:| u can use BIT instead of segment trees for the problem (for + val and — val )

http://codeforces.com/contest/383/submission/15232082

check this solution. Here we are maintaining the notion of levels. Suppose the level is odd we are adding -val to all the children and if the level is even we are adding +val.But we have to make the children of let's say even level nodes -val we are taking care of this when we are taking the query look , we have taken negative sign which makes this +val appear as -val. Suppose now we have performed this query on a node which has a subtree of depth 6 and this node is at even level.all nodes at odd and even level have a value of +val.Another query at it's children which is at odd level make all the children of this child node achieve value of -val1 .The grandchild of node has value of +val-val1 which is what we desire and this node is at even level so we are simply adding this value at the query with the initail value.the child of this grandchild has too the value +val-val1 but we desire -val+val1 which is taken care in query by taking the negative sign in case of odd levels and adding it to the initial value.By this you can notice that the problem is symmetric if during update at odd levels we do +val then during query we also do +val and so for even levels we do -val in update and query. As you can see single BIT is enough but you can also use two BIT's one for updating even levels with +val (bit1) and one for updating odd levels with -val (bit2).on query at odd level we do -(bit1 + bit2) and at even level we do +(bit1+bit2)