Show that underset(xto0^(-))lim((e^(1//x...

Show that `underset(xto0^(-))lim((e^(1//x)-1)/(e^(1//x)+1))` does not exist.

Text Solution

Verified by Experts

The correct Answer is:

Hence `lim_(xto0)(f(x)` doesn'ts exist.

Promotional Banner

Promotional Banner

Topper's Solved these Questions

LIMITS
ARIHANT MATHS|Exercise Exercise (Single Option Correct Type Questions)|40 Videos
LIMITS
ARIHANT MATHS|Exercise Exercise (More Than One Correct Option Type Questions)|15 Videos
INVERSE TRIGONOMETRIC FUNCTIONS
ARIHANT MATHS|Exercise Exercise (Questions Asked In Previous 13 Years Exam)|8 Videos
LOGARITHM AND THEIR PROPERTIES
ARIHANT MATHS|Exercise Exercise (Questions Asked In Previous 13 Years Exam)|4 Videos

Similar Questions

Explore conceptually related problems

Show that lim_(xto0^(-)) ((e^(1//x)-1)/(e^(1//x)+1)) does not exist.

Statement 1: If lim_(xto0){f(x)+(sinx)/x} does not exist then lim_(xto0)f(x) does not exist. Statement 2: lim_(xto0)((e^(1//x)-1)/(e^(1//x)+1)) does not exist.

lim_(xto0)((e^(x)-1)/x)^(1//x)

Show that lim_(xrarr0)e^(-1//x) does not exist.

Show that (lim)_(x rarr0)(e^((1)/(x))-1)/(e^((1)/(z))+1)does neg e xi st

lim_(xto0)(((1+x)^(1//x))/e)^(1/(sinx)) is equal to

underset( x rarr 0 ) ("Lim") [ ((1+x)^(1//x))/( e ) ]^(1//x)

Consider the following : 1. lim_(xto0) (1)/(x) exists. 2. lim_(xto0) (1)/(e^(x)) does not exist. Which of the above is/are correct?

Slove lim_(xto0)((1+x)^(1//x)-e)/x

ARIHANT MATHS-LIMITS-Exercise For Session 6

Show that underset(xto0^(-))lim((e^(1//x)-1)/(e^(1//x)+1)) does not ex...
Text Solution
|
The value o lim(xtooo)(1/(n^(3)))([1^(2)x+1^(2)]+[2^(2)x+2^(2)]+…..+[n...
Text Solution
|
The value of lim(xto1^(+))(int(1)^(x)|t-1|dt)/(sin(x-1)) is
Text Solution
|
The value of lim(n->oo) sum(k=1)^n log(1+k/n)^(1/n),is
Text Solution
|
Evaluate: (lim)(nvecoo)n[1/(n a)+1/(n a+1)+1/(n a+2)++1/(n b)]
Text Solution
|