apatil/ballast.py

## ballast.py
from __future__ import division
import numpy as np

# A boat is a dict with keys
# mass, center_of_mass, cm_depth, front_depth, back_depth, pitch, length, width
# units are radians (angles), meters (depths and lengths), tons (mass)
# Boats are idealized as rectangular prisms

water_density = 1

kg_to_pound = 2.2
ton_to_pound = kg_to_pound*1000
inch_to_meter = .0254
meter_to_inch = 1/inch_to_meter

def buoyancy_constraint(center_of_mass, cm_depth, length, pitch):
    """
    Gives zero for the correct center of mass.

    This is the torque about the center of mass due to buoyancy, found by \int_0^l P(x)(x-cm)dx
    where P is pressure. Since the hydrostatic force is normal to the baseplate, there's no need
    for a cos(theta) term. The pressure at position x is equal to d_cm  - (x-cm)\sin \theta where
    d_cm is the depth at the cm and \theta is the pitch angle.
    """
    l = length-center_of_mass
    return (l**2-center_of_mass**2)/2.*cm_depth - (l**3+center_of_mass**3)/3.*np.sin(pitch)

def mass_from_displacement(center_of_mass, cm_depth, length, pitch, width, water_density=water_density):
    """
    Computes the mass from the cm, the depth at cm, pitch, length and width
    of the boat, and the density of water.
    """
    back_depth = cm_depth + center_of_mass*np.sin(pitch)
    front_depth = back_depth - length*np.sin(pitch)
    return (front_depth+back_depth)/2.*length*width*np.cos(pitch)*water_density

def init_boat(front_depth, back_depth, length, width):
    "Computes the mass, cm and attitude of the boat from readily-measurable data."
    if np.abs(front_depth-back_depth) > length:
        raise ValueError, 'Difference between front and back depths exceeds length.'

    # Compute the pitch angle first.
    pitch = np.arcsin((back_depth-front_depth)/length)

    # Find the CM by satisfying the buoyancy constraint.
    from scipy import optimize
    f = lambda cm, bd=back_depth, l=length, p=pitch: buoyancy_constraint(cm, bd - cm*np.sin(p), l, p)
    center_of_mass = optimize.bisect(f, 0, length)
    cm_depth = (front_depth*(center_of_mass)+back_depth*(length-center_of_mass))/length

    # Everything else is easy once the CM is known...
    mass = mass_from_displacement(center_of_mass, cm_depth, length, pitch, width)

    return {'mass': mass,
            'center_of_mass': center_of_mass,
            'cm_depth': cm_depth,
            'front_depth': front_depth,
            'back_depth': back_depth,
            'pitch': pitch,
            'length': length,
            'width': width}

def plot_boat(boat):
    "Plots the attitude of the boat to scale, with the waterline shown."
    import pylab as pl
    pl.plot([-boat['center_of_mass']*np.cos(boat['pitch']),
                (boat['length']-boat['center_of_mass'])*np.cos(boat['pitch'])],
            [-boat['back_depth'],-boat['front_depth']],'r-')
    pl.plot([-boat['center_of_mass'],boat['length']-boat['center_of_mass']],[0,0],'b-')
    pl.axis('image')
    pl.axis('off')

def ballast(boat, new_mass, new_center_of_mass):
    """
    Adds a new mass distribution with given mass and center of mass to the boat.
    Returns a new boat with the requested mass added.
    """
    # Get new mass and CM. Remember, this isn't like adding two RV's,
    # it's like mixing two distributions.
    mass = boat['mass']+new_mass
    center_of_mass = (boat['center_of_mass']*boat['mass']+new_center_of_mass*new_mass)/mass

    # These don't change.
    width=boat['width']
    length=boat['length']

    # A function of depth at cm and pitch angle
    # which is only zero when the mass is correct
    # and the buoyancy constraint is satisfied.
    def f(x, cm=center_of_mass, m=mass, w=width, l=length):
        cm_depth=x[0]
        pitch=x[1]
        md = mass_from_displacement(cm, cm_depth, l, pitch, w)
        bc = buoyancy_constraint(cm, cm_depth, l, pitch)
        return (md-m)**2+bc**2

    # Find the depth at cm and the pitch angle.
    from scipy import optimize
    x = optimize.fmin(f, np.array([boat['cm_depth'], boat['pitch']]))#, bounds=[(0,None),(-np.pi/2.,np.pi/2.)])
    cm_depth, pitch = x

    # Everything else is easy...
    back_depth = cm_depth+center_of_mass*np.sin(pitch)
    front_depth = back_depth-length*np.sin(pitch)

    return {'mass': mass,
            'center_of_mass': center_of_mass,
            'cm_depth': cm_depth,
            'front_depth': front_depth,
            'back_depth': back_depth,
            'pitch': pitch,
            'length': length,
            'width': width}

def find_ballast_amount(f, m0, ballast_center_of_mass):
    """
    Returns a ballast mass that would bring f(ballast_mass, ballast_center_of_mass) to zero.
    f must be provided as an input and should presumably close on other characteristics
    of the boat.
    """
    from scipy import optimize
    m = optimize.fmin(f, m0, (ballast_center_of_mass,))
    return np.asscalar(m)

if __name__ == '__main__':

    length = (57*12-22-22/2.-92/2.)*inch_to_meter
    width = (6*12+10)*inch_to_meter
    ballast_cm = length-92/2*inch_to_meter
    front_depth = (9+.75)*inch_to_meter
    back_depth = 23*inch_to_meter
    desired_front_drop = 5
    desired_front_depth = desired_front_drop*inch_to_meter+front_depth

    b = init_boat(front_depth, back_depth, length, width)
    def f(m, cm, b=b):
        return np.abs(ballast(b, m, cm)['front_depth']-desired_front_depth)
    m_ballast = find_ballast_amount(f, 2, ballast_cm)
    b2 = ballast(b, m_ballast, ballast_cm)

    print 'Adding %f pounds of ballast changes front depth from %f to %f inches, back depth from %f to %f inches.'%(m_ballast*ton_to_pound, b['front_depth']*meter_to_inch, b2['front_depth']*meter_to_inch, b['back_depth']*meter_to_inch, b2['back_depth']*meter_to_inch)
	from __future__ import division
	import numpy as np

	# A boat is a dict with keys
	# mass, center_of_mass, cm_depth, front_depth, back_depth, pitch, length, width
	# units are radians (angles), meters (depths and lengths), tons (mass)
	# Boats are idealized as rectangular prisms

	water_density = 1

	kg_to_pound = 2.2
	ton_to_pound = kg_to_pound*1000
	inch_to_meter = .0254
	meter_to_inch = 1/inch_to_meter

	def buoyancy_constraint(center_of_mass, cm_depth, length, pitch):
	"""
	Gives zero for the correct center of mass.

	This is the torque about the center of mass due to buoyancy, found by \int_0^l P(x)(x-cm)dx
	where P is pressure. Since the hydrostatic force is normal to the baseplate, there's no need
	for a cos(theta) term. The pressure at position x is equal to d_cm - (x-cm)\sin \theta where
	d_cm is the depth at the cm and \theta is the pitch angle.
	"""
	l = length-center_of_mass
	return (l2-center_of_mass2)/2.cm_depth - (l3+center_of_mass3)/3.np.sin(pitch)

	def mass_from_displacement(center_of_mass, cm_depth, length, pitch, width, water_density=water_density):
	"""
	Computes the mass from the cm, the depth at cm, pitch, length and width
	of the boat, and the density of water.
	"""
	back_depth = cm_depth + center_of_mass*np.sin(pitch)
	front_depth = back_depth - length*np.sin(pitch)
	return (front_depth+back_depth)/2.lengthwidthnp.cos(pitch)water_density

	def init_boat(front_depth, back_depth, length, width):
	"Computes the mass, cm and attitude of the boat from readily-measurable data."
	if np.abs(front_depth-back_depth) > length:
	raise ValueError, 'Difference between front and back depths exceeds length.'

	# Compute the pitch angle first.
	pitch = np.arcsin((back_depth-front_depth)/length)

	# Find the CM by satisfying the buoyancy constraint.
	from scipy import optimize
	f = lambda cm, bd=back_depth, l=length, p=pitch: buoyancy_constraint(cm, bd - cm*np.sin(p), l, p)
	center_of_mass = optimize.bisect(f, 0, length)
	cm_depth = (front_depth(center_of_mass)+back_depth(length-center_of_mass))/length

	# Everything else is easy once the CM is known...
	mass = mass_from_displacement(center_of_mass, cm_depth, length, pitch, width)

	return {'mass': mass,
	'center_of_mass': center_of_mass,
	'cm_depth': cm_depth,
	'front_depth': front_depth,
	'back_depth': back_depth,
	'pitch': pitch,
	'length': length,
	'width': width}

	def plot_boat(boat):
	"Plots the attitude of the boat to scale, with the waterline shown."
	import pylab as pl
	pl.plot([-boat['center_of_mass']*np.cos(boat['pitch']),
	(boat['length']-boat['center_of_mass'])*np.cos(boat['pitch'])],
	[-boat['back_depth'],-boat['front_depth']],'r-')
	pl.plot([-boat['center_of_mass'],boat['length']-boat['center_of_mass']],[0,0],'b-')
	pl.axis('image')
	pl.axis('off')

	def ballast(boat, new_mass, new_center_of_mass):
	"""
	Adds a new mass distribution with given mass and center of mass to the boat.
	Returns a new boat with the requested mass added.
	"""
	# Get new mass and CM. Remember, this isn't like adding two RV's,
	# it's like mixing two distributions.
	mass = boat['mass']+new_mass
	center_of_mass = (boat['center_of_mass']boat['mass']+new_center_of_massnew_mass)/mass

	# These don't change.
	width=boat['width']
	length=boat['length']

	# A function of depth at cm and pitch angle
	# which is only zero when the mass is correct
	# and the buoyancy constraint is satisfied.
	def f(x, cm=center_of_mass, m=mass, w=width, l=length):
	cm_depth=x[0]
	pitch=x[1]
	md = mass_from_displacement(cm, cm_depth, l, pitch, w)
	bc = buoyancy_constraint(cm, cm_depth, l, pitch)
	return (md-m)2+bc2

	# Find the depth at cm and the pitch angle.
	from scipy import optimize
	x = optimize.fmin(f, np.array([boat['cm_depth'], boat['pitch']]))#, bounds=[(0,None),(-np.pi/2.,np.pi/2.)])
	cm_depth, pitch = x

	# Everything else is easy...
	back_depth = cm_depth+center_of_mass*np.sin(pitch)
	front_depth = back_depth-length*np.sin(pitch)

	return {'mass': mass,
	'center_of_mass': center_of_mass,
	'cm_depth': cm_depth,
	'front_depth': front_depth,
	'back_depth': back_depth,
	'pitch': pitch,
	'length': length,
	'width': width}

	def find_ballast_amount(f, m0, ballast_center_of_mass):
	"""
	Returns a ballast mass that would bring f(ballast_mass, ballast_center_of_mass) to zero.
	f must be provided as an input and should presumably close on other characteristics
	of the boat.
	"""
	from scipy import optimize
	m = optimize.fmin(f, m0, (ballast_center_of_mass,))
	return np.asscalar(m)

	if __name__ == '__main__':

	length = (5712-22-22/2.-92/2.)inch_to_meter
	width = (612+10)inch_to_meter
	ballast_cm = length-92/2*inch_to_meter
	front_depth = (9+.75)*inch_to_meter
	back_depth = 23*inch_to_meter
	desired_front_drop = 5
	desired_front_depth = desired_front_drop*inch_to_meter+front_depth

	b = init_boat(front_depth, back_depth, length, width)
	def f(m, cm, b=b):
	return np.abs(ballast(b, m, cm)['front_depth']-desired_front_depth)
	m_ballast = find_ballast_amount(f, 2, ballast_cm)
	b2 = ballast(b, m_ballast, ballast_cm)

	print 'Adding %f pounds of ballast changes front depth from %f to %f inches, back depth from %f to %f inches.'%(m_ballastton_to_pound, b['front_depth']meter_to_inch, b2['front_depth']meter_to_inch, b['back_depth']meter_to_inch, b2['back_depth']*meter_to_inch)