I have a problem with constructing a Bezier surface following an example from a book, using mathematical formulas in matrix form. Especially when multiplying matrices.

I'm trying to use this formula I have a matrix of control points

```
B = np.array([
[[-15, 0, 15], [-15, 5, 5], [-15, 5, -5], [-15, 0, -15]],
[[-5, 5, 15], [-5, 5, 5], [-5, 5, -5], [-5, 5, -15]],
[[5, 5, 15], [5, 5, 5], [5, 5, -5], [5, 5, -15]],
[[15, 0, 15], [15, 5, 5], [15, 5, -5], [15, 0, -15]]
])
```

And we have to multiply it by matrices and get [N][B][N]^t

And I tried to multiply the matrix by these two, but I get completely different values for the final matrix, I understand that most likely the problem is in the code

"

```
B = np.array([
[[-15, 0, 15], [-5, 5, 15], [5, 5, 15], [15, 0, 15]],
[[-15, 5, 5], [-5, 5, 5], [5, 5, 5], [15, 5, 5]],
[[-15, 5, -5], [-5, 5, -5], [5, 5, -5], [15, 5, -5]],
[[-15, 0, -15], [-5, 5, -15], [5, 5, -15], [15, 0, -15]]
])
N = np.array([[-1, 3, -3, 1],
[3, -6, 3, 0],
[-3, 3, 0, 0],
[1, 0, 0, 0]
])
Nt = np.array([[-1, 3, -3, 1],
[3, -6, 3, 0],
[-3, 3, 0, 0],
[1, 0, 0, 0]])
B_transformed = np.zeros_like(B)
for i in range(B.shape[0]):
for j in range(B.shape[1]):
for k in range(3):
B_transformed[i, j, k] = B[i, j, k] * N[j, k] * Nt[j, k]
```

"

```
[[[ -15 0 135]
[ -45 180 135]
[ 45 45 0]
[ 15 0 0]]
[[ -15 45 45]
[ -45 180 45]
[ 45 45 0]
[ 15 0 0]]
[[ -15 45 -45]
[ -45 180 -45]
[ 45 45 0]
[ 15 0 0]]
[[ -15 0 -135]
[ -45 180 -135]
[ 45 45 0]
[ 15 0 0]]]
```

Correct answer from book is

```
NBNt = np.array([
[[0, 0, 0], [0, 0, 0], [0, 0, 0], [0, 0, 0]],
[[0, 0, 0], [0, -45, 0], [0, 45, 0], [0, -15, 0]],
[[0, 0, 0], [0, 45, 0], [0, -45, 0], [30, 15, 0]],
[[0, 0, 0], [0, -15, 0], [0, 15, -30], [-15, 0, 15]]
])
```

Next, matrix multiplication will also be performed, so it’s important for me to understand what I’m doing wrong

Q(0.5, 0.5) =

```
[0.125 0.25 0.5 1. ] * [N][B][N]^t * [[0.125]
[0.25 ]
[0.5 ]
[1. ]]
```

This is the calculation of a point on a surface at w = 0.5 and u = 0.5

And the answer should be

[0, 4.6875, 0]

I use Jupyter Notebook