- 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_1/Fig1E_art.dig
<?xml version="1.0" encoding="UTF-8"?>
<!DOCTYPE engauge>
<Document VersionNumber="12.1" AxesPointsRequired="0">
<Image Width="302" Height="199"><![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="7" StartX="0" StepX="10" StopX="60" 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="14" StartX="-4.21393" StepX="4.08796" StopX="48.9295" CoordDisableY="0" CoordDisableYString="Count" CountY="8" StartY="-1.39865" StepY="0.199073" StopY="-0.00513703"/>
<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	134" Ordinal="1" IsAxisPoint="True" IsXOnly="False" Index="225">
<PositionScreen X="35.2778" Y="18.5838"/>
<PositionGraph X="0" Y="0"/>
</Point>
<Point Identifier="Axes	point	136" Ordinal="2" IsAxisPoint="True" IsXOnly="False" Index="225">
<PositionScreen X="35.5928" Y="154.34"/>
<PositionGraph X="0" Y="-1.2"/>
</Point>
<Point Identifier="Axes	point	138" Ordinal="3" IsAxisPoint="True" IsXOnly="False" Index="225">
<PositionScreen X="286.317" Y="154.025"/>
<PositionGraph X="60" 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	139" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="45.9871" Y="18.5838"/>
</Point>
<Point Identifier="Curve1	point	140" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="63.311" Y="18.8988"/>
</Point>
<Point Identifier="Curve1	point	141" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="65.5159" Y="30.2381"/>
</Point>
<Point Identifier="Curve1	point	142" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="68.3507" Y="46.9321"/>
</Point>
<Point Identifier="Curve1	point	143" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="69.9256" Y="64.256"/>
</Point>
<Point Identifier="Curve1	point	144" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="73.3904" Y="84.0997"/>
</Point>
<Point Identifier="Curve1	point	145" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="76.8552" Y="102.684"/>
</Point>
<Point Identifier="Curve1	point	146" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="80.6349" Y="120.007"/>
</Point>
<Point Identifier="Curve1	point	147" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="91.9742" Y="131.662"/>
</Point>
<Point Identifier="Curve1	point	148" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="101.109" Y="126.622"/>
</Point>
<Point Identifier="Curve1	point	149" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="111.503" Y="116.543"/>
</Point>
<Point Identifier="Curve1	point	150" Ordinal="11" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="120.007" Y="104.888"/>
</Point>
<Point Identifier="Curve1	point	151" Ordinal="12" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="134.812" Y="91.3443"/>
</Point>
<Point Identifier="Curve1	point	152" Ordinal="13" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="151.191" Y="78.1151"/>
</Point>
<Point Identifier="Curve1	point	153" Ordinal="14" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="168.829" Y="67.0908"/>
</Point>
<Point Identifier="Curve1	point	154" Ordinal="15" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="189.303" Y="57.9564"/>
</Point>
<Point Identifier="Curve1	point	155" Ordinal="16" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="207.887" Y="51.6568"/>
</Point>
<Point Identifier="Curve1	point	156" Ordinal="17" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="225.526" Y="46.6171"/>
</Point>
<Point Identifier="Curve1	point	157" Ordinal="18" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="246.945" Y="43.4673"/>
</Point>
<Point Identifier="Curve1	point	158" Ordinal="19" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="265.213" Y="39.3725"/>
</Point>
<Point Identifier="Curve1	point	159" Ordinal="20" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="285.372" Y="38.1126"/>
</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	point	160" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="57.0114" Y="18.5838"/>
</Point>
<Point Identifier="Curve2	point	161" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="70.2406" Y="44.0972"/>
</Point>
<Point Identifier="Curve2	point	162" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="73.7054" Y="70.8706"/>
</Point>
<Point Identifier="Curve2	point	163" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="77.8001" Y="88.5095"/>
</Point>
<Point Identifier="Curve2	point	164" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="82.5248" Y="107.093"/>
</Point>
<Point Identifier="Curve2	point	165" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="87.8795" Y="115.913"/>
</Point>
<Point Identifier="Curve2	point	166" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="100.479" Y="119.692"/>
</Point>
<Point Identifier="Curve2	point	167" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="114.968" Y="107.723"/>
</Point>
<Point Identifier="Curve2	point	168" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="129.457" Y="95.754"/>
</Point>
<Point Identifier="Curve2	point	169" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="146.151" Y="81.2649"/>
</Point>
<Point Identifier="Curve2	point	170" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="165.995" Y="72.1305"/>
</Point>
<Point Identifier="Curve2	point	171" Ordinal="11" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="177.649" Y="65.8309"/>
</Point>
<Point Identifier="Curve2	point	172" Ordinal="12" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="187.098" Y="62.0511"/>
</Point>
<Point Identifier="Curve2	point	173" Ordinal="13" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="197.493" Y="58.5863"/>
</Point>
<Point Identifier="Curve2	point	174" Ordinal="14" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="205.052" Y="57.6414"/>
</Point>
<Point Identifier="Curve2	point	175" Ordinal="15" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="214.817" Y="54.4916"/>
</Point>
<Point Identifier="Curve2	point	176" Ordinal="16" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="223.006" Y="52.6017"/>
</Point>
<Point Identifier="Curve2	point	177" Ordinal="17" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="232.455" Y="51.3418"/>
</Point>
<Point Identifier="Curve2	point	178" Ordinal="18" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="242.85" Y="49.4519"/>
</Point>
<Point Identifier="Curve2	point	179" Ordinal="19" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="251.984" Y="46.6171"/>
</Point>
<Point Identifier="Curve2	point	180" Ordinal="20" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="261.749" Y="45.6721"/>
</Point>
<Point Identifier="Curve2	point	181" Ordinal="21" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="271.198" Y="45.3572"/>
</Point>
<Point Identifier="Curve2	point	182" Ordinal="22" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="284.112" Y="43.7823"/>
</Point>
</CurvePoints>
</Curve>
<Curve CurveName="Curve3">
<ColorFilter CurveName="Curve3" 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="Curve3">
<LineStyle Width="1" Color="1" ColorString="Blue" ConnectAs="0" ConnectAsString="FunctionSmooth"/>
<PointStyle Radius="10" LineWidth="1" Color="1" ColorString="Blue" Shape="2" ShapeString="Diamond"/>
</CurveStyle>
<CurvePoints>
<Point Identifier="Curve3	point	183" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="55.4365" Y="18.5838"/>
</Point>
<Point Identifier="Curve3	point	184" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="70.5556" Y="28.0332"/>
</Point>
<Point Identifier="Curve3	point	185" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="77.4851" Y="42.2074"/>
</Point>
<Point Identifier="Curve3	point	186" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="84.7297" Y="54.4916"/>
</Point>
<Point Identifier="Curve3	point	187" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="91.3443" Y="60.7912"/>
</Point>
<Point Identifier="Curve3	point	188" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="101.424" Y="65.8309"/>
</Point>
<Point Identifier="Curve3	point	189" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="114.023" Y="64.8859"/>
</Point>
<Point Identifier="Curve3	point	190" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="128.512" Y="61.7361"/>
</Point>
<Point Identifier="Curve3	point	191" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="140.481" Y="58.9013"/>
</Point>
<Point Identifier="Curve3	point	192" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="150.246" Y="56.0665"/>
</Point>
<Point Identifier="Curve3	point	193" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="158.435" Y="53.8616"/>
</Point>
<Point Identifier="Curve3	point	194" Ordinal="11" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="164.105" Y="51.9717"/>
</Point>
<Point Identifier="Curve3	point	195" Ordinal="12" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="176.389" Y="49.7669"/>
</Point>
<Point Identifier="Curve3	point	196" Ordinal="13" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="188.358" Y="47.247"/>
</Point>
<Point Identifier="Curve3	point	197" Ordinal="14" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="204.737" Y="45.3572"/>
</Point>
<Point Identifier="Curve3	point	198" Ordinal="15" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="218.281" Y="43.1523"/>
</Point>
<Point Identifier="Curve3	point	199" Ordinal="16" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="232.14" Y="42.2074"/>
</Point>
<Point Identifier="Curve3	point	200" Ordinal="17" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="249.149" Y="38.7426"/>
</Point>
<Point Identifier="Curve3	point	201" Ordinal="18" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="271.198" Y="38.4276"/>
</Point>
<Point Identifier="Curve3	point	202" Ordinal="19" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="284.742" Y="36.8527"/>
</Point>
</CurvePoints>
</Curve>
<Curve CurveName="Curve4">
<ColorFilter CurveName="Curve4" 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="Curve4">
<LineStyle Width="1" Color="1" ColorString="Blue" ConnectAs="0" ConnectAsString="FunctionSmooth"/>
<PointStyle Radius="10" LineWidth="1" Color="1" ColorString="Blue" Shape="3" ShapeString="Square"/>
</CurveStyle>
<CurvePoints>
<Point Identifier="Curve4	point	203" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="74.3353" Y="18.5838"/>
</Point>
<Point Identifier="Curve4	point	204" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="90.0844" Y="23.6235"/>
</Point>
<Point Identifier="Curve4	point	205" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="108.038" Y="26.4583"/>
</Point>
<Point Identifier="Curve4	point	206" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="135.442" Y="28.3482"/>
</Point>
<Point Identifier="Curve4	point	207" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="157.49" Y="27.7183"/>
</Point>
<Point Identifier="Curve4	point	208" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="187.728" Y="28.0332"/>
</Point>
<Point Identifier="Curve4	point	209" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="202.532" Y="27.0883"/>
</Point>
<Point Identifier="Curve4	point	210" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="226.786" Y="27.0883"/>
</Point>
<Point Identifier="Curve4	point	211" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="248.519" Y="26.1434"/>
</Point>
<Point Identifier="Curve4	point	212" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="267.733" Y="27.0883"/>
</Point>
<Point Identifier="Curve4	point	213" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="285.687" Y="26.4583"/>
</Point>
</CurvePoints>
</Curve>
<Curve CurveName="Curve5">
<ColorFilter CurveName="Curve5" 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="Curve5">
<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="Curve5	point	214" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="68.0357" Y="18.2689"/>
</Point>
<Point Identifier="Curve5	point	215" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="94.4941" Y="19.5288"/>
</Point>
<Point Identifier="Curve5	point	216" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="114.023" Y="20.1587"/>
</Point>
<Point Identifier="Curve5	point	217" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="134.182" Y="20.7887"/>
</Point>
<Point Identifier="Curve5	point	218" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="161.9" Y="19.8438"/>
</Point>
<Point Identifier="Curve5	point	219" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="182.689" Y="20.4737"/>
</Point>
<Point Identifier="Curve5	point	220" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="207.572" Y="19.5288"/>
</Point>
<Point Identifier="Curve5	point	221" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="226.471" Y="19.5288"/>
</Point>
<Point Identifier="Curve5	point	222" Ordinal="8" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="247.574" Y="19.2138"/>
</Point>
<Point Identifier="Curve5	point	223" Ordinal="9" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="268.048" Y="19.2138"/>
</Point>
<Point Identifier="Curve5	point	224" Ordinal="10" IsAxisPoint="False" IsXOnly="False" Index="225">
<PositionScreen X="286.317" Y="19.2138"/>
</Point>
</CurvePoints>
</Curve>
</CurvesGraphs>
</CoordSystem>
</Document>
