Triagle abc is reflected over the y-axis what are the coordinates of the refected triangle describe in words what happens to the x coordinates and the y coordinates of the orignal triangle's vertices as a result of this reflection

The "Connections Math" Account has been IP banned, so I have bought a laptop and went to a place with free wifi to write this. Collins is correct, if you need an answer let me know. I have the full quizlet.

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reflection move from
(x,y).....(-x,y)

To find the coordinates of the reflected triangle after reflecting Triangle ABC over the y-axis, you need to understand what happens to the x and y coordinates of the original triangle's vertices.

The y-axis is a vertical line that serves as a mirror for the reflection. When a point is reflected over the y-axis, its x-coordinate changes sign (+ to - or - to +), while its y-coordinate remains the same.

Let's say Triangle ABC has vertices A(x1, y1), B(x2, y2), and C(x3, y3).

After reflecting over the y-axis:
- The x-coordinate of vertex A will change sign, becoming -x1, while the y-coordinate remains the same, y1.
- The x-coordinate of vertex B will change sign, becoming -x2, while the y-coordinate remains the same, y2.
- The x-coordinate of vertex C will change sign, becoming -x3, while the y-coordinate remains the same, y3.

So, the coordinates of the reflected triangle will be:
Vertex A: (-x1, y1)
Vertex B: (-x2, y2)
Vertex C: (-x3, y3)

In summary, when a triangle is reflected over the y-axis, the x-coordinates of its vertices change sign while the y-coordinates remain the same.

is easy right???

@Help... easy... yea math is easy... *rolls eyes*