Let `f(x)=f_(1)(x)-2f_(2)(x),` where `f_(1)(x)={{:(min{x^(2),|x|}",",|x|le1),(max{x^(2),|x|}",",|x|gt1):}` `"and "f_(2)(x)={{:(min {x^(2),|x|}",",|x|gt1),(max{x^(2),|x|}",",|x|le1):}` `"and let "g(x)={{:(min{f(t),-3letlex,-3lexlt0}),(max{f(t),0letltx,0lexle3}):}` The graph of `y=g(x)` in its domain is broken at
A. 1 point
B. 2 points
C. 3 points
D. None of these