If `f(x)=x^(2)"sin"(1)/(x)`, where `xne0`, then the value of the function f at x=0, so that the function is continuous at x=0, is

If f(x)=x sin ((1)/(x)),x ne 0 then the value of the function at x=0, so that the function is continuous at x=0 is

if f(x)=x^2sin(1/x) , x!=0 then the value of the function f at x=0 so that the function is continuous at x=0

If f (x) = x sin (1)/(2), x ne 0 then the value of the ltbRgt function at x = 0 so that the function is continuous at x= -0 , is :

If f(x)=[(3sin x)/(x)],x!=0, then the value of f(0) so that the function f(x) is continuous at x=0 is

The value of f(0) so that the function f(x)=(1)/(x)-(1)/(sinx) is continuous at x = 0 is ________

If the function f(x)=(sin10 x)/x , x!=0 is continuous at x=0 , find f(0) .

The function f(x)=x^(2)"sin"(1)/(x) , xne0,f(0)=0 at x=0

If f(x) = ((a+x)^(2)sin(a+x)-a^(2)sin a)/(x) , x !=0 , then the value of f(0) so that f is continuous at x = 0 is

A function f(x) is defined as f(x)=[x^(m)(sin1)/(x),x!=0,m in N and 0, if x=0 The least value of m for which f'(x) is continuous at x=0 is