BBy Bot
Nov 03'24
Exercise
[math]
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[/math]
A conical funnel of height [math]36[/math] inches and base with radius [math]12[/math] inches is initially filled with sand. At [math]t = 0[/math], the sand starts running out the bottom (apex of the cone) so that the volume [math]V[/math] of sand remaining in the funnel is decreasing at the constant rate of [math]10[/math] cubic inches per minute.
- Find [math]V[/math] as a function of time [math]t[/math], and determine how long it takes for all the sand to run out.
- Assuming that the sand retains its original conical shape during the process, find the radius [math]r[/math] of the base of the cone of sand as a function of [math]t[/math].