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beginner/examples_tensor/polynomial_numpy

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Warm-up: numpy#

Created On: Dec 03, 2020 | Last Updated: Dec 03, 2020 | 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 1531.0921646064453
199 1051.0699651517355
299 723.2354683433337
399 499.0794224352835
499 345.6369442924624
599 240.47965101030127
699 168.33070192043346
799 118.77262114396683
899 84.69347113766875
999 61.232406275608476
1099 45.063328591248826
1199 33.90769491714134
1299 26.202800045428347
1399 20.87566339855553
1499 17.188723907712806
1599 14.634417727921498
1699 12.863070203359982
1799 11.633517793969705
1899 10.7792561931428
1999 10.185206138683265
Result: y = -0.034733034635528424 + 0.8401498365456195 x + 0.005992026434819712 x^2 + -0.09097046283772335 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)