Posted by Craig on Tuesday, November 25, 2008 at 7:54pm.

Question

Posted by Craig on Tuesday, November 25, 2008 at 7:54pm. t: 0 2 5 7 11 12 r'(t): 5.7 4.0 2.0 1.2 0.6 0.5 The volume of a spherical hot air balloon expands as the air inside the balloon is heated. The radius of the balloon in feet is modeled by a twice-differentiable function of r of time t, where t is measured in minutes. For 0> do you mean that r is a quadratic function of t, a cubic or what? As I see it, I could differentiate a function any number of times, just because I might reach a derivative of zero does not mean I couldn't do it once more. e.g y = x^3 + ... y' = 3x^2 .... y'' = 6x .... y''' = 6 y'''' = 0 y ''''' = 0 * Calculus - Craig, Tuesday, November 25, 2008 at 11:00pm i'm guessing that twice differentiable means y'' o Calculus - Reiny, Tuesday, November 25, 2008 at 11:33pm agree, but what level is the function? e.g. If I knew that y = ... is quadratic, I could say y = at^2 + bt + c and go from there, but how do I know it's not a cubic? * Calculus - Damon, Wednesday, November 26, 2008 at 6:23am It does not matter I think. We are not fitting the entire data set with a function but doing linear, then quadratic, interpolation. For part a use radius at 5 and dr/dt at 5 r(5.4) = r(5) + .4 r'(5) r(5.4) = 30 + .4 (2) r(5.4) = 30 + .8 r(5.4) = 30.8 * Calculus - Damon, Wednesday, November 26, 2008 at 6:29am V = Volume = (4/3) pi r^3 in ft^3 DV/dt = (4/3) pi (3) r^2 dr/dt in ft^3/sec at t = 5 dV/dt = 4 pi r^2 (2) = 8 pi (30)^2 = 240 pi ft^3/second NOTE - the rate of change of volume is the surface area, 4 pi r^2 times the rate of change of radius - think about it.

Damon · Answer

Sorry about the spelling :(

Khang · Answer

@ Damon on part B You made an error when squaring 30, it seems like you didn't square. the answer would be 7200pi ft^3/min