Link.
There is a nice approach to this problem that involves some physical insight.
In the following we'll refer to Takahashi as A and to Aoki as B.
Without loss of generality, assume $A_1 > B_1$. Consider A's relative motion with respect to B, i.e. imagine B is always at rest. The relative velocity of A is $A_1 - B_1$ for the first $T_1$ minutes and $A_2 - B_2$ for the subsequent $T_2$ minutes.
Let $S = (A_1 - B_1) T_1 + (A_2 - B_2) T_2$, we have
- if $S > 0$, A and B never meet,
- if $S = 0$, they meet infinitely many times,
- if $S < 0$, they meet some finite number of times.
In case $S < 0$, it's not hard to figure out the number of times A and B meet.
code
int main() { ll t1, t2; ll a1, a2, b1, b2; scan(t1, t2, a1, a2, b1, b2);b1 -= a1; b2 -= a2; if (b1 < 0) { b1 = -b1; b2 = -b2; } ll s = b1 * t1 + b2 * t2; if (s == 0) { println("infinity"); } else if (s > 0) { println(0); } else { s = -s; ll k = b1 * t1 / s; ll ans = 2 * k; if (b1 * t1 % s == 0) { ++ans; } else { ans += 2; } println(ans - 1); // -1 because we do not count the start of the run as a meet } return 0;
}