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Pārbaudiet, vai apļa sektorā ir vai nav punkts.

Mums ir aplis, kura centrs ir sākuma punktā (0 0). Kā ievade mums ir dots apļa sektora sākuma leņķis un apļa sektora lielums procentos. 

Piemēri:  

Input : Radius = 8 StartAngle = 0 Percentage = 12 x = 3 y = 4 Output : Point (3 4) exists in the circle sector Input : Radius = 12 Startangle = 45 Percentage = 25 x = 3 y = 4 Output : Point (3 4) does not exist in the circle sector


 



Avots: Wikibook.org' title= Avots: Wikibook.org


Šajā attēlā sākuma leņķis ir 0 grādu rādiuss r un pieņemsim, ka krāsainā laukuma procentuālā daļa ir 12%, tad mēs aprēķinām beigu leņķi kā 360/procenti + sākuma leņķis .

Lai noskaidrotu, vai punkts (x y) pastāv apļa sektorā (centrēts sākuma punktā), mēs atrodam šī punkta polārās koordinātas un pēc tam veicam šādas darbības:

  1. Izmantojot šo, pārveidojiet x y uz polārajām koordinātām 
    Leņķis = prombūtne(y/x); Rādiuss = sqrt(x * y y y y y y);
  2. Tad leņķim jābūt starp sākuma leņķi un beigu leņķi un rādiusam starp 0 un jūsu rādiusu.
C++ 
// C++ program to check if a point lies inside a circle // sector. #include   using namespace std; void checkPoint(int radius int x int y float percent  float startAngle) {  // calculate endAngle  float endAngle = 360/percent + startAngle;  // Calculate polar co-ordinates  float polarradius = sqrt(x*x+y*y);  float Angle = atan(y/x);  // Check whether polarradius is less then radius of circle  // or not and Angle is between startAngle and endAngle  // or not  if (Angle>=startAngle && Angle<=endAngle && polarradius<radius)  printf('Point (%d %d) exist in the circle sectorn' x y);  else  printf('Point (%d %d) does not exist in the circle sectorn'  x y); } // Driver code int main() {  int radius = 8 x = 3 y = 4;  float percent = 12 startAngle = 0;  checkPoint(radius x y percent startAngle);  return 0; }
Java 
// Java program to check if // a point lies inside a circle // sector. class GFG { static void checkPoint(int radius int x int y float percent  float startAngle) {  // calculate endAngle  float endAngle = 360/percent + startAngle;    // Calculate polar co-ordinates  double polarradius = Math.sqrt(x*x+y*y);  double Angle = Math.atan(y/x);    // Check whether polarradius is  // less then radius of circle  // or not and Angle is between  // startAngle and endAngle  // or not  if (Angle>=startAngle && Angle<=endAngle && polarradius<radius)  System.out.print('Point'+'('+x+''+y+')'+  ' exist in the circle sectorn');  else  System.out.print('Point'+'('+x+''+y+')'+  ' exist in the circle sectorn'); } // Driver Program to test above function public static void main(String arg[]) {  int radius = 8 x = 3 y = 4;  float percent = 12 startAngle = 0;  checkPoint(radius x y percent startAngle); } } // This code is contributed // by Anant Agarwal.
Python3 
# Python3 program to check if a point  # lies inside a circle sector. import math def checkPoint(radius x y percent startAngle): # calculate endAngle endAngle = 360 / percent + startAngle # Calculate polar co-ordinates polarradius = math.sqrt(x * x + y * y) Angle = math.atan(y / x) # Check whether polarradius is less # then radius of circle or not and  # Angle is between startAngle and  # endAngle or not if (Angle >= startAngle and Angle <= endAngle and polarradius < radius): print('Point (' x '' y ') ' 'exist in the circle sector') else: print('Point (' x '' y ') ' 'does not exist in the circle sector') # Driver code radius x y = 8 3 4 percent startAngle = 12 0 checkPoint(radius x y percent startAngle) # This code is contributed by # Smitha Dinesh Semwal
C# 
// C# program to check if a point lies // inside a circle sector. using System.IO; using System; class GFG {    static void checkPoint(int radius int x int y  float percent float startAngle)  {    // calculate endAngle  float endAngle = 360 / percent + startAngle;    // Calculate polar co-ordinates  float polarradius =   (float)Math.Sqrt(x * x + y * y);    float Angle = (float)Math.Atan(y / x);    // Check whether polarradius is less then   // radius of circle or not and Angle is   // between startAngle and endAngle or not  if (Angle >= startAngle && Angle <= endAngle  && polarradius < radius)  Console.Write('Point ({0} {1}) exist in '  + 'the circle sector' x y);  else  Console.Write('Point ({0} {1}) does not '  + 'exist in the circle sector' x y);  }    // Driver code  public static void Main()  {  int radius = 8 x = 3 y = 4;  float percent = 12 startAngle = 0;  checkPoint(radius x y percent startAngle);  } } // This code is contributed by Smitha Dinesh Semwal
JavaScript 
<script> // Javascript program to check if // a point lies inside a circle // sector. function checkPoint(radius x y percent startAngle) {    // Calculate endAngle  let endAngle = 360 / percent + startAngle;    // Calculate polar co-ordinates  let polarradius = Math.sqrt(x * x + y * y);  let Angle = Math.atan(y / x);    // Check whether polarradius is  // less then radius of circle  // or not and Angle is between  // startAngle and endAngle  // or not  if (Angle >= startAngle &&   Angle <= endAngle &&   polarradius < radius)  document.write('Point' + '(' + x +   '' + y + ')' +  ' exist in the circle sectorn');  else  document.write('Point' + '(' + x +   '' + y + ')' +  ' exist in the circle sectorn'); }   // Driver code  let radius = 8 x = 3 y = 4; let percent = 12 startAngle = 0; checkPoint(radius x y percent startAngle); // This code is contributed by splevel62   </script>

Izvade:  

Point(3 4) exists in the circle sector

Laika sarežģītība:  O(1)
Palīgtelpa: O(1)


 

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