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Python – Von Mises Distribution in Statistics
• Last Updated : 10 Jan, 2020

scipy.stats.vonmises() is a Von Mises continuous random variable. It is inherited from the of generic methods as an instance of the rv_continuous class. It completes the methods with details specific for this particular distribution.

Parameters :

q : lower and upper tail probability
x : quantiles
loc : [optional]location parameter. Default = 0
scale : [optional]scale parameter. Default = 1
size : [tuple of ints, optional] shape or random variates.
moments : [optional] composed of letters [‘mvsk’]; ‘m’ = mean, ‘v’ = variance, ‘s’ = Fisher’s skew and ‘k’ = Fisher’s kurtosis. (default = ‘mv’).

Results : Von Mises continuous random variable

Code #1 : Creating Von Mises continuous random variable

 `# importing library ` ` `  `from` `scipy.stats ``import` `vonmises  ` `   `  `numargs ``=` `vonmises .numargs  ` `a, b ``=` `0.2``, ``0.8` `rv ``=` `vonmises (a, b)  ` `   `  `print` `(``"RV : \n"``, rv)   `

Output :

```RV :
scipy.stats._distn_infrastructure.rv_frozen object at 0x000002A9D9D5D3C8
```

Code #2 : Von Mises continuous variates and probability distribution

 `import` `numpy as np  ` `quantile ``=` `np.arange (``0.01``, ``1``, ``0.1``)  ` ` `  `# Random Variates  ` `R ``=` `vonmises .rvs(a, b, size ``=` `10``)  ` `print` `(``"Random Variates : \n"``, R)  ` ` `  `# PDF  ` `x ``=` `np.linspace(vonmises.ppf(``0.01``, a, b), ` `                ``vonmises.ppf(``0.99``, a, b), ``10``) ` `R ``=` `vonmises.pdf(x, ``1``, ``3``) ` `print` `(``"\nProbability Distribution : \n"``, R)  `

Output :

```Random Variates :
[-1.55704728  0.7897694   1.71204809  0.17694981  1.28641702 -0.89616709
0.73042266 -0.96836691 -1.22798199  1.78334179]

Probability Distribution :
[0.21232231 0.11051151 0.06092225 0.04639279 0.05510669 0.09455777
0.18422368 0.30266756 0.33604068 0.24063755]
```

Code #3 : Graphical Representation.

 `import` `numpy as np  ` `import` `matplotlib.pyplot as plt  ` `    `  `distribution ``=` `np.linspace(``0``, np.minimum(rv.dist.b, ``3``))  ` `print``(``"Distribution : \n"``, distribution)  ` `    `  `plot ``=` `plt.plot(distribution, rv.pdf(distribution))  `

Output :

```Distribution :
[0.         0.04081633 0.08163265 0.12244898 0.16326531 0.20408163
0.24489796 0.28571429 0.32653061 0.36734694 0.40816327 0.44897959
0.48979592 0.53061224 0.57142857 0.6122449  0.65306122 0.69387755
0.73469388 0.7755102  0.81632653 0.85714286 0.89795918 0.93877551
0.97959184 1.02040816 1.06122449 1.10204082 1.14285714 1.18367347
1.2244898  1.26530612 1.30612245 1.34693878 1.3877551  1.42857143
1.46938776 1.51020408 1.55102041 1.59183673 1.63265306 1.67346939
1.71428571 1.75510204 1.79591837 1.83673469 1.87755102 1.91836735
1.95918367 2.        ]
```

Code #4 : Varying Positional Arguments

 `import` `matplotlib.pyplot as plt  ` `import` `numpy as np  ` ` `  `x ``=` `np.linspace(``0``, ``5``, ``100``)  ` `    `  `# Varying positional arguments  ` `y1 ``=` `vonmises.pdf(x, a, b)  ` `y2 ``=` `vonmises.pdf(x, a, b)  ` `plt.plot(x, y1, ``"*"``, x, y2, ``"r--"``)  `

Output :

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