∫dx/(1+2x²)
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1 + 2x² = 1 + (√2x)² = 1 + tan²θ = sec²θ
令√2x = tanθ ==> x = (1/√2)tanθ,dx = (1/√2)sec²θ dθ
∫ dx/(1 + 2x²)
= ∫ [(1/√2)sec²θ]/(sec²θ) dθ
= (1/√2)∫ dθ
= θ/√2 + C
= (1/√2)arctan(√2x) + C
令√2x = tanθ ==> x = (1/√2)tanθ,dx = (1/√2)sec²θ dθ
∫ dx/(1 + 2x²)
= ∫ [(1/√2)sec²θ]/(sec²θ) dθ
= (1/√2)∫ dθ
= θ/√2 + C
= (1/√2)arctan(√2x) + C
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