Let $K,L$ be the point of tangencies of semicircles with diameters $BA,AC$ respectively with the common tangent. $E,F$ are the midpoints of sides $AB,BC$. Using twice the midline theorem we get $$\angle CAX=\angle FEK.$$$AB>BC\implies$ intersection $M$ of lines $EF,KL$ is closer to $F$ than $E$. Denote $a=BC,b=AC$. We have $$\triangle FML\sim\triangle EML\ (a,a,a)\implies\frac{FM}{a/2}=\frac{FM+b/2}{a/2+b/4}\implies FM=a\implies \sin\angle FEK=\sin\angle MFL=\frac{a/2}{FM}=\frac12.$$Hence the answer $$\angle CAX=60^\circ.$$

Solved here some time ago Estonia P10 2017