chrisynchen · August 20, 2021 09:27
diff --git a/LC 1339 Maximum Product of Splitted Binary Tree b/LC 1339 Maximum Product of Splitted Binary Tree
 Given the root of a binary tree, split the binary tree into two subtrees by removing one edge such that the product of the sums of the subtrees is maximized.

 Return the maximum product of the sums of the two subtrees. Since the answer may be too large, return it modulo 109 + 7.

 Note that you need to maximize the answer before taking the mod and not after taking it.

 
 Example 1:
 Input: root = [1,2,3,4,5,6]
 Output: 110
 Explanation: Remove the red edge and get 2 binary trees with sum 11 and 10. Their product is 110 (11*10)

 Example 2:
 Input: root = [1,null,2,3,4,null,null,5,6]
 Output: 90
 Explanation: Remove the red edge and get 2 binary trees with sum 15 and 6.Their product is 90 (15*6)

 Example 3:
 Input: root = [2,3,9,10,7,8,6,5,4,11,1]
 Output: 1025

 Example 4:
 Input: root = [1,1]
 Output: 1
 

 Constraints:
 The number of nodes in the tree is in the range [2, 5 * 104].
 1 <= Node.val <= 104

 class Solution {
    long max = 0;
    private static final int MOD = 1000000007;
    public int maxProduct(TreeNode root) {
        int total = 0;
        
        //Morris traversal
        TreeNode temp = root;
        while(temp != null) {
            if(temp.left == null) {
                total += temp.val;
                temp = temp.right;
            } else {
                TreeNode prev = temp.left;
                while(prev.right != null && prev.right != temp) {
                    prev = prev.right;
                }
                
                if(prev.right == null) {
                    prev.right = temp;
                    temp = temp.left;
                } else {
                    prev.right = null;
                    total += temp.val;
                    temp = temp.right; 
                }
            }
        }
        
        
        traversal(root, total);
        
        return (int) (max % MOD);
    }
    
    private long traversal(TreeNode node, long sum) {
        if(node == null) return 0;
        
        long left = traversal(node.left, sum);
        long right = traversal(node.right, sum);
        
        max = Math.max(max, (left * sum - left));
        max = Math.max(max, (right * sum - right));

        return node.val + left + right;
    }
 }
	Given the root of a binary tree, split the binary tree into two subtrees by removing one edge such that the product of the sums of the subtrees is maximized.

	Return the maximum product of the sums of the two subtrees. Since the answer may be too large, return it modulo 109 + 7.

	Note that you need to maximize the answer before taking the mod and not after taking it.


	Example 1:
	Input: root = [1,2,3,4,5,6]
	Output: 110
	Explanation: Remove the red edge and get 2 binary trees with sum 11 and 10. Their product is 110 (11*10)

	Example 2:
	Input: root = [1,null,2,3,4,null,null,5,6]
	Output: 90
	Explanation: Remove the red edge and get 2 binary trees with sum 15 and 6.Their product is 90 (15*6)

	Example 3:
	Input: root = [2,3,9,10,7,8,6,5,4,11,1]
	Output: 1025

	Example 4:
	Input: root = [1,1]
	Output: 1


	Constraints:
	The number of nodes in the tree is in the range [2, 5 * 104].
	1 <= Node.val <= 104

	class Solution {
	long max = 0;
	private static final int MOD = 1000000007;
	public int maxProduct(TreeNode root) {
	int total = 0;

	//Morris traversal
	TreeNode temp = root;
	while(temp != null) {
	if(temp.left == null) {
	total += temp.val;
	temp = temp.right;
	} else {
	TreeNode prev = temp.left;
	while(prev.right != null && prev.right != temp) {
	prev = prev.right;
	}

	if(prev.right == null) {
	prev.right = temp;
	temp = temp.left;
	} else {
	prev.right = null;
	total += temp.val;
	temp = temp.right;
	}
	}
	}


	traversal(root, total);

	return (int) (max % MOD);
	}

	private long traversal(TreeNode node, long sum) {
	if(node == null) return 0;

	long left = traversal(node.left, sum);
	long right = traversal(node.right, sum);

	max = Math.max(max, (left * sum - left));
	max = Math.max(max, (right * sum - right));

	return node.val + left + right;
	}
	}