Volume of a solid using shell method: y=x. , y= -x/2 , x=2 about y-axis

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Math lover799

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Use the shell method to find the volume of the solids generated by revolving the region's blunderbuss the curves and lines about the y axis.

y=x. , y= -x/2 , x=2

So I tried answering this question using x as shell radius and (x-x/2) as shell height. After integrating I got 8π/3 as the answer. But I checked the solution and they have talked (x-(-x/2)) as shell height. Why have they subtracted it?
 
Math lover799 said:
Use the shell method to find the volume of the solids generated by revolving the region's blunderbuss the curves and lines about the y axis.

y=x. , y= -x/2 , x=2

So I tried answering this question using x as shell radius and (x-x/2) as shell height. After integrating I got 8π/3 as the answer. But I checked the solution and they have talked (x-(-x/2)) as shell height. Why have they subtracted it?
Click to expand...

?? Why have you added it? The distance between two curves is obtained by subtraction. Maybe I'm not understanding your question.
 
Take two numbers, say 10 and 2.

Is the distance between them 10+2 = 12 or 10-2 = 8?
 
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