The Somos-5 sequence is defined by $a_{0} = a_{1} = a_{2} = a_{3} = a_{4} =1$ and $a_{m} = \frac{a_{m-1} a_{m-4} + a_{m-2} a_{m-3}}{a_{m-5}}$ for $m \geq5$. We relate the arithmetic of the Somos-5 sequence to the elliptic curve $E :y^{2} + xy = x^{3} + x^{2} - 2x$ and use properties of Galois representationsattached to $E$ to prove the density of primes $p$ dividing some term in theSomos-5 sequence is equal to $\frac{5087}{10752}$.
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