Example 7-4-10 - Maple Help



Chapter 7: Triple Integration



Section 7.4: Integration in Cylindrical Coordinates



Example 7.4.10



 Use cylindrical coordinates to integrate the function $f=1$ over $R$, that part of the interior of the sphere ${x}^{2}+{y}^{2}+{z}^{2}=4$ that lies inside the cylinder whose cross section is .