Point E(0, -2) is a vertex of square DEFG. After a 90* clockwise rotation of the square about the origin, which of the following is the location of E?

A. (-2,0)
B. (2,0)
C. (2,2)
D. (0,2)

Point D(-3,5) is a vertex of triangle DEF. After rotation of the triangle about the origin D us located at (3,5). Which of the following was the rotation of the triangle?

A. 90* (degrees) clockwise
B. 90* Counterclockwise
C. 180*
D. 360*

And if anyone knows the answers to the rest of the questions, that would be awesome!!!

Doing this right now

It's a and the other one was c and if your doing my work the others are b,c

1. A (-2,0)

2.c 180
These are the correct answers
Trust me will pass it! I just took and got 100% pass!

To determine the new location of point E after a 90-degree clockwise rotation about the origin, we can use the rotation formula for a point (x, y) by 90 degrees.

For a point (x, y) rotated 90 degrees clockwise, the new coordinates are given by (-y, x).

In this case, point E(0, -2) is being rotated, so we substitute x = 0 and y = -2 into the formula:

(-y, x) = (-(-2), 0) = (2, 0)

Therefore, after a 90-degree clockwise rotation about the origin, point E will be located at coordinates (2, 0). So, the answer is option B.

For the second question, since point D remains at (3, 5) after rotation, it means that the rotation does not change the position of point D.

In this case, the rotation is 360 degrees (or any multiple of 360 degrees), which means the triangle remains in its original position and orientation. Therefore, the answer is option D: 360 degrees.

If you need help with any other questions, please provide them, and I'll be happy to assist you!