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 brainliest and 20 points! Which best explains whether or not ΔABC ≅ ΔLMN? The figures are congruent because a 270° rotation about the origin and then a reflection over the x-axis will map ΔABC onto ΔLMN. The figures are congruent because a 90 rotation about the origin and then a reflection over the x-axis will map ΔABC onto ΔLMN. The figures are not congruent because point B corresponds with point N and point C corresponds with point M. The figures are not congruent because there is no rigid transformation or combination of rigid transformations that will map ΔABC onto ΔLMN.

brainliest and 20 points Which best explains whether or not ΔABC ΔLMN The figures are congruent because a 270 rotation about the origin and then a reflection o class=

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frika

Triangle ABC has vertices at points A(-1,1), B(-4,1) and C(-1,5).

270° rotation about the origin in anti-clockwise direction has the rule:

(x,y)→(y,-x).

Then

  • A(-1,1)→A'(1,1);
  • B(-4,1)→B'(1,4);
  • C(-1,5)→C'(5,1).

Reflection about the x-axis has the rule

(x,y)→(x,-y).

Then

  • A'(1,1)→L(1,-1);
  • B'(1,4)→M(1,-4);
  • C'(5,1)→N(5,-1).

Thus, triangles ABC and LMN are congruent.

Answer: correct option is A.

GWay

The answer is A.

A) ΔRST ≅ ΔACB

I hope this helps anyone looking for the answer to this Q <//3 sorry

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