# Plotting a histogram estimate together with an analytical solution of the mean and covariance parameters

How do I plot a histogram estimate of this marginal distribution p(x1):

``````import numpy as np
import matplotlib.pyplot as plt
from scipy.stats import norm
linalg = np.linalg

N = 100
mean = [1,1]
cov = [[0.3, 0.2],[0.2, 0.2]]
data = np.random.multivariate_normal(mean, cov, N)
L = linalg.cholesky(cov)
# print(L.shape)
# (2, 2)
uncorrelated = np.random.standard_normal((2,N))
data2 = np.dot(L,uncorrelated) + np.array(mean).reshape(2,1)
# print(data2.shape)
# (2, 100)
plt.figure()
plt.scatter(data2[0,:], data2[1,:], c='green')
plt.scatter(data[:,0], data[:,1], c='yellow')
plt.show()

# Plotting histograms and fitting normal distributions
plt.subplot(211)
plt.hist(data[:,0], bins=20, normed=1, alpha=0.5, color='green')
plt.hist(data2[0,:], bins=20, normed=1, alpha=0.5, color='yellow')
x = np.arange(-1, 3, 0.001)
plt.plot(x, norm.pdf(x, *norm.fit(data[:,0])), color='green')
plt.plot(x, norm.pdf(x, *norm.fit(data2[0,:])), color='yellow')
plt.title('Var 1')

plt.subplot(212)
plt.hist(data[:,1], bins=20, normed=1, alpha=0.5, color='green')
plt.hist(data2[1,:], bins=20, normed=1, alpha=0.5, color='yellow')
x = np.arange(-1, 3, 0.001)
plt.plot(x, norm.pdf(x, *norm.fit(data[:,1])), color='green')
plt.plot(x, norm.pdf(x, *norm.fit(data2[1,:])), color='yellow')
plt.title('Var 2')

plt.tight_layout()
``````

together with an analytical solution given the mean and covariance parameters: N = 100 2-dimensional samples x = (x1,x2)T ∈ R2 drawn from a 2-dimensional Gaussian distribution, with mean µ = (1,1)T and covariance matrix Σ = (0.3 0.2 0.2 0.2)

I'm told that I can use this from Bishops Pattern Recognition and Machine Learning (taken from page 88):

``````p(xa) = p(xa, xb) dxb
``````

Can you write me the analytical expression for the marginal distribution p(x1)?

I'm using Python.

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