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GD&T Linear Distance from Edge to Edge
Hi,
I have a part that I am unsure how to dimension properly. I have a linear measurement from two nominally parallel lines. However one of the lines has a perpindicularity callout. I want the measurement to be from the edge to a plane going through the highest point on the other edge. Other than just describing it via text, is there a GD&T callout I could use to indicate his?
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[/IMG]
Thanks