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623 lines
19 KiB
C
623 lines
19 KiB
C
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/* $XFree86: xc/programs/Xserver/mi/mizerclip.c,v 1.1 1999/10/13 22:33:13 dawes Exp $ */
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/***********************************************************
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Copyright 1987, 1998 The Open Group
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All Rights Reserved.
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The above copyright notice and this permission notice shall be included in
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all copies or substantial portions of the Software.
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THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR
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IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
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FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE
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OPEN GROUP BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN
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AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN
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CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE.
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Except as contained in this notice, the name of The Open Group shall not be
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used in advertising or otherwise to promote the sale, use or other dealings
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in this Software without prior written authorization from The Open Group.
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Copyright 1987 by Digital Equipment Corporation, Maynard, Massachusetts.
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All Rights Reserved
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Permission to use, copy, modify, and distribute this software and its
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documentation for any purpose and without fee is hereby granted,
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provided that the above copyright notice appear in all copies and that
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both that copyright notice and this permission notice appear in
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supporting documentation, and that the name of Digital not be
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used in advertising or publicity pertaining to distribution of the
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software without specific, written prior permission.
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DIGITAL DISCLAIMS ALL WARRANTIES WITH REGARD TO THIS SOFTWARE, INCLUDING
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ALL IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS, IN NO EVENT SHALL
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DIGITAL BE LIABLE FOR ANY SPECIAL, INDIRECT OR CONSEQUENTIAL DAMAGES OR
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ANY DAMAGES WHATSOEVER RESULTING FROM LOSS OF USE, DATA OR PROFITS,
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WHETHER IN AN ACTION OF CONTRACT, NEGLIGENCE OR OTHER TORTIOUS ACTION,
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ARISING OUT OF OR IN CONNECTION WITH THE USE OR PERFORMANCE OF THIS
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SOFTWARE.
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******************************************************************/
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#include "mi.h"
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#include "miline.h"
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/*
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The bresenham error equation used in the mi/mfb/cfb line routines is:
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e = error
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dx = difference in raw X coordinates
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dy = difference in raw Y coordinates
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M = # of steps in X direction
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N = # of steps in Y direction
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B = 0 to prefer diagonal steps in a given octant,
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1 to prefer axial steps in a given octant
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For X major lines:
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e = 2Mdy - 2Ndx - dx - B
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-2dx <= e < 0
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For Y major lines:
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e = 2Ndx - 2Mdy - dy - B
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-2dy <= e < 0
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At the start of the line, we have taken 0 X steps and 0 Y steps,
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so M = 0 and N = 0:
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X major e = 2Mdy - 2Ndx - dx - B
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= -dx - B
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Y major e = 2Ndx - 2Mdy - dy - B
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= -dy - B
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At the end of the line, we have taken dx X steps and dy Y steps,
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so M = dx and N = dy:
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X major e = 2Mdy - 2Ndx - dx - B
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= 2dxdy - 2dydx - dx - B
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= -dx - B
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Y major e = 2Ndx - 2Mdy - dy - B
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= 2dydx - 2dxdy - dy - B
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= -dy - B
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Thus, the error term is the same at the start and end of the line.
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Let us consider clipping an X coordinate. There are 4 cases which
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represent the two independent cases of clipping the start vs. the
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end of the line and an X major vs. a Y major line. In any of these
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cases, we know the number of X steps (M) and we wish to find the
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number of Y steps (N). Thus, we will solve our error term equation.
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If we are clipping the start of the line, we will find the smallest
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N that satisfies our error term inequality. If we are clipping the
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end of the line, we will find the largest number of Y steps that
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satisfies the inequality. In that case, since we are representing
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the Y steps as (dy - N), we will actually want to solve for the
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smallest N in that equation.
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Case 1: X major, starting X coordinate moved by M steps
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-2dx <= 2Mdy - 2Ndx - dx - B < 0
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2Ndx <= 2Mdy - dx - B + 2dx 2Ndx > 2Mdy - dx - B
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2Ndx <= 2Mdy + dx - B N > (2Mdy - dx - B) / 2dx
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N <= (2Mdy + dx - B) / 2dx
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Since we are trying to find the smallest N that satisfies these
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equations, we should use the > inequality to find the smallest:
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N = floor((2Mdy - dx - B) / 2dx) + 1
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= floor((2Mdy - dx - B + 2dx) / 2dx)
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= floor((2Mdy + dx - B) / 2dx)
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Case 1b: X major, ending X coordinate moved to M steps
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Same derivations as Case 1, but we want the largest N that satisfies
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the equations, so we use the <= inequality:
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N = floor((2Mdy + dx - B) / 2dx)
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Case 2: X major, ending X coordinate moved by M steps
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-2dx <= 2(dx - M)dy - 2(dy - N)dx - dx - B < 0
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-2dx <= 2dxdy - 2Mdy - 2dxdy + 2Ndx - dx - B < 0
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-2dx <= 2Ndx - 2Mdy - dx - B < 0
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2Ndx >= 2Mdy + dx + B - 2dx 2Ndx < 2Mdy + dx + B
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2Ndx >= 2Mdy - dx + B N < (2Mdy + dx + B) / 2dx
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N >= (2Mdy - dx + B) / 2dx
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Since we are trying to find the highest number of Y steps that
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satisfies these equations, we need to find the smallest N, so
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we should use the >= inequality to find the smallest:
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N = ceiling((2Mdy - dx + B) / 2dx)
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= floor((2Mdy - dx + B + 2dx - 1) / 2dx)
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= floor((2Mdy + dx + B - 1) / 2dx)
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Case 2b: X major, starting X coordinate moved to M steps from end
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Same derivations as Case 2, but we want the smallest number of Y
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steps, so we want the highest N, so we use the < inequality:
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N = ceiling((2Mdy + dx + B) / 2dx) - 1
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= floor((2Mdy + dx + B + 2dx - 1) / 2dx) - 1
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= floor((2Mdy + dx + B + 2dx - 1 - 2dx) / 2dx)
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= floor((2Mdy + dx + B - 1) / 2dx)
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Case 3: Y major, starting X coordinate moved by M steps
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-2dy <= 2Ndx - 2Mdy - dy - B < 0
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2Ndx >= 2Mdy + dy + B - 2dy 2Ndx < 2Mdy + dy + B
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2Ndx >= 2Mdy - dy + B N < (2Mdy + dy + B) / 2dx
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N >= (2Mdy - dy + B) / 2dx
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Since we are trying to find the smallest N that satisfies these
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equations, we should use the >= inequality to find the smallest:
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N = ceiling((2Mdy - dy + B) / 2dx)
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= floor((2Mdy - dy + B + 2dx - 1) / 2dx)
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= floor((2Mdy - dy + B - 1) / 2dx) + 1
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Case 3b: Y major, ending X coordinate moved to M steps
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Same derivations as Case 3, but we want the largest N that satisfies
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the equations, so we use the < inequality:
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N = ceiling((2Mdy + dy + B) / 2dx) - 1
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= floor((2Mdy + dy + B + 2dx - 1) / 2dx) - 1
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= floor((2Mdy + dy + B + 2dx - 1 - 2dx) / 2dx)
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= floor((2Mdy + dy + B - 1) / 2dx)
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Case 4: Y major, ending X coordinate moved by M steps
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-2dy <= 2(dy - N)dx - 2(dx - M)dy - dy - B < 0
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-2dy <= 2dxdy - 2Ndx - 2dxdy + 2Mdy - dy - B < 0
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-2dy <= 2Mdy - 2Ndx - dy - B < 0
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2Ndx <= 2Mdy - dy - B + 2dy 2Ndx > 2Mdy - dy - B
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2Ndx <= 2Mdy + dy - B N > (2Mdy - dy - B) / 2dx
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N <= (2Mdy + dy - B) / 2dx
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Since we are trying to find the highest number of Y steps that
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satisfies these equations, we need to find the smallest N, so
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we should use the > inequality to find the smallest:
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N = floor((2Mdy - dy - B) / 2dx) + 1
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Case 4b: Y major, starting X coordinate moved to M steps from end
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Same analysis as Case 4, but we want the smallest number of Y steps
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which means the largest N, so we use the <= inequality:
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N = floor((2Mdy + dy - B) / 2dx)
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Now let's try the Y coordinates, we have the same 4 cases.
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Case 5: X major, starting Y coordinate moved by N steps
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-2dx <= 2Mdy - 2Ndx - dx - B < 0
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2Mdy >= 2Ndx + dx + B - 2dx 2Mdy < 2Ndx + dx + B
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2Mdy >= 2Ndx - dx + B M < (2Ndx + dx + B) / 2dy
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M >= (2Ndx - dx + B) / 2dy
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Since we are trying to find the smallest M, we use the >= inequality:
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M = ceiling((2Ndx - dx + B) / 2dy)
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= floor((2Ndx - dx + B + 2dy - 1) / 2dy)
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= floor((2Ndx - dx + B - 1) / 2dy) + 1
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Case 5b: X major, ending Y coordinate moved to N steps
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Same derivations as Case 5, but we want the largest M that satisfies
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the equations, so we use the < inequality:
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M = ceiling((2Ndx + dx + B) / 2dy) - 1
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= floor((2Ndx + dx + B + 2dy - 1) / 2dy) - 1
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= floor((2Ndx + dx + B + 2dy - 1 - 2dy) / 2dy)
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= floor((2Ndx + dx + B - 1) / 2dy)
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Case 6: X major, ending Y coordinate moved by N steps
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-2dx <= 2(dx - M)dy - 2(dy - N)dx - dx - B < 0
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-2dx <= 2dxdy - 2Mdy - 2dxdy + 2Ndx - dx - B < 0
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-2dx <= 2Ndx - 2Mdy - dx - B < 0
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2Mdy <= 2Ndx - dx - B + 2dx 2Mdy > 2Ndx - dx - B
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2Mdy <= 2Ndx + dx - B M > (2Ndx - dx - B) / 2dy
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M <= (2Ndx + dx - B) / 2dy
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Largest # of X steps means smallest M, so use the > inequality:
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M = floor((2Ndx - dx - B) / 2dy) + 1
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Case 6b: X major, starting Y coordinate moved to N steps from end
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Same derivations as Case 6, but we want the smallest # of X steps
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which means the largest M, so use the <= inequality:
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M = floor((2Ndx + dx - B) / 2dy)
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Case 7: Y major, starting Y coordinate moved by N steps
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-2dy <= 2Ndx - 2Mdy - dy - B < 0
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2Mdy <= 2Ndx - dy - B + 2dy 2Mdy > 2Ndx - dy - B
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2Mdy <= 2Ndx + dy - B M > (2Ndx - dy - B) / 2dy
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M <= (2Ndx + dy - B) / 2dy
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To find the smallest M, use the > inequality:
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M = floor((2Ndx - dy - B) / 2dy) + 1
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= floor((2Ndx - dy - B + 2dy) / 2dy)
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= floor((2Ndx + dy - B) / 2dy)
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Case 7b: Y major, ending Y coordinate moved to N steps
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Same derivations as Case 7, but we want the largest M that satisfies
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the equations, so use the <= inequality:
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M = floor((2Ndx + dy - B) / 2dy)
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Case 8: Y major, ending Y coordinate moved by N steps
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-2dy <= 2(dy - N)dx - 2(dx - M)dy - dy - B < 0
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-2dy <= 2dxdy - 2Ndx - 2dxdy + 2Mdy - dy - B < 0
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-2dy <= 2Mdy - 2Ndx - dy - B < 0
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2Mdy >= 2Ndx + dy + B - 2dy 2Mdy < 2Ndx + dy + B
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2Mdy >= 2Ndx - dy + B M < (2Ndx + dy + B) / 2dy
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M >= (2Ndx - dy + B) / 2dy
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To find the highest X steps, find the smallest M, use the >= inequality:
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M = ceiling((2Ndx - dy + B) / 2dy)
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= floor((2Ndx - dy + B + 2dy - 1) / 2dy)
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= floor((2Ndx + dy + B - 1) / 2dy)
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Case 8b: Y major, starting Y coordinate moved to N steps from the end
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Same derivations as Case 8, but we want to find the smallest # of X
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steps which means the largest M, so we use the < inequality:
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M = ceiling((2Ndx + dy + B) / 2dy) - 1
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= floor((2Ndx + dy + B + 2dy - 1) / 2dy) - 1
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= floor((2Ndx + dy + B + 2dy - 1 - 2dy) / 2dy)
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= floor((2Ndx + dy + B - 1) / 2dy)
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So, our equations are:
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1: X major move x1 to x1+M floor((2Mdy + dx - B) / 2dx)
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1b: X major move x2 to x1+M floor((2Mdy + dx - B) / 2dx)
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2: X major move x2 to x2-M floor((2Mdy + dx + B - 1) / 2dx)
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2b: X major move x1 to x2-M floor((2Mdy + dx + B - 1) / 2dx)
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3: Y major move x1 to x1+M floor((2Mdy - dy + B - 1) / 2dx) + 1
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3b: Y major move x2 to x1+M floor((2Mdy + dy + B - 1) / 2dx)
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4: Y major move x2 to x2-M floor((2Mdy - dy - B) / 2dx) + 1
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4b: Y major move x1 to x2-M floor((2Mdy + dy - B) / 2dx)
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5: X major move y1 to y1+N floor((2Ndx - dx + B - 1) / 2dy) + 1
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5b: X major move y2 to y1+N floor((2Ndx + dx + B - 1) / 2dy)
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6: X major move y2 to y2-N floor((2Ndx - dx - B) / 2dy) + 1
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6b: X major move y1 to y2-N floor((2Ndx + dx - B) / 2dy)
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7: Y major move y1 to y1+N floor((2Ndx + dy - B) / 2dy)
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7b: Y major move y2 to y1+N floor((2Ndx + dy - B) / 2dy)
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8: Y major move y2 to y2-N floor((2Ndx + dy + B - 1) / 2dy)
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8b: Y major move y1 to y2-N floor((2Ndx + dy + B - 1) / 2dy)
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We have the following constraints on all of the above terms:
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0 < M,N <= 2^15 2^15 can be imposed by miZeroClipLine
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0 <= dx/dy <= 2^16 - 1
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0 <= B <= 1
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The floor in all of the above equations can be accomplished with a
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simple C divide operation provided that both numerator and denominator
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are positive.
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Since dx,dy >= 0 and since moving an X coordinate implies that dx != 0
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and moving a Y coordinate implies dy != 0, we know that the denominators
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are all > 0.
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For all lines, (-B) and (B-1) are both either 0 or -1, depending on the
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bias. Thus, we have to show that the 2MNdxy +/- dxy terms are all >= 1
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or > 0 to prove that the numerators are positive (or zero).
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For X Major lines we know that dx > 0 and since 2Mdy is >= 0 due to the
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constraints, the first four equations all have numerators >= 0.
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For the second four equations, M > 0, so 2Mdy >= 2dy so (2Mdy - dy) >= dy
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So (2Mdy - dy) > 0, since they are Y major lines. Also, (2Mdy + dy) >= 3dy
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or (2Mdy + dy) > 0. So all of their numerators are >= 0.
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For the third set of four equations, N > 0, so 2Ndx >= 2dx so (2Ndx - dx)
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>= dx > 0. Similarly (2Ndx + dx) >= 3dx > 0. So all numerators >= 0.
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For the fourth set of equations, dy > 0 and 2Ndx >= 0, so all numerators
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are > 0.
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To consider overflow, consider the case of 2 * M,N * dx,dy + dx,dy. This
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is bounded <= 2 * 2^15 * (2^16 - 1) + (2^16 - 1)
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<= 2^16 * (2^16 - 1) + (2^16 - 1)
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<= 2^32 - 2^16 + 2^16 - 1
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<= 2^32 - 1
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Since the (-B) and (B-1) terms are all 0 or -1, the maximum value of
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the numerator is therefore (2^32 - 1), which does not overflow an unsigned
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32 bit variable.
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*/
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/* Bit codes for the terms of the 16 clipping equations defined below. */
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#define T_2NDX (1 << 0)
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|||
|
#define T_2MDY (0) /* implicit term */
|
|||
|
#define T_DXNOTY (1 << 1)
|
|||
|
#define T_DYNOTX (0) /* implicit term */
|
|||
|
#define T_SUBDXORY (1 << 2)
|
|||
|
#define T_ADDDX (T_DXNOTY) /* composite term */
|
|||
|
#define T_SUBDX (T_DXNOTY | T_SUBDXORY) /* composite term */
|
|||
|
#define T_ADDDY (T_DYNOTX) /* composite term */
|
|||
|
#define T_SUBDY (T_DYNOTX | T_SUBDXORY) /* composite term */
|
|||
|
#define T_BIASSUBONE (1 << 3)
|
|||
|
#define T_SUBBIAS (0) /* implicit term */
|
|||
|
#define T_DIV2DX (1 << 4)
|
|||
|
#define T_DIV2DY (0) /* implicit term */
|
|||
|
#define T_ADDONE (1 << 5)
|
|||
|
|
|||
|
/* Bit masks defining the 16 equations used in miZeroClipLine. */
|
|||
|
|
|||
|
#define EQN1 (T_2MDY | T_ADDDX | T_SUBBIAS | T_DIV2DX)
|
|||
|
#define EQN1B (T_2MDY | T_ADDDX | T_SUBBIAS | T_DIV2DX)
|
|||
|
#define EQN2 (T_2MDY | T_ADDDX | T_BIASSUBONE | T_DIV2DX)
|
|||
|
#define EQN2B (T_2MDY | T_ADDDX | T_BIASSUBONE | T_DIV2DX)
|
|||
|
|
|||
|
#define EQN3 (T_2MDY | T_SUBDY | T_BIASSUBONE | T_DIV2DX | T_ADDONE)
|
|||
|
#define EQN3B (T_2MDY | T_ADDDY | T_BIASSUBONE | T_DIV2DX)
|
|||
|
#define EQN4 (T_2MDY | T_SUBDY | T_SUBBIAS | T_DIV2DX | T_ADDONE)
|
|||
|
#define EQN4B (T_2MDY | T_ADDDY | T_SUBBIAS | T_DIV2DX)
|
|||
|
|
|||
|
#define EQN5 (T_2NDX | T_SUBDX | T_BIASSUBONE | T_DIV2DY | T_ADDONE)
|
|||
|
#define EQN5B (T_2NDX | T_ADDDX | T_BIASSUBONE | T_DIV2DY)
|
|||
|
#define EQN6 (T_2NDX | T_SUBDX | T_SUBBIAS | T_DIV2DY | T_ADDONE)
|
|||
|
#define EQN6B (T_2NDX | T_ADDDX | T_SUBBIAS | T_DIV2DY)
|
|||
|
|
|||
|
#define EQN7 (T_2NDX | T_ADDDY | T_SUBBIAS | T_DIV2DY)
|
|||
|
#define EQN7B (T_2NDX | T_ADDDY | T_SUBBIAS | T_DIV2DY)
|
|||
|
#define EQN8 (T_2NDX | T_ADDDY | T_BIASSUBONE | T_DIV2DY)
|
|||
|
#define EQN8B (T_2NDX | T_ADDDY | T_BIASSUBONE | T_DIV2DY)
|
|||
|
|
|||
|
/* miZeroClipLine
|
|||
|
*
|
|||
|
* returns: 1 for partially clipped line
|
|||
|
* -1 for completely clipped line
|
|||
|
*
|
|||
|
*/
|
|||
|
int
|
|||
|
miZeroClipLine(xmin, ymin, xmax, ymax,
|
|||
|
new_x1, new_y1, new_x2, new_y2,
|
|||
|
adx, ady,
|
|||
|
pt1_clipped, pt2_clipped, octant, bias, oc1, oc2)
|
|||
|
int xmin, ymin, xmax, ymax;
|
|||
|
int *new_x1, *new_y1, *new_x2, *new_y2;
|
|||
|
int *pt1_clipped, *pt2_clipped;
|
|||
|
unsigned int adx, ady;
|
|||
|
int octant;
|
|||
|
unsigned int bias;
|
|||
|
int oc1, oc2;
|
|||
|
{
|
|||
|
int swapped = 0;
|
|||
|
int clipDone = 0;
|
|||
|
guint32 utmp;
|
|||
|
int clip1, clip2;
|
|||
|
int x1, y1, x2, y2;
|
|||
|
int x1_orig, y1_orig, x2_orig, y2_orig;
|
|||
|
int xmajor;
|
|||
|
int negslope, anchorval;
|
|||
|
unsigned int eqn;
|
|||
|
|
|||
|
x1 = x1_orig = *new_x1;
|
|||
|
y1 = y1_orig = *new_y1;
|
|||
|
x2 = x2_orig = *new_x2;
|
|||
|
y2 = y2_orig = *new_y2;
|
|||
|
|
|||
|
clip1 = 0;
|
|||
|
clip2 = 0;
|
|||
|
|
|||
|
xmajor = IsXMajorOctant(octant);
|
|||
|
bias = ((bias >> octant) & 1);
|
|||
|
|
|||
|
while (1)
|
|||
|
{
|
|||
|
if ((oc1 & oc2) != 0) /* trivial reject */
|
|||
|
{
|
|||
|
clipDone = -1;
|
|||
|
clip1 = oc1;
|
|||
|
clip2 = oc2;
|
|||
|
break;
|
|||
|
}
|
|||
|
else if ((oc1 | oc2) == 0) /* trivial accept */
|
|||
|
{
|
|||
|
clipDone = 1;
|
|||
|
if (swapped)
|
|||
|
{
|
|||
|
SWAPINT_PAIR(x1, y1, x2, y2);
|
|||
|
SWAPINT(clip1, clip2);
|
|||
|
}
|
|||
|
break;
|
|||
|
}
|
|||
|
else /* have to clip */
|
|||
|
{
|
|||
|
/* only clip one point at a time */
|
|||
|
if (oc1 == 0)
|
|||
|
{
|
|||
|
SWAPINT_PAIR(x1, y1, x2, y2);
|
|||
|
SWAPINT_PAIR(x1_orig, y1_orig, x2_orig, y2_orig);
|
|||
|
SWAPINT(oc1, oc2);
|
|||
|
SWAPINT(clip1, clip2);
|
|||
|
swapped = !swapped;
|
|||
|
}
|
|||
|
|
|||
|
clip1 |= oc1;
|
|||
|
if (oc1 & OUT_LEFT)
|
|||
|
{
|
|||
|
negslope = IsYDecreasingOctant(octant);
|
|||
|
utmp = xmin - x1_orig;
|
|||
|
if (utmp <= 32767) /* clip based on near endpt */
|
|||
|
{
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN2 : EQN1;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN4 : EQN3;
|
|||
|
anchorval = y1_orig;
|
|||
|
}
|
|||
|
else /* clip based on far endpt */
|
|||
|
{
|
|||
|
utmp = x2_orig - xmin;
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN1B : EQN2B;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN3B : EQN4B;
|
|||
|
anchorval = y2_orig;
|
|||
|
negslope = !negslope;
|
|||
|
}
|
|||
|
x1 = xmin;
|
|||
|
}
|
|||
|
else if (oc1 & OUT_ABOVE)
|
|||
|
{
|
|||
|
negslope = IsXDecreasingOctant(octant);
|
|||
|
utmp = ymin - y1_orig;
|
|||
|
if (utmp <= 32767) /* clip based on near endpt */
|
|||
|
{
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN6 : EQN5;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN8 : EQN7;
|
|||
|
anchorval = x1_orig;
|
|||
|
}
|
|||
|
else /* clip based on far endpt */
|
|||
|
{
|
|||
|
utmp = y2_orig - ymin;
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN5B : EQN6B;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN7B : EQN8B;
|
|||
|
anchorval = x2_orig;
|
|||
|
negslope = !negslope;
|
|||
|
}
|
|||
|
y1 = ymin;
|
|||
|
}
|
|||
|
else if (oc1 & OUT_RIGHT)
|
|||
|
{
|
|||
|
negslope = IsYDecreasingOctant(octant);
|
|||
|
utmp = x1_orig - xmax;
|
|||
|
if (utmp <= 32767) /* clip based on near endpt */
|
|||
|
{
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN2 : EQN1;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN4 : EQN3;
|
|||
|
anchorval = y1_orig;
|
|||
|
}
|
|||
|
else /* clip based on far endpt */
|
|||
|
{
|
|||
|
/*
|
|||
|
* Technically since the equations can handle
|
|||
|
* utmp == 32768, this overflow code isn't
|
|||
|
* needed since X11 protocol can't generate
|
|||
|
* a line which goes more than 32768 pixels
|
|||
|
* to the right of a clip rectangle.
|
|||
|
*/
|
|||
|
utmp = xmax - x2_orig;
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN1B : EQN2B;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN3B : EQN4B;
|
|||
|
anchorval = y2_orig;
|
|||
|
negslope = !negslope;
|
|||
|
}
|
|||
|
x1 = xmax;
|
|||
|
}
|
|||
|
else if (oc1 & OUT_BELOW)
|
|||
|
{
|
|||
|
negslope = IsXDecreasingOctant(octant);
|
|||
|
utmp = y1_orig - ymax;
|
|||
|
if (utmp <= 32767) /* clip based on near endpt */
|
|||
|
{
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN6 : EQN5;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN8 : EQN7;
|
|||
|
anchorval = x1_orig;
|
|||
|
}
|
|||
|
else /* clip based on far endpt */
|
|||
|
{
|
|||
|
/*
|
|||
|
* Technically since the equations can handle
|
|||
|
* utmp == 32768, this overflow code isn't
|
|||
|
* needed since X11 protocol can't generate
|
|||
|
* a line which goes more than 32768 pixels
|
|||
|
* below the bottom of a clip rectangle.
|
|||
|
*/
|
|||
|
utmp = ymax - y2_orig;
|
|||
|
if (xmajor)
|
|||
|
eqn = (swapped) ? EQN5B : EQN6B;
|
|||
|
else
|
|||
|
eqn = (swapped) ? EQN7B : EQN8B;
|
|||
|
anchorval = x2_orig;
|
|||
|
negslope = !negslope;
|
|||
|
}
|
|||
|
y1 = ymax;
|
|||
|
}
|
|||
|
|
|||
|
if (swapped)
|
|||
|
negslope = !negslope;
|
|||
|
|
|||
|
utmp <<= 1; /* utmp = 2N or 2M */
|
|||
|
if (eqn & T_2NDX)
|
|||
|
utmp = (utmp * adx);
|
|||
|
else /* (eqn & T_2MDY) */
|
|||
|
utmp = (utmp * ady);
|
|||
|
if (eqn & T_DXNOTY)
|
|||
|
if (eqn & T_SUBDXORY)
|
|||
|
utmp -= adx;
|
|||
|
else
|
|||
|
utmp += adx;
|
|||
|
else /* (eqn & T_DYNOTX) */
|
|||
|
if (eqn & T_SUBDXORY)
|
|||
|
utmp -= ady;
|
|||
|
else
|
|||
|
utmp += ady;
|
|||
|
if (eqn & T_BIASSUBONE)
|
|||
|
utmp += bias - 1;
|
|||
|
else /* (eqn & T_SUBBIAS) */
|
|||
|
utmp -= bias;
|
|||
|
if (eqn & T_DIV2DX)
|
|||
|
utmp /= (adx << 1);
|
|||
|
else /* (eqn & T_DIV2DY) */
|
|||
|
utmp /= (ady << 1);
|
|||
|
if (eqn & T_ADDONE)
|
|||
|
utmp++;
|
|||
|
|
|||
|
if (negslope)
|
|||
|
utmp = -utmp;
|
|||
|
|
|||
|
if (eqn & T_2NDX) /* We are calculating X steps */
|
|||
|
x1 = anchorval + utmp;
|
|||
|
else /* else, Y steps */
|
|||
|
y1 = anchorval + utmp;
|
|||
|
|
|||
|
oc1 = 0;
|
|||
|
MIOUTCODES(oc1, x1, y1, xmin, ymin, xmax, ymax);
|
|||
|
}
|
|||
|
}
|
|||
|
|
|||
|
*new_x1 = x1;
|
|||
|
*new_y1 = y1;
|
|||
|
*new_x2 = x2;
|
|||
|
*new_y2 = y2;
|
|||
|
|
|||
|
*pt1_clipped = clip1;
|
|||
|
*pt2_clipped = clip2;
|
|||
|
|
|||
|
return clipDone;
|
|||
|
}
|