Explanation Given: A cylinder fuel tank of length L lying on its side, where the ends are circular with radius b . Calculation: Consider a cylinder fuel tank of length L lying on its side, with radius r and height h . Consider the cross-section area of right circularcylinder is A, therefore, the volume of the cylinder is V = A L Using the symmetry the area of cross-section is A = 2 × Area of region A B C Consider the region ABC which is bounded by the curve x = b 2 − y 2 , x

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Author: SMITH KARL J, STRAUSS MONTY J, TODA MAGDALENA DANIELE

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Chapter 6.1, Problem 58PS

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To explain:why the volume of the tank is modeled by V(h)=2L∫−bhb2−y2dy .

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Chapter 6.1, Problem 57PS

Chapter 6.1, Problem 59PS

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Chapter 6 Solutions

Calculus

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why the volume of the tank is modeled by V ( h ) = 2 L ∫ − b h b 2 − y 2 d y .

Solution Summary: The author explains that the volume of the cylindrical tank is modeled by V(h)=2Ldisplaystyle underset-boverset

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Chapter 6 Solutions