Daniel B. answered • 10/25/21
A retired computer professional to teach math, physics
Let
L = 75ft be half the the total length of the rope,
h(t) be the vertical distance of the weight from the pulley after time t,
x(t) be the horizontal distance of the worker from the initial position after time t,
v = 3 ft/s be the worker's speed.
We are given
h(0) = L,
x(0) = 0,
and we need to calculate h'(t), and then h'(10/v) and h'(30/v).
Let P be the point representing the pulley.
Consider the right angle triangle having the points P, x(0), x(t).
By the Pythagorean theorem the distance between P and x(t) is
√(L² + x(t)²) = √(L² + (vt)²)
Therefore
h(t) = 2L - √(L² + (vt)²)
After differentiation and simplification
h'(t) = -v²t/√(L² + (vt)²)
The worker has walked 30ft after time t = 10s.
Plugging in actual numbers
h'(10) = -3²×10/√(75² + (3×10)²) = -1.1 ft/s
Similarly after the worker walked 10 ft.
