Home
Class 12
MATHS
The value of : lim(x to 0) (cos x)^(1/x)...

The value of : `lim_(x to 0) (cos x)^(1/x)` is

A

`1`

B

`0`

C

`e`

D

none of the above

Text Solution

Verified by Experts

Promotional Banner

Topper's Solved these Questions

  • SAMPLE QUESTION PAPER 4

    ICSE|Exercise Section B|10 Videos

  • SAMPLE QUESTION PAPER 4

    ICSE|Exercise Section C|11 Videos

  • SAMPLE QUESTION PAPER 3

    ICSE|Exercise SECTION-C|7 Videos

  • SAMPLE QUESTION PAPER 5

    ICSE|Exercise Section .C.|10 Videos

Similar Questions

Explore conceptually related problems

lim_(x to 0) (cos x)/(pi-x)

The value of : lim_(x rarr0)(cosx-1)/(x) is

Evaluate : lim_(x to 0) (e^(cos x)-1)/(cos x)

The value of lim_(xrarr0)(cos x+sinx)^((1)/(x)) is equal to to (take e = 2.71)

f(x)= |{:(cos x,,x,,1),(2sin x ,,x^(2),,2x),(tanx ,, x,,1):}| then find the value of lim_(xto 0) (f(x))/(x)

The value of lim_(x to 0) ("sin" (pi cos^(2) x))/(x^(2)) equals

The value of lim _(xto0) (cos (sin x )- cos x)/(x ^(4)) is equal to :

lim_(x to 0) (cos 2x-1)/(cos x-1)

The value of lim_(x rarr 0) (1-cos2x)/(e^(x^(2))-e^(x)+x) is

The value of lim_(x to 0) ((1)/(x^(2)) - cot x) equals