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How can you tell by looking at the coordinates of the two triangles that δ a'b'c' is a 180° rotation of δ abc?

a.the coordinates cannot prove a 180° rotation.

b.the y-coordinates of the points on δa'b'c' have opposite signs from the corresponding points on δabc.

c.the x-coordinates of the points on δa'b'c' have opposite signs from the corresponding points on δabc. eliminate

d.both the x and y coordinates of the points on δa'b'c' have opposite signs from the corresponding points on δabc?

Respuesta :

Answer:

Option d is correct.

Both the x and y coordinates of the point on δa'b'c' have opposite signs from the corresponding points on δabc.

Step-by-step explanation:

The rule of 180 degree rotation about the origin is:

[tex](x, y) \rightarrow (-x , -y)[/tex]

Since a Rotation of a point through 180°, about the origin when a point a(h, k)  is rotated about the origin through 180° in anticlockwise or clockwise direction.

then, By the rule of 180 degree rotation;

[tex]a(h, k) \rightarrow a'(-h , -k)[/tex]

so, it takes the new position i.e, [tex]a'(-h , -k)[/tex]

Therefore, both the x and y coordinates of the point on δa'b'c' have opposite signs from the corresponding points on δabc.