Description: Ildar is the algorithm teacher of William and Harris. Today, Ildar is teaching Cartesian Tree. However, Harris is sick, so Ildar is only teaching William. A cartesian tree is a rooted tree, that can be constructed from a sequence of distinct integers. We build the cartesian tree as follows: 1. If the sequence is empty, return an empty tree; 2. Let the position of the maximum element be $$$x$$$; 3. Remove element on the position $$$x$$$ from the sequence and break it into the left part and the right part (which might be empty) (not actually removing it, just taking it away temporarily); 4. Build cartesian tree for each part; 5. Create a new vertex for the element, that was on the position $$$x$$$ which will serve as the root of the new tree. Then, for the root of the left part and right part, if exists, will become the children for this vertex; 6. Return the tree we have gotten. For example, this is the cartesian tree for the sequence $$$4, 2, 7, 3, 5, 6, 1$$$: After teaching what the cartesian tree is, Ildar has assigned homework. He starts with an empty sequence $$$a$$$. In the $$$i$$$-th round, he inserts an element with value $$$i$$$ somewhere in $$$a$$$. Then, he asks a question: what is the sum of the sizes of the subtrees for every node in the cartesian tree for the current sequence $$$a$$$? Node $$$v$$$ is in the node $$$u$$$ subtree if and only if $$$v = u$$$ or $$$v$$$ is in the subtree of one of the vertex $$$u$$$ children. The size of the subtree of node $$$u$$$ is the number of nodes $$$v$$$ such that $$$v$$$ is in the subtree of $$$u$$$. Ildar will do $$$n$$$ rounds in total. The homework is the sequence of answers to the $$$n$$$ questions. The next day, Ildar told Harris that he has to complete the homework as well. Harris obtained the final state of the sequence $$$a$$$ from William. However, he has no idea how to find the answers to the $$$n$$$ questions. Help Harris! Input Format: The first line contains a single integer $$$n$$$ ($$$1 \le n \le 150000$$$). The second line contains $$$n$$$ integers $$$a_1, a_2, \ldots, a_n$$$ ($$$1 \le a_i \le n$$$). It is guarenteed that each integer from $$$1$$$ to $$$n$$$ appears in the sequence exactly once. Output Format: Print $$$n$$$ lines, $$$i$$$-th line should contain a single integer — the answer to the $$$i$$$-th question. Note: After the first round, the sequence is $$$1$$$. The tree is The answer is $$$1$$$. After the second round, the sequence is $$$2, 1$$$. The tree is The answer is $$$2+1=3$$$. After the third round, the sequence is $$$2, 1, 3$$$. The tree is The answer is $$$2+1+3=6$$$. After the fourth round, the sequence is $$$2, 4, 1, 3$$$. The tree is The answer is $$$1+4+1+2=8$$$. After the fifth round, the sequence is $$$2, 4, 1, 5, 3$$$. The tree is The answer is $$$1+3+1+5+1=11$$$.