Which of the following statements is correct about the given Turing Machine transitions below?
$\begin{array}{|c|c|c|c|} \hline \delta & 0 & 1 & B \\ \hline q0 & (q1,1,R) & (q1, 1,R) & \text{Halt} \\ \hline q1 & (q0, 0, R) & (q0, 1, R) & (qf, B, R) \\ \hline qf & \text{Halt} & \text{Halt} & \text{Halt} \\ \hline \end{array}$
Where,
$\lceil = \{0,1,B\}$
$Q = \{q0 ,q1 ,qf \}$
Final State, $F = \{qf \}$
Initial State $= q0 $
- TM does not halt on any string start with $‘1'$.
- TM halts on all strings of odd length and accepts it.
- TM does not halt on all strings in $\Sigma ^*$.
- TM halts on all strings of even length.
- I and II
- II and IV
- II and III
- I , II and III