In terms of its radius [tex]r[/tex], the volume of the balloon is
[tex]V(r)=\dfrac{4\pi}3r^3[/tex]
The diameter [tex]d[/tex] is twice the radius, so that in terms of its diameters, the balloon's volume is given by
[tex]V(d)=\dfrac{4\pi}3\left(\dfrac d2\right)^3=\dfrac\pi6d^3[/tex]
Differentiate both sides with respect to time [tex]t[/tex]:
[tex]\dfrac{\mathrm dV}{\mathrm dt}=\dfrac\pi2d^2\dfrac{\mathrm dd}{\mathrm dt}[/tex]
The diameter increases at a rate of [tex]\frac{\mathrm dd}{\mathrm dt}=6\frac{\rm cm}{\rm min}[/tex]. When the diameter is [tex]d=50\,\mathrm{cm}[/tex], we have
[tex]\dfrac{\mathrm dV}{\mathrm dt}=\dfrac\pi2(50\,\mathrm{cm})^2\left(6\frac{\rm cm}{\rm min}\right)=7500\pi\dfrac{\mathrm{cm}^3}{\rm min}[/tex]
or about 23,562 cc/min (where cc = cubic centimeters)
