Hint For problem, of this type, Weierstrass substitution (or tangent half-angle substitution) is extremely useful. Using t=\tan(x/2), you have \sin(x)=\frac{2t}{1+t^2} \cos(x)=\frac{1-t^2}{1+t^2} ...

\displaystyle{I}=-{\csc{{x}}}+{\ln}{\left|{\sec{{x}}}+{\tan{{x}}}\right|}+{\ln}{\left|{\sec{{x}}}\right|}+{\ln}{\left|{\sin{{x}}}\right|}+{\cot{{x}}}-{\ln}{\left|{\csc{{x}}}-{\cot{{x}}}\right|}+{c} ...

Let I=\int\frac{\cos x}{\sin x+\cos x}\ dx and J=\int \frac{\sin x}{\sin x+\cos x}\ dx. Then I+J=\int\frac{\cos x+\sin x}{\sin x+\cos x}\ dx=x+C_1 and I-J=\int\frac{\cos x-\sin x}{\sin x+\cos x}\ dx=\ln |\sin x+\cos x|+C_2 ...

\displaystyle{\ln{{2}}} Explanation: using the result \displaystyle\int\frac{{{f}'{\left({x}\right)}}}{{{f{{\left({x}\right)}}}}}{\left.{d}{x}\right.}={\ln}{\left|{f{{\left({x}\right)}}}\right|}+{C} ...

\displaystyle\int{\left({\cos{{\left({x}\right)}}}-{\sin{{\left(\frac{{x}}{{2}}-\pi\right)}}}\right)}{\left.{d}{x}\right.}={\sin{{\left({x}\right)}}}-\frac{{1}}{{2}}{\cos{{\left(\frac{{x}}{{2}}\right)}}}+{C} ...

Remember that \dfrac{\cos(x)}{\sin(x)} = \cot(x) and not \tan(x). An easier way to do \int \dfrac{\cos(x)}{\sin(x)} dx is to do as follows. Hence, I = \int \dfrac{\cos(x)}{\sin(x)} dx. Set ...