`f(x)= {(|x-1|",",x ge 0),(-|x|",",x lt 0):}` Prove that f(x) is continuous for `x in R- {0}`.

A function is defined as f(x) = {{:(e^(x)",",x le 0),(|x-1|",",x gt 0):} , then f(x) is(a) continuous at x = 0 ,(b) continuous at x = 1 (c)differentiable at x = 0

Prove that f(x)= 2x-|x| is a continuous function at x= 0.

f(x)= {((x)/(|x|)",","if" x lt 0),(-1",","if" x ge 0):}

If f(x)= {(x",",x in {0, 1}),(1",",x ge 1):} then, ……

f(x)= {((|sin x|)/(x)",",x ne 0),(1",",x=0):} Examine the continuity of f(x), x= 0

f(x)= {((tan 2x)/(x)",",x ne 0),(K",",x=0):} If a function f is continuous at x=0 then find k.

f(x)= {((1- cos 4x)/(8x^(2))",",x ne 0),(k",",x= 0):} . If the function f(x) is continuous at x= 0, then find k.

f(x)= {(x+1",","if" x ge 1),(x^(2) + 1",","if " x lt 1):}