Select the correct answer. Vertex A in quadrilateral ABCD lies at (-3, 2). If you rotate ABCD 180° clockwise about the origin, what will be the coordinates of A′ of the rotated quadrilateral A′B′C′D′? (

3, -2)

(-3, 2)

(-2, 3)

(-3, -2)

Question

contestada

Respuesta :

kanest kanest · Answer 1 · 2018-07-12T23:46:53+02:00

When you rotate a point 180 degrees around the origin, the point values will be transformed in this way:

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

The x value is -3, and the y value is 2. In this rotation, the x value becomes positive, and the y value becomes negative.

The new x value will be 3, and the new y value will be -2. The answer is (3, -2).

Answer Link

dinakrul7366 dinakrul7366 · Answer 2 · 2021-12-15T19:45:49+01:00

Answer:The coordinate of A' after rotated through 180° is (3,-2)

Step-by-step explanation:

Given vertex A in a quadrilateral ABCD lies at (-3,2). Now we have to rotate the quadrilateral ABCD 180° clockwise about the origin.

The point (x,y) is when rotated about the origin through 90° in clockwise direction then the new position will be (y,-x).

Now,the point A which is given is (-3,2)

First after rotation through 90° the new point will be (2-(-3)) = (2,3)

Again this point further rotated through 90° or we can say that rotation after 180° then the new point become A' = (3,-2).

Hence, The coordinate of A' after rotated through 180° is (3,-2)

Step-by-step explanation:

Hope this helps if not sorry