the verticals of ABC are A(2, -5), B (-3, 5), and C ( 3,-3). The triangle is reflected over the x-axis. use arrow notation to describe the original triangle and its reflection.
A.
A (2,-5), B(-3,5), C(3, -3) --> (2,-5), (-3,5) (3, -3)*****
B.
A (2,-5), B(-3,5), C(3, -3) --> (-2,5), (3, -5), (-3,3)
C.
A (2,-5), B(-3,5), C(3, -3) --> (-2,-5), (3,5), (-3,-3)
D.
A (2,-5), B(-3,5), C(3, -3) --> (2,5) (-3, -5), (3,3)
never mind I found the answer
HWELP
The correct answer is A. A (2,-5), B(-3,5), C(3, -3) --> (2,-5), (-3,5), (3, -3).
To describe the reflection over the x-axis, we need to negate the y-coordinate of each vertex.
Original Triangle:
A(2, -5)
B(-3, 5)
C(3, -3)
Reflected Triangle:
A(2, -(-5)) -> A(2, 5)
B(-3, -5) -> B(-3, 5)
C(3, -(-3)) -> C(3, 3)
Using arrow notation, we can represent the original triangle and its reflection as:
A (2,-5), B(-3,5), C(3, -3) --> (2,-5), (-3,5), (3, -3)