\( \cos ^ { 2 } ( 45 ^ { \circ } - A ) - \sin ^ { 2 } ( 45 ^ { \circ } - A ) \)

Did you know that the expression \( \cos^{2}(45^{\circ} - A) - \sin^{2}(45^{\circ} - A) \) can be simplified using a trigonometric identity? It actually utilizes the identity \( \cos^{2}(x) - \sin^{2}(x) = \cos(2x) \). So, you can rewrite your expression as \( \cos(2(45^{\circ} - A)) \), or ultimately \( \cos(90^{\circ} - 2A) \), which is \( \sin(2A) \)! In real-world settings, this applies to physics phenomena such as wave interference, where the sine and cosine functions represent different wave motions. Understanding how to manipulate these trigonometric identities can make analyzing harmonic motion, signal processing, or even electrical circuits much easier—and who wouldn't want to impress their friends with cool sound wave troubles?