rotation and enlargement rotation and reduction reduction enlargement \( \square \) \( \square \) \( \square \) \( \square \) \( \square \) greater than 1 reflection and enlargernert

Did you know that transformations like rotations and enlargements have roots in ancient geometry? Greek mathematicians like Euclid explored these concepts over 2,000 years ago, laying the foundation for how we understand shapes and their movements today. Imagine a world where these brilliant minds flipped, turned, and stretched shapes without the aid of modern technology! In the real world, these transformations are not just limited to math exercises; they are critical in fields like computer graphics and animation. For instance, when animators create a character that spins or grows larger on screen, they are using rotation and enlargement to bring those characters to life. This means that the exciting transformations discussed in math class have actual applications in making your favorite movies!