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I need help to create a torus out of a circle by revolving it about x=2r, r is the radius of the circle.
I am open to either JULIA code or Python code. Whichever that can solve my problem the most efficient.
I have Julia code to plot circle and the x=2r as the axis of revolution.
using Plots, LaTeXStrings, Plots.PlotMeasures
gr()
θ = 0:0.1:2.1π
x = 0 .+ 2cos.(θ)
y = 0 .+ 2sin.(θ)
plot(x, y, label=L"x^{2} + y^{2} = a^{2}",
framestyle=:zerolines, legend=:outertop)
plot!([4], seriestype="vline", color=:green, label="x=2a")
I want to create a torus out of it, but unable, meanwhile I have solid of revolution Python code like this:
# Calculate the surface area of y = sqrt(r^2 - x^2)
# revolved about the x-axis
import matplotlib.pyplot as plt
import numpy as np
import sympy as sy
x = sy.Symbol("x", nonnegative=True)
r = sy.Symbol("r", nonnegative=True)
def f(x):
return sy.sqrt(r**2 - x**2)
def fd(x):
return sy.simplify(sy.diff(f(x), x))
def f2(x):
return sy.sqrt((1 + (fd(x)**2)))
def vx(x):
return 2*sy.pi*(f(x)*sy.sqrt(1 + (fd(x) ** 2)))
vxi = sy.Integral(vx(x), (x, -r, r))
vxf = vxi.simplify().doit()
vxn = vxf.evalf()
n = 100
fig = plt.figure(figsize=(14, 7))
ax1 = fig.add_subplot(221)
ax2 = fig.add_subplot(222, projection='3d')
ax3 = fig.add_subplot(223)
ax4 = fig.add_subplot(224, projection='3d')
# 1 is the starting point. The first 3 is the end point.
# The last 200 is the number of discretization points.
# help(np.linspace) to read its documentation.
x = np.linspace(1, 3, 200)
# Plot the circle
y = np.sqrt(2 ** 2 - x ** 2)
t = np.linspace(0, np.pi * 2, n)
xn = np.outer(x, np.cos(t))
yn = np.outer(x, np.sin(t))
zn = np.zeros_like(xn)
for i in range(len(x)):
zn[i:i + 1, :] = np.full_like(zn[0, :], y[i])
ax1.plot(x, y)
ax1.set_title("$f(x)$")
ax2.plot_surface(xn, yn, zn)
ax2.set_title("$f(x)$: Revolution around $y$")
# find the inverse of the function
y_inverse = x
x_inverse = np.power(2 ** 2 - y_inverse ** 2, 1 / 2)
xn_inverse = np.outer(x_inverse, np.cos(t))
yn_inverse = np.outer(x_inverse, np.sin(t))
zn_inverse = np.zeros_like(xn_inverse)
for i in range(len(x_inverse)):
zn_inverse[i:i + 1, :] = np.full_like(zn_inverse[0, :], y_inverse[i])
ax3.plot(x_inverse, y_inverse)
ax3.set_title("Inverse of $f(x)$")
ax4.plot_surface(xn_inverse, yn_inverse, zn_inverse)
ax4.set_title("$f(x)$: Revolution around $x$ \n Surface Area = {}".format(vxn))
plt.tight_layout()
plt.show()
Here is a way that actually allows rotating any figure in the XY plane around the Y axis.
"""
Rotation of a figure in the XY plane about the Y axis:
ϕ = angle of rotation
z' = z * cos(ϕ) - x * sin(ϕ)
x' = z * sin(ϕ) + x * cos(ϕ)
y' = y
"""
using Plots
# OP definition of the circle, but we put center at x, y of 4, 0
# for the torus, otherwise we get a bit of a sphere
θ = 0:0.1:2.1π
x = 4 .+ 2cos.(θ) # center at (s, 0, 0)
y = 0 .+ 2sin.(θ)
# add the original z values as 0
z = zeros(length(x))
plot(x, y, z, color=:red)
# add the rotation axis
ϕ = 0:0.1:π/2 # for full torus use 2π at stop of range
xprime, yprime, zprime = Float64[], Float64[], Float64[]
for a in ϕ, i in eachindex(θ)
push!(zprime, z[i] + z[i] * cos(a) - x[i] * sin(a))
push!(xprime, z[i] * sin(a) + x[i] * cos(a))
push!(yprime, y[i])
end
plot!(xprime, yprime, zprime, alpha=0.3, color=:green)
Here is a way using the Meshes package for the construction of the mesh and the MeshViz package for the visualization. You'll just have to translate to fulfill your desiderata.
using Meshes
using MeshViz
using LinearAlgebra
using GLMakie
# revolution of the polygon defined by (x,y) around the z-axis
# x and y have the same length
function revolution(x, y, n)
u_ = LinRange(0, 2*pi, n+1)[1:n]
j_ = 1:(length(x) - 1) # subtract 1 because of periodicity
function f(u, j)
return [x[j] * sin(u), x[j] * cos(u), y[j]]
end
points = [f(u, j) for u in u_ for j in j_]
topo = GridTopology((length(j_), n), (true, true))
return SimpleMesh(Meshes.Point.(points), topo)
end
# define the section to be rotated: a circle
R = 3 # major radius
r = 1 # minor radius
ntheta = 100
theta_ = LinRange(0, 2*pi, ntheta)
x = [R + r*cos(theta) for theta in theta_]
y = [r*sin(theta) for theta in theta_]
# make mesh
mesh = revolution(x, y, 100)
# visualize mesh
viz(mesh)
EDIT: animation
using Meshes
using MeshViz
using LinearAlgebra
using GLMakie
using Makie
using Printf
function revolutionTorus(R, r, alpha; n1=30, n2=90)
theta_ = LinRange(0, 2, n1+1)[1:n1]
x = [R + r*cospi(theta) for theta in theta_]
y = [r*sinpi(theta) for theta in theta_]
full = alpha == 2
u_ = LinRange(0, alpha, n2 + full)[1:n2]
function f(u, j)
return [x[j] * sinpi(u), x[j] * cospi(u), y[j]]
end
points = [f(u, j) for u in u_ for j in 1:n1]
topo = GridTopology((n1, n2 - !full), (true, full))
return SimpleMesh(Meshes.Point.(points), topo)
end
# generates `nframes` meshes for alpha = 0 -> 2 (alpha is a multiple of pi)
R = 3
r = 1
nframes = 10
alpha_ = LinRange(0, 2, nframes+1)[2:(nframes+1)]
meshes = [revolutionTorus(R, r, alpha) for alpha in alpha_]
# draw and save the frames in a loop
for i in 1:nframes
# make a bounding box in order that all frames have the same aspect
fig, ax, plt =
viz(Meshes.Box(Meshes.Point(-4.5, -4.5, -2.5), Meshes.Point(4.5, 4.5, 2.5)); alpha = 0)
ax.show_axis = false
viz!(meshes[i])
scale!(ax.scene, 1.8, 1.8, 1.8)
png = #sprintf "revolutionTorus%02d.png" i
Makie.save(png, fig)
end
# make GIF with ImageMagick
comm = #cmd "convert -delay 1x2 'revolutionTorus*.png' revolutionTorus.gif"
run(comm)
I want to draw a circle with a specified angle of inclination in 3D space using Python. Similar to the image below:
Image
I can already draw circles in 2D. I modified my program by referring to the link below:
Masking a 3D numpy array with a tilted disc
import numpy as np
import matplotlib.pyplot as plt
r = 5.0
a, b, c = (0.0, 0.0, 0.0)
angle = np.pi / 6 # "tilt" of the circle
fig = plt.figure()
ax = fig.add_subplot(111, projection='3d')
ax.set_xlabel('X')
ax.set_ylabel('Y')
ax.set_zlabel('Z')
ax.set_xlim(-10,10)
ax.set_ylim(-10,10)
ax.set_zlim(-10,10)
phirange = np.linspace(0, 2 * np.pi, 300) #to make a full circle
x = a + r * np.cos(phirange)
y = b + r * np.sin(phirange)
z= c
ax.plot(x, y, z )
plt.show()
Now I can draw the circle in 3D space, but I can't get the circle to tilt at the angle I want.
I tried to modify the code in the Z part, the circle can be tilted, but not the result I want.
z = c + r * np.cos(phirange) * np.sin(angle)
Result image:
Do the X and Y parts also need to be modified? What should I do?
update: the circle tilt with other axis
Let i = (1, 0, 0), j = (0, 1, 0). Those are the direction vectors of the x-axis and y-axis, respectively. Those two vectors form an orthonormal basis of the horizontal plane. Here "orthonormal" means the two vectors are orthogonal and both have length 1.
A circle on the horizontal plane with centre C and radius r consists in all points that can be written as C + r * (cos(theta) * i + sin(theta) * j), for all values of theta in range [0, 2 pi]. Note that this works with i and j, but it would have worked equally with any other orthonormal basis of the horizontal plane.
A circle in any other plane can be described exactly the same way, by replacing i and j with two vectors that form an orthonormal basis of that plane.
According to your image, the "tilted plane at angle tilt" has the following orthonormal basis:
a = (cos(tilt), 0, sin(tilt))
b = (0, 1, 0)
You can check that these are two vectors in your plane, that they are orthogonal and that they both have norm 1. Thus they are indeed an orthonormal basis of your plane.
Therefore a circle in your plane, with centre C and radius r, can be described as all the points C + r * (cos(theta) * a + sin(theta) * b), where theta is in range [0, 2 pi].
In terms of x,y,z, this translates into the following system of three parametric equations:
x = x_C + r * cos(theta) * x_a + r * sin(theta) * x_b
y = y_C + r * cos(theta) * y_a + r * sin(theta) * y_b
z = z_C + r * cos(theta) * z_a + r * sin(theta) * z_b
This simplifies a lot, because x_b, y_a, z_b are all equal to 0:
x = x_C + r * cos(theta) * x_a # + sin(theta) * x_b, but x_b == 0
y = y_C + r * sin(theta) * y_b # + cos(theta) * y_a, but y_a == 0
z = z_C + r * cos(theta) * z_a # + sin(theta) * z_b, but z_b == 0
Replacing x_a, y_b and z_a by their values:
x = x_C + r * cos(tilt) * cos(theta)
y = y_C + r * sin(theta)
z = z_C + r * sin(tilt) * cos(theta)
In python:
import numpy as np
import matplotlib.pyplot as plt
# parameters of circle
r = 5.0 # radius
x_C, y_C, z_C = (0.0, 0.0, 0.0) # centre
tilt = np.pi / 6 # tilt of plane around y-axis
fig = plt.figure()
ax = fig.add_subplot(111, projection='3d')
ax.set_xlabel('X')
ax.set_ylabel('Y')
ax.set_zlabel('Z')
ax.set_xlim(-10,10)
ax.set_ylim(-10,10)
ax.set_zlim(-10,10)
theta = np.linspace(0, 2 * np.pi, 300) #to make a full circle
x = x_C + r * np.cos(tilt) * np.cos(theta)
y = y_C + r * np.sin(theta)
z = z_C + r * np.sin(tilt) * np.cos(theta)
ax.plot(x, y, z )
plt.show()
I'm interested in plotting a real-valued function f(x,y,z)=a, where (x,y,z) is a 3D point on the sphere and a is a real number. I calculate the Cartesian coordinates of the points of the sphere as follows, but I have no clue on how to visualize the value of f on each of those points.
import plotly.graph_objects as go
import numpy as np
fig = go.Figure(layout=go.Layout(title=go.layout.Title(text=title), hovermode=False))
# Create mesh grid for spherical coordinates
phi, theta = np.mgrid[0.0:np.pi:100j, 0.0:2.0 * np.pi:100j]
# Get Cartesian mesh grid
x = np.sin(phi) * np.cos(theta)
y = np.sin(phi) * np.sin(theta)
z = np.cos(phi)
# Plot sphere surface
self.fig.add_surface(x=x, y=y, z=z, opacity=0.35)
fig.show()
I would imagine/expect/like a visualization like this
Additionally, I also have the gradient of f calculated in closed-form (i.e., for each (x,y,z) I calculate the 3D-dimensional gradient of f). Is there a way of plotting this vector field, similarly to what is shown in the figure above?
Here's an answer that's far from perfect, but hopefully that's enough for you to build on.
For the sphere itself, I don't know of any "shortcut" to do something like that in plotly, so my approach is simply to manually create a sphere mesh. Generating the vertices is simple, for example like you did - the slightly more tricky part is figuring out the vertex indices for the triangles (which depends on the vertex generation scheme). There are various algorithms to do that smoothly (i.e. generating a sphere with no "tip"), I hacked something crude just for the demonstration. Then we can use the Mesh3d object to display the sphere along with the intensities and your choice of colormap:
N = 100 # Sphere resolution (both rings and segments, can be separated to different constants)
theta, z = np.meshgrid(np.linspace(-np.pi, np.pi, N), np.linspace(-1, 1, N))
r = np.sqrt(1 - z ** 2)
x = r * np.cos(theta)
y = r * np.sin(theta)
x = x.ravel()
y = y.ravel()
z = z.ravel()
# Triangle indices
indices = np.arange(N * (N - 1) - 1)
i1 = np.concatenate([indices, (indices // N + 1) * N + (indices + 1) % N])
i2 = np.concatenate([indices + N, indices // N * N + (indices + 1) % N])
i3 = np.concatenate([(indices // N + 1) * N + (indices + 1) % N, indices])
# Point intensity function
def f(x, y, z):
return (np.cos(x * 2) + np.sin(y ** 2) + np.sin(z) + 3) / 6
fig = go.Figure(data=[
go.Mesh3d(
x=x,
y=y,
z=z,
colorbar_title='f(x, y, z)',
colorscale=[[0, 'gold'],
[0.5, 'mediumturquoise'],
[1, 'magenta']],
intensity = f(x, y, z),
i = i1,
j = i2,
k = i3,
name='y',
showscale=True
)
])
fig.show()
This yields the following interactive plot:
To add the vector field you can use the Cone plot; this requires some tinkering because when I simply draw the cones at the same x, y, z position as the sphere, some of the cones are partially or fully occluded by the sphere. So I generate another sphere, with a slightly larger radius, and place the cones there. I also played with some lighting parameters to make it black like in your example. The full code looks like this:
N = 100 # Sphere resolution (both rings and segments, can be separated to different constants)
theta, z = np.meshgrid(np.linspace(-np.pi, np.pi, N), np.linspace(-1, 1, N))
r = np.sqrt(1 - z ** 2)
x = r * np.cos(theta)
y = r * np.sin(theta)
x = x.ravel()
y = y.ravel()
z = z.ravel()
# Triangle indices
indices = np.arange(N * (N - 1) - 1)
i1 = np.concatenate([indices, (indices // N + 1) * N + (indices + 1) % N])
i2 = np.concatenate([indices + N, indices // N * N + (indices + 1) % N])
i3 = np.concatenate([(indices // N + 1) * N + (indices + 1) % N, indices])
# Point intensity function
def f(x, y, z):
return (np.cos(x * 2) + np.sin(y ** 2) + np.sin(z) + 3) / 6
# Vector field function
def grad_f(x, y, z):
return np.stack([np.cos(3 * y + 5 * x),
np.sin(z * y),
np.cos(4 * x - 3 * y + z * 7)], axis=1)
# Second sphere for placing cones
N2 = 50 # Smaller resolution (again rings and segments combined)
R2 = 1.05 # Slightly larger radius
theta2, z2 = np.meshgrid(np.linspace(-np.pi, np.pi, N2), np.linspace(-R2, R2, N2))
r2 = np.sqrt(R2 ** 2 - z2 ** 2)
x2 = r2 * np.cos(theta2)
y2 = r2 * np.sin(theta2)
x2 = x2.ravel()
y2 = y2.ravel()
z2 = z2.ravel()
uvw = grad_f(x2, y2, z2)
fig = go.Figure(data=[
go.Mesh3d(
x=x,
y=y,
z=z,
colorbar_title='f(x, y, z)',
colorscale=[[0, 'gold'],
[0.5, 'mediumturquoise'],
[1, 'magenta']],
intensity = f(x, y, z),
i = i1,
j = i2,
k = i3,
name='y',
showscale=True
),
go.Cone(
x=x2, y=y2, z=z2, u=uvw[:, 0], v=uvw[:, 1], w=uvw[:, 2], sizemode='absolute', sizeref=2, anchor='tail',
lighting_ambient=0, lighting_diffuse=0, opacity=.2
)
])
fig.show()
And yields this plot:
Hope this helps. There are a lot of tweaks to the display, and certainly better ways to construct a sphere mesh (e.g. see this article), so there should be a lot of freedom there (albeit at the cost of some work).
Good luck!
As there are many questions (this, this and this) about axis grid in mayavi that how to get matplotlib type grid using mayavi and there is no satisfactory answer even from Mayavi updates.
So regarding above problem, there is an idea that we can add ground plane in Mayavi as object and then we can draw/show required objects on ground plane. Below is object that I draw as ground plane
Code for above draw ground is
x, y = np.mgrid[-10:10:200j, -10:10:200j]
z = np.sin(x * y) / (x * y)
mlab.figure(bgcolor=(1, 1, 1))
mlab.surf(z, colormap='cool')
mlab.show()
Let's say we have an object that we want to draw/show it on above ground plane.
Below is object (as a example)
Code for above object is
mlab.figure(fgcolor=(0, 0, 0), bgcolor=(1, 1, 1))
u, v = mgrid[- 0.035:pi:0.01, - 0.035:pi:0.01]
X = 2 / 3. * (cos(u) * cos(2 * v) + sqrt(2) * sin(u) * cos(v)) * cos(u) / (sqrt(2) - sin(2 * u) * sin(3 * v))
Y = 2 / 3. * (cos(u) * sin(2 * v) - sqrt(2) * sin(u) * sin(v)) * cos(u) / (sqrt(2) - sin(2 * u) * sin(3 * v))
Z = -sqrt(2) * cos(u) * cos(u) / (sqrt(2) - sin(2 * u) * sin(3 * v))
S = sin(u)
mlab.mesh(X, Y, Z, scalars=S, colormap='YlGnBu', )
mlab.view(.0, - 5.0, 4)
mlab.show()
This code is available here
So how we can draw given object on the given ground plane same like below image? I edit this image in photoshop for better view.
Looking for some kind suggestions.
Thanks to the knowledge acquired on this website. I am able to write a simple script that prints the coordinate (x and y) of a contour plot.
Here is an example:
from numpy import *
from pylab import *
# generate a set of random points
npts = 500
phi = random(npts)*2*pi
theta = random(npts)*pi
u = random(npts)
x = u * sin( theta) * cos( phi )
y = u * sin( theta) * sin( phi )
z = u * cos( theta )
bins = linspace(-1,1,100)
H = histogram2d(x,y,bins=(bins,bins))
fig=figure()
ax1 = fig.add_subplot(1,1,1)
levels = [1,2,3]
CS = ax1.contour(H[0].T,levels=levels)
show()
# print contours coordinates
for kk in range(len(levels)):
print CS.allsegs[kk][0][:,0],CS.allsegs[kk][0][:,1]
I would like to do the same, but in 3D but I'm struggling.
The first step to do is to bin the data, which I can do with:
H = histogramdd((x,y,z),bins=(bins,bins,bins))
But now, how can I get the coordinates of a contour in 3D? I can't even come up with a simple algorithm for that.