A. I wonder if every generator of $Z({\rm Spin}_n^{\epsilon}(q))$ is a square element in ${\rm Spin}_n^{\epsilon}(q)$?

B. When $Z(\Omega_{2m}^{\epsilon}(q))\cong C_2$, is the unique element of order two of $Z(\Omega_{2m}^{\epsilon}(q))$ a square element in $\Omega_{2m}^{\epsilon}(q)$?

Notes. 

1. Here the ground field is a finite field $F_q$ with $q$ a power of some prime $p$.

2. We always set $n=2m\geq 6$ and $q^m\equiv \epsilon~({\rm mod}~4)$.

Some quoted results:

If $n=2m$ and $q^m\equiv \epsilon~({\rm mod}~4)$, then $\Omega_n^\epsilon(q)$ has a centre of order 2, and the spin group has the structure $4.{\rm P\Omega}_n^\epsilon (q)$ if $m$ is odd, and the structure $2^2.{\rm P\Omega}_n^\epsilon (q)$ (necessarily with $\epsilon=+$) if $m$ is even.

If $m\geq 3$, then $P\Omega^{\epsilon}(2m,q)$ is a finite simple group.

$P\Omega_6^+(q)=PSL_4(q)$. 

$P\Omega_6^-(q)=PSU_4(q)$.

$z_0$ generates the center of $tw_{n+1}(T)$. $\omega_{n-2}(T)$ is a Sylow 2-subgroup of $\Omega^{\epsilon}(2^n,q)$. Further $\omega_{n-2}(T)/Z$, where $Z=\langle z_0\rangle$, is a Sylow 2-subgroup of $P\Omega^\epsilon(2^n,q)$.

Analysis:

1. $\pi: \Omega_6^-(3)\rightarrow P\Omega_6^-(3)$.

If $x^2=-1$, then $f(x)$ is an element of order 2, however $o(x)=4$, a contradiction by Richard Lyons's notes below.

2. Let $S$ be a Sylow $2$-subgroup of ${\rm GO}_{2m}^{+}(q)$, we have $S\cong D_4\times (D_4\wr C_2)$, when $m=3$, $q=5$.

Therefore $Z(S)\cong C_2\times C_2$. Hence there is an element $a\in S$ such that $a^2=-1$ by the structure of $D_4$, Now however is $a\in \Omega_6^+(5)$?

The following websites may be useful to my question.

https://mathoverflow.net/questions/140568/double-covers-of-the-orthogonal-groups#

http://brauer.maths.qmul.ac.uk/Atlas/v3/

https://mathoverflow.net/questions/191412/about-the-number-of-their-conjugacy-classes-in-some-classes-of-finite-simple-gro/191430#191430