Consider the incomplete paragraph proof. Given: P is a point on the perpendicular bisector, l, of MN. Prove: PM = PN Line l is a perpendicular bisector of line segment M N. It intersects line segment M N at point Q. Line l also contains point P. Because of the unique line postulate, we can draw 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
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Answer:
POINT N IS THE IMAGE OF M
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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 .
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