Sunday, May 22, 2011

Geometry Problem 603: Parallelogram, Diagonals, Congruence, Concurrency

Geometry Problem
Click the figure below to see the complete problem 603.

Geometry Problem 603: Parallelogram, Diagonals, Congruence, Concurrency.

Posted by Antonio Gutierrez at 3:04 PM
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2 comments:

  1. Peter TranMay 22, 2011 at 9:56 PM

    http://img405.imageshack.us/img405/8158/problem603.png
    1. Since EHGF is a parallelogram so EF=GH and
    Angle (BHG)= Angle (BMF)= Angle (MFD)
    and Angle (MEA)= Angle (FPC)= Angle (PGN)
    and Triangle(BHG) congruence to Triangle (DFE) Case ASA
    AH=BH-AB =DF-DC=CF similarly we also have AE= CG
    2. Let O is the intersection of AC and BD
    we have Triangle (AEO) congruence to Triangle (CGO) case SAS
    so Angle(COG)= Angle (AOE) and E,O,G are collinear
    Similarly H,O,F are collinear.
    3. We have Triangle ( AQH) congruence to Triangle (CPF) caseASA
    and Triangle (HQO) congruence to Triangle (FPO) case SAS
    Angle(HOQ)= Angle (FOP) so P,O, Q are collinear
    Similarly M,O,N are collinear

    Peter Tran

    ReplyDelete
  2. PravinJune 1, 2011 at 3:50 AM

    AH // and = CF imply BHDF is a parallelogram and so FH, BD bisect each other at O.

    Similarly BEDG is a parallelogram implies that
    EG and BD bisect each other at O.

    ReplyDelete

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