10330. Sleepy cow sorting (bronze)

Farmer John is attempting to sort his n cows, conveniently numbered 1..n, before they head out to the pastures for breakfast.

Currently, the cows are standing in a line in the order p₁, p₂, p₃, ..., p_n, and Farmer John is standing in front of cow p₁. He wants to reorder the cows so that they are in the order 1, 2, 3, ..., n, with cow 1 next to Farmer John.

The cows are a bit sleepy today, so at any point in time the only cow who is paying attention to Farmer John’s instructions is the cow directly facing Farmer John. In one time step, he can instruct this cow to move k paces down the line, for any k in the range 1..n − 1. The k cows whom she passes will amble forward, making room for her to insert herself in the line after them.

For example, suppose that n = 4 and the cows start off in the following order:

FJ: 4, 3, 2, 1

The only cow paying attention to FJ is cow 4. If he instructs her to move 2 paces down the line, the order will subsequently look like this:

FJ: 3, 2, 4, 1

Now the only cow paying attention to FJ is cow 3, so in the second time step he may give cow 3 an instruction, and so forth until the cows are sorted.

Farmer John is eager to complete the sorting, so he can go back to the farmhouse for his own breakfast. Help him find the minimum number of time steps required to sort the cows.

Input. The first line contains n (1 ≤ n ≤ 100). The second line contains n integers p₁, p₂, p₃, ..., p_n, indicating the starting order of the cows.

Output. Print a single integer: the minimum number of time steps before the n cows are in sorted order, if Farmer John acts optimally.

Sample input

Sample output

1 2 4 3

SOLUTION

sorting

Algorithm analysis

Consider some starting order of cows that can be sorted with one instruction. To do this, the first cow should be put in its place. This can only be done if all the cows, from the second to the last, are already arranged in ascending order. For example, any of the following sequences can be sorted with a single command:

3 1 2 4 5 6 7

6 1 2 3 4 5 7

In order for the cows to be sorted with two instructions, it is necessary that all cows, from the third to the last, are arranged in ascending order:

6 3 1 2 4 5 7

7 2 1 3 4 5 6

Suppose that k instructions are sufficient for FJ. In this case, only the first k cows change their positions. This means that the last n – k cows are already sorted in increasing order, with respect to each other.

Conversely, suppose that the last n – k cows are sorted in increasing order. Consider a sequence of k instructions after which all n cows are sorted

If k = 0, then the cows are already completely sorted.

If k > 0, then the first cow can be inserted among the last n − k cows, so that now the last n + 1 − k cows are in increasing order. After repeating this k − 1 more times, the last n cows are in increasing order. Since there are only n cows, after k instructions the cows are sorted.

To solve the problem, one must find the maximum i such that

p_i > p_i₊₁ < p_i₊₂ < … < p_n

The answer will be the value i + 1. If there is no such i (the input array p_i is already sorted), then the answer is 0.

Example

Consider n = 7 cows, the last n – k = 7 – 3 = 4 of which are already sorted:

6 2 3 1 4 5 7

This sequence can be sorted with k = 3 instructions:

· put in place the cow number 6: 2 3 1 4 5 6 7;

· put in place the cow number 2: 3 1 2 4 5 6 7;

· put in place the cow number 3: 1 2 3 4 5 6 7;

Algorithm realization

Read the input data.

scanf("%d", &n);

p.resize(n);

for (i = 0; i < n; i++)

scanf("%d", &p[i]);

Find the maximum value of i such that p_i > p_i₊₁ < p_i₊₂ < … < p_n_-1.

res = 0;

for (i = n - 2; i >= 0; i--)

if (p[i] > p[i + 1])

{

The answer is the value i + 1.

res = i + 1;

break;

}

Print the answer.

printf("%d\n", res);