Abstract
The so called modern physics is at present included in the curricula of high school. Therefore, we often organize in-depth lessons on quantum mechanics and on the special theory of relativity (SR). In the following sections, we want to show a lesson given by the first author of this paper. He proposes to students a proportion to deduce relativistic time dilation and length contraction without knowing the Lorentz transformations.
Keywords
Special relativity; speed of light; mean proportion
1. Introduction
Special and general relativity are currently part of the high school curricula in almost all countries [1[1] E. Benedetto and G. Iovane, Resonance 27, 673 (2022)., 2[2] E. Benedetto, M.D. Mauro, A. Feoli, A.L. Iannella and A. Naddeo, Physics Education 58, 015005 (2023)., 3[3] E. Benedetto and G. Iovane, Revista Brasileira de Ensino de Física 44, e20210421 (2022)., 4[4] I.M. Egdall, Physics Teacher 47, 522 (2009)., 5[5] I.M. Egdall, Physics Teacher 52, 406 (2014)., 6[6] E.S. Ginsberg, Physics Teacher 58, 373 (2020)., 7[7] D.V. Redžić, European Journal of Physics 29, 191 (2008)., 8[8] I. Russo, G. Iuele, G. Iovane and E. Benedetto, Physics Education 57, 023009 (2022)., 9[9] W.B. Stannard, Physics Education 53, 035013 (2018)., 10[10] A.M. Pendrill, P. Ekström, L. Hansson, P. Mars, L. Ouattara and U. Ryan, Physics Education 49, 425 (2014)., 11[11] A.M. Pendrill, Physics Education 52, 065002 (2017)., 12[12] Y. Lehavi and I. Galili, American Journal of Physics 77, 417 (2009)., 13[13] E. Benedetto, A. Feoli and A.L. Iannella, Revista Brasileira de Ensino de Física 44, e20210336 (2022).]. Teaching is a much more important branch of physics than one might think. Indeed, it may also happen that concepts of classical physics, well known to specialists, require further study from a didactic point of view due to the young age of the students [14[14] E. Benedetto, Afrika Matematika 28, 23 (2017)., 15[15] F. Munley, American Journal of Physics 72, 1478 (2004)., 16[16] D.V. Redžić, European Journal of Physics 28, (2007)., 17[17] L. Borgongino, S.R. Aliberti, F. Romeo and R.D. Luca, European Journal of Physics 43, 015802 (2022)., 18[18] R.D. Luca, American Journal of Physics 89, 21 (2021)., 19[19] P. Chudinov, V. Eltyshev and Y. Barykin, Revista Mexicana de Fisica E 19, 010201 (2022)., 20[20] H. Putranta, H. Kuswanto, M. Hajaroh, S.I.A. Dwiningrum and Rukiyati, Revista Mexicana de Fisica E 19, 010207 (2022)., 21[21] U. Umrotul, A.A.L. Jewaru, S. Kusairi and N.A. Pramono, Revista Mexicana de Fisica E 19, 010209 (2022)., 22[22] E. Puspitaningtyas, E.F.N. Putri, U. Umrotul and S. Sutopo, Revista Mexicana de Fisica E 18, 10 (2021)., 23[23] A. Feoli and E. Benedetto, Physics Education 56, 015002 (2021)., 24[24] G.M.O. Sharifov, Revista Mexicana de Fisica E 18, 90 (2021)., 25[25] E. Benedetto, I. Bochicchio, C. Corda, F. Feleppa and E. Laserra, European Journal of Physics 41, 045002 (2020)., 26[26] E.F. Putri and E. Purwaningsih, Revista Mexicana de Fisica E 18, 131 (2021)., 27[27] E. Benedetto, A. Briscione and G. Iovane, Revista Brasileira de Ensino de Física 43, e20200515 (2021)., 28[28] R. Yáñez-Valdez, P.A.Gómez Valdez and F.A. Rivero, Revista Mexicana de Fisica E 17, 156 (2020)., 29[29] A. Vidak, V. Dananić and V. Mešić, Revista Mexicana de Fisica E 17, 215 (2020).]. Generally during the last year of high school, students learn that SR is founded on the principle of relativity and on the fact that the speed of light is a fundamental constant of nature and it does not follow the Galilean law of addition. Therefore, the students learn that the Galilean transformations must be replaced. Since a rigorous derivation of the new relativistic transformations is not possible for their knowledge, generally the textbooks show, without proof, the final form of the so-called special Lorentz transformations
where (x, y, z, t) and (x′, y′, z′, t′) are the coordinates of an event in two frames, c is the speed of light and relative velocity v is confined to the x − x′ direction. Through relations (1) some relativistic effects such as the contraction of lengths and time dilation are deduced [30[30] J.S. Walker, Physics (Pearson Publishing, London, 2021), 5 ed., 31[31] R. Resnick, Introduction to special relativity (Wiley Publishing, New York, 1968).]. In the following sections, we want to deduce these relativistic predictions without using Lorentz transformations.
2. Mean Proportions
As pointed out in a previous work [8[8] I. Russo, G. Iuele, G. Iovane and E. Benedetto, Physics Education 57, 023009 (2022).], even simple newcomers to physics participate as speakers in the in-depth lessons. For example, we want to describe a lesson given by the first author of this paper who is a lawyer with a passion for science. He explains to students how to deduce length contraction and time dilation without using Lorentz transformations but with a new postulate that he hypothesized. Similarly to what we saw in [8[8] I. Russo, G. Iuele, G. Iovane and E. Benedetto, Physics Education 57, 023009 (2022).], we consider a train of length L and a ray of light that starts from the rear of the train arrives at the front and is reflected back to the starting point. The relative velocity between train and ground is v. Obviously, from a train point of view, the flight time is
Whereas Δt′ and L′ are the flight time and train length in the ground reference frame. They are still unknown and, reasoning in Newtonian terms, we expect that Δt′ = Δt and L′ = L. The author of the lecture, for reasons of symmetry and reasoning with classical physics, hypothesizes that the space gained in the direction of motion and the space lost in the opposite one must be in proportion to the length of the train. For this reason, he postulates: the double of the train length, from the point of view of an observer, is always mean proportional between the space that the light would travel in the direction of motion and that in the opposite direction during the flight time interval measured by the other observer’s clock. Mathematically speaking, we postulate
or
We already want to underline that, as we will see in the next section, this proportion is actually a consequence of the invariance of spacetime interval in Minkowsky chronotope. From (3) we get
Therefore
getting
From (2), we can finally write the following relation between the proper and improper time interval
Similarly, from the proportion (4) we deduce
getting
From (2) we can write
finally getting the length contraction
3. Physical Meaning of Proportions
The physical meaning of these proportions was given by Carmine Serio, an Italian physicist, and Antonio Rita an Italian mathematician [32[32] A. Rita, M.C. Rita, S. Rita and R. Arcieri, La meravigliosa matematica delle intelligenze artificiali (Booksprint, Romagnano al Monte, 2022).]. We start by the fundamental invariant of SR, that is, the space-time distance
Let us consider a clock in relative motion with respect to an inertial system (x′, y′, z′, t′) and a reference system (x, y, z, t) at rest with respect to the moving clock. In the latter frame the clock is at rest and we have
while in the former
Therefore
and it is possible to write
getting
From (18) we deduce the following well known relation
Now we can rewrite the relation (18) in the following manner
obtaining
and that is the proportion (3) in the following infinitesimal form
Thanks to (19), the previous relation can be written as
and that is the proportion (4) in the following infinitesimal form
From what we have seen, we can say that the proportions (3) and (4) are the mathematical expression of the invariance of the speed of light.
4. Conclusions
In this manuscript, starting from some in-depth lessons held at high schools, we present a lesson proposed by the first author of this paper. The showed proportions admit a simple interpretation in Newtonian three-dimensional space. We do not claim that this approach can replace the common deductions explained in the introductory texts using bouncing light clocks and relative velocity symmetry but, perhaps due to its simplicity, it aroused a strong interest and a great participation of the students. A demanding of symmetry in Newtonian framework, allowed to deduce relativistic deformations without resorting to more elaborate concepts such as four-dimensional space-time and the relative metrics induced by the invariance of the speed of light.
Acknowledgments
The authors wish to thank Prof Carmine Serio and Prof Maurizio Gasperini for comments, discussions and suggestions. Furthermore, they wish to thank the anonymous referees for improving the original version of the paper.
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[1]E. Benedetto and G. Iovane, Resonance 27, 673 (2022).
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[2]E. Benedetto, M.D. Mauro, A. Feoli, A.L. Iannella and A. Naddeo, Physics Education 58, 015005 (2023).
-
[3]E. Benedetto and G. Iovane, Revista Brasileira de Ensino de Física 44, e20210421 (2022).
-
[4]I.M. Egdall, Physics Teacher 47, 522 (2009).
-
[5]I.M. Egdall, Physics Teacher 52, 406 (2014).
-
[6]E.S. Ginsberg, Physics Teacher 58, 373 (2020).
-
[7]D.V. Redžić, European Journal of Physics 29, 191 (2008).
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[8]I. Russo, G. Iuele, G. Iovane and E. Benedetto, Physics Education 57, 023009 (2022).
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[9]W.B. Stannard, Physics Education 53, 035013 (2018).
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[10]A.M. Pendrill, P. Ekström, L. Hansson, P. Mars, L. Ouattara and U. Ryan, Physics Education 49, 425 (2014).
-
[11]A.M. Pendrill, Physics Education 52, 065002 (2017).
-
[12]Y. Lehavi and I. Galili, American Journal of Physics 77, 417 (2009).
-
[13]E. Benedetto, A. Feoli and A.L. Iannella, Revista Brasileira de Ensino de Física 44, e20210336 (2022).
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[14]E. Benedetto, Afrika Matematika 28, 23 (2017).
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[15]F. Munley, American Journal of Physics 72, 1478 (2004).
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[16]D.V. Redžić, European Journal of Physics 28, (2007).
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[17]L. Borgongino, S.R. Aliberti, F. Romeo and R.D. Luca, European Journal of Physics 43, 015802 (2022).
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[18]R.D. Luca, American Journal of Physics 89, 21 (2021).
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[19]P. Chudinov, V. Eltyshev and Y. Barykin, Revista Mexicana de Fisica E 19, 010201 (2022).
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[20]H. Putranta, H. Kuswanto, M. Hajaroh, S.I.A. Dwiningrum and Rukiyati, Revista Mexicana de Fisica E 19, 010207 (2022).
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[21]U. Umrotul, A.A.L. Jewaru, S. Kusairi and N.A. Pramono, Revista Mexicana de Fisica E 19, 010209 (2022).
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[22]E. Puspitaningtyas, E.F.N. Putri, U. Umrotul and S. Sutopo, Revista Mexicana de Fisica E 18, 10 (2021).
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[23]A. Feoli and E. Benedetto, Physics Education 56, 015002 (2021).
-
[24]G.M.O. Sharifov, Revista Mexicana de Fisica E 18, 90 (2021).
-
[25]E. Benedetto, I. Bochicchio, C. Corda, F. Feleppa and E. Laserra, European Journal of Physics 41, 045002 (2020).
-
[26]E.F. Putri and E. Purwaningsih, Revista Mexicana de Fisica E 18, 131 (2021).
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[27]E. Benedetto, A. Briscione and G. Iovane, Revista Brasileira de Ensino de Física 43, e20200515 (2021).
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[28]R. Yáñez-Valdez, P.A.Gómez Valdez and F.A. Rivero, Revista Mexicana de Fisica E 17, 156 (2020).
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[29]A. Vidak, V. Dananić and V. Mešić, Revista Mexicana de Fisica E 17, 215 (2020).
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[30]J.S. Walker, Physics (Pearson Publishing, London, 2021), 5 ed.
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[31]R. Resnick, Introduction to special relativity (Wiley Publishing, New York, 1968).
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[32]A. Rita, M.C. Rita, S. Rita and R. Arcieri, La meravigliosa matematica delle intelligenze artificiali (Booksprint, Romagnano al Monte, 2022).
Publication Dates
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Publication in this collection
27 Nov 2023 -
Date of issue
2023
History
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Received
28 July 2023 -
Reviewed
10 Sept 2023 -
Accepted
06 Oct 2023