Geometry Problem. Post your solution in the comment box below.
Level: Mathematics Education, High School, Honors Geometry, College.
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Saturday, December 3, 2016
Geometry Problem 1291 Three Squares, Collinear Vertices, Midpoint, Congruence
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https://goo.gl/photos/mimSHwEKYejTtxPm9
ReplyDeleteLet M,N, P, O are the projection of J, E, G and B over AC
Note that triangles CMJ congruent to ENC . Triangle ENA congruent to APG
So CM=EN= u and JM=CN=v ( see sketch)
and EN=AP=u and AN=PG= v1
OP=OA+AP=w+u =OC+CM=OM => O is the midpoint of PM
AC=AN+NC=v1+v=BD=2.w=> w=1/2(v+v1)
In trapezoid GPMJ , middle base OB’=1/2(PG+MJ)= ½(v1+v)=OB
So B coincide to B’ => G, B, J are collinear and B is the midpoint of GJ
Prolem 1291
ReplyDeleteTriangle GAB=triangle AED (AG=AE,AB=AD,<GAB=90+<EAB=<EAD), so GB=ED and <GBA=<EDA.But triangle ECD=triangle JCB (EL=LJ,CD=CB, <ECD=<BCJ=90+<ECB ), so
BJ=DE and <CBJ=<CDE.Then GB=BJ and <GBJ=<GBA+<ABC+<CBJ=90+<ADE+<EDC=90+90=180. Therefore the points G,B and J are
collinear.
APOSTOLIS MANOLOUDIS 4 HIGH SCHOOL KORYDALLOS PIRAEUS GREECE
It is also true that in this question FB=BH and FB is perpendicular to BH. Any suggestions for proof?
ReplyDeleteSuggestions: See the problem 496 at
Deletehttp://www.gogeometry.com/problem/p496_triangle_two_square_side_concurrent_90_degrees.htm
Found it: Let P be the midpoint of GE; Q the midpoint of EJ
ReplyDeletePEQB is a parallelogram (PB is midpoint segment in Triangle EGJ)
Triangle FPB congruent with Triangle BQH
Hence, FB=BH
<FBP+<FBH+<HBQ+<BQE=180 (cointerior angles in p'gram) I
<HBQ+<BQE+<QHB=90 (adds up to 180 in triangle) II
<FBP=<QHB (matching angles in congruent triangles)
Subtract II from I: <FBH=90
Find another way to prove that FB=BH and FB ⊥ BH
DeleteSee the drawing
See the drawing
ReplyDelete∠GAB= ∠GAE+∠EAB=Π/2+∠EAB
∠EAD= ∠EAB+ ∠BAD=∠EAB+ Π/2
=> ∠GAB= ∠EAD
=> ΔGAB is congruent to ΔEAD (SAS)
=> GB=ED
=> ∠GBA= ∠EDA
In the same way, ΔJCB is congruent to ΔECD (SAS)
=>JB=ED
=> ∠CBJ= ∠EDC
GB=ED and JB=ED Therefore BG=BJ
∠ADC= Π/2=∠ADE+∠EDC
∠GBJ = ∠GBA +∠ABC+∠CBJ= ∠ADE+Π/2 +∠EDC= Π
Therefore G,B and J are aligned
Define I intersection of GJ and ED
∠CJI= ∠CEI => CJIE are concyclic
=> ∠ECJ= ∠EIJ => ∠EIJ = Π/2
Therefore GJ ⊥DE
From Problem 496
: CF=AH, CF⊥ AH and CF AH and GJ are concurrent (K)
CF⊥ AH => KF⊥ KH => FH diameter of circle FKH
∠AKC= ∠ABC = Π/2
=>ABKC are concyclic
=> ∠BAK= ∠BCK
=> ∠BAH= ∠BCF
Δ BAH is congruent to Δ BCF (SAS)
=> BH=BF and ∠BHA= ∠BFC
=> ∠BHK= ∠BFK
=>FBKH are concyclic
KF⊥ KH Therefore BF⊥ BH
CK⊥ KH and CE⊥ EH =>CKEHJ are concyclic
=> ∠EKC= 3Π/2= ∠EKJ + ∠JKC = ∠EKJ + ∠JEC = ∠EKJ + Π/2
=> ∠EKJ= Π/2
K and I on GJ, IE⊥ GJ and KE⊥ GJ
Therefore K=I