$A$ is brother of $B$ with probability of $P_1$;
$B$ is brother of $C$ with probability of $P_2$;
How we can find probability of $A$ is brother of $C$ ($P_3$), based on $P_1$ and $P_2$?
All events are independent.
$A$ is brother of $B$ with probability of $P_1$;
$B$ is brother of $C$ with probability of $P_2$;
How we can find probability of $A$ is brother of $C$ ($P_3$), based on $P_1$ and $P_2$?
All events are independent.
There's not enough information to solve the problem. In particular, it's possible that A and C are brothers but B is not their brother, but we have no information on what the probability of that event might be.
If we assume that this probability is zero (or negligibly small), and if the events "A is a brother of B" and "B is a brother of C" are independent, then the answer is trivial: $P_3 = P_1 P_2$. But that's a lot of unstated assumptions.