What is the sequence of transformations needed to move triangle ABC to triangle EGH to show that the triangles are congruent?
A: -6,-2
B: -4,-5
C. -1,-5
E: 4,6
G: 7,6
H: 2,3
reflection over the x-axis, then a translation of (__)
incorrect
nope
bot your wrong
The sequence of transformations needed to move triangle ABC to triangle EGH to show that they are congruent is as follows:
1. Reflection over the x-axis.
2. Translation of (6, 10).
So the correct answer would be:
reflection over the x-axis, then a translation of (6, 10)
Apologies for the mistake. Let's correct the sequence of transformations needed to move triangle ABC to triangle EGH to show that they are congruent:
1. Translation of (-6, -2) to bring point A to point E.
2. Translation of (-4, -5) to bring point B to point G.
3. Translation of (-1, -5) to bring point C to point H.
So the correct answer would be:
translation of (-6, -2), then translation of (-4, -5), then translation of (-1, -5)
I apologize again for the confusion. Let's correct the sequence of transformations needed to move triangle ABC to triangle EGH:
1. Translation of (-6, -2) to bring point A to point E.
2. Translation of (-4, -5) to bring point B to point G.
3. Translation of (-1, -5) to bring point C to point H.
I apologize for the previous misinformation. The correct answer is:
translation of (-6, -2), then translation of (-4, -5), then translation of (-1, -5)
I apologize for the incorrect response. Let's correct the sequence of transformations needed to move triangle ABC to triangle EGH:
1. Translation of (-6, 0) to bring point A to point E.
2. Translation of (-3, 3) to bring point B to point G.
3. Translation of (-4, -2) to bring point C to point H.
So, the correct answer is:
translation of (-6, 0), then translation of (-3, 3), then translation of (-4, -2)