(a) 3.58 km 45° south of east
The total displacement is given by:
[tex]d=vt[/tex]
where
v is the average velocity
t is the time
The average velocity is:
v = 3.53 m/s
While we need to convert the time from minutes to seconds:
[tex]t=169 min \cdot 60 s/min = 10140 s[/tex]
Therefore, the magnitude of the displacement is
[tex]d=(3.53)(10140)=35794 m = 3.58 km[/tex]
And the direction is the same as the velocity, therefore 45° south of east.
(b) 5.53 m/s 90° south of east
The velocity of the air relative to the ground is
[tex]v_a = 2.00 m/s[/tex]
and the direction is exactly opposite to that of Allen, so it is 45° north of west. Allen's velocity relative to the ground is
v = 3.53 m/s
So this must be the resultant of Allen's velocity relative to the air (v') and the air's speed ([tex]v_a[/tex]). Since these two vectors are in opposite direction, we have
[tex]v= v'-v_a[/tex]
Therefore we find v', Allen's velocity relative to the air:
[tex]v'=v+v_a = 3.53 + 2.00 = 5.53 m/s[/tex]
The direction must be measured relative to the air's reference frame. In this reference frame, Allen is moving exactly backward, so his direction will be 90° south of east.
(c) 56.1 km at 90° south of east.
Since Allen's velocity relative to the air is
v' = 5.53 m/s
Then the displacement of Allen relative to the air will be given by
[tex]d'=v't[/tex]
and substituting,
[tex]d'=(5.53)(10140)=56074 m = 56.1 km[/tex]
And the direction is the same as that of the velocity, therefore will be 90° south of east.
