![The region bounded by the curve y=ln(x)/x and the lines x=1, x=e, y=0 is rotated around x=2π. Find the volume of the solid generated. How would I go about solving this? Doesn't The region bounded by the curve y=ln(x)/x and the lines x=1, x=e, y=0 is rotated around x=2π. Find the volume of the solid generated. How would I go about solving this? Doesn't](https://useruploads.socratic.org/iHlNRTs2QPWd5fIMsAX9_Rev1.png)
The region bounded by the curve y=ln(x)/x and the lines x=1, x=e, y=0 is rotated around x=2π. Find the volume of the solid generated. How would I go about solving this? Doesn't
![The slope of the tangent to the curve y = ln (x) at x = 1 is . Hint: Graph y = ln (x) and then draw the tangent at the point The slope of the tangent to the curve y = ln (x) at x = 1 is . Hint: Graph y = ln (x) and then draw the tangent at the point](https://homework.study.com/cimages/multimages/16/sdcb011732759915435979865.png)
The slope of the tangent to the curve y = ln (x) at x = 1 is . Hint: Graph y = ln (x) and then draw the tangent at the point
![algebra precalculus - $y = \ln x$ with their $x$ coordinates as $1,2$ and $t$ respectively - Mathematics Stack Exchange algebra precalculus - $y = \ln x$ with their $x$ coordinates as $1,2$ and $t$ respectively - Mathematics Stack Exchange](https://i.stack.imgur.com/cH0gt.jpg)