How to Determine the Depth of a Vat Based on Object's Sinking Velocity

How can we calculate the depth of a vat based on an object's sinking velocity?

Can you determine the depth of a container if an object sinks into it with a constant velocity equal to the velocity with which it hits the surface?

Calculating the Depth of a Vat

When an object sinks to the bottom of a vat with a constant velocity, the depth of the vat can be calculated using the height from which the object is dropped and the time it takes to reach the bottom.

To calculate the depth of a container or vat, we can use the formula:

Depth of vat = (1/2) * g * t^2

Where:

g = acceleration due to gravity (9.8 m/s^2)

t = time taken for the object to reach the bottom

In the given situation where a heavy ball is dropped into a vat of foam from a height of 5.80 meters and reaches the bottom in 5.00 seconds with a constant velocity, we can determine the depth of the vat using the provided data.

Using the formula and the given values, we find:

Height (H) = 50.176 meters from the crane to the vat's bottom

Crane's height above the vat (h) is 6.10 meters

Depth of vat = 44.076 meters

Therefore, the depth of the vat in this scenario is 44.076 meters.

← How to calculate current drawn from electric mains supply How does a magnifying glass flip images upside down →