If $z_{1}\;,z_{2}$ are two complex number $(|z_{1}|\neq |z_{2}|)$ satisfying
$\bigg||z_{1}|-4\bigg|+\bigg||z_{2}|-4\bigg|=|z_{1}|+|z_{2}|$ $=\bigg||z_{1}|-3\bigg|+\bigg||z_{2}|-3\bigg|.$Then minimum of $\bigg||z_{1}|-|z_{2}|\bigg|$
Try: Let $|z_{1}|=a$ and $|z_{2}|=b$ and $a,b\geq 0$ and $a\neq b$
So $$|a-4|+|b-4|=|a|+|b| = |a-3|+|b-3|.$$
Let $A(0,0)$ and $B(3,3)$ and $C(4,4)$ and $P(a,b)$
Then $PA=PB=PC.$ and we have to find $|a-b|$
so i did not understand how can i conclude it,
could someone please explain me
Thanks
