96 lines
2.8 KiB
Python
96 lines
2.8 KiB
Python
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def get_version_major():
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return 0
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def get_version_minor():
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return 0
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def get_version_patch():
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return 2
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def get_version_string():
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return f"{get_version_major()}.{get_version_minor()}.{get_version_patch}"
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def prefix():
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return "ABC3D"
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import time
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import datetime
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from mathutils import (
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Vector,
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)
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def get_timestamp():
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return datetime.datetime \
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.fromtimestamp(time.time()) \
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.strftime('%Y.%m.%d-%H:%M:%S')
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def mapRange(in_value, in_min, in_max, out_min, out_max, clamp=False):
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output = out_min + ((out_max - out_min) / (in_max - in_min)) * (in_value - in_min)
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if clamp:
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if out_min < out_max:
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return min(out_max, max(out_min, output))
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else:
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return max(out_max, min(out_min, output))
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else:
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return output
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import warnings
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import functools
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def deprecated(func):
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"""This is a decorator which can be used to mark functions
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as deprecated. It will result in a warning being emitted
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when the function is used."""
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@functools.wraps(func)
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def new_func(*args, **kwargs):
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warnings.simplefilter('always', DeprecationWarning) # turn off filter
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warnings.warn("Call to deprecated function {}.".format(func.__name__),
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category=DeprecationWarning,
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stacklevel=2)
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warnings.simplefilter('default', DeprecationWarning) # reset filter
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return func(*args, **kwargs)
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return new_func
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import subprocess
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import sys
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def open_file_browser(directory):
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if sys.platform=='win32':
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os.startfile(directory)
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elif sys.platform=='darwin':
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subprocess.Popen(['open', directory])
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else:
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try:
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subprocess.Popen(['xdg-open', directory])
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except OSError:
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pass
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# er, think of something else to try
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# xdg-open *should* be supported by recent Gnome, KDE, Xfce
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def printerr(*args, **kwargs):
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print(*args, file=sys.stderr, **kwargs)
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# # Evaluate a bezier curve for the parameter 0<=t<=1 along its length
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# def evaluateBezierPoint(p1, h1, h2, p2, t):
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# return ((1 - t)**3) * p1 + (3 * t * (1 - t)**2) * h1 + (3 * (t**2) * (1 - t)) * h2 + (t**3) * p2
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# # Evaluate the unit tangent on a bezier curve for t
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# def evaluateBezierTangent(p1, h1, h2, p2, t):
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# return (
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# (-3 * (1 - t)**2) * p1 + (-6 * t * (1 - t) + 3 * (1 - t)**2) * h1 +
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# (-3 * (t**2) + 6 * t * (1 - t)) * h2 + (3 * t**2) * p2
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# ).normalized()
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# def calculateBezierLength(p1, h1, h2, p2, resolution=20):
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# step = 1/resolution
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# previous_p = p1
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# length = 0
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# for i in range(0, resolution):
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# t = (i + 1) * step
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# p = evaluateBezierPoint(p1, h1, h2, p2, t)
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# length += p.distance(previous_p)
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# previous_p = p
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# return length
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