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Hi we have the following problem:

$\iiint x\,dx\,dy\,dz$ limited by the paraboloid of equation $x=4 y^2+4z^2$ and for the plane $x=4$.

We are having difficulty on finding the limits of each integral and how to turn to polar coordinates.

Could you offer any tips? I can provide more details on the comments on what we tried. Thank you.

2 Answers 2

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Normally, polar coordinates are given as $x=r\cos \theta $ and $y=r\sin \theta $, but that does not necessarily have to be. In this case, I think it is wise to use $y=r\cos \theta $ and $z=r\sin \theta $. Then, your limits of integration would be from the paraboloid to the plane (in $dx$), then from zero to the radius of the bounding circle in the $y$-$z$ plane, then from zero to $2\pi$ in $\theta$ to complete the full revolution around the circle.

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    Thank you we are trying this right now!2012-09-07
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    If you use y=rcos(θ) and z=rsin(θ), what do you use for x since the integral is ∫∫∫xdxdydz?2012-09-07
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    You don't need to substitute anything for x... the change in variables result in a differential of the form: $r dxdrd\theta$.2012-09-07
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An idea: make a substitution change $\,x\leftrightarrow z\,$, so that you have the paraboloid $\,z=4x^2+4y^2\,$ and the plane$\,z=4\,$, and now use cylindrical coordinates and the symmetry of the paraboloid around the $\,z-\,$ axis:

$$\iiint z\,dx\,dy\,dz=4\int_0^1dr\int_0^{\pi/2}d\theta\int_{4r^2}^4 4r^3\,dz$$

Please do note that $\,4r^3=4r^2\cdot r=z|J|$, where $|J|$ is the Jacobian of the transformation into cylindrical coordinates.

Added: We can also do the following:

$$\begin{align} \iiint z\,dx\,dy\,dz &= 4\int_0^1dr\int_0^{\pi/2}d\theta\int_{4r^2}^4 zr\,dz\\ & = 2\pi\int_0^1r\left[\frac{1}{2}z^2\right]\Bigg|_{4r^2}^4\,dr \\ & = \pi\int_0^1(16r-16r^5)\,dr \\ & = 16\pi\left(\frac{1}{2}-\frac{1}{6}\right) \\ & = \frac{16\pi}{3} \end{align}$$

which is the right answer according to the book. I still am not sure what went wrong with the first method which I leave here for others to check and comment.

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    Sorry the answer doesn't matches with the calculator :/2012-09-07
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    What's *the answer" and by whom ( the book's?)? And what did you get above? Just like that it's hard to say what could have happened...2012-09-07
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    The answer according to my text book is 16pi/3 and what I got from above was 64pi/152012-09-07
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    Well, the result of the integral in my answer is $\,\frac{8\pi}{3}\,$ , so it is off by a simple factor of 2 which I can't see right now from where it comes. Perhaps later I'll add something to my answer. Anyways, your calculation seesm to be wrong2012-09-07
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    @Edoardo , what book is that?2012-09-07
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    Sometimes, books can be mistaken as well.2012-09-07