Find the Maclaurin series for F(x)= ∫(e^t -1)/t dt (lower bound=0, upper bound=x) ?

1 Answer
Ultrilliam
Apr 20, 2018

Don't think you can.

Explanation:

F(x)= int_0^x (e^t - 1)/t \ dt qquad F(0) = 0

Using Liebnitz rule: F'(x) = (e^x - 1)/x qquad F'(0) = 0/0. The limit is 1 but I think you have to stop there.

Related questions
Impact of this question
1045 views around the world
You can reuse this answer
Creative Commons License