Answer:
(a) 6.58 m/s
(b) East direction
(c) 2.33 m/s
(d) -259353 J
Explanation:
From the law of conservation of linear momentum
M1u1+m2u2=(m1+m2)V where V is common velocity, m1 and m2 are masses of objects, u1 and u2 are velocities of m1 and m2 respectively
Making V the subject
[tex]V=\frac {m1u1+m2u2}{m1+m2}[/tex]
Let West be positive while East be negative hence
[tex]V=\frac {1050*14+6320*-10}{1050+6320}= -6.58073 m/s\approx -6.58 m/s[/tex]
Velocity=6.58 m/s
(b)
Since common velocity is negative, it implies that after collision the vehicles move to the East
(c)
m1u1=m2u2
[tex]u1=\frac {m2u2}{m1}=\frac {1050*14}{6320}= 2.325949367 m/s\approx 2.33 m/s[/tex]
(d)
The initial kinetic energy is given by
[tex]KE_i=0.5m1(u1)^{2}+0.5m2(u2)^{2}=0.5(m1(u1)^{2}+ m2(u2)^{2})=0.5(1050*14^{2}+6320*10^{2}}= 418900 J[/tex]
The final kinetic energy is given by
[tex]KE_f=0.5(m1+m2)V^{2}=0.5(1050+6320)*6.58^{2}= 159547.2 J[/tex]
Since the two vehicles remain locked after collision, this is inelastic collision hence kinetic energy is not conserved
Change in kinetic energy is given by
[tex]\triangle KE=KE_f-KE_i=159547.2 J-418900 J=-259352.766 J\approx -259353 J[/tex]
