A function `f(x)` is defined as below `f(x)=(cos(sin x) - cos x) /x^2 , x!= 0 and f(0) = a`, f(x) is continuous at `x= 0` if 'a' equals

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

If f(x)=(sin^(- 1)x)^2*cos(1/ x)"if"x!=0;f(0)=0,f(x) is continuous at x= 0 or not ?

If f(x)=(1-cos2x)/(x^(2))quad , x!=0 and f(x) is continuous at x=0 ,then f(0)=?

f(x)=(sin x-x cos x)/(x^(2)) if x!=0 and f(0)=0 then int_(0)^(1)f(x)dx is

Define f(0) such that the function f(x)=(cos(sin x)-cos x)/(x^(2)),x!=0, is continuous at x=0

A function f(x) is defined as follows f(x)={(sin x)/(x),x!=0 and 2,x=0 is,f(x) continuous at x=0? If not,redefine it so that it become continuous at x=0 .

f:R rarr R is defined by f(x)={(cos3x-cos x)/(x^(2)),x!=0 lambda,x=0 and f is continuous at x=0; then lambda=

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

If f(x) =(1+sin x - cos x)/(1-sin x - cos x ), x != 0 , is continuous at x = 0 , then f(0) = ………