Geometric and arithmetic means and contraction factor

  • Context: High School 
  • Thread starter Thread starter south
  • Start date Start date
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
6 replies · 1K views
south
Messages
91
Reaction score
20
TL;DR
Geometric and arithmetic means and contraction factor
Is it correct to state that the relativistic contraction factor is the ratio of the geometric mean to the arithmetic mean of the terms ##C+v## and ##C-v##?
 
Physics news on Phys.org
Ibix said:
Why do you think so?
I think the following:
Although mathematically it coincides, interpreting the contraction factor as the quotient of two means may not fit the physical nature of the phenomenon.
 
south said:
I think the following:
Although mathematically it coincides, interpreting the contraction factor as the quotient of two means may not fit the physical nature of the phenomenon.
There's nothing wrong with stating it. If you end up doing algebra in SR knowing identities for ##\gamma## is often helpful. I don't see that it adds any physical insight though. More useful to know that ##\gamma =\cosh\psi##, where ##\psi## is the rapidity.
 
Ibix said:
There's nothing wrong with stating it. If you end up doing algebra in SR knowing identities for ##\gamma## is often helpful. I don't see that it adds any physical insight though. More useful to know that ##\gamma =\cosh\psi##, where ##\psi## is the rapidity.
I don't find any correlation with the physical situation in that statement about the means. It seems like an empty mathematical game to me.