Given a knapsack of some capacity $C$ and $n$ objects with object $i$ having weight $w_i$ and profit $p_i$, the goal is to choose some subset of the objects that can fit in the knapsack (i.e. the sum of their weights is no more than $C$) while maximizing profit.

This can be formulated as a mixed-integer program as: $$ \begin{array}{ll} \mbox{maximize} & x' p \\ \mbox{subject to} & x \in \{0, 1\} \\ & w' x <= C \\ \end{array} $$

$x$ is a vector is size $n$ where $x_i$ is one if we chose to keep the object in the knapsack, 0 otherwise.

In [16]:

```
# Data taken from http://people.sc.fsu.edu/~jburkardt/datasets/knapsack_01/knapsack_01.html
w = [23; 31; 29; 44; 53; 38; 63; 85; 89; 82]
C = 165
p = [92; 57; 49; 68; 60; 43; 67; 84; 87; 72];
n = length(weights)
```

Out[16]:

In [17]:

```
using Convex, GLPKMathProgInterface
x = Variable(n, :Bin)
problem = maximize(dot(p, x), dot(w, x) <= C)
solve!(problem, GLPKSolverMIP())
```