Cevians, Symmedians, and Excircles MA 341 – Topics in Geometry Lecture 16 Cevian A cevian is a line segment which joins a vertex of a triangle l with h a point on the h opposite side d (or ( its extension). B cevian A 05-Oct-2011 D MA 341 001 C 2 Cevian Triangle & Circle • Pick P in the interior of ∆ABC • Draw cevians from f each h vertex through h h P to the h opposite side • Gives set of three intersecting cevians AA AA’, BB BB’, and CC’ with respect to that point. • The triangle ∆A ∆A’B’C’ B C is known as the cevian triangle of ∆ABC with respect to P • Circumcircle of ∆A’B’C’ is known as the evian circle with respect to P. 05-Oct-2011 MA 341 001 3 Cevian circle Cevian C i triangle 05-Oct-2011 MA 341 001 4 Cevians In ∆ABC examples of cevians are: medians di – cevian i point i =G perpendicular bisectors – cevian point = O angle bisectors – cevian point = I (incenter) altitudes – cevian point = H Ceva’s ’ Theorem h deals d l with h concurrence of f any set of cevians. 05-Oct-2011 MA 341 001 5 Gergonne Point In ∆ABC find the incircle and points of tangency of f incircle i i l with i h sides id of f ∆ABC. ∆ BC Known as contact triangle g 05-Oct-2011 MA 341 001 6 Gergonne Point These cevians are concurrent! Why? Recall that AE=AF, BD=BF, and CD=CE Ge 05-Oct-2011 MA 341 001 7 Gergonne Point The point is called the Gergonne point, Ge. Ge 05-Oct-2011 MA 341 001 8 Gergonne Point Draw lines parallel to sides of contact g through ug Ge.. triangle 05-Oct-2011 MA 341 001 9 Gergonne Point Six points are concyclic!! Called the Adams Circle 05-Oct-2011 MA 341 001 10 Gergonne Point Center of Adams circle = incenter of ∆ABC 05-Oct-2011 MA 341 001 11 Isogonal Conjugates Two lines AB and AC through vertex A are g if one is the reflection said to be isogonal of the other through the angle bisector. 05-Oct-2011 MA 341 001 12 Isogonal Conjugates If lines through A, B, and C are concurrent g lines are concurrent at P,, then the isogonal at Q. Points P and Q are isogonal conjugates. 05-Oct-2011 MA 341 001 13 Symmedians In ∆ABC, the symmedian ASa is a cevian g vertex A ((Sa BC)) isogonally g y through conjugate to the median AMa, Ma being the p of BC. midpoint The other two symmedians BSb and CSc are defined y similarly. 05-Oct-2011 MA 341 001 14 Symmedians The three symmedians ASa, BSb and CSc concur in a p point commonly y denoted K and variably known as either • the symmedian point or • the Lemoine point 05-Oct-2011 MA 341 001 15 Symmedian of Right Triangle The symmedian point K of a right triangle is the midpoint of the altitude to the hypotenuse A hypotenuse. Mb K B 05-Oct-2011 C D MA 341 001 16 Proportions of the Symmedian Draw the cevian from vertex A, A through the symmedian point, to the opposite side of the triangle, triangle meeting BC at Sa. Then c b BSa c2 2 CSa b a 05-Oct-2011 MA 341 001 17 Length of the Symmedian Draw the cevian from vertex C, C through the symmedian point, to the opposite side of the triangle. triangle Then this segment has length 2 2 2 ab 2a 2b c CSc a2 b2 2 2 2 Likewise bc 2b 2c a ASa 2 2 b c ac 2a 2c b B b BS 2 2 a c 2 05-Oct-2011 MA 341 001 2 2 18 Excircles In several versions of geometry triangles are defined in terms of lines not segments. A C B 05-Oct-2011 MA 341 001 19 Excircles Do these sets of three lines define circles? Known as tritangent circles A C B 05-Oct-2011 MA 341 001 20 Excircles A IC rc IB rb I B C IA 05-Oct-2011 MA 341 001 ra 21 Construction of Excircles 05-Oct-2011 MA 341 001 22 Extend the sides 05-Oct-2011 MA 341 001 23 Bisect exterior angle at A 05-Oct-2011 MA 341 001 24 Bisect exterior angle at B 05-Oct-2011 MA 341 001 25 Find intersection Ic 05-Oct-2011 MA 341 001 26 Drop perpendicular to AB Ic 05-Oct-2011 MA 341 001 27 Find point of intersection with AB Ic 05-Oct-2011 MA 341 001 28 Construct circle centered at Ic Ic 05-Oct-2011 rc MA 341 001 29 05-Oct-2011 MA 341 001 30 Excircles The Ia, Ib, and Ic are called excenters. ra, rb, rc are called ll d exradii d 05-Oct-2011 MA 341 001 31 Excircles Theorem: The length of the tangent from a vertex to the opposite exscribed circle equals the semiperimeter, s. CP = s 05-Oct-2011 MA 341 001 32 Excircles 1. CQ Q = CP 2. AP = AY 3. CP = CA+AP = CA+AY Q BC+BY 4. CQ= 5. CP + CQ Q = AC + AY + BY + BC 6. 2CP = AB + BC + AC = 2s 7. CP = s 05-Oct-2011 MA 341 001 33 Exradii 1. CPICP 2 tan(C/2)=r 2. t (C/2) C/s / 3. Use Law of Tangents Ic C (s a)(s b) rc s tan s s(s ( c)) 2 05-Oct-2011 MA 341 001 s(s a)(s b) sc 34 Exradii Likewise 05-Oct-2011 ra s(s b)(s c) sa rb s(s a)(s c) s b rc s(s a)(s b) sc MA 341 001 35 Excircles Theorem: For any triangle ∆ABC 1 1 1 1 r r a rb rc 05-Oct-2011 MA 341 001 36 Excircles 1 1 1 ra rb rc sa s(s a)(s b)(s c) s(s a)(s b)(s c) sc s(s a)(s b)(s c) ( a)(s )( b)(s )( c)) s(s s 05-Oct-2011 s b 3s (a b c) sa s b sc s(s ( b)(s )( c)) s(s ( a)( a)(s c)) s(s ( a)( a)(s b)) s(s a)(s b)(s c) s K 1 r MA 341 001 37 Nagel Point In ∆ABC find the excircles and points of tangency of f the h excircles i l with i h sides id of f ∆ABC. 05-Oct-2011 MA 341 001 38 Nagel Point These cevians are concurrent! 05-Oct-2011 MA 341 001 39 Nagel Point Point is known as the Nagel point 05-Oct-2011 MA 341 001 40 Mittenpunkt Point The mittenpunkt of ∆ABC is the ymm point of p f the excentral triangle g symmedian (∆IaIbIc formed from centers of excircles)) 05-Oct-2011 MA 341 001 41 Mittenpunkt Point The mittenpunkt of ∆ABC is the point of f the lines f from m the intersection of excenters through midpoints of p g sides corresponding 05-Oct-2011 MA 341 001 42 Spieker Point The Spieker center is center of Spieker . ., the incenter of f the medial m circle,, i.e., triangle of the original triangle . 05-Oct-2011 MA 341 001 43 Special Segments Gergonne point, centroid and mittenpunkt are collinear GGe =2 GM 05-Oct-2011 MA 341 001 44 Special Segments Mittenpunkt, Spieker center and orthocenter are collinear 05-Oct-2011 MA 341 001 45 Special Segments Mittenpunkt, incenter and symmedian point K are collinear with w distance ratio IM 2(a2 +b2 + c2 ) = 2 MK (a +b + c) 05-Oct-2011 MA 341 001 46 Nagel Line The Nagel line is the line on which the g centroid , Spieker p incenter , triangle center Sp, and Nagel point Na lie. GNa =2 IG 05-Oct-2011 MA 341 001 47 Various Centers 05-Oct-2011 MA 341 001 48
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