Answer:
1. v = 0.3296m/s
2. x = 0.077m (above the platform)
Explanation:
The first distance given allows you to calculate the spring constant of the construction. (it will be in terms of the brother's mass; don't worry, it factors out later.)
k = m×g / x where x = 0.16m
When the rest of the brothers pull the platform lower, you can calculate the stored energy.
Us = 0.5× k×X²
Us = 0.5×m×g× x where x = 0.16m
When the brothers release the platform, the stored energy is converted to kinetic energy and gravitational potential energy of the brave fraternity brother (BFB) until the springs reach equilibrium position.
PEgrav = mgh where h = 0.16m
KE = 0.5×mv²
At equilibrium position, the energy originally stored in the spring will be equal to the energy of the BFB. Solve for v.
0.5×m×(-9.81 m/s²) ×0.16 m = m ×(-9.81 m/s²)×0.16 m + 0.5×m×v²
As promised, mass factors out.
0.5× (-9.81 m/s²) ×0.16m = (-9.81 m/s²) × 0.16 m + 0.5× v²
-0.5 * (-9.81 m/s²) ×0.16m = 0.5 ×V²
9.81 m/s²×0.16m = v²
v = √(6.9651 m/s²)
v = 1.235m/s
A little arithmetic will show that from the equilibrium point, the BFB has 0.80m between his helmet and the ceiling. Calculate his speed after he has traveled this distance.
V = V0 + At
x = x0 + v0t + 0.5At²
Solving for t:
0.19 m = 0 m + 1.235 m/s×t + 0.5×(-9.81m/s²)×t²
You'll find that t = 0.0923 s and 0.378s. The smaller value is the ceiling crossing on the way up, and the larger is on the way back down, assuming no ceiling is actually present.
1. With t, solve for v:
v = 1.235 m/s + (-9.81 m/s²) ×0.0923s
v = 0.3296m/s
2. with initial v, solve for x:
v = v0 + At
t = (0 - 1.235m/s) / -9.81 m/s²
t = 0.126 seconds
x = x0 + v0t + 0.5×At²
x = 0 + (1.235m/s×0.126 s) + (0.5 × (-9.81 m/s²×0.126²s)
x = 0 + 0.15561 m - . 0.0778m
x = 0.077m (above the platform)
