Answer:
they meet from the girl's original position at: 2.37 (meters)
Explanation:
We need to use the Newton's law, exactly the second law that relate force, mass and acceleration as: [tex]F=m*a[/tex] with this we can get both accelerations; solving for acceleration [tex]a=\frac{F}{m}[/tex]. Now [tex]a_{girl}=\frac{5.76}{42.3}=0.14 (m/s^{2})[/tex] and[tex]a_{sled}=\frac{5.76}{7.93}=0.73(m/s^{2})[/tex]. Then knowing that they both travel at the same time and assuming that the distance among the girl and the sled is: 15.0-x, so, [tex]x=\frac{1}{2}*a_{girl}*t^{2}[/tex] and[tex]15.0-x=\frac{1}{2}*a_{sled}*t^{2}[/tex], solving for the time we get:[tex]t=\sqrt{\frac{2x}{a_{girl} } }[/tex] and [tex]t=\sqrt{\frac{2*(15.0-x)}{a_{sled} } }[/tex] with this equations we solving for the x that is the distance between the girl and the sled after the apply the force and we get:[tex]\sqrt{\frac{2x}{a_{girl}}} = \sqrt{\frac{2*(15.0-x)}{a_{sled} }[/tex]. Finally we get:[tex]\frac{x}{a_{girl} }=\frac{(15.0-x)}{a_{sled} }[/tex] and replacing the values we have got:[tex]\frac{x}{0.14} =\frac{(15.0-x)}{0.73}[/tex] so [tex]5.33*x=15-x[/tex] so x=2.37 (meters).
