the space-time coordinates of the s

the space-time coordinates of the same event. It should be linear because
if the motion is uniform in one of the involved reference frames it
should be uniform in all other inertial reference frames moving
uniformly relative to it. Besides that a transformation equation applied
to (5) should confirm the invariance of the physical quantities it equates.
Encouraged by Galileo’s transformation equations3
x = + x Vt ′ ′ (8)
x′ = −x Vt (9)
t t = ′ (10)
we guess that in Einstein’s special relativity theory, one of the
transformation equations should have the shape
x = + ax cbt ′ ′ (11)
where a and b represent factors which, due to the linear character of a
transformation equation, could depend on the relative velocity V but not on
the space-time coordinates of the involved events. In order to find them we
impose the condition that it should correctly relate the space-time
coordinates of events E(x=Vt,0,t) and E’(x’=0,0,t’) and of events
E’(x’=-Vt’,0,t’), E(0,0,t) we have defined deriving the formula which
accounts for the time dilation effect. In the case of the first pair of events
(11) works as