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Dear Calculus Students: I have decided to continue the family business established by my grandfather, and I need some help planning one of the escapes
Dear Calculus Students: I have decided to continue the family business established by my grandfather, and I need some help planning one of the escapes that I am including in my inaugural tour. When I went looking for help, your enterprising and resourceful professor naturally referred me to you. I will be locked in chains and have my feet shackled to the top of a stool which is attached to the bottom of a giant tank that looks vaguely like a laboratory flask. The flask will be filled with water (at a constant rate of 500 gallons per minute), and after much practice out of the water, I have determined that it will take me exactly 10 minutes to escape from the chains. I have a flair for the dramatic, so I would like to escape from the shackles at the exact instant that the water reaches the top of my head. I need your help in determining how tall the stool should be. Also, I want to monitor the rise of the water during the escape, so at any time after the water begins flowing, I want to know how high the water is in the tank and how fast the water is rising. While I am fairly accomplished at holding my breath under water, I would like to know how long I will have to hold my breath during the last part of the stunt. I've included a sketch of the tank below, which gives the diameter of the tank at 1-foot intervals. 5.5 ft 5.7 At 6 ft 63 ft 6.7 At 7ft 7.5 ft 8.1 ft 8.9 ft 10 At 11.5 f 14 ft 20 ft After consulting with your enterprising and resourceful professor, he suggested that you might be interested to know that I am 5 feet 9 inches tall, and I'm pretty skinny so that you can ignore both my volume and the volume of the stool in your analysis. Yours sincerely, T. Houdini A Few Comments After consulting with T. Houdini, I have a few suggestions that may help you get started: . A gallon is equal to 0.13368 cubic feet. . You can think of the volume and the height of the water as functions of time. You can easily find an expression for I' (t), and then use your expression for volume in terms of height to solve for h(t)
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