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The midpoints of the sides of an arbitrary quadrilateral form a parallelogram. If the quadrilateral is [[convex polygon|convex]] or [[concave polygon|concave]] (not [[Quadrilateral#Complex_quadrilaterals|complex]]), then the area of the parallelogram is half the area of the quadrilateral.
If one introduces the concept of oriented areas for [[Polygon|''n''-gons]], then this area equality also holds for complex quadrilaterals.<ref name=Coxeter>[[Coxeter|Coxeter, H. S. M.]] and
The Varignon parallelogram exists even for a [[Quadrilateral#Skew_quadrilaterals|skew quadrilateral]], and is planar whether the quadrilateral is planar or not. The theorem can be generalized to the [[midpoint polygon]] of an arbitrary polygon.
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