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.

[1] Kalita, H., and Hazarika, B. Theory of Henstock-Orlicz Spaces. Springer Monograph, 2025. doi:10.1007/978-981-96-9548-5.

[2] Batkunde, H., and Rumlawang, F. Y. "Norma pada ruang bernorma-n berdimensi tertentu." Equator: Journal of Mathematical and Statistical Sciences, 2(1), 2023, pp. 27–35. doi:10.26418/ejmss.v2i1.64814.

[3] Alsina, C., Sikorska, J., and Thomas, M. S. Norm Derivatives Characterizations of Inner Product Spaces. Singapore: World Scientific, 2010.

[4] Bişgin, M. C. "The binomial sequence spaces which include the spaces ℓ^p and ℓ^∞ and geometric properties." Journal of Inequalities and Applications, 2016, Article 304. doi:10.1186/s13660-016-1252-4.

[5] Akbarbaglu, I., and Maghsoudi, S. "A note on the convolution in Orlicz spaces." Mathematical Inequalities and Applications, 26(3), 2023, pp. 645–653. doi:10.7153/mia-2023-26-39.

[6] Hazmy, S. A., Masta, A. A., and Idris, M. "First type s-Orlicz space: completeness, inclusion, and s-Hölder inequality." The Journal of Analysis, article in press, 2026. doi:10.1007/s41478-026-01047-3.

[7] Kreyszig, E. Introductory Functional Analysis with Applications. New York: Wiley, 1989.

[8] Khusnussaadah, N., and Supama, S. "Completeness of sequence spaces generated by an Orlicz function." EKSAKTA: Journal of Sciences and Data Analysis, 19(1), 2019, pp. 1–14. doi:10.20885/eksakta.vol19.iss1.art1.

[9] Prayoga, P. S., Masta, A. A., and Fatimah, S. "Sifat inklusi dan perumuman ketaksamaan Hölder pada ruang barisan Orlicz." Eureka Matika, 8(2), 2020, pp. 184–199. doi:10.17509/jem.v8i2.30740.

[10] Kolmogorov, A. N., and Fomin, S. V. Introductory Real Analysis. See Chapter 8: Examples of Metric and Normed Spaces. New York: Dover Publications, 1975.

[11] Lax, P. D. Functional Analysis. See Chapter 3: Sequence Spaces. New York: Wiley-Interscience, 2002.

[12] Rudin, W. Principles of Mathematical Analysis. 3rd ed. See Chapter 6, especially the exercises. New York: McGraw-Hill, 1976.

[13] Konca, S., Idris, M., and Gunawan, H. "p-summable sequence spaces with inner products." Beu J. Sci. Techn., 5(1), 2015, pp. 37–41. doi:10.17678/beujst.06700.

[14] Debbarma, D., and Tripathy, B. C. "Relative Uniform Convergence of Quantum Difference Sequence of Functions Related to ℓ^p-Space Defined by Orlicz Function." Annales Mathematicae Silesianae, 39(2), 2025, pp. 48–68. doi:10.2478/amsil-2024-0026.

[15] Hazmy, S. A., and Masta, A. A. "Geometric Interpretation and Some Analytical Properties of First Type S-Convex Function." Bol. Soc. Paran. Mat., 43(2), 2025, pp. 1–13. doi:10.5269/bspm.77015.

[16] Cui, Y., Wang, X., and Niu, Y. "Locally Nearly Uniformly Convex Points in Orlicz Spaces Equipped with the Luxemburg Norm." Axioms, 15, Article 74, 2026. doi:10.3390/axioms15010074.