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PLEASE ANSWER ASAP! WILL GIVE BRAINLIEST!Because of the unique line postulate, we can draw a unique line segment PM. Using the definition of reflection, PM can be reflected over line l. By the definition of reflection, point P is the image of itself and point N is the image of ________. Because reflections preserve length, PM = PN. point M point Q segment PM segment QM

PLEASE ANSWER ASAP WILL GIVE BRAINLIESTBecause of the unique line postulate we can draw a unique line segment PM Using the definition of reflection PM can be re class=

Respuesta :

point N is the image of M .

Step-by-step explanation:

given : P is a point on the perpendicular bisector, l, of MN.

to prove : PM = PN

.A Reflection is a transformation in which the figure is the mirror image of the other. Every point is a mirror reflection of itself .

By the definition of reflection, point P is the image of itself ,point N is the image of M .

The line l acts as a Line of symmetry  or axis of reflection.

Reflections preserve length so PM = PN.

hence , point N is the image of M .

Answer:

point M

Step-by-step explanation:

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