-Vj capmZ0Zb431 38@t33f>f31fff30fff32fff>1>>LF A Study of MediansL L L 4L LTF _\ONi D 8@t Page: LL|  :!( (ipL erWritI{ by: Makyado V NNVH n BN0 @ P(($N$ @ P-h Refl 8@tC Center F Mark Mirror G- Mark Vector Mark Distance kCˀC "'lt{p 8@tBepeat setrgbcolor pop}bd4 e ICC O\TaT 8@tAO( X[)O( Vvxx8CB]PPS#e 8@t American Heritage DictionaryApple Video PlayerAppleCD Audil s @ghConjectures: The medians of a triangle (green) intersect at a single point (P) called the centroid. The centroid of a triangle divides each median into two parts so that the distance from the centroid to the midpoint is half the distance from the centroid to the vertex. }`EpTtp{|,{HH4i  8@t CancelӅ`ӊRemoveӂӅ 8V[Point P is the centroid of the triangle. A centroid is the center of the triangle's mass.@ӊJXӅ`Ws `ӆL-pӅ?dK 8@tm1  m{!:A}ABC = @@K@, P;8( @\Pl6@;.33"3""@lj-V1#:#@ Angle(ABC) = N@3(2@KNdPp-V(10@u 0pP@K\p@< T"-V -Vd!@DTl8@V\ ?@-?s(@h 8@$H0h@,@ dh`t d@*0 d@!@z d@, N[2.  8@tlU=@ nfL0.H2.H//N0.H2.H//N "-AJo=|CˀCCB?!H0  8@tk//N П.:*šj<*j02H//N0H2H//N П\DCC CˀC?/ N!at  8@tj 08<>???>6#CBCC ?w?|D-H 8@t midpt f)2D CB \ag/. 8@t midpt E)2D CC kyp~?< 8@t midpt D)2D C@B ' 8@tx00@ CC C@B?' 8@ty J J  CCCB? 1L' 8@tz J JT` CˀCCB? |\a 8@tPp Ո Db$$pq Ոp CUBUU N[a4  8@taaIHDR5IHR6 IHDR7CUBUUCB?{[at Se  8@t abok Stickies Shut ownPt0wP `CUBUUCC? x 8@t m5{p `Ո E4$${P{ @Ո{P 0  m {S:PA} = @@K@, P;8( @\Pl6@;.33"3""@lj-V1#:#@Length(Segment PA) = N@3(2@KNdPp-V(10@u 0pP@K\p@< T"-V -Vd!@DTl8@V\ ?@-?s(@h 8@$H0h@,@ dh`t d@*0 d@!@z d@,  8@t m6ك 0Ո E4$$كك Ոك  m {S:Pmidpt E} = @@K@, P;8( @\Pl6@;.33"3""@lj-V1#:#@Length(Segment Pmidpt E) = 3(2@KNdPp-V(10@u 0pP@K\p@< T"-V -Vd!@DTl8@V\ ?@-?s(@h 8@$H0h@,@ dh`t d@*0 d@!@z d@,  8@t m7wwUUDD {D:m {S:Pmidpt E}}{m {S:PA}} = @K@, P;8( @\Pl6@;.33"3""@lj-V1#:#@.Length(Segment Pmidpt E)/Length(Segment PA) = 3(2@KNdPp-V(10@u 0pP@K\p@< T"-V -Vd!@DTl8@V\ ?@-?s(@h 8@$H0h@,@ dh`t d@*0 d@!@z d@, @  8@t hq E4$$phqph0Length(Segment Pmidpt E)Length(Segment PA)Length(Segment Pmidpt E)/Leng>ĺ?kĺ?>ç ?C ?>ѻ?ѹ?