1.the vertices of triangle abc are A(2, -5) B(-3,5) C(3, -3). the trianlge is reflected over the x-axsis. use the arrow notation to discribe the origanal triangle and its reflection.
wouldn't the answer be the same measurements?
yes
To describe the original triangle ABC and its reflection over the x-axis, we can use the arrow notation.
The original triangle ABC has vertices A(2, -5), B(-3, 5), and C(3, -3). Let's use the arrow notation to describe the original triangle:
A(2, -5) ⟶ B(-3, 5) ⟶ C(3, -3)
Now, let's reflect the original triangle over the x-axis. To reflect a point over the x-axis, we need to keep the x-coordinate the same, but change the sign of the y-coordinate. Let's do that for each vertex:
A(2, -5) reflected over the x-axis becomes A(2, 5)
B(-3, 5) reflected over the x-axis becomes B(-3, -5)
C(3, -3) reflected over the x-axis becomes C(3, 3)
Now, we can use the arrow notation to describe the reflected triangle:
A(2, 5) ⟶ B(-3, -5) ⟶ C(3, 3)
So, the original triangle ABC with vertices A(2, -5), B(-3, 5), and C(3, -3) is reflected over the x-axis to get a new triangle with vertices A(2, 5), B(-3, -5), and C(3, 3).