How do I simplify $$\frac{\sin(x)}{1+\cos(x)}+\frac{1+\cos(x)}{\sin(x)}?$$ Any help would be appreciated.
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3 Answers
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$$\frac{\sin(x)}{1+\cos(x)}+\frac{1+\cos(x)}{\sin(x)}=\frac{\sin^{2}(x)+\cos^{2}(x)+2\cos(x)+1}{\sin(x)(1+\cos(x))}=\frac{2}{\sin(x)}$$
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This is not recommended as the best way here, but can work if stuck. Let $t=\tan \frac x2$ so that $$\sin x = \frac {2t}{1+t^2}; \cos x =\frac {1-t^2}{1+t^2}$$The original expression becomes (after multiplying numerators and denominators by $1+t^2$) $$\frac {2t}{1+t^2+1-t^2}+\frac {1+t^2+1-t^2}{2t}=t+\frac 1t=\frac {t^2+1}t=\frac 2{\sin x}$$
answered May 25, 2014 at 3:59
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Using the identity $\frac{\sin(x)}{1+\cos(x)}=\frac{1-\cos(x)}{\sin(x)}$ and substituting in the given, we get
$$\frac{\sin(x)}{1+\cos(x)}+\frac{1+\cos(x)}{\sin(x)}=\frac{1-\cos(x)}{\sin(x)}+\frac{1+\cos(x)}{\sin(x)} =\frac{2}{\sin(x)}$$
