Calculus/Related Rates/Solutions

1. A spherical balloon is inflated at a rate of

100ft^{3}/min

. Assuming the rate of inflation remains constant, how fast is the radius of the balloon increasing at the instant the radius is

4ft

?

Known:

$V={\frac {4}{3}}\pi r^{3}$
${\dot {V}}=100$
$r=4$
Take the time derivative:
${\dot {V}}=4\pi r^{2}{\dot {r}}$
Solve for ${\dot {r}}$ :
${\dot {r}}={\frac {\dot {V}}{4\pi r^{2}}}$
Plug in known values:

{\dot {r}}={\frac {100}{4\pi 4^{2}}}=\mathbf {{\frac {25}{16\pi }}{\frac {ft}{min}}}

Known:

$V={\frac {4}{3}}\pi r^{3}$
${\dot {V}}=100$
$r=4$
Take the time derivative:
${\dot {V}}=4\pi r^{2}{\dot {r}}$
Solve for ${\dot {r}}$ :
${\dot {r}}={\frac {\dot {V}}{4\pi r^{2}}}$
Plug in known values:

{\dot {r}}={\frac {100}{4\pi 4^{2}}}=\mathbf {{\frac {25}{16\pi }}{\frac {ft}{min}}}

2. Water is pumped from a cone shaped reservoir (the vertex is pointed down)

10ft

in diameter and

10ft

deep at a constant rate of

3ft^{3}/min

. How fast is the water level falling when the depth of the water is

6ft

?

Known:

$h=2r$
$V={\frac {1}{3}}\pi r^{2}h={\frac {1}{3}}\pi ({\frac {h}{2}})^{2}h={\frac {1}{12}}\pi h^{3}$
${\dot {V}}=3$
$h=6$
Take the time derivative:
${\dot {V}}={\frac {1}{4}}\pi h^{2}{\dot {h}}$
Solve for ${\dot {h}}$ :
${\dot {h}}={\frac {4{\dot {V}}}{\pi h^{2}}}$
Plug in known values:

{\dot {h}}={\frac {(4)(3)}{\pi 6^{2}}}=\mathbf {{\frac {1}{3\pi }}{\frac {ft}{min}}}

Known:

$h=2r$
$V={\frac {1}{3}}\pi r^{2}h={\frac {1}{3}}\pi ({\frac {h}{2}})^{2}h={\frac {1}{12}}\pi h^{3}$
${\dot {V}}=3$
$h=6$
Take the time derivative:
${\dot {V}}={\frac {1}{4}}\pi h^{2}{\dot {h}}$
Solve for ${\dot {h}}$ :
${\dot {h}}={\frac {4{\dot {V}}}{\pi h^{2}}}$
Plug in known values:

{\dot {h}}={\frac {(4)(3)}{\pi 6^{2}}}=\mathbf {{\frac {1}{3\pi }}{\frac {ft}{min}}}

3. A boat is pulled into a dock via a rope with one end attached to the bow of a boat and the other wound around a winch that is

2ft

in diameter. If the winch turns at a constant rate of

2rpm

, how fast is the boat moving toward the dock?

Let

R

be the number of revolutions made and

s

be the distance the boat has moved toward the dock.

Known:
${\frac {R}{s}}={\frac {1}{2\pi r}}$ (each revolution adds one circumferance of distance to s)
${\dot {R}}=2$
$r=1$
Solve for $s$ :
$s=2\pi rR$
Take the time derivative:
${\dot {s}}=2\pi r{\dot {R}}$
Plug in known values:

{\dot {s}}=2\pi (1)(2)=\mathbf {4\pi {\frac {ft}{min}}}

Let

R

be the number of revolutions made and

s

be the distance the boat has moved toward the dock.

Known:
${\frac {R}{s}}={\frac {1}{2\pi r}}$ (each revolution adds one circumferance of distance to s)
${\dot {R}}=2$
$r=1$
Solve for $s$ :
$s=2\pi rR$
Take the time derivative:
${\dot {s}}=2\pi r{\dot {R}}$
Plug in known values:

{\dot {s}}=2\pi (1)(2)=\mathbf {4\pi {\frac {ft}{min}}}

4. At time

t=0

a pump begins filling a cylindrical reservoir with radius 1 meter at a rate of

e^{-t}

cubic meters per second. At what time is the liquid height increasing at 0.001 meters per second?

Known:

$V=\pi r^{2}h$
${\dot {V}}=e^{-t}$
$r=1$
${\dot {h}}=0.001$
Take the time derivative:
${\dot {V}}=\pi r^{2}{\dot {h}}$
Plug in the known values:
$e^{-t}=0.001\pi$
Solve for t:

\mathbf {t=-\ln(.001\pi )}

Known:

$V=\pi r^{2}h$
${\dot {V}}=e^{-t}$
$r=1$
${\dot {h}}=0.001$
Take the time derivative:
${\dot {V}}=\pi r^{2}{\dot {h}}$
Plug in the known values:
$e^{-t}=0.001\pi$
Solve for t:

\mathbf {t=-\ln(.001\pi )}