Kotlin solution without preprepared magic squares (generating all)
import java.io.* import java.math.* import java.security.* import java.text.* import java.util.* import java.util.concurrent.* import java.util.function.* import java.util.regex.* import java.util.stream.* import kotlin.collections.* import kotlin.comparisons.* import kotlin.io.* import kotlin.jvm.* import kotlin.jvm.functions.* import kotlin.jvm.internal.* import kotlin.ranges.* import kotlin.sequences.* import kotlin.text.* /* * Complete the 'formingMagicSquare' function below. * * The function is expected to return an INTEGER. * The function accepts 2D_INTEGER_ARRAY s as parameter. */ fun formingMagicSquare(initial: Array<Array<Int>>): Int { var minChanges = Int.MAX_VALUE var minSquare = arrayOf(arrayOf(0)) val allMagicSquares = formingEveryPossibleMagicSquare() allMagicSquares.remove(initial) allMagicSquares.forEach { magicSquare -> val changesDone = calculateChanges(initial, magicSquare) if (changesDone < minChanges) { minChanges = changesDone minSquare = magicSquare } } return minChanges } fun formingEveryPossibleMagicSquare(): MutableList<Array<Array<Int>>> { val magicSquares: MutableList<Array<Array<Int>>> = mutableListOf() for (q in 1..9) { for (w in 1..9) { if (!w.isNotEqualTo(q)) continue for (e in 1..9) { if (!e.isNotEqualTo(q, w)) continue for (a in 1..9) { if (!a.isNotEqualTo(q, w, e)) continue for (s in 1..9) { if (!s.isNotEqualTo(q, w, e, a)) continue for (d in 1..9) { if (!d.isNotEqualTo(q, w, e, a, s)) continue for (z in 1..9) { if (!z.isNotEqualTo(q, w, e, a, s, d)) continue for (x in 1..9) { if (!x.isNotEqualTo(q, w, e, a, s, d, z)) continue for (c in 1..9) { if (!c.isNotEqualTo(q, w, e, a, s, d, z, x)) continue val row1 = arrayOf(q, w, e) val row2 = arrayOf(a, s, d) val row3 = arrayOf(z, x, c) val newSquare = arrayOf(row1, row2, row3) if (areSumsCorrect(newSquare)) { magicSquares.add(newSquare) } } } } } } } } } } return magicSquares } fun Int.isNotEqualTo(vararg other: Int) = other.none { it == this } fun calculateChanges(initial: Array<Array<Int>>, changed: Array<Array<Int>>): Int { var changes = 0 for (i in 0..2) { for (j in 0..2) { val difference = initial[i][j] - changed[i][j] changes += Math.abs(difference) } } return changes } private fun areSumsCorrect(square: Array<Array<Int>>): Boolean { val allRowSums = square.map { it.sum() } val allColumnSums = listOf( square[0][0] + square[1][0] + square[2][0], square[0][1] + square[1][1] + square[2][1], square[0][2] + square[1][2] + square[2][2] ) val diagonalSums = listOf( square[0][0] + square[1][1] + square[2][2], square[0][2] + square[1][1] + square[2][0] ) val allSums = allRowSums + allColumnSums + diagonalSums return allSums.all { it == allSums[0] } } fun main(args: Array<String>) { val s = Array<Array<Int>>(3, { Array<Int>(3, { 0 }) }) for (i in 0 until 3) { s[i] = readLine()!!.trimEnd().split(" ").map{ it.toInt() }.toTypedArray() } val result = formingMagicSquare(s) println(result) }
Does the "correct" answer really rely on Googling a list of all possible 3x3 magic squares, or is there a feasible computational solution I'm missing?
C#
int[,,] matrix_list = new[,,] { {{8, 1, 6}, {3, 5, 7}, {4, 9, 2}}, {{6, 1, 8}, {7, 5, 3}, {2, 9, 4}}, {{4, 9, 2}, {3, 5, 7}, {8, 1, 6}}, {{2, 9, 4}, {7, 5, 3}, {6, 1, 8}}, {{8, 3, 4}, {1, 5, 9}, {6, 7, 2}}, {{4, 3, 8}, {9, 5, 1}, {2, 7, 6}}, {{6, 7, 2}, {1, 5, 9}, {8, 3, 4}}, {{2, 7, 6}, {9, 5, 1}, {4, 3, 8}} }; int minumum = Int32.MaxValue; for(int x = 0; x < 8; x++) { int toplam = 0; for(int i=0; i < 3; i++) { for(int j =0 ;j <3 ; j++) { toplam += Math.Abs((s[i][j] - matrix_list[x,i,j])); } } minumum = Math.Min(minumum, toplam); } return minumum;
Java 8
public static int formingMagicSquare(List<List<Integer>> s) { final List<List<Integer>> magicSquares = Arrays.asList( Arrays.asList(6, 1, 8, 7, 5, 3, 2, 9, 4), Arrays.asList(8, 1, 6, 3, 5, 7, 4, 9, 2), Arrays.asList(6, 7, 2, 1, 5, 9, 8, 3, 4), Arrays.asList(8, 3, 4, 1, 5, 9, 6, 7, 2), Arrays.asList(2, 7, 6, 9, 5, 1, 4, 3, 8), Arrays.asList(4, 3, 8, 9, 5, 1, 2, 7, 6), Arrays.asList(2, 9, 4, 7, 5, 3, 6, 1, 8), Arrays.asList(4, 9, 2, 3, 5, 7, 8, 1, 6)); List<Integer> flatList = s.stream().flatMap(x -> x.stream()).collect(Collectors.toList()); int result = magicSquares.stream().map(x -> { int sum = 0; for (int i = 0; i < x.size(); i++) { int listDiff = x.get(i) - flatList.get(i); sum += Math.max(listDiff, listDiff * -1); } return sum; }).mapToInt(x -> x).min().getAsInt(); return result; } }
Kinda clunky and verbose but uses only 1 for loop(2 if we count "min"), no "if elses" and it's easy to understand:
def formingMagicSquare(s): msp = { 0:[8,1,6,3,5,7,4,9,2], 1:[6,1,8,7,5,3,2,9,4], 2:[4,9,2,3,5,7,8,1,6], 3:[2,9,4,7,5,3,6,1,8], 4:[8,3,4,1,5,9,6,7,2], 5:[4,3,8,9,5,1,2,7,6], 6:[6,7,2,1,5,9,8,3,4], 7:[2,7,6,9,5,1,4,3,8], } box = [*s[0], *s[1], *s[2]] result = [0, 0, 0, 0, 0, 0, 0, 0] for x in range(9): result[0] += abs(msp[0][x] - box[x]) result[1] += abs(msp[1][x] - box[x]) result[2] += abs(msp[2][x] - box[x]) result[3] += abs(msp[3][x] - box[x]) result[4] += abs(msp[4][x] - box[x]) result[5] += abs(msp[5][x] - box[x]) result[6] += abs(msp[6][x] - box[x]) result[7] += abs(msp[7][x] - box[x]) return min(result)
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