It satisfies to show that $(a+b+c)(1/a+1/b+1/c)\ge 9$, which is trivial by Cauchy @below sure! Let A denote the area and a, b, and c the side lengths. We know $h_i=\frac{2A}{i}$, thus $2A*\sum_{cyc}\frac{1}{a}\ge \frac{9*2A}{a+b+c}$, then simplify.

Can you please clarify how you got that.

Using that $\frac1{h_a}+\frac1{h_b}+\frac1{h_c}=\frac1r$. for instance here

@above, what is incorrect?