First, here is a derivation of the space-time equations of motion, in which acceleration is constant. Let time (distimement) = t, position = r, initial position = r(t₀) = r₀, velocity = v, initial velocity = v(t₀) = v₀, v = |v| = speed, and acceleration = a.

First equation of motion

v = ∫ a dt = v₀ + at

Second equation of motion

r = ∫ (v₀ + at) dt = r₀ + v₀t + ½at²

Third equation of motion

From v² = v ∙ v = (v₀ + at) ∙ (v₀ + at) = v₀² + 2t(a ∙ v₀) + a²t², and

(2a) ∙ (r ‒ r₀) = (2a) ∙ (v₀t + ½at²) = 2t(a ∙ v₀) + a²t² = v² ‒ v₀², it follows that

v² = v₀² + 2(a ∙ (r ‒ r₀)).

Next, here is a derivation of the time-space equations of motion, in which prestination is constant. Let position (displacement) = r, time = t, initial time = t(r₀) = t₀, celerity = u, initial celerity = u(r₀) = u₀, u = |u| = pace, and prestination = b.

First equation of motion

u = ∫ b dr = u₀ + bt

Second equation of motion

t = ∫ (u₀ + br) dr = t₀ + u₀r + ½br²

Third equation of motion

From u² = u ∙ u = (u₀ + br) ∙ (u₀ + br) = u₀² + 2r(b ∙ u₀) + b²r², and

(2b) ∙ (t ‒ t₀) = (2b) ∙ (u₀r + ½br²) = 2r(b ∙ u₀) + b²r² = u² ‒ u₀², it follows that

u² = u₀² + 2(b ∙ (t ‒ t₀)).

It is often said that Newton’s laws are laws of nature, which can only be determined by observation. That’s true in the sense that the definitions required are based on inductive reasoning. However, once these definitions are in hand, it should be a deductive science. This is classical science, in the sense of Euclid, Archimedes, Plato, and Aristotle.

Here is a derivation of Newton’s second law in space-time, with distance, s, time, t, and mass, m:

Velocity, v := ds/dt.

Acceleration, a := dv/dt.

Mass flow rate, ṁ := dm/dt.

Weighted distance, ș := ms.

Momentum, p := dș/dt = d(ms)/dt = (mds + sdm)/dt = m(ds/dt) + s(dm/dt) = mv + sṁ.

If mass is constant, then p = mv.

Force, F  := dp/dt = d(mv + sṁ)/dt = d(mv)/dt + d(sṁ)/dt = (mdv/dt + vdm/dt) + (sdṁ/dt + ṁds/dt) = ma + vṁ + sṃ + ṁv = ma + 2ṁv + sṃ, where ṃ = dṁ/dt.

If mass is constant, then F = ma.

Here is a derivation of Newton’s second law in time-space, with vass, n = 1/m:

Celerity, u := dt/ds.

Prestination, b := du/ds.

Vass flow rate, ṅ := dn/ds.

Weighted duration, ț := nt.

Celentum, q := dț/ds = d(nt)/ds = (ndt + tdn)/ds = n(dt/ds) + t(dn/ds) = nu + tṅ.

If vass is constant, then q = nu.

Elaphrence, Γ := dq/ds = d(nu + tṅ)/ds = d(nu)/ds + d(tṅ)/ds = (ndu/ds + udn/ds) + (tdṅ/ds + ṅdt/ds) = nb + uṅ + tṇ + ṅu = nb + 2ṅu + tṇ, where ṇ = dṅ/ds.

If vass is constant, then Γ = nb.

I’ve discussed before how there may be two different one-way speeds of light since they are matters of convention. See here and here. This post is concerned with the transformation between two observers in such a case. I continue to work with the standard configuration, see here.

The standard transformation of reference frames begins with two frames in uniform relative motion along one axis (usually called x). Here we take the spatial axis to be the r-axis, which parallels the spatial axis of motion. Similarly, the temporal axis is taken to be the t-axis, which parallels the temporal axis of motion.

The notation here is indifferent as to the existence of other dimensions. If they exist, they are orthogonal to the direction of motion, whether spatial or temporal, and their corresponding values are the same for both frames. One can generalize the results here to other directions by rotation.

The two frames are differentiated by primed and unprimed letters. They coincide at time t = 0 and their relative speed is v. The one-way speed of light is c₁ in one direction and c₂ in the opposite direction such that the round-trip speed equals c, the standard speed of light in a vacuum. That is, the harmonic mean of c₁ and c₂ equals c.

The trajectory of a reference particle or wave that travels at the speed of light follows these equations in both frames:

r =  c₁t or r/c₁ = t and r′ = c₂t′ or r′/c₂ = t′.

Consider a point event such as a flash of light that is observed from each reference frame. How are its coordinates in each frame related?

The basic relations are: r′ = r − tv = r (1 – v/c₁) and t′ = t (1 – v/c₁). Next a factor, γ, is included in the transformation equations:

r′ = γ (r − vt) = γr (1 – v/c₁), and

t′ = γt (1 – v/c₁),

with equal values for the other corresponding primed and unprimed coordinates. The inverse transformations use the other speed of light:

r = γ (r′ + vt′) = γr′ (1 + v/c₂), and

t = γt′ (1 + v/c₂).

Multiply each corresponding pair together to get:

rr′ = γ²rr′ (1 – v/c₁)(1 + v/c₂).

Dividing out rr′ yields:

1 = γ² (1 – v/c₁)(1 + v/c₂).

Solving for γ leads to:

γ = [(1 – v/c₁)(1 + v/c₂)]^–1/2, which applies if |v| < |c|.

This is the Lorentz transformation with two one-way speeds of light.

Previous posts on motion equations, for example here, showed a misleading parallelism. Although there is a formal parallelism as shown, it is more accurate to show the inverse equations. The parallel equations above and below have been revised accordingly.

This post follows on the previous post here, as well as other posts such as here.

The one-way speed of light is a convention (see John A. Winnie, Philosophy of Science, v. 37, 1970). The two-way (round-trip) speed of light is known to be c, but the one-way speed may vary between c/2 and infinity, as long as the two-way speed equals c. This means that those who say the light from a star took X light-years to reach the Earth are speaking of a convention rather than an actual duration.

A convention cannot be “cashed in” to become reality. For example, one cannot adopt a convention that some pebble is worth a million dollars, and take it to the bank and expect them to exchange it for a million dollars. According to their convention, it is worthless. If both follow the same convention, they can make the exchange, but even then it is based on a convention, not on an intrinsic reality.

Similarly, the time for starlight to reach the Earth cannot be cashed in for time on Earth. If the one-way speed of light equals c, then some galaxies appear to be billions of light-years away. But this time is the result of a convention, not an actual duration. This time cannot be cashed in to be an actual duration on Earth. Conventional years are not actual years.

It’s well-known that all motion is relative. That means what bodies are in motion are relative to a frame of reference, and there is no preferred frame of reference. Ironically, Galileo Galilei, who is credited with discovering the relativity of motion, is also known for claiming that the Earth moves around an immovable Sun rather than the converse. Whether the Earth or the Sun moves is a convention relative to a frame of reference, not a reality that all should recognize. Whichever convention is adopted cannot be cashed in for a state of rest or motion.

Conventional science is science with standard conventions. Unconventional science is science with non-standard conventions. Both are legitimate forms of science. Their conclusions should be the same, even though their conventions are different.