I am surprised that this old question was not fully answered yet.
The answer is "No" and it is well known in some circles.
In fact, a far more general statement holds:
1) Let $R$ and $S$ be rings (commutative with 1). Then any group homomorphism $\text{SL}_3(R)\to\text{SL}_2(S)$ has a nilpotent image.
Note that $\text{SL}_3(R)$ contains $\text{SL}_3(\mathbb{Z})$ which is perfect, thus has no nilpotent (or solvable) quotients.
This shows why (1) answers the asked question. I will use this fact more then once.
Recall that $\mathrm{EL}_3(R)<\text{SL}_3(R)$ (which denotes the subgroup generated by elementary matrices) is normal with a nilpotent cokernel
(thank you, Andrei Smolensky, for correcting a mistake I made here earlier). Thus, to prove statement (1) it is enough to show that $\mathrm{EL}_3(R)$ is in the kernel of any homomorphism as above. Observe (by playing with commutation relations of elementary matrices) that the normal closure of the image of $\mathrm{EL}_3(\mathbb{Z})\to \mathrm{EL}_3(R)$ (induced by the map $\mathbb{Z}\to R$) is $\mathrm{EL}_3(R)$. Finally recall that $\mathrm{EL}_3(\mathbb{Z})\simeq \text{SL}_3(\mathbb{Z})$. Thus it is enough for us to prove the following statement:
2) Let $S$ be a ring (commutative with 1). Then any group homomorphism $\text{SL}_3(\mathbb{Z})\to\text{SL}_2(S)$ is trivial.
Note that (2) is equivalent to (1) by the fact that $\text{SL}_3(\mathbb{Z})$ is perfect.
We now fix a homomorphism as in statement (2) and assume its image is non-trivial. It is standard that there is a maximal ideal $m\lhd S$ and an integer $k$ such that the image of $\text{SL}_3(\mathbb{Z})\to\text{SL}_2(S/m^k)$ is already non-trivial. Note that the the kernel of $\text{SL}_2(S/m^k)\to\text{SL}_2(S/m)$ is nilpotent and that $\text{SL}_3(\mathbb{Z})$ has no non-trivial nilpotent quotients. It follows that $\text{SL}_3(\mathbb{Z})\to\text{SL}_2(S/m)$ is non-trivial. We are left to prove the following statement:
3) Let $k$ be a field. Then any group homomorphism $\text{SL}_3(\mathbb{Z})\to\text{SL}_2(k)$ is trivial.
Now there are many ways to proceed, and mine is not better than yours (please let me know your quick proof in a comment), but let me shoot with all the guns. There is a beatiful argument of Tits which I want to use.
Since $\text{SL}_3(\mathbb{Z})$ is finitely generated, the matrix elements of its image generate a finitely generated domain in $k$, and this one could be embedded in a local field. Moreover, if the image of $\text{SL}_3(\mathbb{Z})$ in $\text{SL}_2(k)$ is infinite, this new embedding could be chosen such that the image of $\text{SL}_3(\mathbb{Z})$ is actually unbounded. Thus we get the following:
4) In (3) we can take $k$ to be a local field and assume that the image of the homomorphism is either unbounded or finite.
If the image of the homomorphism is unbounded we get a contradiction to Margulis' super-rigidity. So we may assume that the image is finite. In case $\text{char}(k)=0$ we may replace it with $\mathbb{C}$, thus assume that the image is in $\mathrm{SU}(2)$, which has no non-abelain nilpotent group, unlike any image of $\text{SL}_3(\mathbb{Z})$, and get a contradiction. So we get $k=\mathbb{F}_q((t))$ for some prime power $q$. The finite image of $\text{SL}_3(\mathbb{Z})$ is contained (up to conjugation) in the maximal compact $\text{SL}_2(\mathbb{F}_q[[t]])$.
Arguing as we did after statement (2), with $S=\mathbb{F}_q[[t]]$ and $m=(t)$,
we get:
5) In (3) we may assume $k$ is finite.
We now compose with the obvious map $\text{SL}_2(k)\to \text{PSL}_2(k)$.
We should be a bit careful: recall the isomorphism $\text{SL}_3(\mathbb{F}_2)\simeq \text{PSL}_2(\mathbb{F}_7)$.
(5) will follow from:
6) The only non-trivial homomorphism $\text{SL}_3(\mathbb{Z})\to \text{PSL}_2(\mathbb{F}_q)$ is for $q=7$.
Dickson classified all maximal subgroups of $\text{PSL}_2(\mathbb{F}_q)$
and all groups in the list which are non-solvable are of the form $\text{PSL}_2(\mathbb{F}_{q'})$ or $\text{PGL}_2(\mathbb{F}_{q'})$ for some prime power $q'<q$. By the fact that $\text{SL}_3(\mathbb{Z})$ is perfect we deduce that if its image is contained in $\text{PGL}_2(\mathbb{F}_{q'})$ then it is contained in its subgroup $\text{PSL}_2(\mathbb{F}_{q'})$. It follows that:
7) in (6) we can assume the homomorphism is onto.
Consider the image of the Heisenberg group. Since every non-abelian nilpotent subgroup of $\text{PSL}_2(\mathbb{F}_q)$ has an abelinization of order $2$, we conclude that the image of the elementary matrices of $\text{SL}_3(\mathbb{Z})$ are of order $2$. Therefore the homomorphism factors via a surjection $\text{SL}_3(\mathbb{F}_2)\to\text{PSL}_2(\mathbb{F}_q)$.
The result follows by counting.