3. I) Total Energy of a System:
In classical mechanics and quantum mechanics, the Hamiltonian operator (H) represents the total energy of a system. For a particle or a wave, the total energy (E) is the sum of its kinetic energy (Eₖ) and potential energy (Eₚ).
II) Restoring Forces in Classical and Quantum Oscillations:
In classical mechanics, a linear oscillation vibrates with a single frequency; its movement is sinusoidal and regular. The harmonic oscillation encounters a restoring force (F) directly linked to the displacement (x) from its equilibrium position, where k represents a positive constant. In quantum mechanics, a harmonic oscillation is governed by a restoring force that varies proportionally to the displacement of the oscillation phase.
III) Hamiltonian Operator and Total Energy of a System:
The Hamiltonian equation conveys that the kinetic energy (Eₖ) and potential energy (Eₚ) of a wave is equal to the wave's total energy (E).
The expression, E = Eₖ + Eₚ.
This equation signifies that the total energy of a wave (E) is the sum of its kinetic energy (Eₖ) and potential energy (Eₚ). It is a fundamental principle in classical mechanics and quantum mechanics.
IV ) Relationships in Harmonic Oscillation Frequencies and Time Intervals:
The time interval (T) of a harmonic oscillation with frequency (f), the phase angle (θ) = 360 degree of the signal phase, or a complete cycle of the frequency of the harmonic oscillation. The relationship between the angular frequency (ω), time interval (T), and phase angle (θ) for a harmonic oscillation, ω = T/θ.
V) Frequency, Time, Energy, and Planck's Constant: Relationships:
The energy (E) of the the harmonic oscillation with frequency (f) can be represented by the Planck equation, E = hf, where h is Planck constant. The relationship between frequency (f), time interval (T), energy (E), and Planck's constant (h) can be expressed as:
f = 1/T = E/h. Therefore, T = h/E.
VII) The de Broglie relations:
The de Broglie relation conveys momentum ρ and the wavelength λ of the wave representation is given by Planck's constant. Expressed by the equation,
λ = h/ρ.
This equation denotes that the wavelength (λ) is inversely proportional to the momentum (ρ) of a wave, where h represents Planck's constant.
f = ρ/h.
This equation demonstrates that the frequency (f) is directly proportional to the momentum (ρ), with h being Planck's constant.
VIII) Conservation of Total Energy in a Point:
The overall energy (E) of a point remains constant, as expressed by the equation:
Eₜ = Eₖ + Eₚ.
Here:
Eₜ signifies the total energy possessed by the point.
Eₖ represents the kinetic energy associated with the point, usually connected to its motion or movement.
Eₚ denotes the potential energy linked to the point's position or configuration within a given system.
This equation, Eₜ = Eₖ + Eₚ, indicates that the summation of kinetic and potential energies remains steady over time for the considered point. Any alterations in either kinetic or potential energy are offset by opposite changes in the other form, ensuring that the total energy of the point, Eₜ, remains constant throughout its evolution.
IX) Conservation of Energy Analysis:
The differential analysis reveals that the increment in kinetic energy is equivalent to the decrement in potential energy:
ΔEₖ = - ΔEₚ
XI) Work-Energy Theorem and Differential Kinetic Energy:
As per the work-energy theorem, the relationship between force F and the differential distance Δx over which it acts produces a change in kinetic energy (ΔEₖ).
ΔEₖ = F ⋅ Δx → ΔEₖ = FΔx
X) Relationship between Force and Potential Energy Change:
This equation illustrates the connection between force (F) and the negative rate of change of potential energy (ΔEₚ) concerning displacement (Δx).
F = - (ΔEₚ/Δx)
XI) Relationship between Changes in Kinetic and Potential Energy with Respect to Position:
The expression (ΔEₖ / Δx) = -(ΔEₚ / Δx) signifies the inverse relationship between the rates of change of kinetic and potential energy concerning position.
The previous equation ΔEₖ = FΔx represents the relationship between the change in kinetic energy ΔEₖ and the force F acting over a displacement Δx. When this equation is rearranged, it shows that the rate of change of kinetic energy with respect to position (ΔEₖ / Δx) is equal to the negative rate of change of potential energy with respect to position (ΔEₚ / Δx).
XII) Point Existence and Oscillations:
A point lacks physical presence. It does not have dimensions and is not connected to any event, space, or time. In mathematics, a point is utilized to indicate an exact location or position within or outside a space; it does not possess any length, width, height, or shape. A point acts as the initial reference for depicting any figure or shape and is denoted by a dot.
When a wave within a point initiates a linear oscillation from its equilibrium state or balanced position, its movement disrupts the surrounding potential due to its specific linear motion.
An idea is presented where the total potential energy (∞E₀ₚ) is considered to be equal to the sum of potential energy (∆E₀ₚ) at each individual point within a theoretical 0ₜₕ-dimensional space. This space is conceptualized as a collection of points, each lacking measurable size or dimensions. It's a concept involving an infinite sum of potential energy changes happening at numerous tiny, indivisible points without spatial extent. The equation below attempts to explain how the sum of these extremely small potential energy changes across all these theoretical points within this dimensionless space could potentially result in an overall infinite potential energy. However, it's important to note that such a theoretical framework is deeply rooted in abstract concepts and might not have direct real-world physical implications or practical interpretations.
∞E₀ₚ = ∫ ΔE₀ₚ dx (integral over the domain representing points in a 0ₜₕ-dimensional space).
The equation ∞E₀ₚ = ∫ ΔE₀ₚ dx represents an abstract conceptualization involving potential energy (∞E₀ₚ) being equal to the integral (∫) of infinitesimal potential energy (ΔE₀ₚ) with respect to a differential element (dx), where the integral is taken over the domain representing points in a 0ₜₕ-dimensional space.
Such an oscillating point existence, in a 0ₜₕ-dimensional space with linear oscillation, signifies a noneventful energetic state devoid of time in the absence of changing events.
The transition from ∞E₀ₚ = ∫ ΔE₀ₚ dx to ∞E₀ₖ = 0 embodies a transformative process wherein infinite or significant potential energy (∞E₀ₚ) diminishes to a state of non-manifestation (E₀ₖ = 0). This transformation signifies the absence of energy manifestation, denoting a noneventful state within a linear space devoid of time. Additionally, it describes how this transformation indicates an absence of energy manifestation, leading to a noneventful state within a linear space without time, where events don't occur and time doesn't progress. This transformation of energy from positional to vibrational energy highlights the concept of a noneventful existence within a linear space devoid of temporal progression.
∞E₀ₖ = 0 symbolize the transformation or conversion of infinite or substantial potential energy (∞E₀ₚ) into a state where energy ceases to manifest (E₀ₖ = 0) due to the non-eventful existence or lack of progression within the context of linear space without time.
A sinusoidal oscillation transforms its potential energy (equilibrium position) into periodic energy. Such oscillations convert potential energy (ΔE₀ₚ) into vibrational energy (ΔE₀ₖ) within a periodic signal. This periodic signal possesses a specific frequency (f₀) and amplitude. This oscillation produces a periodic signal represented by a sinusoidal wave. Sinusoidal or harmonic oscillation is a type of oscillation that produces an output using a sine waveform.
An initiation of an energetic disruption or instability, represented by ΔE₀ₖ, at a specific location within an origin point. This disturbance leads the energetic point to commence oscillation, characterized by its linear motion that causes interference or disturbance in the surrounding potential.
∞E₀ₖ = ∫ ΔE₀ₖ dx to ∞E₀ₚ embodies a transformative process wherein infinite or significant potential energy (∞E₀ₚ = ∫ ΔE₀ₚ dx) diminishes to a state of manifestation (∞E₀ₖ = ∫ ΔE₀ₖ dx).
The equation ∞E₀ₖ = ∫ ΔE₀ₖ dx to ∞E₀ₚ portrays a transformative process where the manifestation of infinite or substantial potential energy (∞E₀ₚ) transitions or diminishes to a state of manifestation (∞E₀ₖ). This equation suggests a shift from a state of significant or boundless potential energy (∞E₀ₚ) to a state denoting a realized or manifested form of energy (∞E₀ₖ), representing the integration of changes in potential energy (∆E₀ₚ and ∆E₀ₖ) across a domain (dx).
XIII) Emergence of Existence and Dimensions in Events, Space, and Time:
A linear dimensional point, when vibrating within two-dimensional states, generates two-dimensional space upon entering two or three-dimensional spaces, thereby initiating events and the passage of time.
To be continued ...