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  1. Prepare
  2. Algorithms
  3. Implementation
  4. Forming a Magic Square
  5. Discussions

Forming a Magic Square

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  • iamhenry760
     + 0 comments

    Great discussion here — I found the insight about there being only eight valid 3×3 magic squares for the numbers 1-9 very helpful. That fact really simplifies the problem by turning it into a fixed comparison set. On a somewhat different note, while I was reading this I reflected on how the same principles of user-experience and efficient logic apply across tech domains. For example, I recently checked out the Black Hole Music APK — an Android app that emphasises smooth UI, ad-free listening, and high-quality audio. It reminded me that whether you’re solving a coding puzzle like designing a magic square or building a music app, attention to detail, performance, and clarity make the difference.

    Thanks for sharing all these approaches — they’re really helpful for understanding both the math and the implementation side of algorithmic challenges!

  • zettix1
     + 0 comments

    I first precomputed all magic squares. There's only one: 4 rotations and 4 mirrors, hence 8 representations of the same magic square. I then printed them and hard coded them.

    public static int formingMagicSquare(List<List<Integer>> s) {
// Write your code here
// precomputed all magic squares.
    int[][] allmagic = new int[][] {
    {2, 7, 6, 9, 5, 1, 4, 3, 8}, 
    {2, 9, 4, 7, 5, 3, 6, 1, 8}, 
    {4, 3, 8, 9, 5, 1, 2, 7, 6}, 
    {4, 9, 2, 3, 5, 7, 8, 1, 6}, 
    {6, 1, 8, 7, 5, 3, 2, 9, 4}, 
    {6, 7, 2, 1, 5, 9, 8, 3, 4}, 
    {8, 1, 6, 3, 5, 7, 4, 9, 2}, 
    {8, 3, 4, 1, 5, 9, 6, 7, 2}
    };
    int[] sint = new int[9];
    for (int y = 0; y < 3; y++) {
        for (int x = 0; x < 3; x++) {
            sint[x + y * 3] = s.get(y).get(x);
        }
    }
    int count = 9 * 9;
    for (int i = 0; i < allmagic.length;i++) {
        int mycount = 0;
        for (int j = 0; j < 9; j++) {
            mycount += Math.abs(allmagic[i][j] - sint[j]);
        }
        if (mycount < count) {
            count = mycount;
        }
    }
    return count;
}

  • acheong08
     + 1 comment

    I wanted to do it the naive way without Googling what the valid permutations are.

    package main

import (
    "bufio"
    "fmt"
    "io"
    "os"
    "strconv"
    "strings"
    "math"
)

func sum(s []int32) int32 {
    sum := int32(0)
    for i := range s {
        sum += s[i]
    }
    return sum
}


func isMagic(s [][]int32) bool {
    sums := []int32{
        sum(s[0]), sum(s[1]), sum(s[2]),
        s[0][0]+s[1][0]+s[2][0],                    
        s[0][1]+s[1][1]+s[2][1],                     
        s[0][2]+s[1][2]+s[2][2],                     
        s[0][0]+s[1][1]+s[2][2],                     
        s[0][2]+s[1][1]+s[2][0],                      
    }
    for i := range sums {
        if sums[i] != 15 {
            return false
        }
    }
    return true
}

func permutations(arr []int32)[][]int32{
    var helper func([]int32, int32)
    res := [][]int32{}

    helper = func(arr []int32, n int32){
        if n == 1{
            tmp := make([]int32, len(arr))
            copy(tmp, arr)
            res = append(res, tmp)
        } else {
            for i := 0; i < int(n); i++{
                helper(arr, n - 1)
                if n % 2 == 1{
                    tmp := arr[i]
                    arr[i] = arr[n - 1]
                    arr[n - 1] = tmp
                } else {
                    tmp := arr[0]
                    arr[0] = arr[n - 1]
                    arr[n - 1] = tmp
                }
            }
        }
    }
    helper(arr, int32(len(arr)))
    return res
}

func generateAllPossibleSquares() [][][]int32 {
    squares := permutations([]int32{1,2,3,4,5,6,7,8,9})
    validMagics := make([][][]int32, 8)
    validCounter := 0
    for _, s := range squares {
        square := [][]int32{s[0:3], s[3:6], s[6:9]}
        if isMagic(square) {
            validMagics[validCounter] = square
            validCounter += 1
        }
    }
    return validMagics
}

func cost(sq1 [][]int32, sq2 [][]int32) int32 {
    totalCost := int32(0)
    for i := range len(sq1) {
        for j := range len(sq1[i]) {
            totalCost += int32(math.Abs(float64(sq1[i][j] - sq2[i][j])))
        }
    }
    return totalCost
} 

/*
 * Complete the 'formingMagicSquare' function below.
 *
 * The function is expected to return an INTEGER.
 * The function accepts 2D_INTEGER_ARRAY s as parameter.
 */

func formingMagicSquare(s [][]int32) int32 {
    // First, we need a function that calculates all the various sums. 
    // To find the closest magic square, we calculate the difference between each intersecting row
    // The smallest cost should be the difference between intersecting rows
    minCost := int32(math.MaxInt32)
    validMagics := generateAllPossibleSquares()
    for i := range validMagics {
        newCost := cost(s, validMagics[i])
        if newCost < minCost {
            minCost = newCost
        }
    }
    return minCost

}

func main() {
    reader := bufio.NewReaderSize(os.Stdin, 16 * 1024 * 1024)

    stdout, err := os.Create(os.Getenv("OUTPUT_PATH"))
    checkError(err)

    defer stdout.Close()

    writer := bufio.NewWriterSize(stdout, 16 * 1024 * 1024)

    var s [][]int32
    for i := 0; i < 3; i++ {
        sRowTemp := strings.Split(strings.TrimRight(readLine(reader)," \t\r\n"), " ")

        var sRow []int32
        for _, sRowItem := range sRowTemp {
            sItemTemp, err := strconv.ParseInt(sRowItem, 10, 64)
            checkError(err)
            sItem := int32(sItemTemp)
            sRow = append(sRow, sItem)
        }

        if len(sRow) != 3 {
            panic("Bad input")
        }

        s = append(s, sRow)
    }

    result := formingMagicSquare(s)

    fmt.Fprintf(writer, "%d\n", result)

    writer.Flush()
}

func readLine(reader *bufio.Reader) string {
    str, _, err := reader.ReadLine()
    if err == io.EOF {
        return ""
    }

    return strings.TrimRight(string(str), "\r\n")
}

func checkError(err error) {
    if err != nil {
        panic(err)
    }
}

  • eidolon_2003
     + 1 comment

    Probably the simplest solution you could think of

    // All eight possible magic squares
static const vector<vector<int>> squares[8] = {
    {
        { 8, 3, 4 },
        { 1, 5, 9 },
        { 6, 7, 2 }
    },
    {
        { 6, 7, 2 },
        { 1, 5, 9 },
        { 8, 3, 4 }
    },
    {
        { 4, 3, 8 },
        { 9, 5, 1 },
        { 2, 7, 6 }
    },
    {
        { 2, 7, 6 },
        { 9, 5, 1 },
        { 4, 3, 8 }
    },
    {
        { 6, 1, 8 },
        { 7, 5, 3 },
        { 2, 9, 4 }
    },
    {
        { 2, 9, 4 },
        { 7, 5, 3 },
        { 6, 1, 8 }
    },
    {
        { 8, 1, 6 },
        { 3, 5, 7 },
        { 4, 9, 2 }
    },
    {
        { 4, 9, 2 },
        { 3, 5, 7 },
        { 8, 1, 6 }
    }
};

int computeCost(const vector<vector<int>> &a, const vector<vector<int>> &b) {
    int cost = 0;
    for (int i = 0; i < 3; i++) {
        for (int j = 0; j < 3; j++) {
            cost += abs(a[i][j] - b[i][j]);
        }
    }
    return cost;
}

int formingMagicSquare(vector<vector<int>> s) {
    int minCost = computeCost(s, squares[0]);
    
    for (int i = 1; i < 8; i++) {
        int c = computeCost(s, squares[i]);
        if (c < minCost) minCost = c;
    }
    
    return minCost;
}

  • aliraza413063321
     + 2 comments

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