Answer:
The velocity [tex]\vec{v}_{c/g}[/tex] of the cart with respect to the ground is
[tex]\vec{v}_{c/g}=-40\hat{x}+80\hat{y}\, km/h[/tex]
if we consider North the positive y-direction and East the positive x-direction.
Explanation:
We have for relative motion the following expression:
[tex]\vec{v}_{c/g}=\vec{v}_{c/p}+\vec{v}_{p/g}[/tex]
Where [tex]\vec{v}_{c/g}[/tex] is the velocity of the cart with respect to the ground, [tex]\vec{v}_{c/p}[/tex] is the velocity of the cart with respect to the plane and [tex]\vec{v}_{p/g}[/tex] is the velocity of the plane with respect to the ground.
We find that:
[tex]\vec{v}_{c/p}=-20\hat{y}[/tex]
[tex]\vec{v}_{p/g}=-40\hat{x}+100\hat{y}[/tex]
Thus:
[tex]\vec{v}_{c/g}=-20\hat{y}-40\hat{x}+100\hat{y}=-40\hat{x}+80\hat{y} \, km/h[/tex]
