Proposed Problem
Click the figure below to see the complete problem 372 about Circles, Common Internal and External Tangent, Angles.
See more:
Complete Geometry Problem 372
Level: High School, SAT Prep, College geometry
Sunday, October 25, 2009
Problem 372: Circles, Common Tangent, Angles
Subscribe to:
Post Comments (Atom)
draw BC' perpendicular to CE
ReplyDeleteextend GB to G' ( on circle)
draw G'E' tangent on G'
=> E'G'//EG ( both perpendicular to GG')
=>ang G'C'E' = FCE
=> C'G'//HM
=> HC' = MG' ( HMG'C' trapezoid )
=> ang MG'G'' = α ( G" tg E'G'G")
=> ang MBG' = 2α
=> x + 2α = 180
x = 180 - 2α
--------------------------------------------
EB bisect mDEG and mECF=mCFE =>
ReplyDeleteHM//EG⊥GD
α+x/2=mHMD+mMDG=90° <=>
x=180°-2α
If < FGH = € then < GDH = €
ReplyDeleteNow < GHM = x/2 hence < FCE = x/2 - €
Considering the angles of Tr. CMD,
x/2 -€ + @ + x/2 + € +@ = 180
Therefore x = 180-2@
Sumith Peiris
Moratuwa
Sri Lanka
Let m(BED) = a and read @ as alpha
ReplyDeleteEDBG is cyclic and Tr.EGB & Tr.EBD are congruent (SSS). Hence m(GBD)=180-2a---(1)
Since CE=CF=> m(ECF)=a and CM||EB.
Hence m(MHD)=a+@=>m(MBD)=2a+2@----(2)
=>x=360-(1)-(2) = 180-2@