- − in./s.
We are given the rate at which the water is flowing out of the container, = − 35π (Why is itnegative?), and are looking for the rate at which the depth of the water is dropping, . Thus,we need to find a way to relate the volume of a cone to its height. We know that the volume of acone is V = πr^2 h. Notice that we have a problem. We have a third variable, r, in the equation.We cannot treat it as a constant the way we did in problem 4 because as the volume of a conechanges, both its height and radius change. But, we also know that in any cone, the ratio of theradius to the height is a constant. Here, when the radius is 21 (because the diameter is 42), theheight is 15. Thus, . We can now isolate r in this equation: r = . Now we canplug it into the volume formula to get rid of r: V = h. This simplifies to V = . Now we can take the derivative of this equation with respect to t:
. Next, we plug = −35π and h = 5 into the derivative and we get
−35π = . Now we can solve for : = − in./s.- − ft/s
We are given the rate at which the length of the rope, R, is changing, = −4 and are lookingfor the rate at which the boat, B, is approaching the dock, . The key to this problem is torealize that the vertical distance from the dock to the bow, the distance from the boat to thedock, and the length of the rope form a right triangle.