Minimum squares to evenly cut a rectangle Last Updated : 19 Jul, 2022 Summarize Comments Improve Suggest changes Share Like Article Like Report Given a rectangular sheet of length l and width w. we need to divide this sheet into square sheets such that the number of square sheets should be as minimum as possible.Examples: Input :l= 4 w=6 Output :6 We can form squares with side of 1 unit, But the number of squares will be 24, this is not minimum. If we make square with side of 2, then we have 6 squares. and this is our required answer. And also we can't make square with side 3, if we select 3 as square side, then whole sheet can't be converted into squares of equal length. Input :l=3 w=5 Output :15 Optimal length of the side of a square is equal to GCD of two numbers C++ // CPP program to find minimum number of // squares to make a given rectangle. #include <bits/stdc++.h> using namespace std; int countRectangles(int l, int w) { // if we take gcd(l, w), this // will be largest possible // side for square, hence minimum // number of square. int squareSide = __gcd(l, w); // Number of squares. return (l * w) / (squareSide * squareSide); } // Driver code int main() { int l = 4, w = 6; cout << countRectangles(l, w) << endl; return 0; } Java // Java program to find minimum number of // squares to make a given rectangle. class GFG{ static int __gcd(int a, int b) { if (b==0) return a; return __gcd(b,a%b); } static int countRectangles(int l, int w) { // if we take gcd(l, w), this // will be largest possible // side for square, hence minimum // number of square. int squareSide = __gcd(l, w); // Number of squares. return (l * w) / (squareSide * squareSide); } // Driver code public static void main(String[] args) { int l = 4, w = 6; System.out.println(countRectangles(l, w)); } } // This code is contributed by mits Python3 # Python3 code to find minimum number of # squares to make a given rectangle. import math def countRectangles(l, w): # if we take gcd(l, w), this # will be largest possible # side for square, hence minimum # number of square. squareSide = math.gcd(l,w) # Number of squares. return (l*w)/(squareSide*squareSide) # Driver Code if __name__ == '__main__': l = 4 w = 6 ans = countRectangles(l, w) print (int(ans)) # this code is contributed by # SURENDRA_GANGWAR C# // C# program to find minimum number of // squares to make a given rectangle. class GFG{ static int __gcd(int a, int b) { if (b==0) return a; return __gcd(b,a%b); } static int countRectangles(int l, int w) { // if we take gcd(l, w), this // will be largest possible // side for square, hence minimum // number of square. int squareSide = __gcd(l, w); // Number of squares. return (l * w) / (squareSide * squareSide); } // Driver code public static void Main() { int l = 4, w = 6; System.Console.WriteLine(countRectangles(l, w)); } } // This code is contributed by mits PHP <?php // PHP program to find minimum number // of squares to make a given rectangle. function gcd($a, $b) { return $b ? gcd($b, $a % $b) : $a; } function countRectangles($l, $w) { // if we take gcd(l, w), this // will be largest possible // side for square, hence minimum // number of square. $squareSide = gcd($l, $w); // Number of squares. return ($l * $w) / ($squareSide * $squareSide); } // Driver code $l = 4; $w = 6; echo countRectangles($l, $w) . "\n"; // This code is contributed // by ChitraNayal ?> JavaScript <script> // Javascript program to find minimum number of // squares to make a given rectangle. function __gcd(a, b) { if (b==0) return a; return __gcd(b,a%b); } function countRectangles(l, w) { // if we take gcd(l, w), this // will be largest possible // side for square, hence minimum // number of square. let squareSide = __gcd(l, w); // Number of squares. return parseInt((l * w) / (squareSide * squareSide)); } // Driver code let l = 4, w = 6; document.write(countRectangles(l, w)); </script> Output: 6 Time Complexity: O(log(min(a, b))), where a and b are two parameters of gcd. Auxiliary Space: O(log(min(a, b))) Comment More infoAdvertise with us S sahilshelangia Follow Improve Article Tags : Misc Mathematical Geometric DSA GCD-LCM square-rectangle +2 More Practice Tags : GeometricMathematicalMisc Similar Reads GCD (Greatest Common Divisor) Practice Problems for Competitive Programming GCD (Greatest Common Divisor) or HCF (Highest Common Factor) of two numbers is the largest positive integer that divides both of the numbers.GCD of Two NumbersFastest Way to Compute GCDThe fastest way to find the Greatest Common Divisor (GCD) of two numbers is by using the Euclidean algorithm. The E 4 min read Program to Find GCD or HCF of Two Numbers Given two positive integers a and b, the task is to find the GCD of the two numbers.Note: The GCD (Greatest Common Divisor) or HCF (Highest Common Factor) of two numbers is the largest number that divides both of them. 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The task is to find the minimum possible health of the winn 4 min read Minimum squares to evenly cut a rectangle Given a rectangular sheet of length l and width w. we need to divide this sheet into square sheets such that the number of square sheets should be as minimum as possible.Examples: Input :l= 4 w=6 Output :6 We can form squares with side of 1 unit, But the number of squares will be 24, this is not min 4 min read Like