5.2.7 Volume Some Surprising Volumes of Revolution, G. L. Alexanderson and L. F. Klosinski, 6:3, 1975, 13-15 Another Way of Looking at n!, David Hsu, 11:5, 1980, 333-334, C, 5.7.2 A Note on the Surface of a Sphere, Arthur C. Segal, 13:1, 1982, 63-64, C The Grazing Goat in n Dimensions, Marshall Fraser, 15:2, 1984, 126-134 A Sequel to "Another Way of Looking at n!", William Moser, 15:2, 1984, 142-143, C, 3.2, 5.7.2 Return of the Grazing Goat in n Dimensions, Mark D. Meyerson, 15:5, 1984, 430-431 Exploring the Volume - Surface Area Relationship, Keith A. Struss, 21:1, 1990, 40-43, C, 5.2.6 Relations between Surface Area and Volume in Lakes, Daniel Cass and Gerald Wildenberg, 21:5, 1990, 384-389, 5.2.6 The Volume and Centroid of the Step Pyramid of Zoser, Anthony Lo Bello, 22:4, 1991, 318-321, C, 5.2.9 Disks, Shells, and Integrals of Inverse Functions, Eric Key, 25:2, 1994, 136-138, C Did Plutarch Get Archimedes' Wishes Right?, Lester H. Lange, 26:3, 1995, 199-204, 2.1 Finding Volumes with the Definite Integral: A Group Project, Mary Jean Winter, 26:3, 1995, 227-228, C The World's Biggest Taco, David D. Bleecker and Lawrence J. Wallen, 29:1, 1998, 2-12, 5.3.4, 9.5 Characterizing Power Functions by Volumes of Revolution, Bettina Richmond and Tom Richmond, 29:1, 1998, 40-41, C, 6.4 FFF #166. Several wrongs make a right, Carl Libis, 31:5, 2000, 396, F Dipsticks for Cylindrical Storage Tanks Š Exact and Approximate, Pam Littleton and David Sanchez, 32:5, 2001, 352-358, 0.4, 5.3.1 FFF. Solid of revolution of 1/x, Don Koks, 33:3, 2002, 227-228, F, 5.6.1 On the Work to Fill a Water Tank, Robert R. Rogers, 34:1, 2003, 56-58, C, 5.2.9 A New Wrinkle on an Old Folding Problem, Greg N. Frederickson, 34:4, 2003, 258-263, 5.1.4 A Calculation of the integral from 0 to infinity of e to the negative x-squared dx, Alberto Delgado, 34:4, 2003, 321-323, C Solids in Rn Whose Area Is the Derivative of the Volume, Michael Dorff and Leon Hall, 34:5, 2003, 350-358, 5.2.6 FFF #236. The volume of a cone, Dale R. Buske, 36:2, 2005, 142, F Can You Paint a Can of Paint?, Robert M. Gethner, 36:5, 2005, 400-402, C, 5.2.6 A Paradoxical Paint Pail, Mark Lynch, 36:5, 2005, 402-404, C, 5.2.6, 9.5 Complementary Coffee Cups, Thomas Banchoff, 37:3, 2006, 170-175 (see also 38:2, 2007, 191) A Bug Problem, Aaron Melman, 37:3, 2006, 219-221, C, 5.2.8 Doublecakes: An Archimedean Ratio Extended, Vera L. X. Figueiredo, Margarida P. Mello, and Sandra A. Santos, 38:2, 2007, 135-138, C, 5.2.6, 5.6.2 Proof Without Words: The Volume of an Ellipsoid via CavalieriÕs Principle, Sidney H. Kung, 39:3, 2008, 190, C, 0.5