\( \cos (A-B) \) to prove that \( \cos (A-B)=\cos A \cdot \cos B+\sin A \cdot \sin B \) nplify: \( \frac{\cos \left(\theta-90^{\circ}\right)}{} \)

Did you know that the cosine of the difference between two angles, \(A\) and \(B\), can be visually represented using the unit circle? When you plot points for \(A\) and \(B\), the angles form a right triangle within the circle, allowing you to observe how the lengths of adjacent and opposite sides correspond to the expressions in the cosine difference formula. This connection lays the groundwork for understanding a variety of trigonometric identities! When simplifying \(\cos (\theta - 90^{\circ})\), you can utilize the cosine function's behavior at specific angles. It turns out that \(\cos(\theta - 90^{\circ})\) is equal to \(\sin(\theta)\). This can be a handy relationship in various applications, like converting problems in trigonometry or physics where phase shifts occur, allowing you to easily switch between sine and cosine representations. Remember, trigonometric identities and transformations are your best friends when you want to untangle angles!