In calculus a surface of revol ution is generated by rotming a curve )' = [(x) defined
Chapter 6, Problem 14(choose chapter or problem)
In calculus a surface of revol ution is generated by rotming a curve )' = [(x) defined on an interval fa. hJ around an axis of revolution. For example. y = x 2 on [0. 1 J rotated about the _I-axis generates the surface shown in Figure 6.13. We say that the surface is "swept out" hy the curve rotating about the x-axis.
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