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Polygon ABCDE has the vertices A(2, 8).
P(-8, 8), and -6, 6).
B(4, 12), C10, 12), D(8, 8), and E6, 6). Polygon MNOPQ has the vertices M-2, 8), M-4, 12), 0(-10, 12),
A transformation or sequence of transformations that can be performed on polygon ABCDE to show that It is congruent to polygon
MNOPQ is a reflection across the y-axis
If polygon MNOPQ Is translated 3 units right and 5 units down,
It will colncide with a congruent polygon, VWXYZ, with Its vertices at

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Answer:

A transformation or sequence of transformations that can be performed on polygon ABCDE to show that it is congruent to polygon MNOPQ is a:

Reflect across the y-axis

Explanation:

please, see the attached graph.

The polygon ABCDE is on the right side, first (I) quadrant.

The polygon MNOPQ is on the left side, second (ll) quadrant.

We can see that the polygon MNOPQ is a reflection of the polygon ABCDE across the y-axis ( only the abscissas change their signs from positive to negative).

Ver imagen cdj8498

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