In this article, we explore sequence spaces by introducing a newly defined norm. We construct the Orlicz sequence space and demonstrate that the norm in this space is equivalent to the norm in the ℓ^p space. As a result, the fundamental properties of the ℓ^p space are carried over to the Orlicz sequence space through the equivalence of norms. One significant implication of this result is that Hölder's inequality, which holds in ℓ^p spaces, can also be applied to the Orlicz sequence space with different positive constants.

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