Evaluate the following integral ∫〖〖tan〗^3 x〗 〖sec〗^5 x dx
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total answers (1)
total answers (1)
Mathematics
∫〖〖tan〗^3 x〗 〖sec〗^5 x dx=∫〖〖tan〗^2 x〗 〖sec〗^4 x(secx tanx ) dx
need an explanation for this answer? contact us directly to get an explanation for this answer=∫〖(〖sec〗^2 x-1) 〖sec〗^4 x〗 (secx tanx ) dx
Substituting u=secx ,then du=secx tanx dx,we obtain:
∫〖〖tan〗^3 x〗 〖sec〗^5 x dx=∫〖(u^2-1) u^4 〗 du
=∫(u^6-u^4 ) du
=1/7 u^7-1/5 u^5+c
=1/7 〖sec〗^7 x-1/5 〖sec〗^5 x+c