Given the [*Ramanujan theta function*][1],

$$f(a,b) = \sum_{n=-\infty}^\infty a^{n(n+1)/2} \; b^{n(n-1)/2}$$ 

Let $q = e^{2\pi i \tau}$ and assume $\tau = \sqrt{-d}.$ Then the following functions for levels $p=5, 7, 11, 13$ are radicals,

$$q^{11/60} \frac{f(-q,-q^4)}{f(-q)}$$
$$q^{61/168} \frac{f(-q,-q^6)}{f(-q^2)}$$
$$q^{223/264} \frac{f(-q,-q^{10})}{f(-q^4)}$$
$$q^{179/156} \frac{f(-q,-q^{12})}{f(-q^5)}$$

Without the $q$-factor, they are analogues of the [Rogers-Ramanujan identities][2] (the first being the namesake) which are sum-products,

$$\sum_{n=0}F_1(q) = \prod_{n=1}F_2(q)$$

Three of the integers involved, namely $60, 168, 156,$ are [orders of transitive groups][3] which in Magma notation are $5T4, 7T5, 13T6$. The one for $p=11$ is the odd one out since $264$ is not a group order. ***But***, we can use alternative quotients, such as the one for level $7$,

$$q^{17/42} \frac{f(-q,-q^6)}{\color{blue}{f(-q)}}$$

which is also a radical and $42$ is the order of $7T4$ (and the answer to the Hitchhiker's universe). It is not necessary that there be a sum-product associated with it.

**Question:** For level $p=11$, can we find an *alternative* quotient (both numerator and denominator) such that, together with the particular factor $q^{m/660},$ then it is also a radical? 

**P.S.** The desired integer $660$ is the order of $11T5$ so this would be another manifestation of [*V. Arnold's trinities*][4] regarding PSL(2,5), PSL(2,7), and PSL(2,11). I've tried various denominators $f(-q^n)$ but can't get $q^{m/660}$.

  [1]: https://en.wikipedia.org/wiki/Ramanujan_theta_function
  [2]: https://mathworld.wolfram.com/Rogers-RamanujanIdentities.html
  [3]: http://galoisdb.math.upb.de/groups
  [4]: https://en.wikipedia.org/wiki/ADE_classification#Trinities