File:Cylindrical-magnet-force-diagram loglog.svg
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Summary
| Description |
English: Exactly computed force between two axially aligned identical cylindrical bar-magnets vs. distance between the magnet centers. Various graphs are shown for different lengths L of the magnets. The force is given in units of where M is the magnetization and R the radius. Both scales are logarithmic as the force becomes very small for larger distance. At large distances the force is well approximated by a dipole force . |
| Date | |
| Source | Own work |
| Author | Geek3 |
| Other versions | Cylindrical-magnet-force-diagram-approx loglog.svg version with approximations |
| SVG development |  This plot was created with Matplotlib. |
| Source code | Python code#!/usr/bin/python
# -*- coding: utf8 -*-
import numpy as np
import scipy.special as sp
import matplotlib.pyplot as plt
import matplotlib as mpl
from math import *
mpl.style.use("classic")
# fix elliptic integrals for negative argument in case of old scipy version
if sp.ellipe(-1) > 0:
E = sp.ellipe
K = sp.ellipk
else:
def E(m):
if m >= 0.:
return sp.ellipe(m)
else:
return sp.ellipe(-m / (1. - m)) * sqrt(1. - m)
def K(m):
if m >= 0.:
return sp.ellipk(m)
else:
return sp.ellipk(-m / (1. - m)) / sqrt(1. - m)
def force_between_disks(z):
'''
Exact formula for the force between two homogeneously charged round disks
aligned on their axis of symmetry.
z is the distance relative to the disk radius.
The force is returned in units of Q^2 / (4 epsilon_0 R^2)
in case of an electric charge Q on each disk.
The solution requires elliptical integrals
'''
if z == 0.:
return pi/2
return pi/2 + 0.5 * (z**2 * E(-4./z**2) - (4+z**2) * K(-4./z**2))
def force_between_magnets(z, R, L):
'''
Exact formula for the force between two axially aligned identical
cylindrical magnets, as long as they are homogeneously magnetized.
'''
zR = z / R
F = force_between_disks(zR)
F -= 2 * force_between_disks(zR + L / R)
F += force_between_disks(zR + 2*L / R)
return F
def force_between_magnets_approx(z, L):
'''
Asymptotic formula for the force between two axially aligned identical
cylindrical magnets for the case z >> R, assuming magnetic point charges
'''
F = 1. / z**2
F -= 2. / (z + L)**2
F += 1. / (z + 2*L)**2
F *= pi / 4
return F
def dipole_force(z, m1, m2):
'''
Axial force between axially aligned dipoles with magnetic moments m1,m2
z: axial distance
Assume mu0=1
'''
F = 3. * m1 * m2 / (2. * pi * z**4)
return F
mpl.style.use('classic')
mpl.rcParams['font.sans-serif'] = 'DejaVu Sans'
mpl.rc('mathtext', default='regular')
mpl.rc('lines', linewidth=2.4)
colors = ['#0000ff', '#00aa00', '#ff0000', '#ee9900', '#cccc00']
L = [('8R', 8.), ('4R', 4.), ('2R', 2.), ('R', 1.), ('R/2', 0.5)]
dash = [6.8, 2.4]
dot = [2.4, 5.8]
plt.figure()
z0, z1 = 0.4, 100
for i in range(len(L)):
f = lambda z: force_between_magnets(z-L[i][1], 1., L[i][1])
zspace = np.logspace(log10(max(z0, L[i][1])), log10(z1), 5001)
plt.plot(zspace, [f(z) for z in zspace], '-',
color=colors[i], label=r'L = ' + L[i][0], zorder=-i-len(L))
plt.plot(L[i][1], f(L[i][1]), 'o', color=colors[i], mew=1.2, zorder=-i)
plt.xlabel('z / R')
plt.ylabel(r'$F\ [\mu_0M^2R^2]$')
plt.title('Force between two cylindrical magnets with magnetization M,\nlength L, radius R and axial center-of-mass distance z')
plt.gca().set_xscale('log')
plt.gca().set_yscale('log')
plt.legend(loc='upper right')
plt.xlim(z0, z1)
plt.ylim(1e-6, 1e1)
plt.grid(True)
plt.tight_layout()
plt.savefig('Cylindrical-magnet-force-diagram_loglog.svg')
|
Licensing
I, the copyright holder of this work, hereby publish it under the following license:
This file is licensed under the Creative Commons Attribution-Share Alike 4.0 International license.
- You are free:
- to share – to copy, distribute and transmit the work
- to remix – to adapt the work
- Under the following conditions:
- attribution – You must give appropriate credit, provide a link to the license, and indicate if changes were made. You may do so in any reasonable manner, but not in any way that suggests the licensor endorses you or your use.
- share alike – If you remix, transform, or build upon the material, you must distribute your contributions under the same or compatible license as the original.
File history
Click on a date/time to view the file as it appeared at that time.
| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 14:56, 23 March 2021 | | 720 × 540 (81 KB) | Geek3 | unit must contain R^2 |
| 13:25, 31 March 2019 |  | 720 × 540 (84 KB) | Geek3 | User created page with UploadWizard |
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