How do you find the volume of a solid of revolution washer method?

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How do you find the volume of a solid of revolution washer method?

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Answer 1 · 2014-08-30T06:30:02

Suppose that #f(x)geq g(x)# for all #x# in #[a,b]#. If the region between the graphs of #f# and #g# from #x=a# to #x=b# is revolved about the #x#-axis, then the volume of the resulting solid can be found by
#V=pi int_a^b{[f(x)]^2-[g(x)]^2}dx#

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How do you find the volume of a solid of revolution washer method?

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