Matematica
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Integrali con tan(ax)
- 1.
- ∫tanaxdx=−1alncosax=1alnsecax
- 3.
- ∫tan3axdx=tan2ax2a+1alncosax
- 4.
- ∫tannaxsec2axdx=tann+1ax(n+1)a
- 5.
- ∫sec2axtanaxdx=1alntanax
- 7.
- ∫xtan2axdx=xtanaxa+1a2lncosax−x22
- 8.
- ∫dxp+qtanax=pxp2+q2+qa(p2+q2)ln(qsinax+pcosax)
- 9.
- ∫tannaxdx=tann−1ax(n−1)a−∫tann−2axdx
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