Answer:
A. [tex]\vec{r}=(6\frac{m}{s})t\ \ \hat{i}[/tex]
B. t = 50 s
Explanation:
A. The vectorial equation of the person who is getting closer to the other person is:
[tex]\vec{r}=\vec{v}t[/tex]
r: position vector
v: speed vector = 6m/s i (if you consider the motion as a horizontal motion)
Then, you replace and obtain:
[tex]\vec{r}=(6\frac{m}{s})t\ \ \hat{i}[/tex]
B. The time is:
[tex]t=\frac{d}{v}[/tex]
d: distance to the observer = 300m
v: speed of the person on the car = 6.00 m/s
[tex]t=\frac{300m}{6m/s}=50s[/tex]
