CloseDistance="10" CoordDisableX="0" CoordDisableXString="Count" CountX="15" StartX="-109.532" StepX="9.8491" StopX="28.355" CoordDisableY="0" CoordDisableYString="Count" CountY="12" StartY="-0.0913036" StepY="0.0981231" StopY="0.988051"/>
        <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;712" Ordinal="1" IsAxisPoint="True" IsXOnly="False" Index="739">
                    <PositionScreen X="47.877" Y="26.4583"/>
                    <PositionGraph X="-90" Y="1"/>
                </Point>
                <Point Identifier="Axes&#9;point&#9;714" Ordinal="2" IsAxisPoint="True" IsXOnly="False" Index="739">
                    <PositionScreen X="47.877" Y="175.759"/>
                    <PositionGraph X="-90" Y="0"/>
                </Point>
                <Point Identifier="Axes&#9;point&#9;716" Ordinal="3" IsAxisPoint="True" IsXOnly="False" Index="739">
                    <PositionScreen X="292.302" Y="176.074"/>
                    <PositionGraph X="60" Y="0"/>
                </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;717" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="63.941" Y="174.814"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;718" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="90.7143" Y="176.704"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;719" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="124.102" Y="172.609"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;720" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="162.53" Y="159.695"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;721" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="184.578" Y="143.631"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;722" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="211.037" Y="116.228"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;723" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="231.825" Y="93.5491"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;724" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="249.464" Y="73.7054"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;725" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="266.788" Y="52.9167"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;726" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="281.907" Y="36.5377"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;727" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="291.672" Y="26.4583"/>
                    </Point>
                </CurvePoints>
            </Curve>
            <Curve CurveName="Curve2">
                <ColorFilter CurveName="Curve2" 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="Curve2">
                    <LineStyle Width="1" Color="1" ColorString="Blue" ConnectAs="0" ConnectAsString="FunctionSmooth"/>
                    <PointStyle Radius="10" LineWidth="1" Color="1" ColorString="Blue" Shape="5" ShapeString="X"/>
                </CurveStyle>
                <CurvePoints>
                    <Point Identifier="Curve2&#9;point&#9;728" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="79.06" Y="176.074"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;729" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="123.472" Y="175.759"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;730" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="165.365" Y="176.389"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;731" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="186.153" Y="174.814"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;732" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="205.367" Y="174.184"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;733" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="224.266" Y="173.869"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;734" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="239.7" Y="173.554"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;735" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="254.819" Y="172.609"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;736" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="266.158" Y="172.294"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;737" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="277.498" Y="172.294"/>
                    </Point>
                    <Point Identifier="Curve2&#9;point&#9;738" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="739">
                        <PositionScreen X="291.672" Y="171.349"/>
                    </Point>
                </CurvePoints>
            </Curve>
        </CurvesGraphs>
    </CoordSystem>
</Document>