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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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1288 Discussions

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  • acheong08
     + 0 comments

    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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  • aliraza413063321
     + 0 comments

    Emergency Locksmith Leeds explains the concept of forming a magic square, a fascinating mathematical arrangement where the sums of numbers in each row, column, and diagonal are equal. Magic squares have been studied for centuries for their intriguing patterns and symmetry. They can vary in size and complexity, offering endless possibilities for puzzles and problem-solving. Understanding their structure enhances logical thinking, number skills, and creativity, making magic squares both educational and entertaining.

  • aliraza413063321
     + 0 comments

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