When an aircraft attempts to climb as rapidly as possible, its climb rate (in feet per minute) decreases as altitude increases, because the air is less dense at higher altitudes. Given below is a table showing performance data for a certain single engine aircraft, giving its climb rate at various altitudes, where c(h) denotes the climb rate of the airplane at an altitude h. h (feet) 0 1000 2000 3000 4000 5000 6000 7000 8000 9000 10,000 c (ft/min) 925 875 830 780 730 685 635 585 535 490 440 Let a new function called m(h) measure the number of minutes required for a plane at altitude h to climb the next foot of altitude. a. Determine a similar table of values for m(h) and explain how it is related to the table above. Be sure to explain the units. b. Give a careful interpretation of a function whose derivative is m(h). Describe what the input is and what the output is. Also, explain in plain English what the function tells us. C. Determine a definite integral whose value tells us exactly the number of minutes required for the airplane to ascend to 10,000 feet of altitude. Clearly explain why the value of this integral has the required meaning. d. Use the Riemann sum M; to estimate the value of the integral you found in (c). Include units on your result.