| I +, 1 <0 If f (x) = 0, r = 0 || -1, r> 0 For what value (or values) of a does limf (x) exist?

If f(x)={(|x|+1,x 0):} For what value (s) of a does lim_(x rarr a)f(x) exists?

If f(x)= {(absx + 1 , x lt 0),(0 , x = 0),(absx - 1 , x gt 0) :} , for what value(s) of a does lim_(x rarr 0) f(x) exist ?

If f(x)={{:(|x|+1","xlt0),(0","x=0),(|x|-1","xgt0):} For what value (s) of a does lim_(xtoa)f(x) exist?

Let f(x)= {(|x|+1,",", x 0.):} For what value(s) of ‘a’ does lim_(x rarr a) f(x) exist ?

If f(x)={{:(|x|+1",",xlt0),(0",",x=0),(|x|-1",",xgt0):} For what value(s) of a does lim_(xrarra)f(x) exists?

If f(x)={{:(|x|+1,xlt0),(0,x=0) ,(|x|-1,xgt0):} for what value (s) of a does lim_(xrarra) f(x) exists?

If f(x)={{:(|x|+1",",xlt0),(0",",x=0),(|x|-1",",xgt0):} For what value(s) of a does lim_(xrarra)f(x) exists?

If f(x)={{:(|x|+1",",xlt0),(0",",x=0),(|x|-1",",xgt0):} For what value(s) of a does lim_(xrarra)f(x) exists?

If f(x)={{:(|x|+1,xlt0),(0,x=0) ,(|x|-1,xgt0):} for what value (s) of a does lim_(xrarra) f(x) exists?