Solution a.): Here is a carefully labeled sketch of the region with a shell marked on the $x$-axis at $x$. The shell has radius $r$, measured from the $y$-axis, and height $h$, taken parallel to the $y$-axis at $x$. It is IMPORTANT to mark ALL of $x$, $r$, and $h$ in the sketch of the region !!!

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Thus the total volume of this Solid of Revolution is $$ Volume = 2 \pi \int_{0}^{2} (radius)(height) \ dx = 2 \pi \int_{0}^{2} rh \ dx $$ $$ = 2 \pi \int_{0}^{2} (x)(e^2-e^x) \ dx $$

Solution b.): IMPORTANT CHANGE: Because we are revolving the region about the $x$-axis, we must mark a shell on the $y$-axis at $y$ !!! The shell has radius $r$, measured from the $x$-axis, and height $h$, taken parallel to the $x$-axis at $y$. It is IMPORTANT to mark ALL of $y$, $r$, and $h$ in the sketch of the region !!!

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Thus the total volume of this Solid of Revolution is $$ Volume = 2 \pi \int_{1}^{e^2} (radius)(height) \ dy = 2 \pi \int_{1}^{e^2} rh \ dy $$ $$ = 2 \pi \int_{1}^{e^2} (y)(\ln y) \ dy $$

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