Answer:
It should be dropped from 160.80m
Explanation:
To calculate the time it takes the weight to reach the ground from 55m we need to consider that the only acceleration applied to it is the gravity, the height at any time t can be calculate as:
[tex]Y=Y_{0}+Vy_{0}*t-1/2*g*t^{2}[/tex]
If we consider that it starts from [tex]Y_{0}=55m[/tex] to reach Y=0, and that the initial velocity on the vertical axis equals zero:
[tex]0=55m-1/2*g*t^{2}[/tex]
solving for t:
[tex]t=\sqrt{\frac{55m*2}{g} } =\sqrt{\frac{110m}{9.8m/s^{2} } }=3.35s[/tex]
Now to calculate the horizontal distance from the target:
[tex]X=X_{0}+Vx_{0}*t-1/2*a*t^{2}[/tex]
We have to consider that:
It will travel from [tex]X_{0}=0m[/tex] (we set the reference on the dropping point so the result X will be de needed distance;
As the air resistance can be ignored there is no force on the horizontal direction, a=0;
The starting velocity [tex]Vx_{0}[/tex] is the same of the plane velocity
It will be traveling for a time t calculated before;
replacing this on the equation:
[tex]X=48m/s*3.35s=160.80m[/tex]
