91Ó°ÊÓ

The momentum and energy relation is given by

$E^2={\left(pc\right)}^2+{\left(m{c}^2\right)}^2$

This equation can be represented in the form of a triangle Fig 37-14 as shown below

It can also be shown that for this triangle

$\sin \mathrm{θ}=\mathrm{β}\&\cos \mathrm{θ}=\frac{1}{\mathrm{γ}}$

An object at rest has some energy called rest mass energy and is expressed as

$E_{rest}=m{c}^2$

In fig 37-20, the base of triangle represents rest mass energy. As rest mass energy is only dependent on mass with$c^2$term being constant. Therefore, the particle with greatest rest energy will have greatest mass, Particles 3,4, and 6 have same base length, therefore same rest energy. And particles 1, 2, and 5 have same mass.

$m_3=m_4=m_6>m_1=m_2=m_5$

The vertical length represents momentum magnitude $p$. The particle 1 has highest height therefore greatest momentum. The particle 2 and 3 has the same height therefore same momentum but less than the particle 1. Particle 5 and 6 have same height therefore same momentum

$p_1>p_2=p_3>p_4>p_5=p_6$

The result of 2^nd postulate of the special theory of relativity is that the clocks run slower for a moving object when measured from a rest frame. The factor by which the clock is running differently is called the Lorentz factor.

The expression for Lorentz factor is

$Y=\frac{1}{\sqrt{i-{\mathrm{β}}^2}}$

Here $\mathrm{β}$is the speed parameter $\raisebox{1ex}{$v$}\!\left/ \!\raisebox{-1ex}{$c$}\right.$.

We know that

$\begin{array}{l}\cos \mathrm{θ}=4\mathrm{γ}\\ \mathrm{γ}=\frac{1}{\cos \mathrm{θ}}\end{array}$

As $$" width="9" height="19" role="math">θincreases $\cos \mathrm{θ}$decreases and as a result $\mathrm{γ}$will increase. Hence greatest angle $\mathrm{θ}$will have greatest Lorentz factor. Therefore, the Lorentz factor ranking will be

${\mathrm{γ}}_1>{\mathrm{γ}}_2>{\mathrm{γ}}_3>{\mathrm{γ}}_4>{\mathrm{γ}}_5>{\mathrm{γ}}_6$

As for part (d), particle 2 and 4 have same length of slanted lines, therefore have same total energy.

For part (e), the particle 1, 2, and 5 have lowest mass as the base length is smaller than other three particles.