# algorithm - How to solve an arithmetic expression DAG?

There are two related excises in The Algorithm Design Manual.

Basically, I know how to solve the first excise, but I don't know how to solve the 2nd one using the first one's solution as a hint.

## Excise of an arithmetic expression tree

Above is an arithmetic expression tree. Suppose an arithmetic expression is given as a tree. Each leaf is an integer and each internal node is one of the standard arithmetical operations (+,−,∗,/). For example, the expression 2 + 3 ∗ 4 + (3 ∗ 4)/5 is represented by the tree in above Figure. Give an O(n) algorithm for evaluating such an expression, where there are n nodes in the tree.

Ok, this is not hard. My solution is like this:

``````    public float evaluate() {
return evaluate(root);
}

private float evaluate(Node_EX _node) {
if (_node.left == null || _node.right == null)
return Float.parseFloat(_node.key);
String op = _node.key;
if (op == "+") {
return evaluate(_node.left) + evaluate(_node.right);
} else if (op == "-") {
return evaluate(_node.left) - evaluate(_node.right);
} else if (op == "*") {
return evaluate(_node.left) * evaluate(_node.right);
} else {
return evaluate(_node.left) / evaluate(_node.right);
}
}
``````

I just use recursive way to solve the expression tree for the result.

## Excise of an arithmetic expression DAG

Suppose an arithmetic expression is given as a DAG (directed acyclic graph) with common subexpressions removed. Each leaf is an integer and each internal node is one of the standard arithmetical operations (+,−,∗,/). For example, the expression 2 + 3 ∗ 4 + (3 ∗ 4)/5 is represented by the DAG in above Figure. Give an O(n + m) algorithm for evaluating such a DAG, where there are n nodes and m edges in the DAG. Hint: modify an algorithm for the tree case to achieve the desired efficiency.

Ok, there is such a hint in the description: Hint: modify an algorithm for the tree case to achieve the desired efficiency.

I am quite confused by this hint, actually. For a typical tree related thing, we normally can use recursive to solve. However, if this is a graph, my first intuitive is to use BFS or DFS to solve it. Then how can I relate BFS or DFS to the tree, though DFS is actually a recursive?

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