Locus of Points (Posted on 2007-12-12)

	Submitted by Bractals
Rating: 3.0000 (2 votes)
Solution:	(Hide)
Clearly the center O is in the locus. Let point P ≠ O be inside C. Let the line OP intersect C at points A and B with P between O and B. ∑ni=1 |XiP|/|PYi| = ∑ni=1 |XiP|2/|XiP|·|PYi| = ∑ni=1 XiP•XiP/|AP|·|PB| = ∑ni=1 (OP - OXi)•(OP - OXi)/(r + |OP|)·(r - |OP|) = [∑ni=1 |OP|2 + |OXi|2 - 2OP•OXi] / [r2 - |OP|2] = [n(r2 + |OP|2) - 2OP•∑ni=1 OXi] / [r2 - |OP|2] = [n(r2 + |OP|2) - 2OP•nOG] / [r2 - |OP|2] = n[r2 + (|OP|2 - 2OP•OG)] / [r2 - |OP|2] = n if OP•OG = |OP|2. ,where G is the center of mass of the points X1, X2, ... , Xn. Clearly the center of mass G is in the locus since OG•OG = |OG|2. OP•OG = |OP|2 <==> OP•OG - |OP|2 = 0 <==> OP•(OG - OP) = 0 <==> OP•PG = 0 But, the locus of points P satisfying OP•PG = 0 is the circle with OG as a diameter. Note: CD denotes the vector from point C to point D. Note: CD•EF denotes the dot product (scaler product) of vectors CD and EF.

	Subject	Author	Date
	Puzzle Answer	K Sengupta	2023-09-30 07:59:20
	re: Solution	Charlie	2007-12-15 18:13:44
	re: Solution	Charlie	2007-12-14 12:52:55
	re: Solution	Charlie	2007-12-14 10:09:42
	Solution	Praneeth	2007-12-14 08:25:37
	re(3): Solution (spoiler)	Charlie	2007-12-14 00:47:20
	re(2): Solution (spoiler)	Praneeth	2007-12-13 23:11:57
	re: Solution (spoiler)	Charlie	2007-12-13 10:34:15
	Solution (spoiler)	Praneeth	2007-12-13 01:44:59
	and also	Charlie	2007-12-13 00:21:20
	re: three points again -- that second one got cut off	Charlie	2007-12-13 00:19:33
	three points again	Charlie	2007-12-13 00:18:04
	Hint	Praneeth	2007-12-13 00:07:18
	three regularly spaced points	Charlie	2007-12-12 22:06:32
	third point	Charlie	2007-12-12 22:04:34
	re: exploration with computer -- 2 non-opposing points	Charlie	2007-12-12 19:52:15
	exploration with computer	Charlie	2007-12-12 19:48:10