Asked by bel
find the limit as x approaches infinity, -(x+1) (e^(1/(x+1))-1)
Answers
Answered by
Steve
If you let u = -(x+1), you have
u(e^(-1/u) - 1)
= (e^(-1/u) - 1) / (1/u)
Now using l'Hospital's Rule, that is the same as
(e^(-1/u) - 1)(1/u^2) / (1/u^2)
= e^(-1/u) - 1
-> 0-1 = -1
u(e^(-1/u) - 1)
= (e^(-1/u) - 1) / (1/u)
Now using l'Hospital's Rule, that is the same as
(e^(-1/u) - 1)(1/u^2) / (1/u^2)
= e^(-1/u) - 1
-> 0-1 = -1
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