Science

Math

Humanities

... and beyond

Socratic Meta
Featured Answers

Topics

How do you integrate #int te^-t# by integration by parts method?

1 Answer

Aug 2, 2016

#= -e^(-t)(t+1) + C#

Explanation:

For #u, v# functions of #t#,

#int uv'dt = uv - int u'vdt#

#u(t) = t implies u'(t) = 1#

#v'(t) = e^(-t) implies v(t) = -e^(-t)#

#intte^(-t)dt = -te^(-t) + int e^(-t)dt#

#=-te^(-t) - e^(-t) + C = -e^(-t)(t+1) + C#

Related questions

See all questions in Integration by Parts

Impact of this question

48603 views around the world

You can reuse this answer
Creative Commons License