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Negative values in pie chart


Ritesh
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 In case of negative value in pie chart, pie chart sliece is showing positive values but in tool tip it is showing correct values.

Any one have any idea , how to show negative values in pie chart.

http://community.softwarefx.com/forums/data:image/png;base64,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This behavior is by design. Not sure how you were expecting to see negative values on a pie chart. Since the value is used to calculate the size of the area in the pie, a negative value would yield negative area. That is why we just use the absolute value to calculate the area.

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