Answer:
The radius is increasing at a rate 0.18 inches per second.
Step-by-step explanation:
We are given the following in the question:
The volume of cylinder is constant.
[tex]\dfrac{dV}{dt} = 0[/tex]
[tex]\dfrac{dh}{dt} = -0.6\text{ inch per second}[/tex]
Instant radius= 3 inches
Instant height = 5 inches
Volume of cylinder =
[tex]V = \pi r^2 h[/tex]
Rate of change of volume =
[tex]\dfrac{dV}{dt} = \pi(2r\dfrac{dr}{dt}h + r^2\dfrac{dh}{dt})[/tex]
Putting all the values, we get,
[tex]0 = \dfrac{22}{7}(2(3)\dfrac{dr}{dt}(5)+(3)^2(-0.6))\\\\30\dfrac{dr}{dt} = 9(0.6)\\\\\dfrac{dr}{dt} = \dfrac{9\times 0.6}{30} = 0.18[/tex]
Thus, the radius is increasing at a rate 0.18 inches per second.
