Geometry Problem. Post your solution in the comment box below.

Level: Mathematics Education, High School, Honors Geometry, College.

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## Thursday, August 10, 2017

### Geometry Problem 1341: Isosceles Triangle, 80-20-80 Degrees, Circumcenter, Angle Bisector

Labels:
20,
80 degrees,
angle bisector,
circumcenter,
isosceles,
triangle

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Problem 1341

ReplyDeleteSuppose the AD crosses the circle at point E, then arcBE=arcEC and <ECB=40, <ECO=50=<OEC (<COE=80).I form the equilateral triangle OCF (F is arcEC ).

Is < FOE=20, if G is circumcenter of triangle FOE then GO=GE=GF and <GOE=10=<GEO.

Is triangle OGC=triangle GFC so <GCO=<GCF=60/2=30.But <FCE=<FOE/2=20/2=10

and <ECG=20.Now triangle DCE=triangle GEC so DC=GE.But triangle OCD=triangle OEG

(OC=OE,DC=GE,<OCD=10=<OEG) ,soOD=DC=GO=GE.Therefore <ODB=<DOC+<DCO=

=10+10=20.

APOSTOLIS MANOLOUDIS 4 HIGH SCHOOL OF KORYDALLOS PIRAEUS GREECE

Problem 1341 (sulotion 2)

ReplyDeleteLet K point on AB such that KA=KO , then <KAO=10=<KOA. I form the equilateral triangle

ΟΚL (the point L is located on the right of BC).Then the point K is the circumcenter the

triangle AOL.So <LAO=<LKO/2=60/2=30=<DAO so the point L belongs to AD.

Is triangle AOK=triangle COL(OA=OC,OK=OL,<KOA=10=<LOC),then LC=LO=KO=KA and

<LCO=10,so the point L belongs to BC.

Therefore the points D,L coincide and <ODB=<OLB=<LOC+<LCO=10+10=20.

APOSTOLIS MANOLOUDIS 4 HIGH SCHOOL OF KORYDALLOS PIRAEUS GREECE

In order to prove "triangle AOK=triangle COL" above, how do we know that "10=<LOC" since we don't know yet that L is on BC?

Deletehttps://ibb.co/df8rta

ReplyDeleteLet AO intersects BC in E. Since AB=BC and OA=OB we have DH is a perpendicular bisector of AE => FA=FE => EF=EB (5). From (3) and (4) and the AAS => triangle ADC=triangel ADF => AC=AF and DC=DF => AD is a perpendicular bisector of FC. Let the perpendicular bisector of BC intersects BC in M and AD in T => TC=TF=TB (6). From (5) and (6) => ET is a perpendicular bisector of FB, i.e. ET _|_ FB. Let TE intersects BF in K => triangle BEK~trianle TEM => D,O,E and T lie on a circle and from (7) => <ODE=<OTE=20.