Question #0ed3c
1 Answer
Aug 15, 2015
Huck's speed relative to the river bank is
Explanation:
The idea behind this problem is that Huck's walking perpendicular to the direction of the raft, which is parralel to the river bank.
This means that Huck's speed relative to the shore will have two components, one parralel to the shore and one perpendicular to the shore.
This means that you can use Pythagoras' Theorem to find the magnitude of Huck's velocity, i.e. his speed
#v_"Huck"^2 = v_"parallel"^2 + v_"perpendicular"^2#
#v_"Huck" = sqrt(v_"parralel"^2 + v_"perpendicular"^2)#
If Huck is moving
#v_"Huck" = sqrt(1.70^2"m"^2/"s"^2 + 0.60^2"m"^2/"s"^2)#
#v_"Huck" = color(green)("1.80 m/s")#
