Answer:
966.22 mph
Explanation:
Velocity of plane with respect to wind (Vp,w)= 612 mph east
velocity of wind with respect to ground, (Vw,g) = 362 mph at 15° North of
east
Write the velocities in vector form
[tex]V_{p,w}=612\widehat{i}[/tex]
[tex]V_{w,g}=362\left ( Cos15\widehat{i}+Sin15\widehat{j} \right )= 349.67\widehat{i}+93.69\widehat{j}[/tex]
Use the formula for the relative velocity
[tex]V_{p,w}=V_{p,g}-V_{w,g}[/tex]
Where, V(p,w) is the velocity of plane with respect to wind
V(p,g) is the velocity of plane with respect to ground
V(w,g) is the velocity of wind with respect to ground
So, [tex]V_{p,g}=V_{p,w}+V_{w,g}[/tex]
[tex]V_{p,g}=\left ( 612+349.67 \right )\widehat{i}+93.69\widehat{j}[/tex]
[tex]V_{p,g}=961.67\widehat{i}+93.69\widehat{j}[/tex]
Magnitude of velocity of lane with respect to ground
[tex]V_{p,g} = \sqrt{961.67^{2}+93.69^{2}}[/tex]
V(p,g) = 966.22 mph
