I can probably figure out part b if you can help me do part a. I've been looking at this and similar problems all day, and I'm just having problems grasping what to do with nested loops. For the first loop there are n iterations, for the second there are n-1, and for the third there are n-1.. Am I thinking about this correctly?

Consider the following algorithm,

which takes as input a sequence of n integers a1, a2, ..., an

and produces as output a matrix M = {mij}

where mij is the minimum term

in the sequence of integers ai, a + 1, ..., aj for j >= i and mij = 0 otherwise.

initialize M so that mij = ai if j >= i and mij = 0

```
for i:=1 to n do
for j:=i+1 to n do
for k:=i+1 to j do
m[i][j] := min(m[i][j], a[k])
end
end
end
return M = {m[i][j]}
```

(a) Show that this algorithm uses Big-O(n^3) comparisons to compute the matrix M.

(b) Show that this algorithm uses Big-Omega(n^3) comparisons to compute the matrix M.

Using this face and part (a), conclude that the algorithm uses Big-theta(n^3) comparisons.