Denote by $\mathbb{F}_q$ the finite field with $q$ elements, and denote by $\bar{\mathbb{F}}_q$ its algebraic closure. Let $G$ be an affine algebraic group over $\bar{\mathbb{F}}_q$, and let $F$ be a Frobenius morphism of $G$ which defines a $\mathbb{F}_q$ structure on $G$.
It is known that each $F$-stable Borel subgroup of $G$ contains a $F$-stable maximal torus of $G$. However, is any $F$-stable maximal torus always contained in some $F$-stable Borel subgroup?
I think it's instructive to think about these problems on the level of $\mathbb{F}_q$ points; then you can see counterexamples even in the simplest cases.
For instance, if $G = GL_2$ defined over $\mathbb{F}_q$ and $B$ is an $F$-stable torus, then $B$ is conjugate (in $GL_2(\mathbb{F}_q)$) to the Borel subgroup of upper triangular matrices. Now consider the torus $T$ with $\mathbb{F}_q$ points
$$T(\mathbb{F}_q) = \bigg\{t = \begin{pmatrix} x & y \\ \alpha y & x\end{pmatrix}\bigg\}$$ where $\alpha\in \mathbb{F}_q$ is not a square. Then we can check that $T$ does not conjugate into $B$. For instance, if $y \neq 0$ then the characteristic polynomial of $t$ does not split in $\mathbb{F}_q$, whereas every element of $B(\mathbb{F}_q)$ has a characteristic polynomial that splits.
The answer is sort of maximally negative. For a (smooth) connected linear algebraic group $G$ over any field $k$ whatsoever, if $G$ admits a Borel $k$-subgroup (as happens for finite $k$) then all such $B$ constitute a single $G(k)$-conjugacy class and all maximal $k$-tori $T$ in any such $B$ map isomorphically onto the quotient $B/U$ by the unipotent radical (which is always "defined over $k$" in such $B$), whence there is only one $k$-isomorphism class of such $T$.
Pick a single such $B_0$ and a single maximal $k$-torus $T_0$ in such a $B_0$. There will generally be lots of maximal $k$-tori $T$ in $G$ that are not $k$-isomorphic to $T_0$ as $k$-groups (e.g., for split $G$ we can generally find lots of non-split $T$, such as usually happens for $G= {\rm{GL}}_n$ when $n > 1$, as in John Binder's example for $n=2$) provided that $k$ isn't too close to being separably closed. All such $T$ are then counterexamples.
