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Comprueba si dos círculos dados se tocan o se cruzan

Pruébalo en GfG Practice ' title= #practiceLinkDiv { mostrar: ninguno !importante; }

Hay dos círculos A y B con sus centros. C1(x1y1) y C2(x2y2) y radio R1 y R2 . La tarea consiste en comprobar que ambos círculos A y B se tocan o no.

Ejemplos:   

Aporte : C1 = (3·4)
        C2 = (14 18)
        R1 = 5 R2 = 8
Producción : Los círculos no se tocan entre sí.



Aporte : C1 = (2·3)
        C2 = (15 28)
        R1 = 12 R2 = 10
Producción : Los círculos se cruzan entre sí.

Aporte : C1 = (-10 8)
        C2 = (14-24)
        R1 = 30 R2 = 10

Práctica recomendadaComprueba si dos círculos dados se tocan ¡Pruébalo!

Acercarse:
La distancia entre los centros C1 y C2 se calcula como

 C1C2 = raíz cuadrada ((x1 - x2) 2 + (y1 - y2) 2 ).

Hay tres condiciones que surgen.

  1. Si C1C2<= R1 - R2: El círculo B está dentro de A.
  2. Si C1C2<= R2 - R1: El círculo A está dentro de B.
  3. Si C1C2< R1 + R2: El círculo se cruza entre sí.
  4. Si C1C2 == R1 + R2: Los círculos A y B están en contacto entre sí.
  5. De lo contrario Los círculos A y B no se superponen

A continuación se muestra la implementación del enfoque anterior: 

C++ 
// C++ program to check if two // circles touch each other or not. #include    using namespace std; int circle(int x1 int y1 int x2 int y2 int r1 int r2) {  double d = sqrt((x1 - x2) * (x1 - x2)  + (y1 - y2) * (y1 - y2));  if (d <= r1 - r2) {  cout << 'Circle B is inside A';  }  else if (d <= r2 - r1) {  cout << 'Circle A is inside B';  }  else if (d < r1 + r2) {  cout << 'Circle intersect to each other';  }  else if (d == r1 + r2) {  cout << 'Circle touch to each other';  }  else {  cout << 'Circle not touch to each other';  } } // Driver code int main() {  int x1 = -10 y1 = 8;  int x2 = 14 y2 = -24;  int r1 = 30 r2 = 10;  circle(x1 y1 x2 y2 r1 r2);  return 0; }
Java 
// Java program to check if two // circles touch each other or not. import java.io.*; class GFG {  static void circle(int x1 int y1 int x2 int y2  int r1 int r2)  {  double d = Math.sqrt((x1 - x2) * (x1 - x2)  + (y1 - y2) * (y1 - y2));  if (d <= r1 - r2) {  System.out.println('Circle B is inside A');  }  else if (d <= r2 - r1) {  System.out.println('Circle A is inside B');  }  else if (d < r1 + r2) {  System.out.println('Circle intersect'  + ' to each other');  }  else if (d == r1 + r2) {  System.out.println('Circle touch to'  + ' each other');  }  else {  System.out.println('Circle not touch'  + ' to each other');  }  }  // Driver code  public static void main(String[] args)  {  int x1 = -10 y1 = 8;  int x2 = 14 y2 = -24;  int r1 = 30 r2 = 10;  circle(x1 y1 x2 y2 r1 r2);  } } // This article is contributed by vt_m.
Python 
# Python program to check if two # circles touch each other or not. import math # Function to check if two circles touch each other def circle(x1 y1 x2 y2 r1 r2): d = math.sqrt((x1 - x2) * (x1 - x2) + (y1 - y2) * (y1 - y2)) if(d <= r1 - r2): print('Circle B is inside A') elif(d <= r2 - r1): print('Circle A is inside B') elif(d < r1 + r2): print('Circle intersect to each other') elif(d == r1 + r2): print('Circle touch to each other') else: print('Circle not touch to each other') # Driver code x1 y1 = -10 8 x2 y2 = 14 -24 r1 r2 = 30 10 # Function call circle(x1 y1 x2 y2 r1 r2) # This code is contributed by Aman Kumar
C# 
// C# program to check if two // circles touch each other or not. using System; class GFG {  static void circle(int x1 int y1 int x2 int y2  int r1 int r2)  {  double d = Math.Sqrt((x1 - x2) * (x1 - x2)  + (y1 - y2) * (y1 - y2));  if (d <= r1 - r2) {  Console.Write('Circle B is inside A');  }  else if (d <= r2 - r1) {  Console.Write('Circle A is inside B');  }  else if (d < r1 + r2) {  Console.Write('Circle intersect'  + ' to each other');  }  else if (d == r1 + r2) {  Console.Write('Circle touch to'  + ' each other');  }  else {  Console.Write('Circle not touch'  + ' to each other');  }  }  // Driver code  public static void Main(String[] args)  {  int x1 = -10 y1 = 8;  int x2 = 14 y2 = -24;  int r1 = 30 r2 = 10;  circle(x1 y1 x2 y2 r1 r2);  } } // This article is contributed by Pushpesh Raj.
JavaScript 
// JavaScript program to check if two circles touch each other or not. function circle(x1 y1 x2 y2 r1 r2) {  var d = Math.sqrt((x1 - x2) * (x1 - x2) + (y1 - y2) * (y1 - y2));  if (d <= r1 - r2) {  console.log('Circle B is inside A');  } else if (d <= r2 - r1) {  console.log('Circle A is inside B');  } else if (d < r1 + r2) {  console.log('Circle intersect to each other');  } else if (d === r1 + r2) {  console.log('Circle touch to each other');  } else {  console.log('Circle not touch to each other');  } } // Driver code var x1 = -10 y1 = 8; var x2 = 14 y2 = -24; var r1 = 30 r2 = 10; circle(x1 y1 x2 y2 r1 r2); // this code is contributed by devendra

Producción 
Circle touch to each other

Complejidad del tiempo: O(log(n)) porque se usa la función sqrt incorporada 
Espacio Auxiliar: O(1)


Este artículo es una contribución de Aarti_Rathi y dharma kumar .

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