Why is a symmetric traceless tensor zero when averaged over all directions?

Symmetry requirement is not necessary. Let us take an orthonormal basis $e_1,e_2,e_3$ and consider all the unit vectors $n in S^2$. $$int_{S^2} T(n,n) d n = sum_{i,j=1}^3T(e_i,e_j) int_{S^2} n^i n^j dn:.$$ $dn$ is the standard rotation-invariant measure on $S^2$ with total value $4pi$, i.e., referring to standard spherical coordinates $$dn = sin theta dtheta dphi:.$$ Now, for every choice of $i=1,2,3$ and $j=1,2,3$ with $ineq j$ there is a rotation $R$ such that $(Rn)^i=-n^i$ but $(Rn)^j = n^j$. Since $dn = dRn$ we immediately have that $$int_{S^2} n^i n^j dn= -int_{S^2} n^i n^j dn= 0 $$ if $ineq j$. Therefore begin{align} sum_{i,j=1}^3T(e_i,e_j) int_{S^2} n^i n^i dn & = sum_{i=1}^3T(e_i,e_i) int_{S^2} n^i n^i dn & = T(e_1,e_1)int_{S^2} (n^1)^2 dn + T(e_2,e_2)int_{S^2} (n^2)^2 dn & qquad quad + T(e_3,e_3)int_{S^2} (n^3)^2 dn:. end{align} To conclude, observe that rotational invariance (as above) $$int_{S^2} n^i n^i dn = d quad mbox{independently of $i=1,2,3$}$$ and thus $$4pi = int_{S^2} sum_{i=1}^3 (n^i)^2 dn = 3d$$ which implies $$d = frac{4pi}{3}:.$$ Inserting in the formula above begin{align} int_{S^2} T(n,n) d n & = sum_{i,j=1}^3T(e_i,e_j) int_{S^2} n^i n^j dn frac{4pi}{3} sum_{i=1}^3 T(e_i,e_i) & = frac{4pi}{3} mathrm{tr}(T):. end{align} In other words, averaging over all directions we obtain the trace up to the factor $1/3$: $$langle Trangle_{S^2} := frac{1}{4pi}int_{S^2} T(n,n) d n = frac{1}{3} mathrm{tr}(T):.$$ Your hypothesis also requires $mathrm{tr}(T)=0$ concluding the proof.

OK, another proof according to the Remark by Emilio that made clear the interpretation of the question. We have to average the tensor (as a bilinear map) in the space of the rotations. The only way to do it, as Emilio wrote, is to take an integral with respect to the normalized (left-invariant) Haar measure of $SO(3)$: $$langle Trangle_{SO(3)}(u,v) := int_{SO(3)} T(R^tu,R^tv) dR$$ Since $dB^tR = dR$ for every $Bin SO(3)$, $$langle Trangle_{SO(3)}(Bu,Bv) = int_{SO(3)} T(R^tBu,R^tBv) dR = int_{SO(3)} T((B^tR)^tu,(B^tR)^tv) dR $$ $$ = int_{SO(3)} T((B^tR)^tu,(B^tR)^tv) dB^{t}R = int_{SO(3)} T(R'^tu,R'^tv) dR' = langle Trangle_{SO(3)}(u,v):.$$ In matricial form, writing $R$ for $B$, $$u^tR langle Trangle_{SO(3)} R^tv = u^tlangle Trangle_{SO(3)}v:. $$ Since $u,v$ are arbitrary, $$R langle Trangle_{SO(3)} R^t = langle Trangle_{SO(3)}:. $$ That is $$R langle Trangle_{SO(3)}= langle Trangle_{SO(3)}R quad forall R in SO(3):.$$ Since the fundamental representation of $SO(3)$ is irreducible, Schur's lemma implies that, for some constant, $tin mathbb{R}$ $$ langle Trangle_{SO(3)} = tI:.$$ In particular, since every unit vector can be transformed to any other unit vector with a rotation, an orthonormal a basis is transformed into an orthonormal basis, and the trace does not depend on the basis, $$3t = sum_{i=1}^3langle Trangle_{SO(3)}(e_i,e_i)$$ $$ = trlangle Trangle_{SO(3)} = int_{SO(3)} sum_{i=1}^3T(R^te_i,R^te_i) dR = int_{SO(3)} tr(T) dR = tr(T):.$$ In summary $$ (langle Trangle_{SO(3)})_{ab} = frac{1}{3}tr(T)delta_{ab}:.$$

The author here maybe concentrate on how to construct a tensor by a vector, so the average over direction means the average over direction of vector,namely $$langle T_{ij}rangle=frac{1}{4pi}int T_{ij}dOmega $$ where $dOmega$ is the solid angle

The argument

a symmetric traceless tensor will yield zero when averaged over all directions

has some background on group theory -- the representation of SO(3) group. We could consider two vector $U,V$ and their tensor product $U_iV_j$ the problem is $U_iV_j$ could be divided into several part obeying different rules under rotation (that is to say, this is a reducible representation)

$$U_iV_j=frac{1}{3}Ucdot Vdelta_{ij}+frac{1}{2}(U_iV_j-U_jV_i)+(frac{U_iV_j-U_jV_i}{2}-frac{Ucdot V}{3}delta_{ij})$$

where the number of independent variable is $3times3=1+3+5$

the first part is a scalar-- it's invariant under rotation. The second part is $(Utimes V)_kepsilon_{ijk}$ which transform like vector. In fact, the tensor is divided into terms called spherical tensor. The last part ,not that simple, tranform as l=2 sphere harmonic function. From the orthogonality of nonequivalent irreducible representation you could find that the integral (interpreted as the inner product of the l=2 with l=0 component) is zero.

Spherical tensor will be useful if you want to discuss items concerning angular momentum ,though they seems do little thing with what you ask. You may refer to books like Modern Quantum Mechanics J.J Sakurai if you're interested in this topic.