We have #f:RR->RR,f(x)=(x+2)e^(-|x|)#How to solve this limit? #lim_(x->0)(f(x)-f(0))/(x);x>0#

1 Answer
Apr 17, 2017

The limit does not exist.

Explanation:

The left and right limits at #0# are different.

The quickest way to see this is to note that this limit is the definition of #f'(0)#.

But for this function we have

#f(x) = {((x+2)e^x,"if",x >= 0),((x+2)e^(-x),"if",x < 0):}#

The right derivative is #e^x+(x+2)e^x# which is #2# at #x=0#

while the left derivative is #e^(-x)-(x+2)e^-x#, which is #-2# and #x=0#.

Using technology

The graph of #f# is shown below.

graph{y=(x+2)e^(-abs(x)) [-5.213, 5.884, -2.11, 3.44]}