Answer:
[tex]t=564.83seconds=9.414minutes=0.1569hours[/tex]
Explanation:
Here the steady speed of the river water relative to ground is
[tex]V_{wg}=0.55m/s[/tex]
Speed of the boy relative to still water is
[tex]V_{BW}=1.50m/s[/tex]
Here we are considering +ve speed along along +ve x-axis and -ve speed along -ve x-axis
Therefore the speed of boy relative to the ground upstream is:
[tex]V_{BGup}=V_{BW}-V_{WG}\\V_{BGup}=1.50m/s-0.550m/s\\V_{BGup}=0.95m/s[/tex]
And the speed of boy relative to the ground downstream is:
[tex]V_{BGdown}=V_{BW}+V_{WG}\\V_{BGdown}=1.50m/s+0.550m/s\\V_{BGdown}=2.05m/s[/tex]
The distance covered in upstream trip d₁=1.0km=1000m and the distance covered in downstream is d₂=1.0km=1000m
Since time taken by a person is to cover distance d with speed v given by:
[tex]t=d/v[/tex]
The total time taken for one trip is:
[tex]t=\frac{d_{1} }{V_{BGup} } -\frac{d_{2} }{V_{BGdown} }\\t=\frac{1000m}{0.95m/s}-\frac{1000m}{2.05m/s}\\ t=564.83seconds=9.414minutes=0.1569hours\\[/tex]
