Improper Integral Calculator

How to Use This Calculator

1. Enter f(x) (e.g. 1/x^2).
2. For infinite upper bound enter 100000000 (10⁸).
3. The calculator evaluates the integral and checks if the result is finite.
4. Use the p-Test tab for quick convergence analysis of ∫ 1/xᵖ.
5. The Professional tab adds asymptotic behavior analysis and Cauchy PV note.

Formula

Example

Frequently Asked Questions

• What is an improper integral? ▼
  An improper integral has either infinite bounds (Type 1: ∫₁^∞) or a discontinuous integrand (Type 2: ∫₀¹ 1/√x dx). Both are evaluated as limits of proper integrals.
• What is the p-test? ▼
  For ∫₁^∞ 1/xᵖ dx: converges to 1/(p−1) when p > 1, diverges when p ≤ 1. For ∫₀¹ 1/xᵖ dx: converges to 1/(1−p) when p < 1, diverges when p ≥ 1.
• How does this calculator handle infinite bounds? ▼
  Enter a large finite number (e.g. 100000000 for +∞). The calculator integrates from a to 10⁶ using Simpson's rule and checks whether the result is finite.
• What is the Cauchy principal value? ▼
  For integrals with symmetric singularities (like ∫₋₁¹ 1/x dx), the Cauchy principal value is the limit of ∫₋ε^ε as ε→0, which can be finite even when the ordinary integral diverges.
• What is the comparison test for integrals? ▼
  If 0 ≤ f(x) ≤ g(x) and ∫g converges, then ∫f converges. If f(x) ≥ g(x) and ∫g diverges, then ∫f diverges.

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