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General Mathematics |
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Authors: Marciano Laoang Legarde
the Natural Laws of Compressed Euler Wave Equations, it describes how trigonometric functions behave when their inputs are transformed exponentially. It explores how sine, cosine, secant, cosecant, tangent, and cotangent waves undergo extreme compression along the positive x-axis, leading to predictable patterns in their peak values, oscillations, and asymptotic behavior. The paper establishes three fundamental laws governing these transformations, revealing deeper insights into wave behavior under exponential scaling.
Comments: 9 Pages. (Note by viXra Admin: Please cite and list scientific references)
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[v1] 2025-03-04 21:43:31
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