<?xml version="1.0" encoding="UTF-8"?>
<!DOCTYPE engauge>
<Document VersionNumber="12.1" AxesPointsRequired="0">
    <Image Width="210" Height="218"><![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="5" StartY="0" StepY="50" StopY="200" Color="0" ColorString="Black"/>
        <GridRemoval Stable="False" DefinedGridLines="False" CloseDistance="10" CoordDisableX="0" CoordDisableXString="Count" CountX="9" StartX="-121.058" StepX="20.6546" StopX="44.1794" CoordDisableY="0" CoordDisableYString="Count" CountY="7" StartY="-19.0129" StepY="19.7598" StopY="99.5458"/>
        <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;1" Ordinal="1" IsAxisPoint="True" IsXOnly="False" Index="14">
                    <PositionScreen X="52.6017" Y="23.9385"/>
                    <PositionGraph X="-100" Y="160"/>
                </Point>
                <Point Identifier="Axes&#9;point&#9;3" Ordinal="2" IsAxisPoint="True" IsXOnly="False" Index="14">
                    <PositionScreen X="52.6017" Y="185.523"/>
                    <PositionGraph X="-100" Y="0"/>
                </Point>
                <Point Identifier="Axes&#9;point&#9;5" Ordinal="3" IsAxisPoint="True" IsXOnly="False" Index="14">
                    <PositionScreen X="183.948" Y="186.468"/>
                    <PositionGraph X="50" 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;6" Ordinal="0" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="56.6964" Y="35.5928"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;7" Ordinal="1" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="72.7604" Y="51.0268"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;8" Ordinal="2" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="81.8949" Y="79.69"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;9" Ordinal="3" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="87.8795" Y="108.668"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;10" Ordinal="4" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="97.6439" Y="144.891"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;11" Ordinal="5" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="114.023" Y="165.68"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;12" Ordinal="6" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="148.986" Y="166.94"/>
                    </Point>
                    <Point Identifier="Curve1&#9;point&#9;13" Ordinal="7" IsAxisPoint="False" IsXOnly="False" Index="14">
                        <PositionScreen X="172.294" Y="166.625"/>
                    </Point>
                </CurvePoints>
            </Curve>
        </CurvesGraphs>
    </CoordSystem>
</Document>
