Answer: To find the height of the embankment, we need to first find the volume of the well and then the volume of the embankment.
Volume of the well = πr^2h = π * (d/2)^2 * h = π * (5/2)^2 * 24 = 157.08 cubic meters
Volume of the embankment = π * (R^2 - r^2) * h, where R is the outer radius of the embankment and r is the inner radius.
Outer radius of the embankment = (5 + 3)/2 = 4 m
Inner radius of the embankment = (5 - 3)/2 = 1 m
Volume of the embankment = π * (4^2 - 1^2) * h = π * 15 * h
We know that the volume of the well is equal to the volume of the embankment, so we can write:
157.08 = π * 15 * h
Solving for h, we get:
h = 157.08 / (π * 15) = 157.08 / 47.12 ≈ 3.32 m
So, the height of the embankment is approximately 3.32 meters.
Explanation: