Matplotlib轮廓不起作用
ube*_*kel 2 python matplotlib sympy
我正试图绘制蝙蝠侠方程.在sympy或matplotlib中的解决方案将是伟大的(圣人不酷,因为我使用的是Windows).问题在于,如果我注释掉某些部分,图中的部分会出现,但所有F *=部分都会出现,我会得到一个空白的图.
import matplotlib.pyplot
from numpy import arange
from numpy import meshgrid
from numpy import sqrt
from numpy import real
delta = 0.01
xrange = arange(-7.0, 7.0, delta)
yrange = arange(-3.0, 3.0, delta)
x, y = meshgrid(xrange,yrange)
F = 1
F *= (((x/7) ** 2) * sqrt(abs(abs(x) - 3)/(abs(x) - 3)) + ((y / 3) ** 2) * sqrt(abs(y + (3 * sqrt(33)) / 7)/(y + (3 * sqrt(33)) / 7)) - 1)
F *= (abs(x/2) - ((3 * sqrt(33) - 7)/112) * x**2 - 3 + sqrt(1 - (abs(abs(x) - 2) - 1) ** 2 ) - y)
F *= (9 * sqrt(abs((abs(x) - 1) * (abs(x) - 3/4))/((1 - abs(x)) * (abs(x) - 3/4))) - 8 * abs(x) - y)
F *= (3 * abs(x) + 0.75 * sqrt(abs((abs(x) - 3/4) * (abs(x) - 1/2))/((3/4 - abs(x)) * (abs(x) - 1/2))) - y)
F *= ((9/4) * sqrt(abs((x - 1/2) * (x + 1/2))/((1/2 - x) * (1/2 + x))) - y)
F *= ((6 * sqrt(10)) / 7 + (3/2 - abs(x)/2) * sqrt(abs(abs(x) - 1)/(abs(x) - 1)) - ((6 * sqrt(10))/ 14) * sqrt(4 - (abs(x) - 1) ** 2 ) - y)
G = 0
matplotlib.pyplot.contour(x, y, (F - G), [0])
matplotlib.pyplot.show()
这里发生了什么?如果一个被乘数的图形为零,那么无论我投入哪个其他被乘数,它仍应如此.
蝙蝠侠等式的来源:http://www.reddit.com/r/pics/comments/j2qjc/do_you_like_batman_do_you_like_math_my_math/
sqrt的参数对于许多点是负的,因此最终的产品都是NaN.您可以将每个因素绘制如下:
from __future__ import division # this is important, otherwise 1/2 will be 0
import matplotlib.pyplot
from numpy import arange
from numpy import meshgrid
from numpy import sqrt
from numpy import real
delta = 0.01
xrange = arange(-7.0, 7.0, delta)
yrange = arange(-3.0, 3.0, delta)
x, y = meshgrid(xrange,yrange)
F1 = (((x/7) ** 2) * sqrt(abs(abs(x) - 3)/(abs(x) - 3)) + ((y / 3) ** 2) * sqrt(abs(y + (3 * sqrt(33)) / 7)/(y + (3 * sqrt(33)) / 7)) - 1)
F2 = (abs(x/2) - ((3 * sqrt(33) - 7)/112) * x**2 - 3 + sqrt(1 - (abs(abs(x) - 2) - 1) ** 2 ) - y)
F3 = (9 * sqrt(abs((abs(x) - 1) * (abs(x) - 3/4))/((1 - abs(x)) * (abs(x) - 3/4))) - 8 * abs(x) - y)
F4 = (3 * abs(x) + 0.75 * sqrt(abs((abs(x) - 3/4) * (abs(x) - 1/2))/((3/4 - abs(x)) * (abs(x) - 1/2))) - y)
F5 = ((9/4) * sqrt(abs((x - 1/2) * (x + 1/2))/((1/2 - x) * (1/2 + x))) - y)
F6 = ((6 * sqrt(10)) / 7 + (3/2 - abs(x)/2) * sqrt(abs(abs(x) - 1)/(abs(x) - 1)) - ((6 * sqrt(10))/ 14) * sqrt(4 - (abs(x) - 1) ** 2 ) - y)
for f in [F1,F2,F3,F4,F5,F6]:
matplotlib.pyplot.contour(x, y, f, [0])
matplotlib.pyplot.show()
结果图:
