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Direct integration equations

#017

Problem

y=x2+3cosx4exy' = x^2 + 3\cos x - 4e^x

Classification

  • power rule
  • exponential antiderivative
  • trigonometric antiderivative
  • solution family

Method

  • direct integration

Solution

y=x33+3sinx4ex+Cy = \frac{x^3}{3} + 3\sin x - 4e^x + C

Simulation & Code

Computational workSimulation
Graph visualization for entry #017
Download .py file
Python codeOpen
import numpy as np
import matplotlib.pyplot as plt

x = np.linspace(-3, 3, 800)

with np.errstate(divide="ignore", invalid="ignore", over="ignore"):
    y = x**3/3 + 3*np.sin(x) - 4*np.exp(x)
    y_prime = x**2 + 3*np.cos(x) - 4*np.exp(x)

plt.figure(figsize=(8, 5))
plt.plot(x, y, label="y = x^3/3 + 3sin(x) - 4e^x", linewidth=2)
plt.plot(x, y_prime, label="y' = x^2 + 3cos(x) - 4e^x", linewidth=2, color="red")
plt.title("Entry #017: solution and derivative")
plt.xlabel("x")
plt.ylabel("value")
plt.grid(True, alpha=0.35)
plt.legend()
plt.tight_layout()
plt.show()

Handwritten derivation

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Takeaway & Interpretation

This equation says the solution's slope is controlled entirely by x^2 + 3cos(x) - 4e^x. After integrating, the solution family becomes y = x^3/3 + 3sin(x) - 4e^x + C, meaning every solution has the same overall shape but may be shifted vertically by the constant C.