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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

107.0. "Geometry Problem V" by HARE::STAN () Mon Jul 30 1984 03:20

Newsgroups: net.math,net.puzzle
Path: decwrl!decvax!ittvax!dcdwest!sdcsvax!akgua!mcnc!ecsvax!pizer
Subject: Geometry V
Posted: Sun Jul 15 07:34:02 1984

Once again, I have another problem, although could be one of the last.  Here
goes:  In the obtuse triangle ABC (angle C is obtuse), point M is on AB such
that AM = MB, point D is on BC such that MD is prpndclr to BC, and point E
is a point on MA such that EC is prpndclr to BC.  Given the area of triangle
ABC is 24, then find area of triangle BED.  Good luck!

Billy Pizer
({decvax,akgua,ihnp4,burl}!mcnc!ecsvax!pizer)

T.R	Title	User	Date	Lines
107.1		HARE::STAN	`Mon Jul 30 1984 03:20`	42
	From: ROLL::USENET "USENET Newsgroup Distributor" 18-JUL-1984 22:07 To: HARE::STAN Subj: USENET net.math newsgroup articles Newsgroups: net.math Path: decwrl!dec-rhea!dec-tonto!luong Subject: Solution to Geometry V Posted: Tue Jul 17 09:02:48 1984 >Subject: Geometry V >Once again, I have another problem, although could be one of the last. Here >goes: In the obtuse triangle ABC (angle C is obtuse), point M is on AB such >that AM = MB, point D is on BC such that MD is prpndclr to BC, and point E >is a point on MA such that EC is prpndclr to BC. Given the area of triangle >ABC is 24, then find area of triangle BED. Good luck! >Billy Pizer Denoting by (XYZ) the area of a triangle XYZ: (MCB) = 0.5 BC.MD and (ECB) = 0.5 BC.EC therefore: (MCB)/(ECB) = MD/EC = DB/CB (since MD and EC are parallel) (1) Draw perpendiculars CC' and DD' to EB. Now: (DEB) = 0.5 EB.DD' and (ECB) = 0.5 EB.CC' Therefore: (DEB)/(ECB) = DD'/CC' = DB/CB (since DD' and CC' are parallel) (2) Combining (1) and (2) shows that: (DEB) = (MCB) (3) But (MCB) = 0.5 CC'.MB (MCB) = 0.5 CC'.(AB/2) = (0.5 CC'.AB)/2 = (ABC)/2 = 12 (4) Finally, combining (3) and (4): (DEB) = 12 ========== Van Luong Nguyen, Digital Equipment Corporation.
107.2		HARE::STAN	`Mon Jul 30 1984 03:21`	35
	Newsgroups: net.math Path: decwrl!amd!dual!zehntel!hplabs!oliveb!tymix!kanner Subject: queer identity Posted: Tue Jul 24 16:09:49 1984 Newsgroups: net.puzzle,net.math Path: decwrl!decvax!ittvax!dcdwest!sdcsvax!bmcg!asgb!gupta Subject: Geometry Puzzle 5 Posted: Thu Jul 26 12:22:14 1984 >Once again, I have another problem, although could be one of the last. Here >goes: In the obtuse triangle ABC (angle C is obtuse), point M is on AB such >that AM = MB, point D is on BC such that MD is prpndclr to BC, and point E >is a point on MA such that EC is prpndclr to BC. Given the area of triangle >ABC is 24, then find area of triangle BED. Good luck! >Billy Pizer Solution> As M is the mid-point of AB, area(MCB) = area(MCA) = 1/2 area(ABC) = 12 ... (1) Also, area(DMC) = area(DME) ... (2) because they are on the same base (DM) and have the same height (DM is parallel to CE). Now, area(MCB) = area(MDB) + area(DMC) = area(MDB) + area(DME) ... (from 2) = area(BED) . . . area(BED) = 12 ... (from 1) Yogesh Gupta sdcrdcf --- bmcg!asgb!gupta sdcsvax ---/