Evaluate :

$\Big(\dfrac{\text{sin 77°}}{\text{cos 13°}}\Big)^2$ + $\Big(\dfrac{\text{cos 77°}}{\text{sin 13°}}\Big)^2$ - 2 cos² 45°

$\Big(\dfrac{\text{sin 77°}}{\text{cos 13°}}\Big)^2 + \Big(\dfrac{\text{cos 77°}}{\text{sin 13°}}\Big)^2 - \text{2 cos}^2 45°\\[1em] = \Big(\dfrac{\text{sin (90° - 13°)}}{\text{cos 13°}}\Big)^2 + \Big(\dfrac{\text{cos (90° - 13°)}}{\text{sin 13°}}\Big)^2 - \text{2 cos}^2 45°\\[1em] = \Big(\dfrac{\text{cos 13°}}{\text{cos 13°}}\Big)^2 + \Big(\dfrac{\text{sin 13°}}{\text{sin 13°}}\Big)^2 - \text{2 cos}^2 45°\\[1em] = \Big(\dfrac{\cancel{cos 13°}}{\cancel{cos 13°}}\Big)^2 + \Big(\dfrac{\cancel{sin 13°}}{\cancel{sin 13°}}\Big)^2 - \text{2 cos}^2 45°\\[1em] = 1^2 + 1^2 - 2 \times \Big(\dfrac{1}{\sqrt2}\Big)^2\\[1em] = 1 + 1 - 2 \times \Big(\dfrac{1}{2}\Big)\\[1em] = 2 - 1\\[1em] = 1$

Hence, $\Big(\dfrac{\text{sin 77°}}{\text{cos 13°}}\Big)^2 + \Big(\dfrac{\text{cos 77°}}{\text{sin 13°}}\Big) - \text{2 cos}^2 45° = 1$.