For an n-variable logic vector x {0,1}" and a {0,1}, xla=a is defined as x\=a = (x1, ..., &i1, 2, [i+1, ..., In). Consider f(x) and g(x) as n-variable logic functions, and let , +, e, and denote AND, OR, Exclusive OR, and NOT operators, respectively. Answer the following questions. , is defined as one = f(x\x:=0) f(x|2z=1), show that f(x) = (3) When a logic operator f(x!2:=0) ti vete For an n-variable logic vector x {0,1}" and a {0,1}, xla=a is defined as x\=a = (x1, ..., &i1, 2, [i+1, ..., In). Consider f(x) and g(x) as n-variable logic functions, and let , +, e, and denote AND, OR, Exclusive OR, and NOT operators, respectively. Answer the following questions. , is defined as one = f(x\x:=0) f(x|2z=1), show that f(x) = (3) When a logic operator f(x!2:=0) ti vete