સાબિત કરો કે $\frac{\cos ^{2}\left(45^{\circ}+\theta\right)+\cos ^{2}\left(45^{\circ}-\theta\right)}{\tan \left(60^{\circ}+\theta\right) \tan \left(30^{\circ}-\theta\right)}=1$

(N/A) ડા.બા. $= \frac{\cos ^{2}\left(45^{\circ}+\theta\right)+\cos ^{2}\left(45^{\circ}-\theta\right)}{\tan \left(60^{\circ}+\theta\right) \cdot \tan \left(30^{\circ}-\theta\right)}$
નિત્યસમ $\cos \theta = \sin(90^{\circ}-\theta)$ અને $\tan \theta = \cot(90^{\circ}-\theta)$ નો ઉપયોગ કરતા:
અંશ: $\cos ^{2}\left(45^{\circ}+\theta\right) + \sin ^{2}\left(90^{\circ}-(45^{\circ}-\theta)\right) = \cos ^{2}\left(45^{\circ}+\theta\right) + \sin ^{2}\left(45^{\circ}+\theta\right) = 1$
છેદ: $\tan \left(60^{\circ}+\theta\right) \cdot \cot \left(90^{\circ}-(30^{\circ}-\theta)\right) = \tan \left(60^{\circ}+\theta\right) \cdot \cot \left(60^{\circ}+\theta\right) = \tan \left(60^{\circ}+\theta\right) \cdot \frac{1}{\tan \left(60^{\circ}+\theta\right)} = 1$
તેથી,$\frac{1}{1} = 1 = \text{જ.બા.}$