Answer:
The ratio of the man's kinetic energy to that of the woman's kinetic energy is 0.629.
Explanation:
Given;
weight of the man, W = 700 N
Weight of the woman, W = 440 N
momentum is given by;
[tex]P = mv\\\\v = \frac{P}{m}[/tex]
Kinetic energy of the man;
[tex]K_m = \frac{1}{2}m_m(\frac{P_m}{m_m})^2 \\\\K_m = \frac{P_m^2}{2m_m}[/tex]
Momentum of the man is calculated as;
[tex]P_m^2 = 2m_mK_m[/tex]
The kinetic energy of the woman is given by;
[tex]K_w = \frac{P_w^2}{2m_w}[/tex]
The momentum of the woman is given;
[tex]P_w^2 = 2m_wK_w[/tex]
Since, momentum of the man = momentum of the woman
[tex]P_m^2 = P_w^2[/tex]
[tex]2m_mK_m = 2m_wK_w\\\\\frac{K_m}{K_w} = \frac{2m_w}{2m_m}\\\\\frac{K_m}{K_w} = \frac{m_w}{m_m}[/tex]
mass of the mas = 700 / 9.8 = 71.429
mass of the woman is = 440 / 9.8 = 44.898
[tex]\frac{K_m}{K_w} = \frac{44.898}{71.429}\\\\\frac{K_m}{K_w} =0.629[/tex]
Therefore, the ratio of the man's kinetic energy to that of the woman's kinetic energy is 0.629.
