src/pathops/SkPathOpsTypes.h - 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.
  */
 #ifndef SkPathOpsTypes_DEFINED
 #define SkPathOpsTypes_DEFINED

 #include <float.h>  // for FLT_EPSILON
 #include <math.h>   // for fabs, sqrt

 #include "SkFloatingPoint.h"
 #include "SkPath.h"
 #include "SkPathOps.h"
 #include "SkPathOpsDebug.h"
 #include "SkScalar.h"

 enum SkPathOpsMask {
     kWinding_PathOpsMask = -1,
     kNo_PathOpsMask = 0,
     kEvenOdd_PathOpsMask = 1
 };

 // Use Almost Equal when comparing coordinates. Use epsilon to compare T values.
 bool AlmostEqualUlps(float a, float b);
 inline bool AlmostEqualUlps(double a, double b) {
     return AlmostEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 // Use Almost Dequal when comparing should not special case denormalized values.
 bool AlmostDequalUlps(float a, float b);
 bool AlmostDequalUlps(double a, double b);

 bool NotAlmostEqualUlps(float a, float b);
 inline bool NotAlmostEqualUlps(double a, double b) {
     return NotAlmostEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 bool NotAlmostDequalUlps(float a, float b);
 inline bool NotAlmostDequalUlps(double a, double b) {
     return NotAlmostDequalUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 // Use Almost Bequal when comparing coordinates in conjunction with between.
 bool AlmostBequalUlps(float a, float b);
 inline bool AlmostBequalUlps(double a, double b) {
     return AlmostBequalUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 bool AlmostPequalUlps(float a, float b);
 inline bool AlmostPequalUlps(double a, double b) {
     return AlmostPequalUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 bool RoughlyEqualUlps(float a, float b);
 inline bool RoughlyEqualUlps(double a, double b) {
     return RoughlyEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 bool AlmostLessUlps(float a, float b);
 inline bool AlmostLessUlps(double a, double b) {
     return AlmostLessUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 bool AlmostLessOrEqualUlps(float a, float b);
 inline bool AlmostLessOrEqualUlps(double a, double b) {
     return AlmostLessOrEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 bool AlmostBetweenUlps(float a, float b, float c);
 inline bool AlmostBetweenUlps(double a, double b, double c) {
     return AlmostBetweenUlps(SkDoubleToScalar(a), SkDoubleToScalar(b), SkDoubleToScalar(c));
 }

 int UlpsDistance(float a, float b);
 inline int UlpsDistance(double a, double b) {
     return UlpsDistance(SkDoubleToScalar(a), SkDoubleToScalar(b));
 }

 // FLT_EPSILON == 1.19209290E-07 == 1 / (2 ^ 23)
 // DBL_EPSILON == 2.22045e-16
 const double FLT_EPSILON_CUBED = FLT_EPSILON * FLT_EPSILON * FLT_EPSILON;
 const double FLT_EPSILON_HALF = FLT_EPSILON / 2;
 const double FLT_EPSILON_DOUBLE = FLT_EPSILON * 2;
 const double FLT_EPSILON_ORDERABLE_ERR = FLT_EPSILON * 16;
 const double FLT_EPSILON_SQUARED = FLT_EPSILON * FLT_EPSILON;
 const double FLT_EPSILON_SQRT = sqrt(FLT_EPSILON);
 const double FLT_EPSILON_INVERSE = 1 / FLT_EPSILON;
 const double DBL_EPSILON_ERR = DBL_EPSILON * 4;  // FIXME: tune -- allow a few bits of error
 const double DBL_EPSILON_SUBDIVIDE_ERR = DBL_EPSILON * 16;
 const double ROUGH_EPSILON = FLT_EPSILON * 64;
 const double MORE_ROUGH_EPSILON = FLT_EPSILON * 256;
 const double WAY_ROUGH_EPSILON = FLT_EPSILON * 2048;

 inline bool zero_or_one(double x) {
     return x == 0 || x == 1;
 }

 inline bool approximately_zero(double x) {
     return fabs(x) < FLT_EPSILON;
 }

 inline bool precisely_zero(double x) {
     return fabs(x) < DBL_EPSILON_ERR;
 }

 inline bool precisely_subdivide_zero(double x) {
     return fabs(x) < DBL_EPSILON_SUBDIVIDE_ERR;
 }

 inline bool approximately_zero(float x) {
     return fabs(x) < FLT_EPSILON;
 }

 inline bool approximately_zero_cubed(double x) {
     return fabs(x) < FLT_EPSILON_CUBED;
 }

 inline bool approximately_zero_half(double x) {
     return fabs(x) < FLT_EPSILON_HALF;
 }

 inline bool approximately_zero_double(double x) {
     return fabs(x) < FLT_EPSILON_DOUBLE;
 }

 inline bool approximately_zero_orderable(double x) {
     return fabs(x) < FLT_EPSILON_ORDERABLE_ERR;
 }

 inline bool approximately_zero_squared(double x) {
     return fabs(x) < FLT_EPSILON_SQUARED;
 }

 inline bool approximately_zero_sqrt(double x) {
     return fabs(x) < FLT_EPSILON_SQRT;
 }

 inline bool roughly_zero(double x) {
     return fabs(x) < ROUGH_EPSILON;
 }

 inline bool approximately_zero_inverse(double x) {
     return fabs(x) > FLT_EPSILON_INVERSE;
 }

 // OPTIMIZATION: if called multiple times with the same denom, we want to pass 1/y instead
 inline bool approximately_zero_when_compared_to(double x, double y) {
     return x == 0 || fabs(x) < fabs(y * FLT_EPSILON);
 }

 // Use this for comparing Ts in the range of 0 to 1. For general numbers (larger and smaller) use
 // AlmostEqualUlps instead.
 inline bool approximately_equal(double x, double y) {
     return approximately_zero(x - y);
 }

 inline bool precisely_equal(double x, double y) {
     return precisely_zero(x - y);
 }

 inline bool precisely_subdivide_equal(double x, double y) {
     return precisely_subdivide_zero(x - y);
 }

 inline bool approximately_equal_half(double x, double y) {
     return approximately_zero_half(x - y);
 }

 inline bool approximately_equal_double(double x, double y) {
     return approximately_zero_double(x - y);
 }

 inline bool approximately_equal_orderable(double x, double y) {
     return approximately_zero_orderable(x - y);
 }

 inline bool approximately_equal_squared(double x, double y) {
     return approximately_equal(x, y);
 }

 inline bool approximately_greater(double x, double y) {
     return x - FLT_EPSILON >= y;
 }

 inline bool approximately_greater_double(double x, double y) {
     return x - FLT_EPSILON_DOUBLE >= y;
 }

 inline bool approximately_greater_orderable(double x, double y) {
     return x - FLT_EPSILON_ORDERABLE_ERR >= y;
 }

 inline bool approximately_greater_or_equal(double x, double y) {
     return x + FLT_EPSILON > y;
 }

 inline bool approximately_greater_or_equal_double(double x, double y) {
     return x + FLT_EPSILON_DOUBLE > y;
 }

 inline bool approximately_greater_or_equal_orderable(double x, double y) {
     return x + FLT_EPSILON_ORDERABLE_ERR > y;
 }

 inline bool approximately_lesser(double x, double y) {
     return x + FLT_EPSILON <= y;
 }

 inline bool approximately_lesser_double(double x, double y) {
     return x + FLT_EPSILON_DOUBLE <= y;
 }

 inline bool approximately_lesser_orderable(double x, double y) {
     return x + FLT_EPSILON_ORDERABLE_ERR <= y;
 }

 inline bool approximately_lesser_or_equal(double x, double y) {
     return x - FLT_EPSILON < y;
 }

 inline bool approximately_lesser_or_equal_double(double x, double y) {
     return x - FLT_EPSILON_DOUBLE < y;
 }

 inline bool approximately_lesser_or_equal_orderable(double x, double y) {
     return x - FLT_EPSILON_ORDERABLE_ERR < y;
 }

 inline bool approximately_greater_than_one(double x) {
     return x > 1 - FLT_EPSILON;
 }

 inline bool precisely_greater_than_one(double x) {
     return x > 1 - DBL_EPSILON_ERR;
 }

 inline bool approximately_less_than_zero(double x) {
     return x < FLT_EPSILON;
 }

 inline bool precisely_less_than_zero(double x) {
     return x < DBL_EPSILON_ERR;
 }

 inline bool approximately_negative(double x) {
     return x < FLT_EPSILON;
 }

 inline bool approximately_negative_orderable(double x) {
     return x < FLT_EPSILON_ORDERABLE_ERR;
 }

 inline bool precisely_negative(double x) {
     return x < DBL_EPSILON_ERR;
 }

 inline bool approximately_one_or_less(double x) {
     return x < 1 + FLT_EPSILON;
 }

 inline bool approximately_one_or_less_double(double x) {
     return x < 1 + FLT_EPSILON_DOUBLE;
 }

 inline bool approximately_positive(double x) {
     return x > -FLT_EPSILON;
 }

 inline bool approximately_positive_squared(double x) {
     return x > -(FLT_EPSILON_SQUARED);
 }

 inline bool approximately_zero_or_more(double x) {
     return x > -FLT_EPSILON;
 }

 inline bool approximately_zero_or_more_double(double x) {
     return x > -FLT_EPSILON_DOUBLE;
 }

 inline bool approximately_between_orderable(double a, double b, double c) {
     return a <= c
             ? approximately_negative_orderable(a - b) && approximately_negative_orderable(b - c)
             : approximately_negative_orderable(b - a) && approximately_negative_orderable(c - b);
 }

 inline bool approximately_between(double a, double b, double c) {
     return a <= c ? approximately_negative(a - b) && approximately_negative(b - c)
             : approximately_negative(b - a) && approximately_negative(c - b);
 }

 inline bool precisely_between(double a, double b, double c) {
     return a <= c ? precisely_negative(a - b) && precisely_negative(b - c)
             : precisely_negative(b - a) && precisely_negative(c - b);
 }

 // returns true if (a <= b <= c) || (a >= b >= c)
 inline bool between(double a, double b, double c) {
     SkASSERT(((a <= b && b <= c) || (a >= b && b >= c)) == ((a - b) * (c - b) <= 0));
     return (a - b) * (c - b) <= 0;
 }

 inline bool roughly_equal(double x, double y) {
     return fabs(x - y) < ROUGH_EPSILON;
 }

 inline bool more_roughly_equal(double x, double y) {
     return fabs(x - y) < MORE_ROUGH_EPSILON;
 }

 inline bool way_roughly_equal(double x, double y) {
     return fabs(x - y) < WAY_ROUGH_EPSILON;
 }

 struct SkDPoint;
 struct SkDVector;
 struct SkDLine;
 struct SkDQuad;
 struct SkDTriangle;
 struct SkDCubic;
 struct SkDRect;

 inline SkPath::Verb SkPathOpsPointsToVerb(int points) {
     int verb = (1 << points) >> 1;
 #ifdef SK_DEBUG
     switch (points) {
         case 0: SkASSERT(SkPath::kMove_Verb == verb); break;
         case 1: SkASSERT(SkPath::kLine_Verb == verb); break;
         case 2: SkASSERT(SkPath::kQuad_Verb == verb); break;
         case 3: SkASSERT(SkPath::kCubic_Verb == verb); break;
         default: SkDEBUGFAIL("should not be here");
     }
 #endif
     return (SkPath::Verb)verb;
 }

 inline int SkPathOpsVerbToPoints(SkPath::Verb verb) {
     int points = (int) verb - ((int) verb >> 2);
 #ifdef SK_DEBUG
     switch (verb) {
         case SkPath::kLine_Verb: SkASSERT(1 == points); break;
         case SkPath::kQuad_Verb: SkASSERT(2 == points); break;
         case SkPath::kCubic_Verb: SkASSERT(3 == points); break;
         default: SkDEBUGFAIL("should not get here");
     }
 #endif
     return points;
 }

 inline double SkDInterp(double A, double B, double t) {
     return A + (B - A) * t;
 }

 double SkDCubeRoot(double x);

 /* Returns -1 if negative, 0 if zero, 1 if positive
 */
 inline int SkDSign(double x) {
     return (x > 0) - (x < 0);
 }

 /* Returns 0 if negative, 1 if zero, 2 if positive
 */
 inline int SKDSide(double x) {
     return (x > 0) + (x >= 0);
 }

 /* Returns 1 if negative, 2 if zero, 4 if positive
 */
 inline int SkDSideBit(double x) {
     return 1 << SKDSide(x);
 }

 inline double SkPinT(double t) {
     return precisely_less_than_zero(t) ? 0 : precisely_greater_than_one(t) ? 1 : t;
 }

 #endif
	/*
	* Copyright 2012 Google Inc.
	*
	* Use of this source code is governed by a BSD-style license that can be
	* found in the LICENSE file.
	*/
	#ifndef SkPathOpsTypes_DEFINED
	#define SkPathOpsTypes_DEFINED

	#include <float.h> // for FLT_EPSILON
	#include <math.h> // for fabs, sqrt

	#include "SkFloatingPoint.h"
	#include "SkPath.h"
	#include "SkPathOps.h"
	#include "SkPathOpsDebug.h"
	#include "SkScalar.h"

	enum SkPathOpsMask {
	kWinding_PathOpsMask = -1,
	kNo_PathOpsMask = 0,
	kEvenOdd_PathOpsMask = 1
	};

	// Use Almost Equal when comparing coordinates. Use epsilon to compare T values.
	bool AlmostEqualUlps(float a, float b);
	inline bool AlmostEqualUlps(double a, double b) {
	return AlmostEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	// Use Almost Dequal when comparing should not special case denormalized values.
	bool AlmostDequalUlps(float a, float b);
	bool AlmostDequalUlps(double a, double b);

	bool NotAlmostEqualUlps(float a, float b);
	inline bool NotAlmostEqualUlps(double a, double b) {
	return NotAlmostEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	bool NotAlmostDequalUlps(float a, float b);
	inline bool NotAlmostDequalUlps(double a, double b) {
	return NotAlmostDequalUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	// Use Almost Bequal when comparing coordinates in conjunction with between.
	bool AlmostBequalUlps(float a, float b);
	inline bool AlmostBequalUlps(double a, double b) {
	return AlmostBequalUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	bool AlmostPequalUlps(float a, float b);
	inline bool AlmostPequalUlps(double a, double b) {
	return AlmostPequalUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	bool RoughlyEqualUlps(float a, float b);
	inline bool RoughlyEqualUlps(double a, double b) {
	return RoughlyEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	bool AlmostLessUlps(float a, float b);
	inline bool AlmostLessUlps(double a, double b) {
	return AlmostLessUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	bool AlmostLessOrEqualUlps(float a, float b);
	inline bool AlmostLessOrEqualUlps(double a, double b) {
	return AlmostLessOrEqualUlps(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	bool AlmostBetweenUlps(float a, float b, float c);
	inline bool AlmostBetweenUlps(double a, double b, double c) {
	return AlmostBetweenUlps(SkDoubleToScalar(a), SkDoubleToScalar(b), SkDoubleToScalar(c));
	}

	int UlpsDistance(float a, float b);
	inline int UlpsDistance(double a, double b) {
	return UlpsDistance(SkDoubleToScalar(a), SkDoubleToScalar(b));
	}

	// FLT_EPSILON == 1.19209290E-07 == 1 / (2 ^ 23)
	// DBL_EPSILON == 2.22045e-16
	const double FLT_EPSILON_CUBED = FLT_EPSILON * FLT_EPSILON * FLT_EPSILON;
	const double FLT_EPSILON_HALF = FLT_EPSILON / 2;
	const double FLT_EPSILON_DOUBLE = FLT_EPSILON * 2;
	const double FLT_EPSILON_ORDERABLE_ERR = FLT_EPSILON * 16;
	const double FLT_EPSILON_SQUARED = FLT_EPSILON * FLT_EPSILON;
	const double FLT_EPSILON_SQRT = sqrt(FLT_EPSILON);
	const double FLT_EPSILON_INVERSE = 1 / FLT_EPSILON;
	const double DBL_EPSILON_ERR = DBL_EPSILON * 4; // FIXME: tune -- allow a few bits of error
	const double DBL_EPSILON_SUBDIVIDE_ERR = DBL_EPSILON * 16;
	const double ROUGH_EPSILON = FLT_EPSILON * 64;
	const double MORE_ROUGH_EPSILON = FLT_EPSILON * 256;
	const double WAY_ROUGH_EPSILON = FLT_EPSILON * 2048;

	inline bool zero_or_one(double x) {
	return x == 0 \|\| x == 1;
	}

	inline bool approximately_zero(double x) {
	return fabs(x) < FLT_EPSILON;
	}

	inline bool precisely_zero(double x) {
	return fabs(x) < DBL_EPSILON_ERR;
	}

	inline bool precisely_subdivide_zero(double x) {
	return fabs(x) < DBL_EPSILON_SUBDIVIDE_ERR;
	}

	inline bool approximately_zero(float x) {
	return fabs(x) < FLT_EPSILON;
	}

	inline bool approximately_zero_cubed(double x) {
	return fabs(x) < FLT_EPSILON_CUBED;
	}

	inline bool approximately_zero_half(double x) {
	return fabs(x) < FLT_EPSILON_HALF;
	}

	inline bool approximately_zero_double(double x) {
	return fabs(x) < FLT_EPSILON_DOUBLE;
	}

	inline bool approximately_zero_orderable(double x) {
	return fabs(x) < FLT_EPSILON_ORDERABLE_ERR;
	}

	inline bool approximately_zero_squared(double x) {
	return fabs(x) < FLT_EPSILON_SQUARED;
	}

	inline bool approximately_zero_sqrt(double x) {
	return fabs(x) < FLT_EPSILON_SQRT;
	}

	inline bool roughly_zero(double x) {
	return fabs(x) < ROUGH_EPSILON;
	}

	inline bool approximately_zero_inverse(double x) {
	return fabs(x) > FLT_EPSILON_INVERSE;
	}

	// OPTIMIZATION: if called multiple times with the same denom, we want to pass 1/y instead
	inline bool approximately_zero_when_compared_to(double x, double y) {
	return x == 0 \|\| fabs(x) < fabs(y * FLT_EPSILON);
	}

	// Use this for comparing Ts in the range of 0 to 1. For general numbers (larger and smaller) use
	// AlmostEqualUlps instead.
	inline bool approximately_equal(double x, double y) {
	return approximately_zero(x - y);
	}

	inline bool precisely_equal(double x, double y) {
	return precisely_zero(x - y);
	}

	inline bool precisely_subdivide_equal(double x, double y) {
	return precisely_subdivide_zero(x - y);
	}

	inline bool approximately_equal_half(double x, double y) {
	return approximately_zero_half(x - y);
	}

	inline bool approximately_equal_double(double x, double y) {
	return approximately_zero_double(x - y);
	}

	inline bool approximately_equal_orderable(double x, double y) {
	return approximately_zero_orderable(x - y);
	}

	inline bool approximately_equal_squared(double x, double y) {
	return approximately_equal(x, y);
	}

	inline bool approximately_greater(double x, double y) {
	return x - FLT_EPSILON >= y;
	}

	inline bool approximately_greater_double(double x, double y) {
	return x - FLT_EPSILON_DOUBLE >= y;
	}

	inline bool approximately_greater_orderable(double x, double y) {
	return x - FLT_EPSILON_ORDERABLE_ERR >= y;
	}

	inline bool approximately_greater_or_equal(double x, double y) {
	return x + FLT_EPSILON > y;
	}

	inline bool approximately_greater_or_equal_double(double x, double y) {
	return x + FLT_EPSILON_DOUBLE > y;
	}

	inline bool approximately_greater_or_equal_orderable(double x, double y) {
	return x + FLT_EPSILON_ORDERABLE_ERR > y;
	}

	inline bool approximately_lesser(double x, double y) {
	return x + FLT_EPSILON <= y;
	}

	inline bool approximately_lesser_double(double x, double y) {
	return x + FLT_EPSILON_DOUBLE <= y;
	}

	inline bool approximately_lesser_orderable(double x, double y) {
	return x + FLT_EPSILON_ORDERABLE_ERR <= y;
	}

	inline bool approximately_lesser_or_equal(double x, double y) {
	return x - FLT_EPSILON < y;
	}

	inline bool approximately_lesser_or_equal_double(double x, double y) {
	return x - FLT_EPSILON_DOUBLE < y;
	}

	inline bool approximately_lesser_or_equal_orderable(double x, double y) {
	return x - FLT_EPSILON_ORDERABLE_ERR < y;
	}

	inline bool approximately_greater_than_one(double x) {
	return x > 1 - FLT_EPSILON;
	}

	inline bool precisely_greater_than_one(double x) {
	return x > 1 - DBL_EPSILON_ERR;
	}

	inline bool approximately_less_than_zero(double x) {
	return x < FLT_EPSILON;
	}

	inline bool precisely_less_than_zero(double x) {
	return x < DBL_EPSILON_ERR;
	}

	inline bool approximately_negative(double x) {
	return x < FLT_EPSILON;
	}

	inline bool approximately_negative_orderable(double x) {
	return x < FLT_EPSILON_ORDERABLE_ERR;
	}

	inline bool precisely_negative(double x) {
	return x < DBL_EPSILON_ERR;
	}

	inline bool approximately_one_or_less(double x) {
	return x < 1 + FLT_EPSILON;
	}

	inline bool approximately_one_or_less_double(double x) {
	return x < 1 + FLT_EPSILON_DOUBLE;
	}

	inline bool approximately_positive(double x) {
	return x > -FLT_EPSILON;
	}

	inline bool approximately_positive_squared(double x) {
	return x > -(FLT_EPSILON_SQUARED);
	}

	inline bool approximately_zero_or_more(double x) {
	return x > -FLT_EPSILON;
	}

	inline bool approximately_zero_or_more_double(double x) {
	return x > -FLT_EPSILON_DOUBLE;
	}

	inline bool approximately_between_orderable(double a, double b, double c) {
	return a <= c
	? approximately_negative_orderable(a - b) && approximately_negative_orderable(b - c)
	: approximately_negative_orderable(b - a) && approximately_negative_orderable(c - b);
	}

	inline bool approximately_between(double a, double b, double c) {
	return a <= c ? approximately_negative(a - b) && approximately_negative(b - c)
	: approximately_negative(b - a) && approximately_negative(c - b);
	}

	inline bool precisely_between(double a, double b, double c) {
	return a <= c ? precisely_negative(a - b) && precisely_negative(b - c)
	: precisely_negative(b - a) && precisely_negative(c - b);
	}

	// returns true if (a <= b <= c) \|\| (a >= b >= c)
	inline bool between(double a, double b, double c) {
	SkASSERT(((a <= b && b <= c) \|\| (a >= b && b >= c)) == ((a - b) * (c - b) <= 0));
	return (a - b) * (c - b) <= 0;
	}

	inline bool roughly_equal(double x, double y) {
	return fabs(x - y) < ROUGH_EPSILON;
	}

	inline bool more_roughly_equal(double x, double y) {
	return fabs(x - y) < MORE_ROUGH_EPSILON;
	}

	inline bool way_roughly_equal(double x, double y) {
	return fabs(x - y) < WAY_ROUGH_EPSILON;
	}

	struct SkDPoint;
	struct SkDVector;
	struct SkDLine;
	struct SkDQuad;
	struct SkDTriangle;
	struct SkDCubic;
	struct SkDRect;

	inline SkPath::Verb SkPathOpsPointsToVerb(int points) {
	int verb = (1 << points) >> 1;
	#ifdef SK_DEBUG
	switch (points) {
	case 0: SkASSERT(SkPath::kMove_Verb == verb); break;
	case 1: SkASSERT(SkPath::kLine_Verb == verb); break;
	case 2: SkASSERT(SkPath::kQuad_Verb == verb); break;
	case 3: SkASSERT(SkPath::kCubic_Verb == verb); break;
	default: SkDEBUGFAIL("should not be here");
	}
	#endif
	return (SkPath::Verb)verb;
	}

	inline int SkPathOpsVerbToPoints(SkPath::Verb verb) {
	int points = (int) verb - ((int) verb >> 2);
	#ifdef SK_DEBUG
	switch (verb) {
	case SkPath::kLine_Verb: SkASSERT(1 == points); break;
	case SkPath::kQuad_Verb: SkASSERT(2 == points); break;
	case SkPath::kCubic_Verb: SkASSERT(3 == points); break;
	default: SkDEBUGFAIL("should not get here");
	}
	#endif
	return points;
	}

	inline double SkDInterp(double A, double B, double t) {
	return A + (B - A) * t;
	}

	double SkDCubeRoot(double x);

	/* Returns -1 if negative, 0 if zero, 1 if positive
	*/
	inline int SkDSign(double x) {
	return (x > 0) - (x < 0);
	}

	/* Returns 0 if negative, 1 if zero, 2 if positive
	*/
	inline int SKDSide(double x) {
	return (x > 0) + (x >= 0);
	}

	/* Returns 1 if negative, 2 if zero, 4 if positive
	*/
	inline int SkDSideBit(double x) {
	return 1 << SKDSide(x);
	}

	inline double SkPinT(double t) {
	return precisely_less_than_zero(t) ? 0 : precisely_greater_than_one(t) ? 1 : t;
	}

	#endif