The motion equations for classical physics below are also in a pdf *here*. Circular/harmonic motion equations are in a pdf *here*.

| |||||

RA Gillmann, 2023-03-09 | Displacement + Time | Dischronment + Stance | Angle & Arc Length | Angle & Arc Duration | |

Stance / Distance
| Displacement: sTime | distime: | Dischronment: tStance | distance: | Angle length: θ = s/rArc length: | Angle duration: φ = t/qArc duration: | |

Radius | Period | Length radius
| Duration radius
| Angular velocity
= d | Wavenumber (angular lenticity)
= d | |

Velocity | Lenticity | Wavenumber | Cross/Tangential velocity
| Cross/Tangential lenticity
| |||

Acceleration | Relentation | Radial acceleration
r = rω^{2} = v/q = r/q² | Radial relentation
q = qκ^{2} = w/r = q/r² | Angular acceleration
| Angular relentation
| |

Tangential acceleration
| Tangential relentation
| ||||

| |||||

Wavelength | Period | λ = S = 2πr = 2πvq | T = 2πq = 2πwr | λ = S = 2π/κ = 1/h | T = 2π/ω = 1/f | |

Revolutions | Repetitions
| Revolutions N = | Repetitions Z = | Period frequency
| Length frequency (circuncy)
| |

Displacement | Dischronment | s = s_{0} + vt | t = t_{0} + wx | θ = θ_{0} + ωt | φ = φ_{0} + κs | |

First Equation of Motion | v = v_{0} + at | w = w_{0} + bs | ω = ω_{0} + αt | κ = κ_{0} + βs | |

Second Equation of Motion | s = s_{0} + v_{0}t + ½at² | t = t_{0} + w_{0}s + ½bs² | θ = θ_{0} + ω_{0}t + ½αt^{2} | φ = φ_{0} + κ_{0}t + ½βs^{2} | |

Third Equation of Motion | v² = v_{0}² + 2a∙(s – s_{0}) | w² = w_{0}² + 2b∙(t – t_{0}) | ω² = ω_{0}² + 2α∙(θ – θ_{0}) | κ² = κ_{0}² + 2β∙(φ – φ_{0}) | |

Inertia | Facilia | Mass – linear inertia: m = 1/n | Vass-linear facilia: n = 1/m | Angular inertia: I = mr^{2} | Angular facilia: J = nq^{2} | |

Momentum | Levamentum | Momentum: p = mv | Levamentum: q = nw | Angular momentum: L = Iω | Angular Levamentum: Γ = Jκ | |

Kinetic Energy and Lethargy | Kinetic energy: E_{K} = ½mv^{2} | Kinetic lethargy: L_{K} = ½nw^{2} | Angular energy E_{A} = ½Iω^{2} | Angular lethargy L_{A} = ½Jκ^{2} | |

Newton’s Second Law | Force: F = ma = dp/dt | Release: R = nb = dq/ds | Torque: τ = Iα = s × F | Strophence: σ = Jβ = t × R | |

Work | Repose | Linear work: W = F ∙ s | Linear repose: Y = R ∙ t | Angular work: W = τ ∙ θ | Angular repose: Y = σ ∙ φ | |

Power | Placidity | Linear power: P = F ∙ v | Linear placidity: Z = R ∙ w | Angular power: P = τ ∙ ω | Angular placidity: Z = σ ∙ κ |