Given the x, y, z coordinates of three points P_1, P_2, P_3 with the angle between them being angle P_1 P_2 P_3, how do you find a point, say at a distance of 1 from P_2, on the line that bisects the angle?

Licinilg

Licinilg

Open question

2022-08-21

How do you find a point on a line bisecting an angle in three-dimensional space?
Given the x, y, z coordinates of three points P 1 , P 2 , P 3 with the angle between them being P 1 P 2 P 3 , how do you find a point, say at a distance of 1 from P 2 , on the line that bisects the angle?I know from the angle bisector theorem that the point must be equidistant from the the vector ( P 3 P 2 ) and ( P 1 P 2 ), but I can't seem to figure out how to find such a point in 3-space.

Answer & Explanation

Paola Mercer

Paola Mercer

Beginner2022-08-22Added 11 answers

Step 1
Assume P 1 , P 2 ,  and  P 3 aren't collinear. Put v 1 = P 1 P 2 and v 2 = P 3 P 2 . You need to find v span { v 1 , v 2 } satisfying the relationship v 1 v | | v 1 | | = v 2 v | | v 2 | | . If you write v = c 1 v 1 + c 2 v 2 you'll immediately recognize that v 1 v | | v 1 | | = v 2 v | | v 2 | | c 2 = c 1 ( | | v 1 | | v 1 v 2 | | v 2 | | | | v 2 | | v 1 v 2 | | v 1 | | )
Step 2
So if we assign c 1 = 1 and c 2 = | | v 1 | | v 1 v 2 | | v 2 | | | | v 2 | | v 1 v 2 | | v 1 | | we see v = v 1 + ( | | v 1 | | v 1 v 2 | | v 2 | | | | v 2 | | v 1 v 2 | | v 1 | | ) v 2 and the line l ( t ) = P 2 + t v bisects P 1 P 2 P 3 . Notice how l ( 1 | | v | | ) is a point on this bisector that lands one unit away from P 2 .
Paulkenyo

Paulkenyo

Beginner2022-08-23Added 1 answers

Step 1
The sum of the two unit vectors v = P 2 P 1 / | P 2 P 1 | + P 2 P 3 / | P 2 P 3 | is a vector lying on the bisector of the angle between them.
Step 2
Make v unitary, multiply it by the distance d you want from P 2 and add to O P 2 .

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