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I am trying to figure out whether a angle lies between 2 other angles. I have been trying to create a simple function to perform this but none of my techniques will work for all possible values of the angles.

Can you help me edit my function to correctly determine if a angle lies between 2 other angles?

enter image description here

In the above picture; I use the green point as the central point, then I determine the angle of each line to the green point. I then calculate the angle of the black point to the green point. I am trying to check if the angle of the black dot is BETWEEN the 2 lines' angles.

NOTE: In my case; an angle(targetAngle) is said to lie between 2 other angles IF the difference between the 2 angles is < 180 degrees AND the targetAngle lies in the cavity made by those 2 angles.

The following code should work but it fails for these(which do lie between the angle):
- is_angle_between(150, 190, 110)
- is_angle_between(3, 41, 345)

bool is_angle_between(int target, int angle1, int angle2) 
{  
  int rAngle1 = ((iTarget - iAngle1) % 360 + 360) % 360;  
  int rAngle2 = ((iAngle2 - iAngle1) % 360 + 360) % 360;  
  return (0 <= rAngle1 && rAngle1 <= rAngle2);  
}  

// Example usage  
is_angle_between(3, 41, 345);  

Another technique I attempted which also doesn't work:

int is_angle_between(int target, int angle1, int angle2)
{
  int dif1  = angle1-angle2;
  int dif2  = angle2-angle1;
  int uDif1 = convert_to_positive_angle( dif1 ); // for eg; convert -15 to 345
  int uDif2 = convert_to_positive_angle( dif2 );

  if (uDif1 <= uDif2) {
    if (dif1 < 0) {
      return (target <= angle1 && target >= angle2);
    }
    else return (in_between_numbers(iTarget, iAngle1, iAngle2));
  }
  else {
    if (dif2 < 0) {
      return (target <= angle1 && target >= angle2);
    }
    else return (in_between_numbers(iTarget, iAngle1, iAngle2));
  }

  return -1;
}
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2  
Why not treat the two angles and your central point as a triangle and check to see if the black dot falls inside of it? –  Nick Savage Jul 10 '12 at 3:36
    
@NickSavage great idea :) Can you name a mathematical formula that can check if a points falls inside a triangle? Or can I do it using simple sin, cos, tan. –  Jake M Jul 10 '12 at 3:37
1  
A couple of questions. Are all angles >=0 and <360? Also, given your test case of 3, 41 and 345, are you asking if 3 is between 41 and 345 degrees? Which should be false, right? –  HeatfanJohn Jul 10 '12 at 3:38
    
@NickSavage How far are you going to allow the two lines defining the triangle? –  tmpearce Jul 10 '12 at 3:39
    
Check this for point inside a triangle –  higuaro Jul 10 '12 at 3:39

7 Answers 7

bool is_angle_between(int target, int angle1, int angle2) 
{
  // make the angle from angle1 to angle2 to be <= 180 degrees
  int rAngle = ((angle2 - angle1) % 360 + 360) % 360;
  if (rAngle >= 180)
    std::swap(angle1, angle2);

  // check if it passes through zero
  if (angle1 <= angle2)
    return target >= angle1 && target <= angle2;
  else
    return target >= angle1 || target <= angle2;
}  
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If angle2 were always 0, and angle1 were always between 0 and 180, this would be easy:

return angle1 < 180 && 0 < target && target < angle1;

if I'm reading the requirements correctly.

But it's not that hard to get there.

int reduced1 = (angle1 - angle2 + 360) % 360; // and imagine reduced2 = 0
if (180 < reduced1) { angle2 = angle1; reduced1 = 360 - reduced1; } // swap if backwards
int reducedTarget = (target - angle2 + 360) % 360;
return reduced1 < 180 && 0 < reducedTarget && reducedTarget < reduced1;
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I've done this before by comparing angles.

enter image description here

In the sketch above vector AD will be between AB and AC if and only if

angle BAD + angle CAD == angle BAC

Because of floating point inaccuracies I compared the values after rounding them first to say 5 decimal places.

So it comes down to having an angle algorithm between two vectors p and q which is simply put like:

double a = p.DotProduct(q);
double b = p.Length() * q.Length();
return acos(a / b); // radians

I'll leave the vector DotProduct and Length calculations as a google search exercise. And you get vectors simply by subtracting the coordinates of one terminal from the other.

You should of course first check whether AB and AC are parallel or anti-parallel.

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void normalize( float& angle ) 
{
    while ( angle < -180 ) angle += 360;
    while ( angle >  180 ) angle -= 360;
}

bool isWithinRange( float testAngle, float a, float b )
{
    a -= testAngle;
    b -= testAngle;
    normalize( a );
    normalize( b );
    if ( a * b >= 0 )
        return false;
    return fabs( a - b ) < 180;
}
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I've found this quote from this thread:

if a point P is inside triangle ABC, then

Area PAB+Area PBC +Area PAC=Area ABC

notice that if P is on the edge of AB, BC, or CA, the above hold. But effectively, one of the area PAB, PBC, PAC is 0 (so just make sure you check that).

if P is outside, the above equality does NOT hold...

How to determine area? you have two options: 1) Heron's theorem, involves sqrt, slower 2) the more perferred way is the cross products (or effectively, the half of absolute value of (sum of the down products minus the sum of up products))

for example, if A=(x1,y1) B=(x2,y2), C=(x3,y3) Area= abs(x1*y2+x2*y3+x3*y1-x1*y3-x3*y2-x2*y1)/2

also you might want to be careful about floating point errors... instead of checking for strict inequality, check for abs(b-a)

Hopefully that will help

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Using a similar style of function as in your question, I have had good luck with the following methods:

    public static bool IsInsideRange(double testAngle, double startAngle, double endAngle)
    {
        var a1 = System.Math.Abs(AngleBetween(startAngle, testAngle));
        var a2 = System.Math.Abs(AngleBetween(testAngle, endAngle));
        var a3 = System.Math.Abs(AngleBetween(startAngle, endAngle));
        return a1 + a2 == a3;
    }

    public static double AngleBetween(double start, double end)
    {
        return (end - start) % 360;
    }
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I know this post is old, but there doesn't seem to be an accepted answer and I have found the following approach to be quite reliable. Although it might be more than what you need. It supports angle ranges larger than 180 degrees (as well as larger than 360 degrees and negative angles). It also supports decimal accuracy.

The method uses this normalize() helper function to convert angles into the right space:

float normalize( float degrees )
{
  //-- Converts the specified angle to an angle between 0 and 360 degrees
  float circleCount = (degrees / 360.0f);
  degrees -= (int)circleCount * 360;
  if( 0.0f > degrees )
  {
    degrees += 360.0f;
  }
  return degrees;
}

Here's the solution:

bool isWithinRange( float start, float end, float angle )
{
  if( fabsf( end - start ) >= 360.0f )
  {
    //-- Ranges greater or equal to 360 degrees cover everything
    return true;
  }

  //-- Put our angle between 0 and 360 degrees
  float degrees = normalize( angle );

  //-- Resolve degree value for the start angle; make sure it's
  //   smaller than our angle.
  float startDegrees = normalize( start );
  if( startDegrees > degrees )
  {
    startDegrees -= 360.0f;
  }

  //-- Resolve degree value for the end angle to be within the
  //   same 360 degree range as the start angle and make sure it
  //   comes after the start angle.
  float endDegrees = normalize( end );
  if( endDegrees < startDegrees )
  {
    endDegrees += 360.0f;
  }
  else if( (endDegrees - startDegrees) >= 360.0f )
  {
    endDegrees -= 360.0f;
  }

  //-- All that remains is to validate that our angle is between
  //   the start and the end.
  if( (degrees < startDegrees) || (degrees > endDegrees) )
  {
    return false;
  }

  return true;
}

Hope this helps someone.

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