16. A picture of a star has 6 identically matched points. What is the least number of degrees that you can

rotate the star onto itself? (1 point)
60°
120°
180°
240

How do i figure this out?

60°

60 degrees I think

sally are you right?

To figure out the least number of degrees that you can rotate the star onto itself, you need to find the angle of rotation that brings each point of the star back to its original position.

Since the star has 6 identically matched points, it means that you need to find the angle of rotation that brings every 1/6th of a rotation back to its original position.

To do this, you can divide 360° (a full rotation) by the number of points on the star. In this case, the star has 6 points, so you would divide 360° by 6 to get the angle of rotation for each point.

Therefore, the least number of degrees you can rotate the star onto itself is 360° / 6 = 60°.

So, the correct answer is 60°.