# Algebraic equation for $$Q(1,1)$$

The algebraic equation is $$P = \sum_{j=0}^{24}\sum_{i=0}^{92} c_{i,j}(A,B,C) x^i y^j \in \mathbb{F}_{45007}[A,B,C,x,y]$$ with $$c_{i,j} \in \mathbb{F}_{45007}[A,B,C]$$, such that $$P(a,b,c,t,Q(1,1;a,b,c;t)) = 0$$ for all values of $$a,b,c$$.

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