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<CoordSystem>
<General ExtraPrecision="1" CursorSize="3"/>
<Coords TypeString="Cartesian" UnitsYString="Number" Coords="0" ScaleYRadius="0" ScaleYRadiusString="Linear" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsDateString="YYYY/MM/DD" UnitsTheta="0" UnitsRadiusString="Number" UnitsY="0" UnitsTimeString="HH:MM:SS" Type="0" UnitsDate="3" UnitsX="0" ScaleXTheta="0" UnitsRadius="0" UnitsTime="2" UnitsXString="Number" ScaleXThetaString="Linear"/>
<DigitizeCurve CursorLineWidth="2" CursorStandardCross="True" CursorSize="1" CursorInnerRadius="5"/>
<Export PointsSelectionFunctions="0" PointsSelectionRelationsString="Interpolate" PointsSelectionRelations="0" XLabel="x" HeaderString="Simple" LayoutFunctions="0" Header="1" PointsSelectionFunctionsString="InterpolateAllCurves" PointsIntervalRelations="10" PointsIntervalFunctions="10" PointsIntervalUnitsRelations="1" OverrideCsvTsv="False" PointsIntervalUnitsFunctions="1" LayoutFunctionsString="AllPerLine" Delimiter="0" DelimiterString="Commas">
<CurveNamesNotExported/>
</Export>
<AxesChecker Mode="1" Seconds="3" LineColor="6"/>
<GridDisplay StepX="1" DisableY="0" ColorString="Black" Stable="False" CountX="2" StopX="1" StepY="1" DisableX="0" StartY="0" StopY="1" CountY="2" StartX="0" Color="0"/>
<GridRemoval StepX="0" CloseDistance="10" Stable="False" DefinedGridLines="False" CountX="2" StopX="0" StepY="0" StartY="0" StopY="0" CountY="2" CoordDisableXString="Count" CoordDisableY="0" CoordDisableYString="Count" CoordDisableX="0" StartX="0"/>
<PointMatch ColorCandidate="7" ColorRejectedString="Red" ColorRejected="6" ColorAccepted="4" ColorCandidateString="Yellow" ColorAcceptedString="Green" PointSize="48"/>
<Segments PointSeparation="25" MinLength="2" LineColorString="Green" FillCorners="False" LineColor="4" LineWidth="4"/>
<Curve CurveName="Axes">
<ColorFilter HueHigh="360" ValueHigh="50" Mode="2" ModeString="Intensity" ForegroundHigh="10" CurveName="Axes" SaturationHigh="100" IntensityLow="0" SaturationLow="50" ValueLow="0" ForegroundLow="0" IntensityHigh="50" HueLow="180"/>
<CurveStyle CurveName="Axes">
<LineStyle ColorString="Transparent" ConnectAs="4" ConnectAsString="ConnectSkipForAxisCurve" Width="0" Color="8"/>
<PointStyle ColorString="Red" Radius="10" Shape="1" ShapeString="Cross" LineWidth="1" Color="6"/>
</CurveStyle>
<CurvePoints/>
</Curve>
<CurvesGraphs>
<Curve CurveName="Curve1">
<ColorFilter HueHigh="360" ValueHigh="50" Mode="2" ModeString="Intensity" ForegroundHigh="10" CurveName="Curve1" SaturationHigh="100" IntensityLow="0" SaturationLow="50" ValueLow="0" ForegroundLow="0" IntensityHigh="50" HueLow="180"/>
<CurveStyle CurveName="Curve1">
<LineStyle ColorString="Blue" ConnectAs="0" ConnectAsString="FunctionSmooth" Width="1" Color="1"/>
<PointStyle ColorString="Blue" Radius="10" Shape="1" ShapeString="Cross" LineWidth="1" Color="1"/>
</CurveStyle>
<CurvePoints/>
</Curve>
</CurvesGraphs>
</CoordSystem>
<OperatingSystem WordSize="64" Endian="LittleEndian"/>
<File Imported="True"/>
<CmdMediator>
<Cmd Description="Coordinate settings" Type="CmdSettingsCoords">
<Coords TypeString="Cartesian" UnitsYString="Number" Coords="0" ScaleYRadius="0" ScaleYRadiusString="Linear" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsDateString="YYYY/MM/DD" UnitsTheta="0" UnitsRadiusString="Number" UnitsY="0" UnitsTimeString="HH:MM:SS" Type="0" UnitsDate="3" UnitsX="0" ScaleXTheta="0" UnitsRadius="0" UnitsTime="2" UnitsXString="Number" ScaleXThetaString="Linear"/>
<Coords TypeString="Cartesian" UnitsYString="Number" Coords="0" ScaleYRadius="0" ScaleYRadiusString="Linear" UnitsThetaString="Degrees (DDD.DDDDD)" UnitsDateString="YYYY/MM/DD" UnitsTheta="0" UnitsRadiusString="Number" UnitsY="0" UnitsTimeString="HH:MM:SS" Type="0" UnitsDate="3" UnitsX="0" ScaleXTheta="1" UnitsRadius="0" UnitsTime="2" UnitsXString="Number" ScaleXThetaString="Log"/>
</Cmd>
<Cmd Description="Add axis point" GraphY="0" GraphX="1" ScreenX="251" IsXOnly="True" Ordinal="1" Type="CmdAddPointAxis" ScreenY="324" Identifier="Axes	point	1"/>
<Cmd Description="Add axis point" GraphY="0" GraphX="1000000000" ScreenX="707" IsXOnly="True" Ordinal="2" Type="CmdAddPointAxis" ScreenY="324" Identifier="Axes	point	3"/>
<Cmd Description="Add axis point" GraphY="2" GraphX="0" ScreenX="99" IsXOnly="False" Ordinal="3" Type="CmdAddPointAxis" ScreenY="264" Identifier="Axes	point	5"/>
<Cmd Description="Add axis point" GraphY="10" GraphX="0" ScreenX="99" IsXOnly="False" Ordinal="4" Type="CmdAddPointAxis" ScreenY="18" Identifier="Axes	point	7"/>
<Cmd Description="Add graph points" CurveName="Curve1" Type="CmdAddPointsGraph">
<Point ScreenX="98" Ordinal="1" ScreenY="344" Identifier="Curve1	point	8"/>
<Point ScreenX="110" Ordinal="1" ScreenY="323" Identifier="Curve1	point	9"/>
<Point ScreenX="120" Ordinal="1" ScreenY="300" Identifier="Curve1	point	10"/>
<Point ScreenX="130" Ordinal="1" ScreenY="277" Identifier="Curve1	point	11"/>
<Point ScreenX="142" Ordinal="1" ScreenY="255" Identifier="Curve1	point	12"/>
<Point ScreenX="155" Ordinal="1" ScreenY="234" Identifier="Curve1	point	13"/>
<Point ScreenX="169" Ordinal="1" ScreenY="213" Identifier="Curve1	point	14"/>
<Point ScreenX="184" Ordinal="1" ScreenY="193" Identifier="Curve1	point	15"/>
<Point ScreenX="201" Ordinal="1" ScreenY="175" Identifier="Curve1	point	16"/>
<Point ScreenX="220" Ordinal="1" ScreenY="159" Identifier="Curve1	point	17"/>
<Point ScreenX="241" Ordinal="1" ScreenY="147" Identifier="Curve1	point	18"/>
<Point ScreenX="265" Ordinal="1" ScreenY="138" Identifier="Curve1	point	19"/>
<Point ScreenX="289" Ordinal="1" ScreenY="134" Identifier="Curve1	point	20"/>
<Point ScreenX="313" Ordinal="1" ScreenY="135" Identifier="Curve1	point	21"/>
<Point ScreenX="337" Ordinal="1" ScreenY="140" Identifier="Curve1	point	22"/>
<Point ScreenX="361" Ordinal="1" ScreenY="146" Identifier="Curve1	point	23"/>
<Point ScreenX="384" Ordinal="1" ScreenY="155" Identifier="Curve1	point	24"/>
<Point ScreenX="407" Ordinal="1" ScreenY="165" Identifier="Curve1	point	25"/>
<Point ScreenX="430" Ordinal="1" ScreenY="175" Identifier="Curve1	point	26"/>
<Point ScreenX="453" Ordinal="1" ScreenY="185" Identifier="Curve1	point	27"/>
<Point ScreenX="477" Ordinal="1" ScreenY="193" Identifier="Curve1	point	28"/>
<Point ScreenX="500" Ordinal="1" ScreenY="200" Identifier="Curve1	point	29"/>
<Point ScreenX="524" Ordinal="1" ScreenY="204" Identifier="Curve1	point	30"/>
<Point ScreenX="549" Ordinal="1" ScreenY="206" Identifier="Curve1	point	31"/>
<Point ScreenX="573" Ordinal="1" ScreenY="202" Identifier="Curve1	point	32"/>
<Point ScreenX="596" Ordinal="1" ScreenY="193" Identifier="Curve1	point	33"/>
<Point ScreenX="617" Ordinal="1" ScreenY="181" Identifier="Curve1	point	34"/>
<Point ScreenX="636" Ordinal="1" ScreenY="165" Identifier="Curve1	point	35"/>
<Point ScreenX="653" Ordinal="1" ScreenY="148" Identifier="Curve1	point	36"/>
<Point ScreenX="668" Ordinal="1" ScreenY="128" Identifier="Curve1	point	37"/>
<Point ScreenX="682" Ordinal="1" ScreenY="108" Identifier="Curve1	point	38"/>
<Point ScreenX="694" Ordinal="1" ScreenY="86" Identifier="Curve1	point	39"/>
</Cmd>
</CmdMediator>
<Error File="src/main/MainWindow.cpp" Context="Shift+Control+E" Comment="userTriggered" Line="357"/>
</Document>
</ErrorReport>
