Answer:
The final speed of the two carts stuck together after the collision is 1 m/s
Explanation:
This is an example of an inelastic collision where two separate carts each with different momentum collide and become a single object.
The conservation of momentum (p) equation is: [tex]p_{1i}+p_{2i}=p_f[/tex] where [tex]p_{1i}[/tex] is the initial momentum of cart 1: [tex]p_{1i}=m_1\,*\,v_{1i}=1\,kg\,*\,3\,\frac{m}{s} = 3 \frac{kg*m}{s}[/tex]
Notice that cart 2 is at rest, therefore its velocity is zero, which makes its initial momentum zero: [tex]p_{2i}=m_2\,*\,v_{2i}= 2\,kg \,*0\,\frac{m}{s} =0[/tex]
The final momentum ([tex]p_f[/tex]) for which we don't know the velocity ([tex]v_f[/tex]) is the product of the final mass (addition of the two masses) times the final velocity of this new object (two carts stuck together):
[tex]p_f=(m_1+m_2)* v_f = 3\,kg\,*\,v_f[/tex]
Now we re-write the conservation of momentum equation to isolate and obtain the unknown final velocity:
[tex]p_{1i}+p_{2i}=p_f\\3\,\frac{m*kg}{s}+0=3\,kg\,*\,v_f\\3\,\frac{m*kg}{s}=3\,kg\,*\,v_f\\v_f=\frac{3}{3}\, \frac{m}{s} \\v_f=1\,\frac{m}{s}[/tex]
