deleted more code following line-buffer refactoring

This commit is contained in:
Simen Svale Skogsrud 2010-03-03 13:12:16 +01:00
parent 7e152851cc
commit 9a41b3a4fb
3 changed files with 0 additions and 99 deletions

17
gcode.c
View File

@ -76,7 +76,6 @@
#define SPINDLE_DIRECTION_CCW 1
struct ParserState {
uint32_t line_number;
uint8_t status_code;
uint8_t motion_mode; /* {G0, G1, G2, G3, G38.2, G80, G81, G82, G83, G84, G85, G86, G87, G88, G89} */
@ -143,7 +142,6 @@ uint8_t gc_execute_line(char *line) {
clear_vector(target);
clear_vector(offset);
gc.line_number++;
gc.status_code = GCSTATUS_OK;
/* First: parse all statements */
@ -387,21 +385,6 @@ uint8_t gc_execute_line(char *line) {
return(gc.status_code);
}
void gc_get_status(double *position, uint8_t *status_code, int *inches_mode, uint32_t *line_number)
{
int axis;
if (gc.inches_mode) {
for(axis = X_AXIS; axis <= Z_AXIS; axis++) {
position[axis] = gc.position[axis]*INCHES_PER_MM;
}
} else {
memcpy(position, gc.position, sizeof(gc.position));
}
*status_code = gc.status_code;
*inches_mode = gc.inches_mode;
*line_number = gc.line_number;
}
// Parses the next statement and leaves the counter on the first character following
// the statement. Returns 1 if there was a statements, 0 if end of string was reached
// or there was an error (check state.status_code).

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@ -40,58 +40,3 @@ double theta(double x, double y)
}
}
/*
Quadrants of the circle
+---- 0 ----+ 0 - y is always positive and |x| < |y|
| | 1 - x is always positive and |x| > |y|
| | 2 - y is always negative and |x| < |y|
3 + 1 3 - x is always negative and |x| > |y|
| |
| |
+---- 2 ----+
*/
// Find the quadrant of the coordinate
int quadrant_of_the_circle(int32_t x, int32_t y) {
if (labs(x)<labs(y)){
if (y>0) {
return(0);
} else {
return(2);
}
} else {
if (x>0) {
return(1);
} else {
return(3);
}
}
}
// Very specialized helper to calculate the amount of steps to travel in the given quadrant of a circle provided the
// axial direction of the quadrant, the angular_direction of travel (-1 or +1) and amount of steps in one half quadrant
// of the circle.
uint32_t steps_in_partial_quadrant(int32_t x, int32_t y, int quadrant, int angular_direction,
int32_t steps_in_half_quadrant) {
if (quadrant_horizontal(quadrant)) { // A horizontal quadrant
if ((angular_direction == 1) ^ (quadrant == 2)) {
return(steps_in_half_quadrant-x);
} else {
return(x+steps_in_half_quadrant);
}
} else { // A vertical quadrant
if ((angular_direction == 1) ^ (quadrant == 3)) {
return(steps_in_half_quadrant-y);
} else {
return(y+steps_in_half_quadrant);
}
}
}
// Counts the amount of full quadrants between quadrant_start and quadrant_target along the angular_direction
int full_quadrants_between(int quadrant_start, int quadrant_target, int angular_direction) {
int diff = angular_direction*(quadrant_target-quadrant_start);
if (diff <= 0) { diff += 4; }
return (diff-1);
}

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@ -25,31 +25,4 @@
// Find the angle from the positive y axis to the given point with respect to origo.
double theta(double x, double y);
// Find the quadrant of the coordinate
int quadrant_of_the_circle(int32_t x, int32_t y);
/*
Quadrants of the circle
+---- 0 ----+ 0 - y is always positive and |x| < |y|
| | 1 - x is always positive and |x| > |y|
| | 2 - y is always negative and |x| < |y|
3 + 1 3 - x is always negative and |x| > |y|
| |
| |
+---- 2 ----+
*/
// A macro to decide if a quadrant-number represent a horizontal quadrant
#define quadrant_horizontal(q) ((q % 2) == 0)
// Very specialized helper to calculate the amount of steps to travel in the given quadrant of a circle provided the
// axial direction of the quadrant, the angular_direction of travel (-1 or +1) and amount of steps in one half quadrant
// of the circle.
uint32_t steps_in_partial_quadrant(int32_t x, int32_t y, int horizontal_quadrant, int angular_direction,
int32_t steps_in_half_quadrant);
// Counts the amount of full quadrants between quadrant_start and quadrant_target along the angular_direction
int full_quadrants_between(int quadrant_start, int quadrant_target, int angular_direction);
#endif