` f (x) = (sin x )/(x) , x ne 0 `and f(x) is continous at x = 0 then f(0) =

A

0

B

1

C

-1

D

2

Verified by Experts

The correct Answer is:

B

Similar Questions

Explore conceptually related problems

If the function f(x)=(sin 3x)/(x)" for "x ne 0 and f(0)=k/2 is continuous at x=0 then k=

f(x) = (2x - sin^(-1))/(2x + tan^(-1) (x)) is continuous at x = 0 then f(0) =

Show that f(x) = x sin ((1)/(x)), x ne 0 , f(0) = 0 is continuous at x = 0

If f(x)=(sin^(2)ax)/(x^(2))" for "x ne 0, f(0)=1 is continuous at x=0 then a=

f (x) = ((e^(kx)-1)(sin kx))/(4x^(2)) , x ne 0, f(0) = 9 , is continuous at x = 0 , then k =

Show that the function f(x) =x sub (1)/(x) , x ne 0 f(0) =0 is continuous at x = 0

f(x) - (1- cos (ax))/( x sin x) , x ne 0, f(0) = 1/2 is continuous at x = 0 , a =

f(x) = (sin (x-a))/(x -a) , x ne , f(a) = 0 , f(x) at x = a is

if f(x)=(1-cos ax)/(x sin x)" for "x ne 0, f(0)=1//2 is continuous at x=0 then a=