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{{Short description|Geometric theorem involving midpoints on a triangle}}
[[File:Midpoint theorem.svg|thumb|upright=1.25|<math> \begin{align} &\text{D and E midpoints of AC and BC}\\ \Rightarrow \, &DE \parallel AB\text{ and } 2|DE|=|AB|\end{align}</math>]]
The '''midpoint theorem''', '''midsegment theorem''', or '''midline theorem''' states that if the midpoints of two sides of a triangle are connected, then the resulting line segment will be parallel to the third side and have half of its length. The midpoint theorem generalizes to the [[intercept theorem]], where rather than using midpoints, both sides are partitioned in the same ratio.<ref>{{Cite book |last=Clapham |first=Christopher |url=https://en.wikipedia.org/wiki/Special:BookSources/9780199235940 |title=The concise Oxford dictionary of mathematics: clear definitions of even the most complex mathematical terms and concepts |last2=Nicholson |first2=James |date=2009 |publisher=Oxford Univ. Press |isbn=978-0-19-923594-0 |edition=4th |series=Oxford paperback reference |___location=Oxford |pages=297}}</ref>
The converse of the theorem is true as well. That is if a line is drawn through the midpoint of triangle side parallel to another triangle side then the line will bisect the third side of the triangle.
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