# Consider the following (unrealistic!) investment issue [closed]

Consider the following (unrealistic!) investment problem.

We have a set S of n potential investments, each given by a pair of floating point numbers (amount, estimated return) There is a total amount A to invest; we want to select investments to maximise the return on this amount.

One may select each investment (a,r) as a whole (spending all of a, and getting r return) or only can select only a fraction f (spending (f*a), and getting (f*r) return). The estimated return of a set of selections is the sum of the returns of the individual selections. Obviously, in selecting elements of S, we cannot spend more than the total amount A available.

Describe an efficient algorithm for computing the maximum estimated return that can be realised with amount A and set of investments S. What is the time complexity of your algorithm (in big-oh notation)?

Is it the best possible?

It is fine to describe your algorithm in words and/or pseudocode; there's no need to include code in a programming language.

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poorly 'disguised' homework. Shows no research or effort. F- –  Mitch Wheat Feb 25 '12 at 0:23
Well I researched whatever I could and I figured out that all the selections in the set could be sorted according to their return value and then the investment amount can be selected according to their return values. But I am stumped after that. –  pslayer89 Feb 25 '12 at 0:33

## closed as not a real question by Mitch Wheat, smparkes, Flexo♦, John Saunders, GravitonFeb 25 '12 at 2:44

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