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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 5074.358028809432
199 3421.50099163
299 2310.1047720256106
399 1562.1406197385315
499 1058.3120431159714
599 718.6186050076084
699 489.37053646070666
799 334.50680016752887
899 229.78668541936398
999 158.90125180390564
1099 110.86823204351535
1199 78.28550041438051
1299 56.15925800077779
1399 41.11719618911406
1499 30.879727589862423
1599 23.90434123105335
1699 19.146189162745237
1799 15.89677158772267
1899 13.675142490150943
1999 12.154465654944081
Result: y = 0.04620663804668313 + 0.8199594512093504 x + -0.007971413944828759 x^2 + -0.08809855634306145 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 0.235 seconds)