We've AC = AM + MC = DF+ MC = DE + EF + MC or 1 = DE/AC + EF/AC + MC/AC ---(1). Noting that triangles GMC, GEF, BDE & BAC are all similar we can say that their areas are proportional to the squares of their corresponding sides. Hence DE/AC = V(S1/S) where V(x)=square root of x. Similarly, EF/AC=V(S2/S) and MC/AC=V(S3/S). BY (1) we can say that 1 = V(S1/S)+V(S2/S)+V(S3/S) or VS= V(S1)+ V(S2)+ V(S3) QED Ajit
Solution to problem 97. Let h, h1, h2 and h3 be the altitudes of triangles ABC, DBE, FGE and MGC, corresponding to sides BC, BE, EG and GC, respectively. As these four triangles are similar, BC/h = BE/h1 = EG/h2 = GC/h3 = k. For the areas we have S = BC.h/2 = (k/2).h*2, S1 = BE.h1/2 = (k/2).h1*2, S2 = EG.h2/2 = (k/2).h2*2 and S3 = GC.h3/2 = (k/2).h3*2. Then sqr(S) = sqr(k/2).h, sqr(S1) = sqr(k/2).h1, sqr(S2) = sqr(k/2).h2 and sqr(S3) = sqr(k/2).h3. So sqr(S1) + sqr(S2) + sqr(S3) = = sqr(k/2).(h1 + h2 + h3) = = sqr(k/2).h = sqr(S). We have used here the result of problem 91, h = h1 + h2 + h3.
We've AC = AM + MC = DF+ MC = DE + EF + MC
ReplyDeleteor 1 = DE/AC + EF/AC + MC/AC ---(1). Noting that triangles GMC, GEF, BDE & BAC are all similar we can say that their areas are proportional to the squares of their corresponding sides. Hence DE/AC = V(S1/S) where V(x)=square root of x. Similarly, EF/AC=V(S2/S) and MC/AC=V(S3/S). BY (1) we can say that 1 = V(S1/S)+V(S2/S)+V(S3/S) or VS= V(S1)+ V(S2)+ V(S3) QED
Ajit
Solution to problem 97.
ReplyDeleteLet h, h1, h2 and h3 be the altitudes of triangles ABC, DBE, FGE and MGC, corresponding to sides BC, BE, EG and GC, respectively.
As these four triangles are similar,
BC/h = BE/h1 = EG/h2 = GC/h3 = k.
For the areas we have
S = BC.h/2 = (k/2).h*2,
S1 = BE.h1/2 = (k/2).h1*2,
S2 = EG.h2/2 = (k/2).h2*2
and S3 = GC.h3/2 = (k/2).h3*2.
Then sqr(S) = sqr(k/2).h,
sqr(S1) = sqr(k/2).h1,
sqr(S2) = sqr(k/2).h2
and sqr(S3) = sqr(k/2).h3.
So sqr(S1) + sqr(S2) + sqr(S3) =
= sqr(k/2).(h1 + h2 + h3) =
= sqr(k/2).h = sqr(S).
We have used here the result of problem 91,
h = h1 + h2 + h3.