1. A segment, ray, line or plane that is perpendicular to a
segment at its midpoint. (CD, ED & FD)
Points that are the same distance away from another point.
(A, B & C are equidistant to D)
When 3, or more, lines, rays, etc.. intersect the same point
they are concurrent to each other. (AD, BD & CD)
The point of intersection between 3, or more, lines, rays, ect..
(Point D)
The point of concurrency between the 3 perpendicular
bisectors of a triangle.
(Also Point D)

2. equidistant CB
Perpendicular
Bisector
Perpendicular
Bisector

3. AB
4x x - 6 2
4x (2)

4. equidistant Theorem JN LN JK LK JM LM
JK could be shown equal to LK using the LL triangle congruence theorem too.
JN LN
JK LK
the
Perpendicular Bisector
JM LM
equidistant
Converse of the Perpendicular Bisector
Theorem

5. GK = HK, GJ = HJ, GF = HF, JK = JK
2x = x + 1
x = 1
GH = GK + HK
GH = 2x + x + 1
GH = 2(1) +(1) + 1
GH = 4

6. PB PC

7. Perpendicular Bisectors
Theorem
Perpendicular Bisectors
Perpendicular Bisectors

8. B D C A