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Algorithm to find the maximum sum in a sequence of overlapping intervals

I was solving the following modified activity scheduling (Greedy approach) problem :

Given a set S of n activities with and start time, **Si** and **fi**, finish time of an **ith** activity. Also given weight **wi** ,*the cost earned by Foo for doing ith activities*.

The problem is to select the activities that **maximizes foo earnings**. We have to return the maximum cost that can be earn by foo.*Assume that Foo can only work on a single activity at a time*.

Note::

This is similar to classic Activity selection problem ,here the only difference is ,for each activities ,we are given a cost wi . And the goal here is too different -*Instead of finding maximum size set of mutually compatible activities* ,In this problem we have to find set of those activities that maximise foo total earnings .

Example

```
Total activities N=4
Si fi wi
0 1 4000
2 5 100
1 4 3000
4 5 2500
Max earning=9500 (Answer)
```

How do i modify the classical greedy activity selection algorithm ,for solving this problem . What logic should i use to solve the above problem?