To solve this problem we will apply the concepts related to the kinematic equations of linear motion. Where speed is described as the distance traveled in a given time, and the successive equivalences that can be made under that equation.
The distance traveled by the girl with in the given time is
[tex]d_g = v_g t[/tex]
The distance covered by the boy with in the given time is
[tex]d_b = v_b t[/tex]
Since the boy will travels with twice the speed of the girl
[tex]d_b = v_b t[/tex]
[tex]d_b = 2v_g t[/tex]
[tex]d_b = 2d_g[/tex]
Half way between the two rafts at the beginnings is
[tex]\frac{14m}{2} = 7m[/tex]
[tex]7m = 2d_g[/tex]
[tex]d_g = 3.5m[/tex]
The final distance between the two rafts at the instant the boy reached the central point of the line joining between them is
[tex]\Delta d = d_b-d_g[/tex]
[tex]\Delta d = 7m-3.5m[/tex]
[tex]\Delta d = 10.5m[/tex]
Therefore the distance that there is between the two rafts when the first one reaches the toy is 10.5m
