More about collisions

1. Maximum angle of deflection

In a collision perfectly elastica, a moving particle of mass M collides with a stationary particle of mass m < M.

We are interested to determine the maximum possible angle θ through which the incident particle can be deflected.



Let's call the velocity of the moving particle v before the collision and w after the collision; call the velocity of the originally stationary particle u after the collision.

We seek the maximum angle of deflection is the angle between v and w.

According to:
The conservation of momentum:
Mv = Mw + mu    (1)
The conservation of kinetic energy:
(1/2)Mv² = (1/2)Mw² + (1/2)mu²   (2)


The equation (1) gives :
u = M(v - w)/m
The equation (2) becomes then:
Mv² = Mw² + m[M(v - w)/m]²
mM(v² - w²) = M²(v² - 2 v.w + w²)
2 v.w = w² + v² - (m/M)(v² - w²)
2 M v.w = (M + m)w² + (M - m)v²
cos θ = [(M + m)w² + (M - m)v²] /(2Mvw) =
(M + m)w/2Mv + (M - m)v/2Mw     (3)

Differentiating with respect to w, and solve for zero gives:
0 = (M + m)/2Mv - (M - m)v/2Mw²
Therefore:
w = v [(M - m)/(M + m)]^1/2

Substituting this to the equation of cosθ yields:
cos θ = (M + m)w/2Mv + (M - m)v/2Mw =
(1/2M)[(M + m)w/v + (M - m)v/w] =
(1/2M)[(M + m)[(M - m)/(M + m)]^1/2 + (M - m)[(M + m)/(M - m)]^1/2] =
(1/2M)[(M + m)^1/2(M - m) + (M - m)^1/2(M + m)] =
[(1 + m/M)(1 - m/M)] ^1/2

Therefore:
cos θ = [(1 + m/M)(1 - m/M)] ^1/2

Hence:
sin²θ = 1 - cos²θ = 1 - [(1 + m/M)(1 - m/M)] = (m/M)²

Therefore:
sinθ = (m/M)

The maximum angle of deflection θ is:
θ = sin^-1(m/M)

2. Head-on collision

Let's rewrite the formula (3):
cos θ = (M + m)w/2Mv + (M - m)v/2Mw

Calling (M + m)/2M = S, and (M - m)/2M = D, we have:
cos θ = S w/v + Dv/w
vw cos θ = Sw² + Dv²

We obtain the following quadratic equation:
Sw² - (v cosθ)w + Dv² = 0

The solutions are:
w = {(v cosθ) +/- [Δ]^1/2 }/2S
Δ = (v cosθ)² - 4 SDv²

The ddifferentiation of w with respect to θ is:
dw/dθ = {- (v sin θ) +/- d[Δ]^1/2/dθ}/2S
d[Δ]^1/2/dθ = (1/2) dΔ/dθ/[Δ]^1/2
dw/dθ = {- (v sin θ) +/- ((1/2) dΔ/dθ/[Δ]^1/2)}/2S
dΔ/dθ = - 2v²cosθ sinθ
dw/dθ = {- (v sin θ) +/- ((1/2) (- 2v²cosθ sinθ)/[Δ]^1/2)}/2S
= {- (v sin θ) -/+ ((v²cosθ sinθ)/[Δ]^1/2)}/2S

Equating to zero gives:
(v sin θ) = -/+ ((v²cosθ sinθ)/[Δ]^1/2)

We have then:
sin θ = 0, that is θ = 0, and Δ = v² cos²θ
1 = -/+ ((v cosθ/[Δ]^1/2)
Δ = v²cos²θ. That is:
(v cosθ)² - 4 SDv² = v²cos²θ.
Or:
4 SDv² = 0, that is D = 0 : M = m

Conclusion:

Whem θ = 0 , the speed w, then the kinetic energy (1/2)Mw², of the mass M after collision is maximum, that is the collision is head-on.

3. Maximum energy transfer

From the conservation of momentum: Mv = Mw + mu , and
The conservation of kinetic energy:
(1/2)Mv² = (1/2)Mw² + (1/2)mu²
we write:
u = (M/m)(v - w)
v² = w² + (M/m) (v² + w² -2vw)

Let S = M + m, and D = M - m, we have then:
sw² - 2(Mv)w + Dv² = 0
Δ' = M²v² - SDv² = m²v²
The solution are:
w₁ = (Mv + mv)/S = v
w₂ = (Mv + mv)/S = v (M - m)/(M + m)   (4)

The two solutions means that if M = m, the mass M stops (w2 = 0) and the mass m takes its velocity ( w1 = v). we have here an excahnge of velocity (then kinetic energy).

The maximum energy transterred to the mass m is then:
T^max = (1/2)Mv² - (1/2)Mw² = (1/2)mu²
According to the relationship (4), we have:
T^max = (1/2)Mv² - (1/2)Mw² = (1/2)Mv² - (1/2)M(v (M - m)/(M + m))² =
(1/2)Mv² [1 - ((M - m)/(M + m))² ] = (1/2)Mv² [(4mM)/(M + m))² ]

Writing as T_o = (1/2)Mv² as the initial energy of the projectile, then:
T^max = (1/2)Mv² [(4mM)/(M + m))²] = T_o [(4mM)/(M + m))²]