Determine if f defined by
`f(x)={{:(x^(2)sin""(1)/(x)," if "x ne 0),(0," if "x= 0):}` is a continuous function?

The value of k which makes the function defined by : f(x) = {{:("sin" (1)/(x),"if",x ne 0),(k,"if",x = 0):} continuous at x = 0 is :

If f(x)={{:(xsin((1)/(x))", if "xne0),(0" , if "x=0):} then at x=0 the function f is

Is the function defined by f(x)={{:(x+5," if "x le1),(x-5," if "x gt 1):} a continuous function?

Show that the function f given by f(x)= {{:(x^2+2," if "x ne 0),(1," if "x=0):} is not continuous at x=0.

If f : R rarr R is defined by f(x) ={(a^(2)cos^(2)+b^(2)sin^(2)x, x le 0),(e^(ax+b), x gt0):} is continuous function, then

For what value of k is the function defined by f(x)={{:(k(x^(2)+2)," if " x le0),(3x+1," if "x gt 0):} continuous at x= 0? Also write whether the function is continuous at x=1.

Examine that f(x) = sin |x| is a continuous function.

Examine the continuity of f, where f is defined by f(x)={{:(sin x+cos x," if "x ne 0),(1," if "x= 0):} .