Respuesta :
Answer:
part (a) v = 1.7 m/s towards right direction
part (b) Not an elastic collision
part (c) F = -228.6 N towards left.
Explanation:
Given,
- Mass of the first puck = [tex]m_1\ =\ 5\ kg[/tex]
- Mass of the second puck = [tex]m_2\ =\ 3\ kg[/tex]
- initial velocity of the first puck = [tex]u_1\ =\ 3\ m/s.[/tex]
- Initial velocity of the second puck = [tex]u_2\ =\ -1.5\ m/s.[/tex]
Part (a)
Pucks are stick together after the collision, therefore the final velocities of the pucks are same as v.
From the conservation of linear momentum,
[tex]m_1u_1\ +\ m_2u_2\ =\ (m_1\ +\ m_2)v\\\Rightarrow v\ =\ \dfrac{m_1u_1\ +\ m_2u_2}{m_1\ +\ m_2}\\\Rightarrow v\ =\ \dfrac{5\times 3\ -\ 1.5\times 1.5}{5\ +\ 1.5}\\\Rightarrow v\ =\ 1.7\ m/s.[/tex]
Direction of the velocity is towards right due to positive velocity.
part (b)
Given,
Final velocity of the second puck = [tex]v_2\ =\ 2.31\ m/s.[/tex]
Let [tex]v_1[/tex] be the final velocity of first puck after the collision.
From the conservation of linear momentum,
[tex]m_1u_1\ +\ m_2u_2\ +\ m_1v_1\ +\ m_2v_2\\\Rightarrow v_1\ =\ \dfrac{m_1u_1\ +\ m_2u_2\ -\ m_2v_2}{m_1}\\\Rightarrow v_1\ =\ \dfrac{5\times 3\ -\ 1.5\times 1.5\ -\ 1.5\times 2.31}{5}\\\Rightarrow v_1\ =\ 1.857\ m/s.[/tex]
For elastic collision, the coefficient of restitution should be 1.
From the equation of the restitution,
[tex]v_1\ -\ v_2\ =\ e(u_2\ -\ u_1)\\\Rightarrow e\ =\ \dfrac{v_1\ -\ v_2}{u_2\ -\ u_1}\\\Rightarrow e\ =\ \dfrac{1.857\ -\ 2.31}{-1.5\ -\ 3}\\\Rightarrow e\ =\ 0.1\\[/tex]
Therefore the collision is not elastic collision.
part (c)
Given,
Time of impact = t = [tex]25\times 10^{-3}\ sec[/tex]
we know that the impulse on an object due to a force is equal to the change in momentum of the object due to the collision,
[tex]\therefore I\ =\ \ m_1v_1\ -\ m_1u_1\\\Rightarrow F\times t\ =\ m_1(v_1\ -\ u_1)\\\Rightarrow F\ =\ \dfrac{m_1(v_1\ -\ u_1)}{t}\\\Rightarrow F\ =\ \dfrac{5\times (1.857\ -\ 3)}{25\times 10^{-3}}\\\Rightarrow F\ =\ -228.6\ N[/tex]
Negative sign indicates that the force is towards in the left side of the movement of the first puck.
