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Let 
$\textsf{T}$ be a triangulated category with shift functor 
$\Sigma \colon \textsf{T} \to \textsf{T}$. Suppose 
$(\textsf{A},\textsf{B})$ is a co-t-structure with coheart 
$\textsf{S} = \Sigma \textsf{A} \cap \textsf{B}$ and extended coheart 
$\textsf{C} = \Sigma^2 \textsf{A} \cap \textsf{B} = \textsf{S}* \Sigma \textsf{S}$, which is an extriangulated category. We show that there is a bijection between co-t-structures 
$(\textsf{A}^{\prime},\textsf{B}^{\prime})$ in 
$\textsf{T}$ such that 
$\textsf{A} \subseteq \textsf{A}^{\prime} \subseteq \Sigma \textsf{A}$ and complete cotorsion pairs in the extended coheart 
$\textsf{C}$. In the case that 
$\textsf{T}$ is Hom-finite, 
$\textbf{k}$-linear and Krull–Schmidt, we show further that there is a bijection between complete cotorsion pairs in 
$\textsf{C}$ and functorially finite torsion classes in 
$\textsf{mod}\, \textsf{S}$.
