File:Inclinedthrow.gif

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Summary

DescriptionInclinedthrow.gif	English: Trajectories of three objects thrown at the same angle (70°). The black object doesn't experience any form of drag and moves along a parabola. The blue object experiences Stokes' drag, and the green object Newton drag.
Date	15 December 2008
Source	Own work
Author	AllenMcC.
Other versions	Inclinedthrow2.gif
GIF development InfoField	This plot was created with Matplotlib.
Source code InfoField	Python code #!/usr/bin/python3 # -- coding: utf8 -- import os import inspect from math import * import numpy as np from scipy.integrate import odeint from scipy.optimize import newton import matplotlib as mpl import matplotlib.pyplot as plt from matplotlib import animation # settings mpl.rcParams['path.snap'] = False fname = 'inclinedthrow' size = 400, 288 l, w, b, h = 22.5/size[0], 1-23/size[0], 22.5/size[1], 1-23/size[1] nframes = 102 delay = 8 lw = 1. ms = 6 c1, c2, c3 = "#000000", "#0000ff", "#007100" def projectile_motion(g, mu, pot, xy0, vxy0, tt): # use a four-dimensional vector function vec = [x, y, vx, vy] def dif(vec, t): # time derivative of the whole vector vec v = hypot(vec[2], vec[3]) vxrel, vyrel = vec[2] / v, vec[3] / v return [vec[2], vec[3], -mu * v*pot vxrel, -g - mu * v*pot vyrel] # solve the differential equation numerically vec = odeint(dif, [xy0[0], xy0[1], vxy0[0], vxy0[1]], tt) return vec[:, 0], vec[:, 1], vec[:, 2], vec[:, 3] # return x, y, vx, vy g = 1. theta = radians(70) v0 = sqrt(g/sin(2theta)) vinf = 2.1 # use identical terminal velocity vinf for both types of friction mu_stokes = g / vinf1 mu_newton = g / vinf2 x0, y0 = 0.0, 0.0 vx0, vy0 = v0 cos(theta), v0 * sin(theta) T = newton(lambda t: projectile_motion(g, 0, 0, (x0, y0), (vx0, vy0), [0, t])[1][1], 2vy0/g) nsub = 10 tt = np.linspace(0, T nframes / (nframes - 1), (nframes - 1) * nsub + 1) traj_free = projectile_motion(g, 0, 0, (x0, y0), (vx0, vy0), tt) traj_stokes = projectile_motion(g, mu_stokes, 1, (x0, y0), (vx0, vy0), tt) traj_newton = projectile_motion(g, mu_newton, 2, (x0, y0), (vx0, vy0), tt) def animate(nframe, saveframes=False): print(nframe, '/', nframes) t = T * float(nframe) / nframes plt.clf() fig.gca().set_position((l, b, w, h)) fig.gca().set_aspect("equal") plt.xlim(0, 1) plt.ylim(0, (hsize[1]) / (wsize[0])) plt.xticks([]), plt.yticks([]) plt.xlabel('Distance', size=12) plt.ylabel('Height', size=12) plt.plot(traj_free[0][:nframensub+1], traj_free[1][:nframensub+1], '-', lw=lw, color=c1) plt.plot(traj_free[0][nframensub], traj_free[1][nframensub], 'ok', color=c1, markersize=ms, markeredgewidth=0) plt.plot(traj_stokes[0][:nframensub+1], traj_stokes[1][:nframensub+1], '-', lw=lw, color=c2) plt.plot(traj_stokes[0][nframensub], traj_stokes[1][nframensub], 'ok', color=c2, markersize=ms, markeredgewidth=0) plt.plot(traj_newton[0][:nframensub+1], traj_newton[1][:nframensub+1], '-', lw=lw, color=c3) plt.plot(traj_newton[0][nframensub], traj_newton[1][nframensub], 'ok', color=c3, markersize=ms, markeredgewidth=0) if saveframes: # export frame dig = int(ceil(log10(nframes))) fsavename = ('frame{:0' + str(dig) + '}.svg').format(nframe) fig.savefig(fsavename) with open(fsavename) as f: content = f.read() content = content.replace('pt"', 'px"').replace('pt"', 'px"') with open(fsavename, 'w') as f: f.write(content) fig = plt.figure(figsize=(size[0]/72., size[1]/72.)) os.chdir(os.path.dirname(os.path.abspath(inspect.getfile(inspect.currentframe())))) for i in range(nframes): animate(i, True) os.system('convert -loop 0 -delay ' + str(delay) + ' frame*.svg +dither ' + fname + '.gif') # keep last frame for two seconds os.system('gifsicle -k32 --color-method blend-diversity -b ' + fname + '.gif -d' + str(delay) + ' "#0-' + str(nframes-2) + '" -d200 "#' + str(nframes-1) + '"') for i in os.listdir('.'): if i.startswith('frame') and i.endswith('.svg'): os.remove(i)

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File history

Click on a date/time to view the file as it appeared at that time.

	Date/Time	Dimensions	User	Comment
current	16:10, 21 October 2020	400 × 288 (374 KB)	Geek3	adjusted friction coefficients such to make terminal velocity of both trajectories equal. In this case, the Newton projectile moves further.
	12:57, 21 October 2009	400 × 288 (453 KB)	AllenMcC.	added Newton drag
	00:40, 22 December 2008	400 × 299 (393 KB)	AllenMcC.	== Summary == {{Information \|Description={{en\|1=Trajectories of two objects thrown at the same angle. The blue object doesn't experience any drag and moves along a parabola. The black object experiences Stokes' drag.}} \|Source=Own work by uploader \|Author
	20:12, 18 December 2008	400 × 299 (393 KB)	AllenMcC.	== Summary == {{Information \|Description={{en\|1=Trajectories of two objects thrown at the same angle. The blue object doesn't experience any drag and moves along a parabola. The black object experiences Stokes' drag.}} \|Source=Own work by uploader \|Author
	04:07, 15 December 2008	700 × 519 (636 KB)	AllenMcC.	{{Information \|Description={{en\|1=Trajectories of two objects thrown at the same angle. The blue object doesn't experience friction and moves along a parabola. The black object experiences Stokes friction.}} \|Source=Own work by uploader \|Author=[[User:All