How do I estimate the maximum likelihood sample mean and sample covariance of the data set consisting of

`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`

The data set looks like this:

```
import numpy as np
import matplotlib.pyplot as plt
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.scatter(data2[0,:], data2[1,:], c='green')
plt.scatter(data[:,0], data[:,1], c='yellow')
plt.show()
```

using these two equations from Bishops Pattern Recognition and Machine Learning: 2.121 and 2.122:

"We begin by considering a single binary random variable `x ∈ {0, 1}`

. For example,
x might describe the outcome of flipping a coin, with `x=1`

representing ‘heads’,
and `x=0`

representing ‘tails’. We can imagine that this is a damaged coin so that
the probability of landing heads is not necessarily the same as that of landing tails.

The probability of `x=1`

will be denoted by the parameter μ so that
`p(x=1|μ) = μ (2.1)`

where `0 μ 1`

, from which it follows that `p(x=0|μ) = 1−μ`

. The probability
distribution over x can therefore be written in the form
** Bern(x|μ) = μx(1−μ)1−x (2.2)**"

Plot the sample mean and correct mean as points in a 2-dimensional plot together with the data points. For this you can use the function plot in Matlab or R. Quantify how much the sample mean deviate from the correct mean. Why do you see a deviation from the correct mean?

I'm using Python, can you help me out?