I'm trying to solve the problem of the magic square in C ++ using Backtracking and recursion in C ++. Specifically for a 4x4 array.

An example of 4x4 magic square solution is as follows, in which each row, column and diagonal add 34:

The change that I have is this: The user enters some values that will start the algorithm.

My algorithm is this:

**here** you can appreciate better the **image**.

I have a notion of how the algorithm should work to solve the problem of the magic square with backtracking and recursion, but I've had problems.

One of them is:

Achievement not make my algorithm "ignore" the values that the user already entered.

My **code** in C++ is in this **link** in Github. And here is the code :

```
#include <iostream>
using namespace std;
int sudoku[4][4];
int row = 0;
int column = 0;
bool isFull(int s[4][4]){
for(int i = 0; i < 4; i++){
for(int j = 0; j < 4; j++){
if(s[4][4] == 0){
return false;
}
}
}
return true;
}
void printMatrix(int s[4][4]){
for(int i = 0; i < 4; i++){
for(int j = 0; j < 4; j++){
cout << sudoku[i][j] << " ";
}
cout << endl;
}
}
bool isAssigned(int row, int column){
if(row == 1 && column == 0 ||
row == 0 && column == 2 ||
row == 1 && column == 2){
return true;
} else return false;
}
bool verify(int s[4][4], int row, int column){
bool flag = false;
int sumrow = 0, sumcolumn = 0, sumDiagonal = 0, sumDiagonal2 = 0;
int value = 3;
for(int i = 0; i < 4; i++){
sumrow = sumrow + s[row][i];
sumcolumn = sumcolumn + s[i][column];
sumDiagonal = sumDiagonal + s[i][i];
sumDiagonal2 = sumDiagonal2 + s[i][value];
value--;
}
if(sumrow <= 34 && sumcolumn <= 34 && sumDiagonal2 <= 34 && sumDiagonal2 <= 34){
return true;
} else return false;
}
bool backtracking(int s[4][4], int row, int column){
if(isFull(s) == true){ //verify if there are no zeros in the matrix
printMatrix(sudoku);
cout<<"Solution find ";
}
else {
if(isAssigned(row, column) == false){ // verify if the cell is already assigned
for(int i = 1; i <= 16; i++){
s[row][column] = i; // assigned value
if(verify(s, row, column) == true){ // verify that the sum of the column, row and diagonal not greater 34
if(column == 4) {
row++;
column=0;
}
backtracking(s, row, column + 1); // recursion
printMatrix(s); // Print the matrix to see progress
cout<<endl;
} else { // the sum value exceeds 34
s[row][column] = 0;
return false;
}
}
}
}
}
int main(){
sudoku[1][0] = 5;
sudoku[0][2] = 15;
sudoku[1][2] = 10;
backtracking(sudoku, row, column);
return 0;
}
```

My `algorithm`

is mainly the following:

Obviously some features in this case, but if you see my `code`

you will realize what I try to do.

Perhaps my solution method does not work or is not good.

The **reason** for this publication is, I need help to improve or Need help to solve the code did. Here is my main function and output I get to run:

```
bool backtracking(int s[4][4], int row, int column){
if(isFull(s) == true){ //verify if there are no zeros in the matrix
printMatrix(sudoku);
cout<<"Solution find ";
}
else {
if(isAssigned(row, column) == false){ // verify if the cell is already assigned
for(int i = 1; i <= 16; i++){
s[row][column] = i; // assigned value
if(verify(s, row, column) == true){ // verify that the sum of the column, row and diagonal not greater 34
if(column == 4) {
row++;
column=0;
}
backtracking(s, row, column + 1); // recursion
printMatrix(s); // Print the matrix to see progress
cout<<endl;
} else { // the sum value exceeds 34
s[row][column] = 0;
return false;
}
}
}
}
}
```

**output:**

```
3 16 15 0
5 0 10 0
0 0 0 0
0 0 0 0
```

as I said before, I have problems when I find a value that the user was already assigned. It is the first time working with backtracking, that is why I find it a bit difficult. Thanks for all.

too broadfor the c++ tag at Stack Overflow. – πάντα ῥεῖ Oct 23 '16 at 20:33"I need help to improve or give me ideas for solving the problem with backtracking and recursion."That's not very clear and quite broad. Please edit your post to ask a specific programming question. – Baum mit Augen♦ Oct 23 '16 at 20:38" I need help with this problem"That's not a very specificprogramming problem. – πάντα ῥεῖ Oct 23 '16 at 20:46