In this problem at each moment you have a set of intervals. You can move from interval
(a,b) from our set to interval
(c,d) from our set if and only if
c<a<d or c<b<d. Also there is a path from interval
I1 from our set to interval
I2 from our set if there is a sequence of successive moves starting from
I1 so that we can reach
I2.
Your program should handle the queries of the following two types:
-
"1 x y" (x<y) − add the new interval (x,y) to the set of intervals. The length of the new interval is guaranteed to be strictly greater than all the previous intervals.
-
"2 a b" (a≠b) − answer the question: is there a path from a-th (one-based) added interval to b-th (one-based) added interval?
Answer all the queries. Note, that initially you have an empty set of intervals.