experimental/Intersection/LineQuadraticIntersection.cpp - skia - Git at Google

 /*
  * Copyright 2012 Google Inc.
  *
  * Use of this source code is governed by a BSD-style license that can be
  * found in the LICENSE file.
  */
 #include "CurveIntersection.h"
 #include "Intersections.h"
 #include "LineUtilities.h"
 #include "QuadraticUtilities.h"

 /*
 Find the interection of a line and quadratic by solving for valid t values.

 From http://stackoverflow.com/questions/1853637/how-to-find-the-mathematical-function-defining-a-bezier-curve

 "A Bezier curve is a parametric function. A quadratic Bezier curve (i.e. three
 control points) can be expressed as: F(t) = A(1 - t)^2 + B(1 - t)t + Ct^2 where
 A, B and C are points and t goes from zero to one.

 This will give you two equations:

   x = a(1 - t)^2 + b(1 - t)t + ct^2
   y = d(1 - t)^2 + e(1 - t)t + ft^2

 If you add for instance the line equation (y = kx + m) to that, you'll end up
 with three equations and three unknowns (x, y and t)."

 Similar to above, the quadratic is represented as
   x = a(1-t)^2 + 2b(1-t)t + ct^2
   y = d(1-t)^2 + 2e(1-t)t + ft^2
 and the line as
   y = g*x + h

 Using Mathematica, solve for the values of t where the quadratic intersects the
 line:

   (in)  t1 = Resultant[a*(1 - t)^2 + 2*b*(1 - t)*t + c*t^2 - x,
                        d*(1 - t)^2 + 2*e*(1 - t)*t  + f*t^2 - g*x - h, x]
   (out) -d + h + 2 d t - 2 e t - d t^2 + 2 e t^2 - f t^2 +
          g  (a - 2 a t + 2 b t + a t^2 - 2 b t^2 + c t^2)
   (in)  Solve[t1 == 0, t]
   (out) {
     {t -> (-2 d + 2 e +   2 a g - 2 b g    -
       Sqrt[(2 d - 2 e -   2 a g + 2 b g)^2 -
           4 (-d + 2 e - f + a g - 2 b g    + c g) (-d + a g + h)]) /
          (2 (-d + 2 e - f + a g - 2 b g    + c g))
          },
     {t -> (-2 d + 2 e +   2 a g - 2 b g    +
       Sqrt[(2 d - 2 e -   2 a g + 2 b g)^2 -
           4 (-d + 2 e - f + a g - 2 b g    + c g) (-d + a g + h)]) /
          (2 (-d + 2 e - f + a g - 2 b g    + c g))
          }
         }

 Using the results above (when the line tends towards horizontal)
        A =   (-(d - 2*e + f) + g*(a - 2*b + c)     )
        B = 2*( (d -   e    ) - g*(a -   b    )     )
        C =   (-(d          ) + g*(a          ) + h )

 If g goes to infinity, we can rewrite the line in terms of x.
   x = g'*y + h'

 And solve accordingly in Mathematica:

   (in)  t2 = Resultant[a*(1 - t)^2 + 2*b*(1 - t)*t + c*t^2 - g'*y - h',
                        d*(1 - t)^2 + 2*e*(1 - t)*t  + f*t^2 - y, y]
   (out)  a - h' - 2 a t + 2 b t + a t^2 - 2 b t^2 + c t^2 -
          g'  (d - 2 d t + 2 e t + d t^2 - 2 e t^2 + f t^2)
   (in)  Solve[t2 == 0, t]
   (out) {
     {t -> (2 a - 2 b -   2 d g' + 2 e g'    -
     Sqrt[(-2 a + 2 b +   2 d g' - 2 e g')^2 -
           4 (a - 2 b + c - d g' + 2 e g' - f g') (a - d g' - h')]) /
          (2 (a - 2 b + c - d g' + 2 e g' - f g'))
          },
     {t -> (2 a - 2 b -   2 d g' + 2 e g'    +
     Sqrt[(-2 a + 2 b +   2 d g' - 2 e g')^2 -
           4 (a - 2 b + c - d g' + 2 e g' - f g') (a - d g' - h')])/
          (2 (a - 2 b + c - d g' + 2 e g' - f g'))
          }
         }

 Thus, if the slope of the line tends towards vertical, we use:
        A =   ( (a - 2*b + c) - g'*(d  - 2*e + f)      )
        B = 2*(-(a -   b    ) + g'*(d  -   e    )      )
        C =   ( (a          ) - g'*(d           ) - h' )
  */


 class LineQuadraticIntersections {
 public:

 LineQuadraticIntersections(const Quadratic& q, const _Line& l, Intersections& i)
     : quad(q)
     , line(l)
     , intersections(i) {
 }

 int intersectRay(double roots[2]) {
 /*
     solve by rotating line+quad so line is horizontal, then finding the roots
     set up matrix to rotate quad to x-axis
     |cos(a) -sin(a)|
     |sin(a)  cos(a)|
     note that cos(a) = A(djacent) / Hypoteneuse
               sin(a) = O(pposite) / Hypoteneuse
     since we are computing Ts, we can ignore hypoteneuse, the scale factor:
     |  A     -O    |
     |  O      A    |
     A = line[1].x - line[0].x (adjacent side of the right triangle)
     O = line[1].y - line[0].y (opposite side of the right triangle)
     for each of the three points (e.g. n = 0 to 2)
     quad[n].y' = (quad[n].y - line[0].y) * A - (quad[n].x - line[0].x) * O
 */
     double adj = line[1].x - line[0].x;
     double opp = line[1].y - line[0].y;
     double r[3];
     for (int n = 0; n < 3; ++n) {
         r[n] = (quad[n].y - line[0].y) * adj - (quad[n].x - line[0].x) * opp;
     }
     double A = r[2];
     double B = r[1];
     double C = r[0];
     A += C - 2 * B; // A = a - 2*b + c
     B -= C; // B = -(b - c)
     return quadraticRootsValidT(A, 2 * B, C, roots);
 }

 int intersect() {
     addEndPoints();
     double rootVals[2];
     int roots = intersectRay(rootVals);
     for (int index = 0; index < roots; ++index) {
         double quadT = rootVals[index];
         double lineT = findLineT(quadT);
         if (pinTs(quadT, lineT)) {
             _Point pt;
             xy_at_t(line, lineT, pt.x, pt.y);
             intersections.insert(quadT, lineT, pt);
         }
     }
     return intersections.fUsed;
 }

 int horizontalIntersect(double axisIntercept, double roots[2]) {
     double D = quad[2].y; // f
     double E = quad[1].y; // e
     double F = quad[0].y; // d
     D += F - 2 * E; // D = d - 2*e + f
     E -= F; // E = -(d - e)
     F -= axisIntercept;
     return quadraticRootsValidT(D, 2 * E, F, roots);
 }

 int horizontalIntersect(double axisIntercept, double left, double right, bool flipped) {
     addHorizontalEndPoints(left, right, axisIntercept);
     double rootVals[2];
     int roots = horizontalIntersect(axisIntercept, rootVals);
     for (int index = 0; index < roots; ++index) {
         _Point pt;
         double quadT = rootVals[index];
         xy_at_t(quad, quadT, pt.x, pt.y);
         double lineT = (pt.x - left) / (right - left);
         if (pinTs(quadT, lineT)) {
             intersections.insert(quadT, lineT, pt);
         }
     }
     if (flipped) {
         flip();
     }
     return intersections.fUsed;
 }

 int verticalIntersect(double axisIntercept, double roots[2]) {
     double D = quad[2].x; // f
     double E = quad[1].x; // e
     double F = quad[0].x; // d
     D += F - 2 * E; // D = d - 2*e + f
     E -= F; // E = -(d - e)
     F -= axisIntercept;
     return quadraticRootsValidT(D, 2 * E, F, roots);
 }

 int verticalIntersect(double axisIntercept, double top, double bottom, bool flipped) {
     addVerticalEndPoints(top, bottom, axisIntercept);
     double rootVals[2];
     int roots = verticalIntersect(axisIntercept, rootVals);
     for (int index = 0; index < roots; ++index) {
         _Point pt;
         double quadT = rootVals[index];
         xy_at_t(quad, quadT, pt.x, pt.y);
         double lineT = (pt.y - top) / (bottom - top);
         if (pinTs(quadT, lineT)) {
             intersections.insert(quadT, lineT, pt);
         }
     }
     if (flipped) {
         flip();
     }
     return intersections.fUsed;
 }

 protected:

 // add endpoints first to get zero and one t values exactly
 void addEndPoints()
 {
     for (int qIndex = 0; qIndex < 3; qIndex += 2) {
         for (int lIndex = 0; lIndex < 2; lIndex++) {
             if (quad[qIndex] == line[lIndex]) {
                 intersections.insert(qIndex >> 1, lIndex, line[lIndex]);
             }
         }
     }
 }

 void addHorizontalEndPoints(double left, double right, double y)
 {
     for (int qIndex = 0; qIndex < 3; qIndex += 2) {
         if (quad[qIndex].y != y) {
             continue;
         }
         if (quad[qIndex].x == left) {
             intersections.insert(qIndex >> 1, 0, quad[qIndex]);
         }
         if (quad[qIndex].x == right) {
             intersections.insert(qIndex >> 1, 1, quad[qIndex]);
         }
     }
 }

 void addVerticalEndPoints(double top, double bottom, double x)
 {
     for (int qIndex = 0; qIndex < 3; qIndex += 2) {
         if (quad[qIndex].x != x) {
             continue;
         }
         if (quad[qIndex].y == top) {
             intersections.insert(qIndex >> 1, 0, quad[qIndex]);
         }
         if (quad[qIndex].y == bottom) {
             intersections.insert(qIndex >> 1, 1, quad[qIndex]);
         }
     }
 }

 double findLineT(double t) {
     double x, y;
     xy_at_t(quad, t, x, y);
     double dx = line[1].x - line[0].x;
     double dy = line[1].y - line[0].y;
     if (fabs(dx) > fabs(dy)) {
         return (x - line[0].x) / dx;
     }
     return (y - line[0].y) / dy;
 }

 void flip() {
     // OPTIMIZATION: instead of swapping, pass original line, use [1].y - [0].y
     int roots = intersections.fUsed;
     for (int index = 0; index < roots; ++index) {
         intersections.fT[1][index] = 1 - intersections.fT[1][index];
     }
 }

 static bool pinTs(double& quadT, double& lineT) {
     if (!approximately_one_or_less(lineT)) {
         return false;
     }
     if (!approximately_zero_or_more(lineT)) {
         return false;
     }
     if (precisely_less_than_zero(quadT)) {
         quadT = 0;
     } else if (precisely_greater_than_one(quadT)) {
         quadT = 1;
     }
     if (precisely_less_than_zero(lineT)) {
         lineT = 0;
     } else if (precisely_greater_than_one(lineT)) {
         lineT = 1;
     }
     return true;
 }

 private:

 const Quadratic& quad;
 const _Line& line;
 Intersections& intersections;
 };

 // utility for pairs of coincident quads
 static double horizontalIntersect(const Quadratic& quad, const _Point& pt) {
     LineQuadraticIntersections q(quad, *((_Line*) 0), *((Intersections*) 0));
     double rootVals[2];
     int roots = q.horizontalIntersect(pt.y, rootVals);
     for (int index = 0; index < roots; ++index) {
         double x;
         double t = rootVals[index];
         xy_at_t(quad, t, x, *(double*) 0);
         if (AlmostEqualUlps(x, pt.x)) {
             return t;
         }
     }
     return -1;
 }

 static double verticalIntersect(const Quadratic& quad, const _Point& pt) {
     LineQuadraticIntersections q(quad, *((_Line*) 0), *((Intersections*) 0));
     double rootVals[2];
     int roots = q.verticalIntersect(pt.x, rootVals);
     for (int index = 0; index < roots; ++index) {
         double y;
         double t = rootVals[index];
         xy_at_t(quad, t, *(double*) 0, y);
         if (AlmostEqualUlps(y, pt.y)) {
             return t;
         }
     }
     return -1;
 }

 double axialIntersect(const Quadratic& q1, const _Point& p, bool vertical) {
     if (vertical) {
         return verticalIntersect(q1, p);
     }
     return horizontalIntersect(q1, p);
 }

 int horizontalIntersect(const Quadratic& quad, double left, double right,
         double y, double tRange[2]) {
     LineQuadraticIntersections q(quad, *((_Line*) 0), *((Intersections*) 0));
     double rootVals[2];
     int result = q.horizontalIntersect(y, rootVals);
     int tCount = 0;
     for (int index = 0; index < result; ++index) {
         double x, y;
         xy_at_t(quad, rootVals[index], x, y);
         if (x < left || x > right) {
             continue;
         }
         tRange[tCount++] = rootVals[index];
     }
     return tCount;
 }

 int horizontalIntersect(const Quadratic& quad, double left, double right, double y,
         bool flipped, Intersections& intersections) {
     LineQuadraticIntersections q(quad, *((_Line*) 0), intersections);
     return q.horizontalIntersect(y, left, right, flipped);
 }

 int verticalIntersect(const Quadratic& quad, double top, double bottom, double x,
         bool flipped, Intersections& intersections) {
     LineQuadraticIntersections q(quad, *((_Line*) 0), intersections);
     return q.verticalIntersect(x, top, bottom, flipped);
 }

 int intersect(const Quadratic& quad, const _Line& line, Intersections& i) {
     LineQuadraticIntersections q(quad, line, i);
     return q.intersect();
 }

 int intersectRay(const Quadratic& quad, const _Line& line, Intersections& i) {
     LineQuadraticIntersections q(quad, line, i);
     return q.intersectRay(i.fT[0]);
 }
	/*
	* Copyright 2012 Google Inc.
	*
	* Use of this source code is governed by a BSD-style license that can be
	* found in the LICENSE file.
	*/
	#include "CurveIntersection.h"
	#include "Intersections.h"
	#include "LineUtilities.h"
	#include "QuadraticUtilities.h"

	/*
	Find the interection of a line and quadratic by solving for valid t values.

	From http://stackoverflow.com/questions/1853637/how-to-find-the-mathematical-function-defining-a-bezier-curve

	"A Bezier curve is a parametric function. A quadratic Bezier curve (i.e. three
	control points) can be expressed as: F(t) = A(1 - t)^2 + B(1 - t)t + Ct^2 where
	A, B and C are points and t goes from zero to one.

	This will give you two equations:

	x = a(1 - t)^2 + b(1 - t)t + ct^2
	y = d(1 - t)^2 + e(1 - t)t + ft^2

	If you add for instance the line equation (y = kx + m) to that, you'll end up
	with three equations and three unknowns (x, y and t)."

	Similar to above, the quadratic is represented as
	x = a(1-t)^2 + 2b(1-t)t + ct^2
	y = d(1-t)^2 + 2e(1-t)t + ft^2
	and the line as
	y = g*x + h

	Using Mathematica, solve for the values of t where the quadratic intersects the
	line:

	(in) t1 = Resultant[a(1 - t)^2 + 2b(1 - t)t + c*t^2 - x,
	d(1 - t)^2 + 2e(1 - t)t + ft^2 - gx - h, x]
	(out) -d + h + 2 d t - 2 e t - d t^2 + 2 e t^2 - f t^2 +
	g (a - 2 a t + 2 b t + a t^2 - 2 b t^2 + c t^2)
	(in) Solve[t1 == 0, t]
	(out) {
	{t -> (-2 d + 2 e + 2 a g - 2 b g -
	Sqrt[(2 d - 2 e - 2 a g + 2 b g)^2 -
	4 (-d + 2 e - f + a g - 2 b g + c g) (-d + a g + h)]) /
	(2 (-d + 2 e - f + a g - 2 b g + c g))
	},
	{t -> (-2 d + 2 e + 2 a g - 2 b g +
	Sqrt[(2 d - 2 e - 2 a g + 2 b g)^2 -
	4 (-d + 2 e - f + a g - 2 b g + c g) (-d + a g + h)]) /
	(2 (-d + 2 e - f + a g - 2 b g + c g))
	}
	}

	Using the results above (when the line tends towards horizontal)
	A = (-(d - 2e + f) + g(a - 2*b + c) )
	B = 2( (d - e ) - g(a - b ) )
	C = (-(d ) + g*(a ) + h )

	If g goes to infinity, we can rewrite the line in terms of x.
	x = g'*y + h'

	And solve accordingly in Mathematica:

	(in) t2 = Resultant[a(1 - t)^2 + 2b(1 - t)t + ct^2 - g'y - h',
	d(1 - t)^2 + 2e(1 - t)t + f*t^2 - y, y]
	(out) a - h' - 2 a t + 2 b t + a t^2 - 2 b t^2 + c t^2 -
	g' (d - 2 d t + 2 e t + d t^2 - 2 e t^2 + f t^2)
	(in) Solve[t2 == 0, t]
	(out) {
	{t -> (2 a - 2 b - 2 d g' + 2 e g' -
	Sqrt[(-2 a + 2 b + 2 d g' - 2 e g')^2 -
	4 (a - 2 b + c - d g' + 2 e g' - f g') (a - d g' - h')]) /
	(2 (a - 2 b + c - d g' + 2 e g' - f g'))
	},
	{t -> (2 a - 2 b - 2 d g' + 2 e g' +
	Sqrt[(-2 a + 2 b + 2 d g' - 2 e g')^2 -
	4 (a - 2 b + c - d g' + 2 e g' - f g') (a - d g' - h')])/
	(2 (a - 2 b + c - d g' + 2 e g' - f g'))
	}
	}

	Thus, if the slope of the line tends towards vertical, we use:
	A = ( (a - 2b + c) - g'(d - 2*e + f) )
	B = 2(-(a - b ) + g'(d - e ) )
	C = ( (a ) - g'*(d ) - h' )
	*/


	class LineQuadraticIntersections {
	public:

	LineQuadraticIntersections(const Quadratic& q, const _Line& l, Intersections& i)
	: quad(q)
	, line(l)
	, intersections(i) {
	}

	int intersectRay(double roots[2]) {
	/*
	solve by rotating line+quad so line is horizontal, then finding the roots
	set up matrix to rotate quad to x-axis
	\|cos(a) -sin(a)\|
	\|sin(a) cos(a)\|
	note that cos(a) = A(djacent) / Hypoteneuse
	sin(a) = O(pposite) / Hypoteneuse
	since we are computing Ts, we can ignore hypoteneuse, the scale factor:
	\| A -O \|
	\| O A \|
	A = line[1].x - line[0].x (adjacent side of the right triangle)
	O = line[1].y - line[0].y (opposite side of the right triangle)
	for each of the three points (e.g. n = 0 to 2)
	quad[n].y' = (quad[n].y - line[0].y) * A - (quad[n].x - line[0].x) * O
	*/
	double adj = line[1].x - line[0].x;
	double opp = line[1].y - line[0].y;
	double r[3];
	for (int n = 0; n < 3; ++n) {
	r[n] = (quad[n].y - line[0].y) * adj - (quad[n].x - line[0].x) * opp;
	}
	double A = r[2];
	double B = r[1];
	double C = r[0];
	A += C - 2 * B; // A = a - 2*b + c
	B -= C; // B = -(b - c)
	return quadraticRootsValidT(A, 2 * B, C, roots);
	}

	int intersect() {
	addEndPoints();
	double rootVals[2];
	int roots = intersectRay(rootVals);
	for (int index = 0; index < roots; ++index) {
	double quadT = rootVals[index];
	double lineT = findLineT(quadT);
	if (pinTs(quadT, lineT)) {
	_Point pt;
	xy_at_t(line, lineT, pt.x, pt.y);
	intersections.insert(quadT, lineT, pt);
	}
	}
	return intersections.fUsed;
	}

	int horizontalIntersect(double axisIntercept, double roots[2]) {
	double D = quad[2].y; // f
	double E = quad[1].y; // e
	double F = quad[0].y; // d
	D += F - 2 * E; // D = d - 2*e + f
	E -= F; // E = -(d - e)
	F -= axisIntercept;
	return quadraticRootsValidT(D, 2 * E, F, roots);
	}

	int horizontalIntersect(double axisIntercept, double left, double right, bool flipped) {
	addHorizontalEndPoints(left, right, axisIntercept);
	double rootVals[2];
	int roots = horizontalIntersect(axisIntercept, rootVals);
	for (int index = 0; index < roots; ++index) {
	_Point pt;
	double quadT = rootVals[index];
	xy_at_t(quad, quadT, pt.x, pt.y);
	double lineT = (pt.x - left) / (right - left);
	if (pinTs(quadT, lineT)) {
	intersections.insert(quadT, lineT, pt);
	}
	}
	if (flipped) {
	flip();
	}
	return intersections.fUsed;
	}

	int verticalIntersect(double axisIntercept, double roots[2]) {
	double D = quad[2].x; // f
	double E = quad[1].x; // e
	double F = quad[0].x; // d
	D += F - 2 * E; // D = d - 2*e + f
	E -= F; // E = -(d - e)
	F -= axisIntercept;
	return quadraticRootsValidT(D, 2 * E, F, roots);
	}

	int verticalIntersect(double axisIntercept, double top, double bottom, bool flipped) {
	addVerticalEndPoints(top, bottom, axisIntercept);
	double rootVals[2];
	int roots = verticalIntersect(axisIntercept, rootVals);
	for (int index = 0; index < roots; ++index) {
	_Point pt;
	double quadT = rootVals[index];
	xy_at_t(quad, quadT, pt.x, pt.y);
	double lineT = (pt.y - top) / (bottom - top);
	if (pinTs(quadT, lineT)) {
	intersections.insert(quadT, lineT, pt);
	}
	}
	if (flipped) {
	flip();
	}
	return intersections.fUsed;
	}

	protected:

	// add endpoints first to get zero and one t values exactly
	void addEndPoints()
	{
	for (int qIndex = 0; qIndex < 3; qIndex += 2) {
	for (int lIndex = 0; lIndex < 2; lIndex++) {
	if (quad[qIndex] == line[lIndex]) {
	intersections.insert(qIndex >> 1, lIndex, line[lIndex]);
	}
	}
	}
	}

	void addHorizontalEndPoints(double left, double right, double y)
	{
	for (int qIndex = 0; qIndex < 3; qIndex += 2) {
	if (quad[qIndex].y != y) {
	continue;
	}
	if (quad[qIndex].x == left) {
	intersections.insert(qIndex >> 1, 0, quad[qIndex]);
	}
	if (quad[qIndex].x == right) {
	intersections.insert(qIndex >> 1, 1, quad[qIndex]);
	}
	}
	}

	void addVerticalEndPoints(double top, double bottom, double x)
	{
	for (int qIndex = 0; qIndex < 3; qIndex += 2) {
	if (quad[qIndex].x != x) {
	continue;
	}
	if (quad[qIndex].y == top) {
	intersections.insert(qIndex >> 1, 0, quad[qIndex]);
	}
	if (quad[qIndex].y == bottom) {
	intersections.insert(qIndex >> 1, 1, quad[qIndex]);
	}
	}
	}

	double findLineT(double t) {
	double x, y;
	xy_at_t(quad, t, x, y);
	double dx = line[1].x - line[0].x;
	double dy = line[1].y - line[0].y;
	if (fabs(dx) > fabs(dy)) {
	return (x - line[0].x) / dx;
	}
	return (y - line[0].y) / dy;
	}

	void flip() {
	// OPTIMIZATION: instead of swapping, pass original line, use [1].y - [0].y
	int roots = intersections.fUsed;
	for (int index = 0; index < roots; ++index) {
	intersections.fT[1][index] = 1 - intersections.fT[1][index];
	}
	}

	static bool pinTs(double& quadT, double& lineT) {
	if (!approximately_one_or_less(lineT)) {
	return false;
	}
	if (!approximately_zero_or_more(lineT)) {
	return false;
	}
	if (precisely_less_than_zero(quadT)) {
	quadT = 0;
	} else if (precisely_greater_than_one(quadT)) {
	quadT = 1;
	}
	if (precisely_less_than_zero(lineT)) {
	lineT = 0;
	} else if (precisely_greater_than_one(lineT)) {
	lineT = 1;
	}
	return true;
	}

	private:

	const Quadratic& quad;
	const _Line& line;
	Intersections& intersections;
	};

	// utility for pairs of coincident quads
	static double horizontalIntersect(const Quadratic& quad, const _Point& pt) {
	LineQuadraticIntersections q(quad, ((_Line) 0), ((Intersections) 0));
	double rootVals[2];
	int roots = q.horizontalIntersect(pt.y, rootVals);
	for (int index = 0; index < roots; ++index) {
	double x;
	double t = rootVals[index];
	xy_at_t(quad, t, x, (double) 0);
	if (AlmostEqualUlps(x, pt.x)) {
	return t;
	}
	}
	return -1;
	}

	static double verticalIntersect(const Quadratic& quad, const _Point& pt) {
	LineQuadraticIntersections q(quad, ((_Line) 0), ((Intersections) 0));
	double rootVals[2];
	int roots = q.verticalIntersect(pt.x, rootVals);
	for (int index = 0; index < roots; ++index) {
	double y;
	double t = rootVals[index];
	xy_at_t(quad, t, (double) 0, y);
	if (AlmostEqualUlps(y, pt.y)) {
	return t;
	}
	}
	return -1;
	}

	double axialIntersect(const Quadratic& q1, const _Point& p, bool vertical) {
	if (vertical) {
	return verticalIntersect(q1, p);
	}
	return horizontalIntersect(q1, p);
	}

	int horizontalIntersect(const Quadratic& quad, double left, double right,
	double y, double tRange[2]) {
	LineQuadraticIntersections q(quad, ((_Line) 0), ((Intersections) 0));
	double rootVals[2];
	int result = q.horizontalIntersect(y, rootVals);
	int tCount = 0;
	for (int index = 0; index < result; ++index) {
	double x, y;
	xy_at_t(quad, rootVals[index], x, y);
	if (x < left \|\| x > right) {
	continue;
	}
	tRange[tCount++] = rootVals[index];
	}
	return tCount;
	}

	int horizontalIntersect(const Quadratic& quad, double left, double right, double y,
	bool flipped, Intersections& intersections) {
	LineQuadraticIntersections q(quad, ((_Line) 0), intersections);
	return q.horizontalIntersect(y, left, right, flipped);
	}

	int verticalIntersect(const Quadratic& quad, double top, double bottom, double x,
	bool flipped, Intersections& intersections) {
	LineQuadraticIntersections q(quad, ((_Line) 0), intersections);
	return q.verticalIntersect(x, top, bottom, flipped);
	}

	int intersect(const Quadratic& quad, const _Line& line, Intersections& i) {
	LineQuadraticIntersections q(quad, line, i);
	return q.intersect();
	}

	int intersectRay(const Quadratic& quad, const _Line& line, Intersections& i) {
	LineQuadraticIntersections q(quad, line, i);
	return q.intersectRay(i.fT[0]);
	}