what is the rate of change of the volume of a ball (v = \\frac{4}{3}\\pi r^{3}) with respect to the radius…

what is the rate of change of the volume of a ball (v = \\frac{4}{3}\\pi r^{3}) with respect to the radius when the radius is r = 19? the volume changes at a rate of . (type an exact answer, using \\pi as needed.)
Answer
Explanation:
Step1: Differentiate volume formula
The volume formula of a ball is $V = \frac{4}{3}\pi r^{3}$. Using the power - rule for differentiation $\frac{d}{dr}(x^{n})=nx^{n - 1}$, we get $\frac{dV}{dr}=\frac{4}{3}\pi\times3r^{2}=4\pi r^{2}$.
Step2: Substitute radius value
We are given $r = 19$. Substitute $r = 19$ into $\frac{dV}{dr}$. So, $\frac{dV}{dr}\big|_{r = 19}=4\pi\times(19)^{2}$. Calculate $(19)^{2}=361$. Then $4\pi\times361 = 1444\pi$.
Answer:
$1444\pi$