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parallelogram law
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(Theorem)
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Let $ABCD$ be a parallelogram with side lengths $u,v$ and whose diagonals have lengths $d_1$ and $d_2$ then $$2u^2+2v^2=d_1^2 + d_2^2.$$
 <45>> \begin{pspicture*}(-1,-1)(6,3) \pspolygon(0,0)(4,0)(5,2)(1,2) \uput[270](2,-0.3){$u$} \uput[180](0.3,1){$v$} \qline(0,0)(5,2) \qline(4,0)(1,2) \uput[0](1.7,0.5){$d_1$} \uput[0](1.8,1.5){$d_2$} \end{pspicture*} } \end{center} \end{document}
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"parallelogram law" is owned by drini. [ owner history (1) ]
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Cross-references: diagonals, lengths, side, parallelogram
There are 2 references to this entry.
This is version 6 of parallelogram law, born on 2001-12-11, modified 2005-01-19.
Object id is 1082, canonical name is ParallelogramLaw.
Accessed 12906 times total.
Classification:
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Pending Errata and Addenda
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