underset(xtooo)lim[sqrt(x+sqrt(x+sqrt(x)...

`underset(xtooo)lim[sqrt(x+sqrt(x+sqrt(x)))-sqrt(x)]` is equal to

A

0

B

`1//2`

C

log 2

D

`e^(4)`

Text Solution

Verified by Experts

The correct Answer is:

B

Promotional Banner

Promotional Banner

Topper's Solved these Questions

LIMITS, CONTINUITY AND DIFFERENTIABILITY
ML KHANNA|Exercise PROBLEM SET (1) (TRUE AND FALSE) |4 Videos
LIMITS, CONTINUITY AND DIFFERENTIABILITY
ML KHANNA|Exercise PROBLEM SET (1) (FILL IN THE BLANKS) |7 Videos
INVERSE CIRCULAR FUNCTIONS
ML KHANNA|Exercise Self Assessment Test|25 Videos
LINEAR PROGRAMMING
ML KHANNA|Exercise Self Assessment Test|8 Videos

Similar Questions

Explore conceptually related problems

lim_(xtooo) [sqrt(x+sqrt(x+sqrt(x)))-sqrt(x)] is equal to

lim_(x rarr oo)[sqrt(x+sqrt(x+sqrt(x)))-sqrt(x)]

lim_(x rarr oo)(sqrt(x+sqrt(x))-sqrt(x)) equals

Find lim_(x rarr oo)[sqrt(x+sqrt(x+sqrt(x)))-sqrt(x)]

lim_(x rarr oo){sqrt(x+sqrt(x+sqrt(x)))-sqrt(x)}

lim_(x to 0)((x)/(sqrt(1+x)-sqrt(1-x))) is equal to

If the value of underset(x to 0)lim (sqrt(2+x)-sqrt2)/(x)" is equal to "1/(a sqrt2) then 'a' equals

The value of lim_(x to oo) {sqrt(x+ sqrt(x + sqrt(x))) - sqrt(x)} equals

ML KHANNA-LIMITS, CONTINUITY AND DIFFERENTIABILITY -MISCELLANEOUS EXERCISE (ASSERTION/ REASONS)

underset(xtooo)lim[sqrt(x+sqrt(x+sqrt(x)))-sqrt(x)] is equal to
Text Solution
|
Let f(x) =(x+1)^(2) - 1, x ge -1 , IF f(x):[-1,oo] -> [-1,oo] Statem...
Text Solution
|
Let f(x) = x|x| and g(x) = sin x Statement-1: gof is differentiable ...
Text Solution
|
Statement-1: "lt"(x to infty) ((x+1)^(10) +(x+2)^(10) + ….+(x+100)^(10...
Text Solution
|