How is this possible? $A_1A'$, $B_1B'$, and $C_1C'$ are parallel to each other because they are all perpendicular to $\ell$, so they cannot intersect.

yes, there was a typo, corrected, $AA',BB',CC'$ is the correct, instead of $A_1A',B_1B',C_1C'$, thanks for noticing

It can be done quickly with complex numbers. Let $a, b, c$ be the complex numbers corresponding to $A_1, B_1, C_1$ and WLOG that $\ell$ is the horizontal line through the origin. This allows us to calculate $A' = \frac1a, B' = \frac1b, C' = \frac1c.$ We also have that $A = \frac{2bc}{b+c}, B = \frac{2ca}{a+c}, C = \frac{2ab}{a+b}.$ We have that $z = \frac{2(a+b+c+2abc)abc - 2}{(ab+bc+ca+2)(a+b+c+2abc)-abc}$ lies on all three lines $AA', BB', CC'$. $\square$

It's obvious by steinbart theorem since $A', B', C' \in (I)$ and $A_1A', B_1B', C_1C'$ are concurrent at a point at infinity