# 3d Math functions

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+ | ==Author== | ||

+ | This is you the person writing the page, please include any credits to people here also. | ||

+ | ==Description== | ||

+ | A general description of what the script/code can do. | ||

+ | ==Usage== | ||

+ | How to use the script/code (please give clear precise instructions). | ||

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+ | ==Code== | ||

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+ | ==Categories== | ||

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## Revision as of 16:12, 11 December 2012

**This article is a stub.**

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## Contents |

## Author

This is you the person writing the page, please include any credits to people here also.

## Description

A general description of what the script/code can do.

## Usage

How to use the script/code (please give clear precise instructions).

## Code

//increase or decrease the length of vector by size Vector3 AddVectorLength(Vector3 vector, float size){ //get the vector length float magnitude = Vector3.Magnitude(vector); //change the length magnitude += size; //normalize the vector Vector3 vectorNormalized = Vector3.Normalize(vector); //scale the vector return Vector3.Scale(vectorNormalized, new Vector3(magnitude, magnitude, magnitude)); } //create a vector of direction "vector" with length "size" Vector3 SetVectorLength(Vector3 vector, float size){ //normalize the vector Vector3 vectorNormalized = Vector3.Normalize(vector); //scale the vector return vectorNormalized *= size; } //caclulate the rotational difference from A to B Quaternion SubtractRotation(Quaternion B, Quaternion A){ Quaternion C = Quaternion.Inverse(A) * B; return C; } //Find the line of intersection between two planes. The planes are defined by a normal and a point on that plane. //The outputs are a point on the line and a vector which indicates it's direction. If the planes are not parallel, //the function outputs true, otherwise false. bool PlanePlaneIntersection(out Vector3 linePoint, out Vector3 lineVec, Vector3 plane1Normal, Vector3 plane1Position, Vector3 plane2Normal, Vector3 plane2Position){ linePoint = Vector3.zero; lineVec = Vector3.zero; //We can get the direction of the line of intersection of the two planes by calculating the //cross product of the normals of the two planes. Note that this is just a direction and the line //is not fixed in space yet. We need a point for that to go with the line vector. lineVec = Vector3.Cross(plane1Normal, plane2Normal); //Next is to calculate a point on the line to fix it's position in space. This is done by finding a vector from //the plane2 location, moving parallel to it's plane, and intersecting plane1. To prevent rounding //errors, this vector also has to be perpendicular to lineDirection. To get this vector, calculate //the cross product of the normal of plane2 and the lineDirection. Vector3 ldir = Vector3.Cross(plane2Normal, lineVec); float denominator = Vector3.Dot(plane1Normal, ldir); //Prevent divide by zero and rounding errors by requiring about 5 degrees angle between the planes. if(Mathf.Abs(denominator) > 0.006f){ Vector3 plane1ToPlane2 = plane1Position - plane2Position; float t = Vector3.Dot(plane1Normal, plane1ToPlane2) / denominator; linePoint = plane2Position + t * ldir; return true; } //output not valid else{ return false; } } //Get the intersection between a line and a plane. //If the line and plane are not parallel, the function outputs true, otherwise false. bool LinePlaneIntersection(out Vector3 intersection, Vector3 linePoint, Vector3 lineVec, Vector3 planeNormal, Vector3 planePoint){ float length; float dotNumerator; float dotDenominator; Vector3 vector; intersection = Vector3.zero; //calculate the distance between the linePoint and the line-plane intersection point dotNumerator = Vector3.Dot((planePoint - linePoint), planeNormal); dotDenominator = Vector3.Dot(lineVec, planeNormal); //line and plane are not parallel if(dotDenominator != 0.0f){ length = dotNumerator / dotDenominator; //create a vector from the linePoint to the intersection point vector = SetVectorLength(lineVec, length); //get the coordinates of the line-plane intersection point intersection = linePoint + vector; return true; } //output not valid else{ return false; } } //Calculate the instersection point of two lines. Returns true if lines intersect, otherwise false. //Note that in 3d, two lines do not intersect most of the time. So if the two lines are not in the //same plane, use ClosestPointsOnTwoLines() instead. bool LineLineIntersection(out Vector3 intersection, Vector3 linePoint1, Vector3 lineVec1, Vector3 linePoint2, Vector3 lineVec2){ intersection = Vector3.zero; Vector3 lineVec3 = linePoint2 - linePoint1; Vector3 crossVec1and2 = Vector3.Cross(lineVec1, lineVec2); Vector3 crossVec3and2 = Vector3.Cross(lineVec3, lineVec2); float planarFactor = Vector3.Dot(lineVec3, crossVec1and2); //Lines are not coplanar. Take into account rounding errors. if((planarFactor >= 0.00001f) || (planarFactor <= -0.00001f)){ return false; } //Note: sqrMagnitude does x*x+y*y+z*z on the input vector. float s = Vector3.Dot(crossVec3and2, crossVec1and2) / crossVec1and2.sqrMagnitude; if((s >= 0.0f) && (s <= 1.0f)){ intersection = linePoint1 + (lineVec1 * s); return true; } else{ return false; } } //Two non-parallel lines which may or may not touch each other have a point on each line which are closest //to each other. This function finds those two points. If the lines are not parallel, the function //outputs true, otherwise false. bool ClosestPointsOnTwoLines(out Vector3 closestPointLine1, out Vector3 closestPointLine2, Vector3 linePoint1, Vector3 lineVec1, Vector3 linePoint2, Vector3 lineVec2){ closestPointLine1 = Vector3.zero; closestPointLine2 = Vector3.zero; float a = Vector3.Dot(lineVec1, lineVec1); float b = Vector3.Dot(lineVec1, lineVec2); float e = Vector3.Dot(lineVec2, lineVec2); float d = a*e - b*b; //lines are not parallel if(d != 0.0f){ Vector3 r = linePoint1 - linePoint2; float c = Vector3.Dot(lineVec1, r); float f = Vector3.Dot(lineVec2, r); float s = (b*f - c*e) / d; float t = (a*f - c*b) / d; closestPointLine1 = linePoint1 + lineVec1 * s; closestPointLine2 = linePoint2 + lineVec2 * t; return true; } else{ return false; } } //This function returns a point which is a projection from a point to a line. Vector3 ProjectPointOnLine(Vector3 linePoint, Vector3 lineVec, Vector3 point){ //get vector from point on line to point in space Vector3 linePointToPoint = point - linePoint; float t = Vector3.Dot(linePointToPoint, lineVec); return linePoint + lineVec * t; } //This function returns a point which is a projection from a point to a plane. Vector3 ProjectPointOnPlane(Vector3 planeNormal, Vector3 planePoint, Vector3 point){ float distance; Vector3 translationVector; //First calculate the distance from the point to the plane: distance = SignedDistancePlanePoint(planeNormal, planePoint, point); //Reverse the sign of the distance distance *= -1; //Get a translation vector translationVector = SetVectorLength(planeNormal, distance); //Translate the point to form a projection return point + translationVector; } //Projects a vector onto a plane. The output is not normalized. Vector3 ProjectVectorOnPlane(Vector3 planeNormal, Vector3 vector){ return vector - (Vector3.Dot(vector, planeNormal) * planeNormal); } //Get the shortest distance between a point and a plane. The output is signed so it holds information //as to which side of the plane normal the point is. float SignedDistancePlanePoint(Vector3 planeNormal, Vector3 planePoint, Vector3 point){ return Vector3.Dot(planeNormal, (point - planePoint)); } //This function calculates a signed (+ or - sign instead of being ambiguous) dot product. It is basically used //to figure out whether a vector is positioned to the left or right of another vector. The way this is done is //by calculating a vector perpendicular to one of the vectors and using that as a reference. This is because //the result of a dot product only has signed information when an angle is transitioning between more or less //then 90 degrees. float SignedDotProduct(Vector3 vectorA, Vector3 vectorB, Vector3 normal){ Vector3 perpVector; float dot; //Use the geometry object normal and one of the input vectors to calculate the perpendicular vector perpVector = Vector3.Cross(normal, vectorA); //Now calculate the dot product between the perpendicular vector (perpVector) and the other input vector dot = Vector3.Dot(perpVector, vectorB); return dot; } //Calculate the angle between a vector and a plane. The plane is made by a normal vector. //Output is in radians. float AngleVectorPlane(Vector3 vector, Vector3 normal){ float dot; float angle; //calculate the the dot product between the two input vectors. This gives the cosine between the two vectors dot = Vector3.Dot(vector, normal); //this is in radians angle = (float)Math.Acos(dot); return 1.570796326794897f - angle; //90 } //Calculate the dot product as an angle float DotProductAngle(Vector3 vec1, Vector3 vec2){ double dot; double angle; //get the dot product dot = Vector3.Dot(vec1, vec2); //Clamp to prevent NaN error. Shouldn't need this in the first place, but there could be a rounding error issue. if(dot < -1.0f){ dot = -1.0f; } if(dot > 1.0f){ dot =1.0f; } //Calculate the angle. The output is in radians //This step can be skipped for optimization... angle = Math.Acos(dot); return (float)angle; } //Convert a plane defined by 3 points to a plane defined by a vector and a point. //The plane point is the middle of the triangle defined by the 3 points. void PlaneFrom3Points(out Vector3 planeNormal, out Vector3 planePoint, Vector3 pointA, Vector3 pointB, Vector3 pointC){ planeNormal = Vector3.zero; planePoint = Vector3.zero; //Make two vectors from the 3 input points, originating from point A Vector3 AB = pointB - pointA; Vector3 AC = pointC - pointA; //Calculate the normal planeNormal = Vector3.Normalize(Vector3.Cross(AB, AC)); //Get the points in the middle AB and AC Vector3 middleAB = pointA + (AB / 2.0f); Vector3 middleAC = pointA + (AC / 2.0f); //Get vectors from the middle of AB and AC to the point which is not on that line. Vector3 middleABtoC = pointC - middleAB; Vector3 middleACtoB = pointB - middleAC; //Calculate the intersection between the two lines. This will be the center //of the triangle defined by the 3 points. LineLineIntersection(out planePoint, middleAB, middleABtoC, middleAC, middleACtoB); }

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