Euler's Identity Visualization

Created by NG KA YEE with Mathify.dev

The animation visually demonstrates Euler's identity \( e^{i\pi} + 1 = 0 \) on the complex plane, showing how rotating around the unit circle by \( \pi \) radians leads to the point \(-1\), and when you add \(1\), it reaches the origin \(0\).