Answer:
t=L/[tex]V_1[/tex]
Explanation:
solution:
Let E be an observer, and B a second observer traveling with velocity [tex]V_{BE}[/tex] as measured by E. If E measures the velocity of an object A as [tex]V_{AE}[/tex] then B will measure A velocity as
[tex]V_{AB}[/tex] = [tex]V_{AE}[/tex] - [tex]V_{BE}[/tex]
Applied here,
the walkway (W) and the man (M) are moving relative to Earth (E}, the velocity of the man relative to the moving walkway is
[tex]V_{MW}[/tex] = [tex]V_{ME}[/tex] - [tex]V_{WE}[/tex]
[tex]V_1=V_{WE}[/tex],
[tex]V_2=V_{MW}[/tex]
The time required for the woman, traveling at constant speed [tex]V_1[/tex] relative to the ground, to travel distance L relative to the ground is :
t=L/[tex]V_1[/tex]
