This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
%I A197147 #6 Mar 30 2012 18:57:52
%S A197147 4,7,0,8,0,0,0,0,1,7,4,9,6,4,6,0,2,7,3,9,3,1,7,3,5,6,4,4,1,0,5,4,5,3,
%T A197147 5,3,3,8,5,0,6,9,2,6,7,9,9,5,1,2,9,0,8,3,1,2,1,0,9,5,6,9,5,1,9,1,4,2,
%U A197147 6,9,5,3,3,3,0,7,7,9,3,1,2,8,6,3,1,3,7,8,1,7,5,8,5,6,3,2,3,5,5
%N A197147 Decimal expansion of the shortest distance from the x axis through (4,1) to the line y=2x.
%C A197147 The shortest segment from one side of an angle T through a point P inside T is called the Philo line of P in T. For discussions and guides to related sequences, see A197032, A197008 and A195284.
%e A197147 length of Philo line: 4.708000017496..
%e A197147 endpoint on x axis: (4.92546, 0); see A197146
%e A197147 endpoint on line y=2x: (1.72768, 3.45536)
%t A197147 f[t_] := (t - k*t/(k + m*t - m*h))^2 + (m*k*t/(k + m*t - m*h))^2;
%t A197147 g[t_] := D[f[t], t]; Factor[g[t]]
%t A197147 p[t_] := h^2 k + k^3 - h^3 m - h k^2 m - 3 h k t + 3 h^2 m t + 2 k t^2 - 3 h m t^2 + m t^3
%t A197147 m = 2; h = 4; k = 1; (* slope m, point (h,k) *)
%t A197147 t = t1 /. FindRoot[p[t1] == 0, {t1, 1, 2}, WorkingPrecision -> 100]
%t A197147 RealDigits[t] (* A197146 *)
%t A197147 {N[t], 0} (* endpoint on x axis *)
%t A197147 {N[k*t/(k + m*t - m*h)],
%t A197147 N[m*k*t/(k + m*t - m*h)]} (* endpt on line y=2x *)
%t A197147 d = N[Sqrt[f[t]], 100]
%t A197147 RealDigits[d] (* A197147 *)
%t A197147 Show[Plot[{k*(x - t)/(h - t), m*x}, {x, 0, 5}],
%t A197147 ContourPlot[(x - h)^2 + (y - k)^2 == .004, {x, 0, 5}, {y, 0, 3}], PlotRange -> {0, 4}, AspectRatio -> Automatic]
%Y A197147 Cf. A197032, A197146, A197008, A195284.
%K A197147 nonn,cons
%O A197147 1,1
%A A197147 _Clark Kimberling_, Oct 11 2011