1000 Solved Problems in Modern Physics

(Grace) #1

352 6 Special Theory of Relativity


6.78

1

2

(M^2 −m 12 −m 22 )=E 1 E 2 −p 1 p 2 cosθ
θ= 900
P±=530 MeV/c
E±=(P±^2 +mπ^2 )^1 /^2 = 548
2 × 5482 + 2 × 1402 =M^2
M=800 MeV/c
It is aρmeson.

Fig. 6.10


6.79 Using the invariance of squared four-momentum before and after the decay


Ei^2 −Pi^2 =Ef^2 −|pf|^2
M^2 =(E 1 +E 2 )^2 −(p 12 +p 22 + 2 p 1 p 2 cosθ)
=(E 12 −p 12 )+(E 22 −p 22 )+2(E 1 E 2 −p 1 p 2 cosθ)
=m 12 +m 22 +2(E 1 E 2 −p 1 p 2 cosθ)

OrE 1 E 2 −p 1 p 2 cosθ=

1

2

(M^2 −m 12 −m 22 )=Invariant

6.80s+t+u=(1/c


(^2) )[(P
A+PB)
(^2) +(P
A−PC)
(^2) +(P
A−PD)
(^2) ]
=(1/c^2 )[3PA^2 +PB^2 +PC^2 +PD^2 + 2 PA(PB−PC−PD)] (1)
From four-momentum conservation,PA+PB=PC+PD (2)
(1) becomes (s+t+u)c^2 =(3mA^2 +mB^2 +mC^2 +mD^2 )− 2 PA^2
UsingPA=mAc,PB=mBc,PC=mCcandPD=mDc
(s+t+u)c^2 =(mA^2 +mB^2 +mC^2 +mD^2 )c^2
Ors+t+u=



i=A,B,C,Dm

2
i

6.81t=(PA−PC)


(^2) /c (^2) =(1/c (^2) )(P
A
(^2) +P
C
(^2) − 2 P
APC)
=(1/c^2 )[mA^2 c^2 +mC^2 c^2 −2(EAEC/c^2 −PA.PC)]
For elastic scatteringA≡C. ThusEA=ECand|PA|=|PC|=p
So thatPA.PC=p^2 cosθ.
c^2 t= 2 mA^2 c^2 −2(EA^2 /c^2 −p^2 cosθ)
ButEA^2 =c^2 p^2 +mA^2 c^4
Therefore,t=− 2 p^2 (1−cosθ)/c^2
6.82 sinφ/ 2 =mπc^2 /2(E 1 E 2 )^1 /^2 (see Prob. 6.103 and 6.104)
Minimum angle isφmin= 2 /γ

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