Techniques of Integration · Improper Integrals
p-Integral Test
A fundamental convergence result: the improper integral of 1/xᵖ from 1 to ∞ converges if and only if p > 1.
Worked examples
Does ∫₁^∞ 1/x^(3/2) dx converge?
- p = 3/2 > 1, so the integral converges.
- Value: [-2/√x]₁^∞ = 0-(-2) = 2
Answer: Converges; equals 2.
Does ∫₁^∞ 1/√x dx converge?
- p = 1/2 ≤ 1, so the integral diverges.
Answer: Diverges.
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