jasonmitchell:
The coordinates of the vertices of △ABC are A(1, 1) , B(5, 1) , and C(5, 3) . The coordinates of the vertices of △A′B′C′ are A′(−1, −1) , B′(−5, −1) , and C′(−5, −3) . Which statement correctly describes the relationship between △ABC and △A′B′C′ ? A. △ABC is congruent to △A′B′C′ because you can map △ABC to △A′B′C′ using a translation 2 units to the left and 2 units down, which is a rigid motion. B. △ABC is congruent to △A′B′C′ because you can map △ABC to △A′B′C′ using a reflection across the y-axis, which is a rigid motion. C. △ABC is not congruent to △A′B′C′ because there is no sequence of rigid motions that maps △ABC to △A′B′C′. D. △ABC is congruent to △A′B′C′ because you can map △ABC to △A′B′C′ using a rotation of 180° about the origin, which is a rigid motion.
dude:
If its not a dilation then its congruent
dude:
I'll be back
jasonmitchell:
k
jasonmitchell:
which one you prefer
dude:
B. △ABC is congruent to △A′B′C′ because you can map △ABC to △A′B′C′ using a reflection across the y-axis, which is a rigid motion.
jasonmitchell:
i thought it was D
jasonmitchell:
@dude
dude:
What makes you think that
jasonmitchell:
i just thought it was at first
dude:
Ahh I goofed my bad
dude:
You're right
jasonmitchell:
really ?
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