Answer:
[tex]\boxed{v=\frac {V}{\sqrt {2}}}[/tex]
Explanation:
We know that speed is given by dividing distance by time or multiplying length and frequency. The speed of the father will be given by Lf where L is the length of the father’s leg ad f is the frequency.
We know that frequency of simple pendulum follows that [tex]f=\frac {1}{2\pi} \sqrt {\frac {g}{l}}[/tex]
Now, the speed of the father will be [tex]V=Lf= L\times (\frac {1}{2\pi} \sqrt {\frac {g}{l}})[/tex] while for the child the speed will be [tex]v=\frac {L}{2}\times (\frac {1}{2\pi} \sqrt {\frac {g}{0.5l}})[/tex]
The ratio of the father’s speed to the child’s speed will be
[tex]\frac {V}{v}=\frac {\frac {L}{2}\times (\frac {1}{2\pi} \sqrt {\frac {g}{0.5l}})}{ L\times (\frac {1}{2\pi} \sqrt {\frac {g}{l}})}\\\frac {V}{v}=\frac {\sqrt {2}}{2}\\\boxed{v=\frac {V}{\sqrt {2}}}[/tex]
