Let $C_1$ be the touch point of the incircle with $AB$. Because $K$ lies outside of the incircle we have $$\angle A_1KB_1\le \angle A_1C_1B_1\iff$$$$180^\circ-2\angle C\le 90^\circ-\frac{\angle C}{2}\iff$$$$60^\circ\le\angle C$$

Let $I$ and $H$ be the incenter of $\triangle ABC$. Then Claim. $IH\|AB$ Proof. Suppose $IB_1$ and $IA_1$ meet $AB$ again at $B_2$ and $A_2$, then $$B_2A_2=B_2K+A_2K=AK+BK=AB$$hence $triangle AHB\cong\triangle A_2IB_2$ Hence $BHIB_2$ is a parallelogram as desired. $\blacksquare$ Therefore, $r=R\cos C$ so $$\cos C=\frac{r}{R}\leq \frac{1}{2}$$as desired.