An Identity Motivated by an Amazing Identity of Ramanujan
Abstract: Ramanujan stated an identity to the effect that if three sequences ${a_n}$, ${b_n}$ and ${c_n}$ are defined by $r_1(x)=:\sum_{n=0}{\infty}a_nxn$, $r_2(x)=:\sum_{n=0}{\infty}b_nxn$ and $r_3(x)=:\sum_{n=0}{\infty}c_nxn$ (here each $r_i(x)$ is a certain rational function in $x$), then [ a_n3+b_n3-c_n3=(-1)n, \hspace{25pt} \forall \,n \geq 0. ] Motivated by this amazing identity, we state and prove a more general identity involving eleven sequences, the new identity being "more general" in the sense that equality holds not just for the power 3 (as in Ramanujan's identity), but for each power $j$, $1\leq j \leq 5$.
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