What is #lim_(x->oo) (e^x-1)/x# ?

2 Answers
Alan N.
Feb 4, 2018

#lim_(x->oo) (e^x-1)/x = oo#

Explanation:

The Maclaurin expansion of #e^x = 1+x+x^2/(2!)+x^3/(3!)+ .......#

Hence, #e^x-1 = x+x^2/(2!)+x^3/(3!)+ .......#

#:. lim_(x->oo) (e^x-1)/x = lim_(x->oo) ((x+x^2/(2!)+x^3/(3!)+ ......)/x)#

#=lim_(x->oo) (1 + x/(2!) +(x^2)/(3!) + .......)#

#= oo#

Alvin L.
Feb 4, 2018

#lim_(x->oo) (e^x-1)/x=oo#

Explanation:

If we consider the numerator and denominator we see that #e^x-1# will grow much much faster than #x# when #x# is large.

This means that the numerator will "outrun" the denominator and the gap will be getting larger and larger, so at infinity, the denominator will just be insignificant, leaving us with:
#lim_(x->oo) (e^x-1)/x=lim_(x->oo) e^x-1=oo#

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