This narrative descriptions provide a complementary explanation that expands on the mathematical presentation, illustrating the concepts of points, oscillations, dimensions, and their interactions in a more elaborative manner.
A point in mathematics represents an exact location in space without physical existence, dimensions, or time. It lacks length, width, height, or shape and is usually named using an uppercase letter. An energetic point oscillates from its equilibrium state, creating a non-eventual existence in linear space without time and converting its positional energy into vibrational energy. This concept of existence through oscillations involves an energetic point oscillating from its equilibrium state, generating vibrational energy, and resulting in an infinitesimal existence without adherence to time.
The conceptual framework of existential formation posits that the temporal dimension is consistently above spatial dimensions, originating from the energetic point's oscillation. Interlaced oscillations synchronize between preceding and forming dimensions during transitions, maintaining continuity. Spatial dimensions are formed through progressive oscillation, occupying the space of the higher temporal dimension. As the progression continues, linear temporal dimension (Dₜ) remains fixed in the fourth dimension (D₄), while planar dimensions continue to form up to dimension Dₙ and beyond.
Progressive oscillations are energetic oscillations where linear oscillations are formed sequentially in each dimension, with Planar Dimension D₂ being the time dimension above Linear Dimensions D₁. Interlaced oscillations form another dimension (D₃), while all dimensions (Dₙ) are formed simultaneously. Continuous interlaced oscillations result from progressive oscillations, forming another dimension (D₅), while all dimensions (Dₙ) are formed simultaneously. The process of continuous interlaced oscillations forms nₜₕ dimensions (Dₙ), where Linear Dimensions Dₜ represent abstract time dimension (Temporal) below Planar Dimension Dₙ.