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Conference rusure::math

Title:	Mathematics at DEC

Moderator:	RUSURE::EDP

Created:	Mon Feb 03 1986
Last Modified:	Fri Jun 06 1997
Last Successful Update:	Fri Jun 06 1997
Number of topics:	2083
Total number of notes:	14613

1123.0. "Quadrilateral Problem" by AITG::DERAMO (Daniel V. {AITG,ZFC}:: D'Eramo) Tue Sep 19 1989 02:05

Article 6962 of sci.math
Path: ryn.esg.dec.com!shlump.nac.dec.com!decuac!haven!purdue!mailrus!cs.utexas.edu!uunet!yale!cmcl2!acf5!ambati
From: ambati@acf5.NYU.EDU (ambati)
Newsgroups: sci.math
Subject: Quadrilateral Problem
Message-ID: <846@acf5.NYU.EDU>
Date: 18 Sep 89 16:05:37 GMT
Reply-To: ambati@acf3.UUCP ()
Organization: New York Univsersity
Lines: 12

I came across a couple of interesting geometric problems that I haven't been 
able to solve fully.

On the sides of a convex quadrilateral are erected externally directed 
squares.  Show that the centers of these squares form a square.  What if the 
squares are directed internally?

Any help or reference would be appreciated.

Thanks.

B.K.Ambati

T.R	Title	User	Personal Name	Date	Lines
1123.1		AITG::DERAMO	Daniel V. {AITG,ZFC}:: D'Eramo	`Wed Sep 20 1989 13:38`	44
	Article 6977 of sci.math Path: ryn.esg.dec.com!shlump.nac.dec.com!decuac!haven!rutgers!njin!princeton!phoenix!tycchow From: tycchow@phoenix.Princeton.EDU (Timothy Yi-chung Chow) Newsgroups: sci.math Subject: Re: Quadrilateral Problem Message-ID: <10494@phoenix.Princeton.EDU> Date: 19 Sep 89 13:42:48 GMT References: <846@acf5.NYU.EDU> <88.UUL1.2#239@valley.UUCP> Reply-To: tycchow@phoenix.Princeton.EDU (Timothy Yi-chung Chow) Organization: Princeton University, NJ Lines: 32 In article <88.UUL1.2#239@valley.UUCP> stan@valley.UUCP (Stanley L. Kameny) writes: >> On the sides of a convex quadrilateral are erected externally directed >> squares. Show that the centers of these squares form a square. What if the >> squares are directed internally? > >For one thing, it is easy to find counterexamples. Neither case works >if the quadrilateral has two very small adjacent sides, and two long >sides. > >The problems must be stated incorrectly! O.K., I guess it's time for me to clear up the situation. I've already e-mailed a solution to the original poster but it looks like I should post an article. The correct statement of the problem is: Show that if you join the centers of opposite squares, the two resulting line segments are equal in length and perpendicular. (This is actually true even if the quadrilateral is concave or "degenerate.") There is also a related problem: Take the midpoints of the two line segments mentioned above, and take the midpoints of the diagonals of the original quadrilateral. Show that these four points form a square. I posted this problem to rec.puzzles a couple of months ago but as far as I can recall, no correct solutions were posted. HINT FOLLOWS: Embed the quadrilateral in the complex plane and note that multiplication by i is equivalent to a 90 degree rotation.
1123.2	Triangles work...	AKQJ10::YARBROUGH	I prefer Pi	`Wed Sep 20 1989 19:14`	10
	>> On the sides of a convex quadrilateral are erected externally directed >> squares. Show that the centers of these squares form a square. What if the >> squares are directed internally? While this statement is unprovable, the equivalent statement for triangles is provable; i.e. that for any triangle, the centers of externally directed equilateral triangles erected on the three sides are the vertices of an equilateral triangle. LAAEFTR (no, not laughter, but Left As An Exercise For The Reader).
1123.3	Morley's theorem	ALLVAX::ROTH	If you plant ice you'll harvest wind	`Fri Sep 22 1989 03:42`	5
	Along similar lines to .2, if you intersect the appropriate trisectors of the angles of an arbitrary triangle, pairwise, then the points are the vertices of a little equilateral triangle. - Jim