If $\cos\alpha = \frac{l\cos\beta+m}{l+m\cos\beta}$, then $\frac{\tan^2(\alpha/2)}{\tan^2(\beta/2)} =$
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The half-angle identity $\tan^2(\theta/2) = \frac{1-\cos\theta}{1+\cos\theta}$ is extremely useful for problems that relate trigonometric functions of an angle $\alpha$ to functions of an angle $\beta$ through a formula for $\cos\alpha$.