/usr/lib/python2.7/dist-packages/angles/__init__.py is in python-angles 1.9.11-1.
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from math import fmod, pi, fabs
def normalize_angle_positive(angle):
""" Normalizes the angle to be 0 to 2*pi
It takes and returns radians. """
return fmod(fmod(angle, 2.0*pi) + 2.0*pi, 2.0*pi)
def normalize_angle(angle):
""" Normalizes the angle to be -pi to +pi
It takes and returns radians."""
a = normalize_angle_positive(angle)
if a > pi:
a -= 2.0 *pi
return a
def shortest_angular_distance(from_angle, to_angle):
""" Given 2 angles, this returns the shortest angular
difference. The inputs and ouputs are of course radians.
The result would always be -pi <= result <= pi. Adding the result
to "from" will always get you an equivelent angle to "to".
"""
return normalize_angle(to_angle-from_angle)
def two_pi_complement(angle):
""" returns the angle in [-2*pi, 2*pi] going the other way along the unit circle.
\param angle The angle to which you want to turn in the range [-2*pi, 2*pi]
E.g. two_pi_complement(-pi/4) returns 7_pi/4
two_pi_complement(pi/4) returns -7*pi/4
"""
#check input conditions
if angle > 2*pi or angle < -2.0*pi:
angle = fmod(angle, 2.0*pi)
if angle < 0:
return 2*pi+angle
elif angle > 0:
return -2*pi+angle
return 2*pi
def _find_min_max_delta(from_angle, left_limit, right_limit):
""" This function is only intended for internal use and not intended for external use.
If you do use it, read the documentation very carefully.
Returns the min and max amount (in radians) that can be moved
from "from" angle to "left_limit" and "right_limit".
\param from - "from" angle - must lie in [-pi, pi)
\param left_limit - left limit of valid interval for angular position
- must lie in [-pi, pi], left and right limits are specified on
the unit circle w.r.t to a reference pointing inwards
\param right_limit - right limit of valid interval for angular position
- must lie in [-pi, pi], left and right limits are specified on
the unit circle w.r.t to a reference pointing inwards
\return (valid, min, max) - angle in radians that can be moved from "from" position before hitting the joint stop
valid is False if "from" angle does not lie in the interval [left_limit,right_limit]
"""
delta = [0]*4
delta[0] = shortest_angular_distance(from_angle,left_limit)
delta[1] = shortest_angular_distance(from_angle,right_limit)
delta[2] = two_pi_complement(delta[0])
delta[3] = two_pi_complement(delta[1])
if delta[0] == 0:
return True, delta[0], max(delta[1], delta[3])
if delta[1] == 0:
return True, min(delta[0], delta[2]), delta[1]
delta_min = delta[0]
delta_min_2pi = delta[2]
if delta[2] < delta_min:
delta_min = delta[2]
delta_min_2pi = delta[0]
delta_max = delta[1]
delta_max_2pi = delta[3]
if delta[3] > delta_max:
delta_max = delta[3]
delta_max_2pi = delta[1]
# printf("%f %f %f %f\n",delta_min,delta_min_2pi,delta_max,delta_max_2pi)
if (delta_min <= delta_max_2pi) or (delta_max >= delta_min_2pi):
if left_limit == -pi and right_limit == pi:
return (True, delta_max_2pi, delta_min_2pi)
else:
return (False, delta_max_2pi, delta_min_2pi)
return True, delta_min, delta_max
def shortest_angular_distance_with_limits(from_angle, to_angle, left_limit, right_limit):
""" Returns the delta from "from_angle" to "to_angle" making sure it does not violate limits specified by left_limit and right_limit.
The valid interval of angular positions is [left_limit,right_limit]. E.g., [-0.25,0.25] is a 0.5 radians wide interval that contains 0.
But [0.25,-0.25] is a 2*pi-0.5 wide interval that contains pi (but not 0).
The value of shortest_angle is the angular difference between "from" and "to" that lies within the defined valid interval.
E.g. shortest_angular_distance_with_limits(-0.5,0.5,0.25,-0.25) returns 2*pi-1.0
shortest_angular_distance_with_limits(-0.5,0.5,-0.25,0.25) returns None since -0.5 and 0.5 do not lie in the interval [-0.25,0.25]
\param left_limit - left limit of valid interval for angular position
- must lie in [-pi, pi], left and right limits are specified on
the unit circle w.r.t to a reference pointing inwards
\param right_limit - right limit of valid interval for angular position
- must lie in [-pi, pi], left and right limits are specified on
the unit circle w.r.t to a reference pointing inwards
\returns valid_flag, shortest_angle
"""
min_delta = -2*pi
max_delta = 2*pi
min_delta_to = -2*pi
max_delta_to = 2*pi
flag, min_delta, max_delta = _find_min_max_delta(from_angle, left_limit, right_limit)
delta = shortest_angular_distance(from_angle,to_angle)
delta_mod_2pi = two_pi_complement(delta)
if flag: #from position is within the limits
if delta >= min_delta and delta <= max_delta:
return True, delta
elif delta_mod_2pi >= min_delta and delta_mod_2pi <= max_delta:
return True, delta_mod_2pi
else: #to position is outside the limits
flag, min_delta_to, max_delta_to = _find_min_max_delta(to_angle,left_limit,right_limit)
if fabs(min_delta_to) < fabs(max_delta_to):
shortest_angle = max(delta, delta_mod_2pi)
elif fabs(min_delta_to) > fabs(max_delta_to):
shortest_angle = min(delta,delta_mod_2pi)
else:
if fabs(delta) < fabs(delta_mod_2pi):
shortest_angle = delta
else:
shortest_angle = delta_mod_2pi
return False, shortest_angle
else: # from position is outside the limits
flag, min_delta_to, max_delta_to = _find_min_max_delta(to_angle,left_limit,right_limit)
if fabs(min_delta) < fabs(max_delta):
shortest_angle = min(delta,delta_mod_2pi)
elif fabs(min_delta) > fabs(max_delta):
shortest_angle = max(delta,delta_mod_2pi)
else:
if fabs(delta) < fabs(delta_mod_2pi):
shortest_angle = delta
else:
shortest_angle = delta_mod_2pi
return False, shortest_angle
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