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%I #5 Mar 30 2012 18:57:45
%S 6,5,8,0,5,2,5,9,6,8,2,3,1,4,3,9,7,9,5,9,1,2,2,6,4,9,3,8,8,7,8,9,4,3,
%T 8,6,6,6,0,8,2,7,9,8,0,7,1,5,6,3,6,8,4,9,1,7,5,2,8,9,9,0,2,6,1,5,7,1,
%U 6,3,0,5,6,9,9,4,8,4,7,7,6,5,9,2,8,5,4,3,4,9,0,5,1,8,7,7,6,6,4,9
%N Decimal expansion of shortest length, (A), of segment from side AB through centroid to side AC in right triangle ABC with sidelengths (a,b,c)=(1,3,sqrt(10)).
%C See A195304 for definitions and a general discussion.
%e (A)=0.658052596823143979591226493887894386660...
%t a = 1; b = 3; h = 2 a/3; k = b/3;
%t f[t_] := (t - a)^2 + ((t - a)^2) ((a*k - b*t)/(a*h - a*t))^2
%t s = NSolve[D[f[t], t] == 0, t, 150]
%t f1 = (f[t])^(1/2) /. Part[s, 4]
%t RealDigits[%, 10, 100] (* (A) A195446 *)
%t f[t_] := (t - a)^2 + ((t - a)^2) (k/(h - t))^2
%t s = NSolve[D[f[t], t] == 0, t, 150]
%t f2 = (f[t])^(1/2) /. Part[s, 4]
%t RealDigits[%, 10, 100] (* (B) A195447 *)
%t f[t_] := (b*t/a)^2 + ((b*t/a)^2) ((a*h - a*t)/(b*t - a*k))^2
%t s = NSolve[D[f[t], t] == 0, t, 150]
%t f3 = (f[t])^(1/2) /. Part[s, 1]
%t RealDigits[%, 10, 100] (* (C) A195448 *)
%t c = Sqrt[a^2 + b^2]; (f1 + f2 + f3)/(a + b + c)
%t RealDigits[%, 10, 100] (* Philo(ABC,G) A195449 *)
%Y Cf. A195304, A195447, A195448, A195449.
%K nonn,cons
%O 0,1
%A _Clark Kimberling_, Sep 18 2011
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