Answer:
The cylinder is given straight away by x^2+y^2=r^2=16\implies r=4. To get the cylinder, we complete one revolution, so that 0\le\theta\le2\pi. The upper limit in z is a spherical cap determined by
x^2+y^2+z^2=144\iff z^2=144-r^2\implies z=\sqrt{144-r^2}
So the volume is given by
\displaystyle\iiint_{\mathcal D}\mathrm dV=\int_{\theta=0}^{\theta=2\pi}\int_{r=0}^{r=4}\int_{z=0}^{z=\sqrt{144-r^2}}r\,\mathrm dz\,\mathrm dr\,\mathrm d\theta
and has a value of \dfrac{128(27-16\sqrt2)\pi}3 (not that we care)
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Step-by-step explanation:
