Let f(x)={x^p sin(1/x) , x != 0 and 0 ...

Let `f(x)={x^p sin(1/x) , x != 0 and 0 ,x=0 and A and B` are two sets such that A and B are continuous anddifferential of `f(x)` at `x = 0` respectively then find `A nn B`.

Similar Questions

Explore conceptually related problems

Let f(x) = sin"" 1/x, x ne 0 Then f(x) can be continuous at x =0

Let f(x) = {:{ (x sin""(1/x) , x ne 0) , ( k , x = 0):} then f(x) is continuous at x = 0 if

Let f(x)={x^(p)sin((1)/(x))+x|x^(3)|,x!=0,0,x=0 the set of values of p for which f'(x) is continuous at x=0 is

Let f(x)={(e^x-1+ax)/x^2, x>0 and b, x=0 and sin(x/2)/x , x<0 , then

Let f(x) = (x+|x|)/x for x ne 0 and let f (0) = 0, Is f continuous at 0?

f(x)=(x(1+a cos x)-b sin x)/(x^(3)),x!=0 and f(0)=1 The value of a and b so that f(x) is a continuous function are.

Let f(x)=(log(1+x/a)-log(1-x/b))/x ,x!=0. Find the value of f at x=0 so that f becomes continuous at x=0