\tan(C/2)=\tan(\pi/2-(A+B)/2)=\frac{1}{\tan((A+B)/2)}=\frac{1-\tan(A/2)\tan(B/2)}{\tan(A/2)+\tan(B/2)} Let a=\tan(A/2), b=\tan(B/2), c=\tan(C/2), all positive, the constraint becomes c=(1-ab)/(a+b) ...

HINT : Formulate a general identity for \tan (\pi-x).

Multiply numerator and denomination by the conjugate of a+jw i.e. a-jw So the numerator becomes a 2 -w 2 - 2awj and the denominator will be real and you'll be able to solve it and get the ...

Assume that \arcsin(a)+\arcsin(b)\in\left[-\frac\pi2,\frac\pi2\right]. Then, since\sin\left(\arcsin(a)+\arcsin(b)\right)=a\sqrt{1-b^2}+b\sqrt{1-a^2},we have\arcsin(a)+\arcsin(b)=\arcsin\left(a\sqrt{1-b^2}+b\sqrt{1-a^2}\right).

If |x|<1, then x^4+1>1>x. If |x|\geq 1, then x^4+1>x^4\geq x. In both cases x^4-x+1>0 so the equation x^4-x+1=0 have no real solutions. Note that x=1 is not a solution of original ...

Oke so I decided to just brute-force this for the residu in z=\frac{\pi}{2} (z=-\frac{\pi}{2} is similar) \begin{align} (z-\frac{\pi}{2})\tan{z-\frac{\pi}{2}}&=(z-\frac{\pi}{2})\frac{\sin{z-\frac{\pi}{2}}}{\cos{z-\frac{\pi}{2}}}\\ &=(z-\frac{\pi}{2})\frac{1-\frac{1}{2!}(z-\frac{\pi}{2})^2+\frac{1}{4!}(z-\frac{\pi}{2})^4\cdots}{-(z-\frac{\pi}{2})+\frac{1}{3!}(z-\frac{\pi}{2})^3-\frac{1}{5!}(z-\frac{\pi}{2})^5\cdots}\\ &=-\frac{1-\frac{1}{2!}(z-\frac{\pi}{2})^2+\frac{1}{4!}(z-\frac{\pi}{2})^4\cdots}{1-\lbrack\frac{1}{3!}(z-\frac{\pi}{2})^2-\frac{1}{5!}(z-\frac{\pi}{2})^4\cdots\rbrack}\\ &=-\lbrack 1-\frac{1}{2!}(z-\frac{\pi}{2})^2+\frac{1}{4!}(z-\frac{\pi}{2})^4\cdots\rbrack\lbrack 1+ \left(\frac{1}{3!}(z-\frac{\pi}{2})^2-\frac{1}{5!}(z-\frac{\pi}{2})^4\cdots\right)+\left(\frac{1}{3!}(z-\frac{\pi}{2})^2-\frac{1}{5!}(z-\frac{\pi}{2})^4\cdots\right)^2+\cdots\rbrack\\ &=-1+\left(\frac{1}{2!}-\frac{1}{3!}\right)(z-\frac{\pi}{2})^2\cdots \end{align} ...