Let `f(x) = ((1 - x(1+ |1-x | )) /(|1-x|)) cos(1/(1-x))` for `x!=1`

Let f(x)=((1-x(1+|1-x|))/(|1-x|))cos((1)/(1-x)) for x!=1

Let f(x)=(1-x(1+|1-x|))/(|1-x|)cos(1/(1-x)) for x!=1. Then: (A)(lim)_(n->1^-)f(x) does not exist (B)(lim)_(n->1^+)f(x) does not exist (C)(lim)_(n->1^-)f(x)=0 (D)(lim)_(n->1^+)f(x)=0

let ( f(x) = 1-|x| , |x| 1 ) g(x)=f(x+1)+f(x-1)

Let f(x)=sin^(-1)((1)/(|x^(2)-1|))+cos^(-1)((1-2|x|)/(3))

Let f(x)=x((1)/(x-1)+(1)/(x)+(1)/(x+1)),x>1

Let f(x)= {{:((x)/(1+|x|)",", |x| ge1), ((x)/(1-|x|)",", |x| lt 1):}, then domain of f'(x) is:

let f(x)=(cos^(-1)(1-{x})sin^(-1)(1-{x}))/(sqrt(2{x}(1-{x}))) where {x} denotes the fractional part of x then

Let f(x)=(x)/(x+3) , then (1)/(f(x+1))-f((1)/(x+1))=?

Let f(x) =cos ^(-1) (3x-1). Then , dom (f )=?