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Last Active: 7 days ago @ 5:12 PM
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Hi, May I ask how can I replicate editing Geometry MoveTo values in code? I would like to update NShape.Geometry without re-drawing the whole Geometry sequence. ![](data:image/png;base64,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) Thank you for your support!
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Last Active: 2 Weeks Ago
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Hi, The following piece of code creates a shape with a triangle geometry: const bool CloseFigure = true;
// Create a shape with a triangle geometry NShape shape = new NShape(); shape.Geometry.AddRelative(new NMoveTo(0.5, 0, CloseFigure)); shape.Geometry.AddRelative(new NLineTo(1, 1)); shape.Geometry.AddRelative(new NLineTo(0, 1)); shape.Geometry.AddRelative(new NLineTo(0.5, 0)); shape.SetBounds(200, 200, 100, 100);
// Add the shape to the page drawingView.ActivePage.Items.Add(shape);
The code above will create the following shape: ![](data:image/png;base64,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) You can then modify the shape geometry, for example you can change the third geometry command like this: ((NLineTo)shape.Geometry[2]).X = 0.5; You will then get the following shape:
![](data:image/png;base64,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)
For more information on shape geometry, please open the following documentation topic:
Best Regards, Nevron Support Team
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