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beginner/examples_tensor/polynomial_numpy

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Warm-up: numpy#

Created On: Dec 03, 2020 | Last Updated: Sep 29, 2025 | Last Verified: Nov 05, 2024

A third order polynomial, trained to predict \(y=\sin(x)\) from \(-\pi\) to \(\pi\) by minimizing squared Euclidean distance.

This implementation uses numpy to manually compute the forward pass, loss, and backward pass.

A numpy array is a generic n-dimensional array; it does not know anything about deep learning or gradients or computational graphs, and is just a way to perform generic numeric computations.

99 155.62738016845734
199 106.20405264022592
299 73.43287809651014
399 51.699020071669615
499 37.28227477966263
599 27.717194082715352
699 21.369634302933875
799 17.15628213306803
899 14.358860687332367
999 12.501039409634329
1099 11.266875275036188
1199 10.446764937889274
1299 9.901622728053432
1399 9.539134714746456
1499 9.298015213006378
1599 9.137567036278705
1699 9.030757435450722
1799 8.959624860153195
1899 8.912231274921643
1999 8.880639515400324
Result: y = 0.0032329965217701463 + 0.8495879111829072 x + -0.0005577456972996861 x^2 + -0.09231294676740048 x^3


import numpy as np
import math

# Create random input and output data
x = np.linspace(-math.pi, math.pi, 2000)
y = np.sin(x)

# Randomly initialize weights
a = np.random.randn()
b = np.random.randn()
c = np.random.randn()
d = np.random.randn()

learning_rate = 1e-6
for t in range(2000):
    # Forward pass: compute predicted y
    # y = a + b x + c x^2 + d x^3
    y_pred = a + b * x + c * x ** 2 + d * x ** 3

    # Compute and print loss
    loss = np.square(y_pred - y).sum()
    if t % 100 == 99:
        print(t, loss)

    # Backprop to compute gradients of a, b, c, d with respect to loss
    grad_y_pred = 2.0 * (y_pred - y)
    grad_a = grad_y_pred.sum()
    grad_b = (grad_y_pred * x).sum()
    grad_c = (grad_y_pred * x ** 2).sum()
    grad_d = (grad_y_pred * x ** 3).sum()

    # Update weights
    a -= learning_rate * grad_a
    b -= learning_rate * grad_b
    c -= learning_rate * grad_c
    d -= learning_rate * grad_d

print(f'Result: y = {a} + {b} x + {c} x^2 + {d} x^3')

Total running time of the script: (0 minutes 0.236 seconds)