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So I'm about to finish my initial course on Integral Calculus when I come across this problem:

Let there be a spherical container full of water with a 2 meter radius. How much work would it take to raise this volume of water 10 meters up from the top of the container?

I can't figure out how to even write this down as a definite integral. I do know how integrating to get Work goes:

A definite integral of the force times distance.

What I don't get is how to input the sphere (x = sqrt(4 - y^2)) in the equation or how to even write it so it's a definite integral. Help is very much appreciated.

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It doesn't matter much, but let the sphere have centre the origin. So the sphere has equation $x^2+y^2+z^2=4$.

For any $z$ (naturally between $-2$ and $2$), the cross-section at height $z$ parallel to the $x$-$y$ plane is a circle the square of whose radius is $4-z^2$.

So any thin slice of thickness "$dz$" at height $z$ has volume about $\pi(4-z^2)dz$. We have to lift this slice to height $12$ above the $x$-$y$ plane.

"Add up" over all slices, that is, integrate. The work done is therefore $\int_{-2}^2 K(12-z)\pi(4-z^2)\,dz,$ where $K$ is a constant that depends on the units used.

Another way: We set up an integral, because you asked for that. And the idea will be useful for other problrms.

But there is a much easier way. It takes $0$ work to bring the water to the $x$-$y$ plane. This is because the work done in lifting the lower part is cancelled by the work done by the water moving from the upper part. Then we have to lift the whole mass, if you wish concentrated at the origin, through a distance $12$. Thus the work is the volume times $12$ times the same constant $K$ as above. The volume is $\frac{4\pi}{3}(2^3)$. Now multiply by $12K$.

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    @EduardodeLuna: In MKS units, it would be (kg)(m$^2$)/(sec$^2$), that is, joules.2012-11-25